6. Trigonometría Tri C1 S01. Tabla. Cálculo de relaciones trigonométricas Se tiene un triángulo rectángulo. Sabiendo que el cateto opuesto al ángulo «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»§#945;«/mi»«/math» es de «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»o«/mi»«/math», el cateto adyacente a «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»§#945;«/mi»«/math» es «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»a«/mi»«/math», y que «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mn»0«/mn»«mo»§#176;«/mo»«mo»§#60;«/mo»«mi»§#945;«/mi»«mo»§#60;«/mo»«mn»90«/mn»«mo»§#176;«/mo»«/math», determinar las relaciones trigonométricas del ángulo «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»§#945;«/mi»«/math».

Observaciones:

- Ingresa los valores decimales con dos cifras, aproximando el segundo decimal, si el tercer decimal es igual o mayir a 5, es decir, si tu resultado es 0.456 debes ingresar 0.46.

- Ingresa las cifras decimales con punto, y no coma

]]>

Para determinar las razones trigonométricas del ángulo «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»§#945;«/mi»«/math», debemos recordar que en un triángulo rectángulo las razones trigonométricas restán representadas con las siguientes fórmulas:

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»s«/mi»«mi»e«/mi»«mi»n«/mi»«mo»(«/mo»«mi»§#945;«/mi»«mo»)«/mo»«mo»=«/mo»«mfrac»«mrow»«mi»c«/mi»«mi»a«/mi»«mi»t«/mi»«mi»e«/mi»«mi»t«/mi»«mi»o«/mi»«mo»§#160;«/mo»«mi»o«/mi»«mi»p«/mi»«mi»u«/mi»«mi»e«/mi»«mi»s«/mi»«mi»t«/mi»«mi»o«/mi»«/mrow»«mrow»«mi»h«/mi»«mi»i«/mi»«mi»p«/mi»«mi»o«/mi»«mi»t«/mi»«mi»e«/mi»«mi»n«/mi»«mi»u«/mi»«mi»s«/mi»«mi»a«/mi»«/mrow»«/mfrac»«/math»

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»cos«/mi»«mo»(«/mo»«mi»§#945;«/mi»«mo»)«/mo»«mo»=«/mo»«mfrac»«mrow»«mi»c«/mi»«mi»a«/mi»«mi»t«/mi»«mi»e«/mi»«mi»t«/mi»«mi»o«/mi»«mo»§#160;«/mo»«mi»a«/mi»«mi»d«/mi»«mi»y«/mi»«mi»a«/mi»«mi»c«/mi»«mi»e«/mi»«mi»n«/mi»«mi»t«/mi»«mi»e«/mi»«/mrow»«mrow»«mi»h«/mi»«mi»i«/mi»«mi»p«/mi»«mi»o«/mi»«mi»t«/mi»«mi»e«/mi»«mi»n«/mi»«mi»u«/mi»«mi»s«/mi»«mi»a«/mi»«/mrow»«/mfrac»«/math»

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»tan«/mi»«mo»(«/mo»«mi»§#945;«/mi»«mo»)«/mo»«mo»=«/mo»«mfrac»«mrow»«mi»c«/mi»«mi»a«/mi»«mi»t«/mi»«mi»e«/mi»«mi»t«/mi»«mi»o«/mi»«mo»§#160;«/mo»«mi»o«/mi»«mi»p«/mi»«mi»u«/mi»«mi»e«/mi»«mi»s«/mi»«mi»t«/mi»«mi»o«/mi»«/mrow»«mrow»«mi»c«/mi»«mi»a«/mi»«mi»t«/mi»«mi»e«/mi»«mi»t«/mi»«mi»o«/mi»«mo»§#160;«/mo»«mi»a«/mi»«mi»d«/mi»«mi»y«/mi»«mi»a«/mi»«mi»c«/mi»«mi»e«/mi»«mi»n«/mi»«mi»t«/mi»«mi»e«/mi»«/mrow»«/mfrac»«/math»

Si se tienen como datos el cateto opuesto que tiene un valor de «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»o«/mi»«/math» y el valor del cateto adyacente, que tiene un valor de «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»a«/mi»«/math», podemos calcular el valor de la hipotenusa a través de la fórmula de Pitágoras:

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»h«/mi»«mo»=«/mo»«msqrt»«msup»«mi»o«/mi»«mn»2«/mn»«/msup»«mo»+«/mo»«msup»«mi»a«/mi»«mn»2«/mn»«/msup»«/msqrt»«/math»

Al reemplazar el valor de ambos catetos, tenemos lo siguiente:

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»h«/mi»«mo»=«/mo»«msqrt»«mo»(«/mo»«mo»#«/mo»«mi»o«/mi»«msup»«mo»)«/mo»«mn»2«/mn»«/msup»«mo»+«/mo»«mo»(«/mo»«mo»#«/mo»«mi»a«/mi»«msup»«mo»)«/mo»«mn»2«/mn»«/msup»«/msqrt»«mo»=«/mo»«mo»#«/mo»«mi»h«/mi»«/math»

Podemos obtener además el valor del ángulo «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»§#945;«/mi»«/math», con la fórmula:

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»§#945;«/mi»«mo»=«/mo»«mi»a«/mi»«mi»tan«/mi»«mfrac»«mrow»«mi»c«/mi»«mi»a«/mi»«mi»t«/mi»«mi»e«/mi»«mi»t«/mi»«mi»o«/mi»«mo»§#160;«/mo»«mi»o«/mi»«mi»p«/mi»«mi»u«/mi»«mi»e«/mi»«mi»s«/mi»«mi»t«/mi»«mi»o«/mi»«mo»§#160;«/mo»«/mrow»«mrow»«mi»a«/mi»«mi»d«/mi»«mi»y«/mi»«mi»a«/mi»«mi»c«/mi»«mi»e«/mi»«mi»n«/mi»«mi»t«/mi»«mi»e«/mi»«/mrow»«/mfrac»«/math»

es decir:

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»§#945;«/mi»«mo»=«/mo»«mi»a«/mi»«mi»tan«/mi»«mfenced»«mfrac»«mrow»«mo»#«/mo»«mi»o«/mi»«/mrow»«mrow»«mo»#«/mo»«mi»a«/mi»«/mrow»«/mfrac»«/mfenced»«/math»

Con el valor del ángulo, podemos a través del uso de la calculadora, determinar las funciones «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»s«/mi»«mi»e«/mi»«mi»n«/mi»«mo»(«/mo»«mi»§#945;«/mi»«mo»)«/mo»«mo»,«/mo»«mo»§#160;«/mo»«mi»cos«/mi»«mo»(«/mo»«mi»§#945;«/mi»«mo»)«/mo»«mo»§#160;«/mo»«mi»y«/mi»«mo»§#160;«/mo»«mi»tan«/mi»«mo»(«/mo»«mi»§#945;«/mi»«mo»)«/mo»«/math», y además podemos calcular estos valores utilizando las fórmulas mencionadas anteriormente, es decir:

Asi obtienes que:

sen(«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»§#945;«/mi»«/math»)=#sol1

cos(«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»§#945;«/mi»«/math»)=#sol2

tan(«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»§#945;«/mi»«/math»)=#sol3

Reporta y/o califica esta pregunta:

1. Copia este código: Tri. C1. S01. a.

2. Presiona este enlace, pega el código y completa el formulario

]]> 1 .3333333 0 0 sen(α)=#sol1cos(α)=#sol2tan(α)=#sol3]]> Felicidades, tu resultado está correcto!

]]> * Tu resultado está incorrecto. Revisa tu ejercicio y si continúas con la duda consulta con tu profesor.

]]> - Santiago Sur 24/6

CORREGIDO En observaciones: Debe indicar que aproxime a 4 decimales ya que con 3 decimales lo toma malo.

En la Retroalimentación: Deben estar presente los cálculos que se indican con palabras.

Observaciones: N.G.R.

-CORREGIDO: Es importante definir número exacto de decimales .

-CORREGIDO: Se sugiere programar, de modo que, para distintos intentos, el alumno deba completar la tabla con distintas funciones del mismo ángulo, no siempre con el coseno. Justamente eso es lo que se pide. Con la función coseno, el alumno debe calcular el ángulo, y luego determinar la función seno y tangente del ángulo.

Observaciones : 20-06-2016 N.G.R.

La observación estaba dirigida a que para distintos intentos la tabla apareciera con valores para distintas funciones no siempre para el coseno.

- PENDIENTE : Explicar el origen de la formula «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»§#945;«/mi»«mo»=«/mo»«mi»a«/mi»«mi»cos«/mi»«mo»(«/mo»«mo»#«/mo»«mi»a«/mi»«mo»)«/mo»«/math» , ya que no todos los profesores trabajan solo con formulas , algunos enseñan a deducir la expresión para calcular.

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»d«/mi»«mo»=«/mo»«mo»#«/mo»«mi»a«/mi»«mo»§#183;«/mo»«msup»«mi»x«/mi»«mn»2«/mn»«/msup»«mo»§#160;«/mo»«mo»+«/mo»«mo»§#160;«/mo»«mi»y«/mi»«/math»

]]>

Para calcular la expresión «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»d«/mi»«mo»=«/mo»«mo»#«/mo»«mi»a«/mi»«mo»§#183;«/mo»«msup»«mi»x«/mi»«mn»2«/mn»«/msup»«mo»§#160;«/mo»«mo»+«/mo»«mo»§#160;«/mo»«mi»y«/mi»«/math», debes utilizar la siguiente identidad trigonométrica:

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»s«/mi»«mi»e«/mi»«msup»«mi»n«/mi»«mn»2«/mn»«/msup»«mi»§#945;«/mi»«mo»§#160;«/mo»«mo»+«/mo»«mo»§#160;«/mo»«msup»«mi»cos«/mi»«mn»2«/mn»«/msup»«mi»§#945;«/mi»«mo»§#160;«/mo»«mo»=«/mo»«mo»§#160;«/mo»«mn»1«/mn»«/math»

Se reemplaza «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»x«/mi»«/math» por «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»cos«/mi»«mi»§#945;«/mi»«/math», quedando la expresión:

Luego se reemplaza «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»y«/mi»«mo»§#160;«/mo»«mi»p«/mi»«mi»o«/mi»«mi»r«/mi»«mo»§#160;«/mo»«mo»#«/mo»«mi»a«/mi»«mi»s«/mi»«mi»e«/mi»«msup»«mi»n«/mi»«mn»2«/mn»«/msup»«mi»§#945;«/mi»«/math», obteniéndose la expresión

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»d«/mi»«mo»=«/mo»«mo»#«/mo»«mi»a«/mi»«mo»§#183;«/mo»«msup»«mi»cos«/mi»«mn»2«/mn»«/msup»«mi»§#945;«/mi»«mo»§#160;«/mo»«mo»+«/mo»«mo»§#160;«/mo»«mo»#«/mo»«mi»a«/mi»«mo»§#183;«/mo»«mi»s«/mi»«mi»e«/mi»«msup»«mi»n«/mi»«mn»2«/mn»«/msup»«mi»§#945;«/mi»«/math»

Si factorizamos la expresión «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»a«/mi»«mo»§#183;«/mo»«mo»(«/mo»«msup»«mi»cos«/mi»«mn»2«/mn»«/msup»«mi»§#945;«/mi»«mo»§#160;«/mo»«mo»+«/mo»«mo»§#160;«/mo»«mi»s«/mi»«mi»e«/mi»«msup»«mi»n«/mi»«mn»2«/mn»«/msup»«mi»§#945;«/mi»«mo»)«/mo»«/math» , y aplicamos la identidad, obtenemos «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»a«/mi»«mo»§#183;«/mo»«mo»(«/mo»«mn»1«/mn»«mo»)«/mo»«/math»

Por lo tanto el resultado es: #sol

Reporta y/o califica esta pregunta:

1. Copia este código: Tri. C1. S01. b.

2. Presiona este enlace, pega el código y completa el formulario

]]> 1 .3333333 0 0 d=#sol]]> Muy bien, felicidades.

]]> +]]> Tu respuesta es incorrecta. Revisa tu ejercicio y continúas con la duda, consulta con tu profesor.

]]> * Santiago Sur 24/6

En la pregunta dice: "para determinar la expresión": debería ser: para determinar el valor de la expresión:

En la Retroalimentación:

Centrar las ecuaciones

Donde dice "por lo tanto el resultado es" debe ingresar el valor ya que la respuesta que nosotros vemos, no la ve el alumno.

#graf

Observación:

Si el resultado es un número decimal ingresa el valor con punto, y sin unidad de medida., con dos decimales y aproximar (ejemplo 35,6784 ingrese 35.68)

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ooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA//9k= Para calcular el cateto a y el cateto b debemos aplicar la fórmula del seno del ángulo alfa

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»sin«/mi»«mfenced»«mi»§#945;«/mi»«/mfenced»«mo»=«/mo»«mfrac»«mrow»«mi»c«/mi»«mi»a«/mi»«mi»t«/mi»«mi»e«/mi»«mi»t«/mi»«mi»o«/mi»«mo»§#160;«/mo»«mi»o«/mi»«mi»p«/mi»«mi»u«/mi»«mi»e«/mi»«mi»s«/mi»«mi»t«/mi»«mi»o«/mi»«mo»§#160;«/mo»«mi»a«/mi»«mi»l«/mi»«mo»§#160;«/mo»«mi»§#225;«/mi»«mi»n«/mi»«mi»g«/mi»«mi»u«/mi»«mi»l«/mi»«mi»o«/mi»«mo»§#160;«/mo»«mi»§#945;«/mi»«/mrow»«mrow»«mi»h«/mi»«mi»i«/mi»«mi»p«/mi»«mi»o«/mi»«mi»t«/mi»«mi»e«/mi»«mi»n«/mi»«mi»u«/mi»«mi»s«/mi»«mi»a«/mi»«/mrow»«/mfrac»«/math»

aplicando los datos en la fórmula

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»sin«/mi»«mfenced»«mi»§#945;«/mi»«/mfenced»«mo»=«/mo»«mfrac»«mi»a«/mi»«mrow»«mo»#«/mo»«mi»x«/mi»«/mrow»«/mfrac»«/math»

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»x«/mi»«mo»§#183;«/mo»«mo»#«/mo»«mi»d«/mi»«mo»=«/mo»«mi»a«/mi»«/math»

Entonces cateto a = #sol1

Para hallar el cateto b reemplazamos en el teorema de pitagoras

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msup»«mi»c«/mi»«mn»2«/mn»«/msup»«mo»§#160;«/mo»«mo»=«/mo»«mo»§#160;«/mo»«msup»«mi»a«/mi»«mn»2«/mn»«/msup»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»+«/mo»«mo»§#160;«/mo»«msup»«mi»b«/mi»«mn»2«/mn»«/msup»«/math»

Reemplazando «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«msup»«mi»x«/mi»«mn»2«/mn»«/msup»«mo»§#32;«/mo»«mo»=«/mo»«mo»§#32;«/mo»«mo»#«/mo»«msup»«mi»h«/mi»«mn»2«/mn»«/msup»«mo»§#32;«/mo»«mo»+«/mo»«msup»«mi»b«/mi»«mn»2«/mn»«/msup»«/math»

Despejando «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«msup»«mi»x«/mi»«mn»2«/mn»«/msup»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»-«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»#«/mo»«msup»«mi»h«/mi»«mn»2«/mn»«/msup»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»=«/mo»«mo»§#160;«/mo»«msup»«mi»b«/mi»«mn»2«/mn»«/msup»«/math»

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msqrt»«mo»#«/mo»«msup»«mi»x«/mi»«mn»2«/mn»«/msup»«mo»§#160;«/mo»«mo»+«/mo»«mo»§#160;«/mo»«mo»#«/mo»«msup»«mi»h«/mi»«mn»2«/mn»«/msup»«/msqrt»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»=«/mo»«mi»b«/mi»«/math»

cateto b = #sol2

Reporta y/o califica esta pregunta:

1. Copia este código: Tri. C1. S01. c.

2. Presiona este enlace, pega el código y completa el formulario

]]> 1 .3333333 0 0 a=#sol1b=#sol2]]> Muy Bien

]]> -]]> Revisemos el procedimiento para mejores resultados n, si aún tienes dudas consulta a tu profesor.

]]> -

Santiago Sur 24/6

En la observación:

Debe indicar con cuántos decimales trabajar y la respuesta con cuántos decimales y si se aproxima o no.

corregido.

En la retroalimentación:

Aparece el valor y debe aparecer la letra de la variable b. Corregido.

Observaciones: N:G:R:

Pendiente : Según acuerdo, en capacitación se indicó que no es conveniente pegar imágenes.Corregido.

Pendiente : Se sugiere normalizar el número de decimales, no es bueno que el enunciado contenga cuatro decimales y en la respuesta se pidan solo dos.Corregido.

Ángulos en grados sexagesimales	ángulo en radianes
A	#AD
#BB	B
C	#CD

Observación:

Si el resultado es decimal, ingresa punto como separador decimal y ocupa 3 decimales

]]>

Recuerda que «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mn»180«/mn»«mo»§#176;«/mo»«mo»=«/mo»«mi»§#960;radianes«/mi»«/math»

para calcular «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»A«/mi»«/math», se realiza de la siguiente manera

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mn»180«/mn»«mo»§#176;«/mo»«mo»§#8594;«/mo»«mi»§#960;«/mi»«mi»r«/mi»«mi»a«/mi»«mi»d«/mi»«mi»i«/mi»«mi»a«/mi»«mi»n«/mi»«mi»e«/mi»«mi»s«/mi»«mspace linebreak=¨newline¨/»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mi»A«/mi»«mo»§#8594;«/mo»«mo»#«/mo»«mi»A«/mi»«mi»D«/mi»«/math»

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»A«/mi»«mo»=«/mo»«mfrac»«mrow»«mn»180«/mn»«mo»§#176;«/mo»«mo»§#183;«/mo»«mo»#«/mo»«mi»A«/mi»«mi»D«/mi»«/mrow»«mi»§#960;radian«/mi»«/mfrac»«/math»

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»A«/mi»«mo»=«/mo»«mo»#«/mo»«mi»s«/mi»«mi»o«/mi»«mi»l«/mi»«mn»1«/mn»«/math»

para calcular «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»B«/mi»«/math», se realiza de la siguiente manera

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mn»180«/mn»«mo»§#176;«/mo»«mo»§#8594;«/mo»«mi»§#960;«/mi»«mi»r«/mi»«mi»a«/mi»«mi»d«/mi»«mi»i«/mi»«mi»a«/mi»«mi»n«/mi»«mi»e«/mi»«mi»s«/mi»«mspace linebreak=¨newline¨/»«mo»§#160;«/mo»«mo»#«/mo»«mi»B«/mi»«mi»B«/mi»«mo»§#8594;«/mo»«mi»B«/mi»«/math»

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»B«/mi»«mo»=«/mo»«mfrac»«mrow»«mi»§#960;«/mi»«mi»r«/mi»«mi»a«/mi»«mi»d«/mi»«mi»i«/mi»«mi»a«/mi»«mi»n«/mi»«mo»§#183;«/mo»«mo»#«/mo»«mi»B«/mi»«mi»B«/mi»«/mrow»«mi»§#960;radian«/mi»«/mfrac»«/math»

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»B«/mi»«mo»=«/mo»«mo»#«/mo»«mi»s«/mi»«mi»o«/mi»«mi»l«/mi»«mn»2«/mn»«mo»=«/mo»«mo»#«/mo»«mi»s«/mi»«mi»o«/mi»«mi»l«/mi»«mn»4«/mn»«/math»

para calcular «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»C«/mi»«/math», se realiza de la siguiente manera

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mn»180«/mn»«mo»§#176;«/mo»«mo»§#8594;«/mo»«mi»§#960;«/mi»«mi»r«/mi»«mi»a«/mi»«mi»d«/mi»«mi»i«/mi»«mi»a«/mi»«mi»n«/mi»«mi»e«/mi»«mi»s«/mi»«mspace linebreak=¨newline¨/»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mi»C«/mi»«mo»§#8594;«/mo»«mo»#«/mo»«mi»C«/mi»«mi»D«/mi»«/math»

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»A«/mi»«mo»=«/mo»«mfrac»«mrow»«mn»180«/mn»«mo»§#176;«/mo»«mo»§#183;«/mo»«mo»#«/mo»«mi»C«/mi»«mi»D«/mi»«/mrow»«mi»§#960;radian«/mi»«/mfrac»«/math»

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»C«/mi»«mo»=«/mo»«mo»#«/mo»«mi»s«/mi»«mi»o«/mi»«mi»l«/mi»«mn»3«/mn»«/math»

Reporta y/o califica esta pregunta:

1. Copia este código: Tri. C1. S02.

2. Presiona este enlace, pega el código y completa el formulario

]]> 1 .3333333 0 0 A=#sol1B=#sol2C=#sol3]]> Muy Bien

Recuerda que

]]> * Al parecer cometiste un error, consulta a tu profesor si tienes dudas

]]> -]]> Santiago Sur 24/6

En la observación:corregido

Indicar el formato del número decimal, con punto, número de decimales, con o sin aproximación.

En la retroalimentación:

Falta escribir el resulatdo de B

01/06/2016 Fatima Toro Lagos

Pendiente: Sugiero que en vez de escribir "completa la siguientes tabla", comiences con "A partir de la tabla..", es mas cercano a lo que deben realizar

corregido: Indicar en las observaciones con cuantos decimales se deben ingresar las cifras.

Pendiente: La tabla debe ser con los segmentos internos y en negro, para utilicemos siempre el mismo formato, o el más parecido.

#graf

Observación :

Ingrese el resultado con WIRIS .

Simplifica hasta dejar una fracción irreductible.

Si ingresas un decimal escríbelo con punto y con tres decimales.

(Ejemplo 2,5678 ingresa 2.568 , si es 0,5 ingresa 0.5 , si el valor es 2,3333 ingresa 2.333 )

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»s«/mi»«mi»e«/mi»«mi»n«/mi»«mi»o«/mi»«mo»§#32;«/mo»«mi»§#225;«/mi»«mi»n«/mi»«mi»g«/mi»«mi»u«/mi»«mi»l«/mi»«mi»o«/mi»«mo»§#32;«/mo»«mi»A«/mi»«mi»B«/mi»«mi»C«/mi»«mo»§#32;«/mo»«mo»=«/mo»«mfrac»«mrow»«mi»c«/mi»«mi»a«/mi»«mi»t«/mi»«mi»e«/mi»«mi»t«/mi»«mi»o«/mi»«mo»§#32;«/mo»«mi»o«/mi»«mi»p«/mi»«mi»u«/mi»«mi»e«/mi»«mi»s«/mi»«mi»t«/mi»«mi»o«/mi»«mo»§#32;«/mo»«mi»d«/mi»«mi»e«/mi»«mi»l«/mi»«mo»§#32;«/mo»«mi»§#225;«/mi»«mi»n«/mi»«mi»g«/mi»«mi»u«/mi»«mi»l«/mi»«mi»o«/mi»«mo»§#32;«/mo»«mi»A«/mi»«mi»B«/mi»«mi»C«/mi»«/mrow»«mrow»«mi»h«/mi»«mi»i«/mi»«mi»p«/mi»«mi»o«/mi»«mi»t«/mi»«mi»e«/mi»«mi»n«/mi»«mi»u«/mi»«mi»s«/mi»«mi»a«/mi»«/mrow»«/mfrac»«/math»

Reemplazando los valores en la fórmula se obtiene:

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»s«/mi»«mi»e«/mi»«mi»n«/mi»«mi»o«/mi»«mo» «/mo»«mi»§#225;«/mi»«mi»n«/mi»«mi»g«/mi»«mi»u«/mi»«mi»l«/mi»«mi»o«/mi»«mo» «/mo»«mi»A«/mi»«mi»B«/mi»«mi»C«/mi»«mo» «/mo»«mo»=«/mo»«mo»#«/mo»«mi»s«/mi»«mi»o«/mi»«mi»l«/mi»«mn»1«/mn»«mo»=«/mo»«mo»#«/mo»«mi»s«/mi»«mi»o«/mi»«mi»l«/mi»«mn»11«/mn»«/math»

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»cos«/mi»«mi»e«/mi»«mi»n«/mi»«mi»o«/mi»«mo»§#32;«/mo»«mi»§#225;«/mi»«mi»n«/mi»«mi»g«/mi»«mi»u«/mi»«mi»l«/mi»«mi»o«/mi»«mo»§#32;«/mo»«mi»A«/mi»«mi»B«/mi»«mi»C«/mi»«mo»§#32;«/mo»«mo»=«/mo»«mfrac»«mrow»«mi»c«/mi»«mi»a«/mi»«mi»t«/mi»«mi»e«/mi»«mi»t«/mi»«mi»o«/mi»«mo»§#32;«/mo»«mo»§#32;«/mo»«mi»a«/mi»«mi»d«/mi»«mi»y«/mi»«mi»a«/mi»«mi»c«/mi»«mi»e«/mi»«mi»n«/mi»«mi»t«/mi»«mi»e«/mi»«mo»§#32;«/mo»«mi»a«/mi»«mi»l«/mi»«mo»§#32;«/mo»«mi»§#225;«/mi»«mi»n«/mi»«mi»g«/mi»«mi»u«/mi»«mi»l«/mi»«mi»o«/mi»«mo»§#32;«/mo»«mi»A«/mi»«mi»B«/mi»«mi»C«/mi»«/mrow»«mrow»«mi»h«/mi»«mi»i«/mi»«mi»p«/mi»«mi»o«/mi»«mi»t«/mi»«mi»e«/mi»«mi»n«/mi»«mi»u«/mi»«mi»s«/mi»«mi»a«/mi»«/mrow»«/mfrac»«/math»

Reemplazando los valores en la fórmula se obtiene :

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»cos«/mi»«mi»e«/mi»«mi»n«/mi»«mi»o«/mi»«mo» «/mo»«mi»§#225;«/mi»«mi»n«/mi»«mi»g«/mi»«mi»u«/mi»«mi»l«/mi»«mi»o«/mi»«mo» «/mo»«mi»A«/mi»«mi»B«/mi»«mi»C«/mi»«mo» «/mo»«mo»=«/mo»«mo»#«/mo»«mi»s«/mi»«mi»o«/mi»«mi»l«/mi»«mn»2«/mn»«mo»=«/mo»«mo»#«/mo»«mi»s«/mi»«mi»o«/mi»«mi»l«/mi»«mn»12«/mn»«/math»

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»tan«/mi»«mi»g«/mi»«mi»e«/mi»«mi»n«/mi»«mi»t«/mi»«mi»e«/mi»«mo»§#32;«/mo»«mi»§#225;«/mi»«mi»n«/mi»«mi»g«/mi»«mi»u«/mi»«mi»l«/mi»«mi»o«/mi»«mo»§#32;«/mo»«mi»A«/mi»«mi»B«/mi»«mi»C«/mi»«mo»§#32;«/mo»«mo»=«/mo»«mfrac»«mrow»«mi»c«/mi»«mi»a«/mi»«mi»t«/mi»«mi»e«/mi»«mi»t«/mi»«mi»o«/mi»«mo»§#32;«/mo»«mi»o«/mi»«mi»p«/mi»«mi»u«/mi»«mi»e«/mi»«mi»s«/mi»«mi»t«/mi»«mi»o«/mi»«mo»§#32;«/mo»«mi»§#225;«/mi»«mi»n«/mi»«mi»g«/mi»«mi»u«/mi»«mi»l«/mi»«mi»o«/mi»«mo»§#32;«/mo»«mi»A«/mi»«mi»B«/mi»«mi»C«/mi»«mo»§#32;«/mo»«/mrow»«mrow»«mi»c«/mi»«mi»a«/mi»«mi»t«/mi»«mi»e«/mi»«mi»t«/mi»«mi»o«/mi»«mo»§#32;«/mo»«mi»a«/mi»«mi»d«/mi»«mi»y«/mi»«mi»a«/mi»«mi»c«/mi»«mi»e«/mi»«mi»n«/mi»«mi»t«/mi»«mi»e«/mi»«mo»§#32;«/mo»«mi»§#225;«/mi»«mi»n«/mi»«mi»g«/mi»«mi»u«/mi»«mi»l«/mi»«mi»o«/mi»«mo»§#32;«/mo»«mi»A«/mi»«mi»B«/mi»«mi»C«/mi»«/mrow»«/mfrac»«/math»

Reemplazando en la fórmula se obtiene .

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»tan«/mi»«mi»g«/mi»«mi»e«/mi»«mi»n«/mi»«mi»t«/mi»«mi»e«/mi»«mo» «/mo»«mi»§#225;«/mi»«mi»n«/mi»«mi»g«/mi»«mi»u«/mi»«mi»l«/mi»«mi»o«/mi»«mo» «/mo»«mi»A«/mi»«mi»B«/mi»«mi»C«/mi»«mo» «/mo»«mo»=«/mo»«mfrac»«mrow»«mo»#«/mo»«mi»x«/mi»«/mrow»«mrow»«mo»#«/mo»«mi»y«/mi»«/mrow»«/mfrac»«/math»

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»tan«/mi»«mi»g«/mi»«mi»e«/mi»«mi»n«/mi»«mi»t«/mi»«mi»e«/mi»«mo» «/mo»«mi»§#225;«/mi»«mi»n«/mi»«mi»g«/mi»«mi»u«/mi»«mi»l«/mi»«mi»o«/mi»«mo» «/mo»«mi»A«/mi»«mi»B«/mi»«mi»C«/mi»«mo» «/mo»«mo»=«/mo»«mo»#«/mo»«mi»s«/mi»«mi»o«/mi»«mi»l«/mi»«mn»3«/mn»«mo»=«/mo»«mo»#«/mo»«mi»s«/mi»«mi»o«/mi»«mi»l«/mi»«mn»13«/mn»«/math»

Reporta y/o califica esta pregunta:

1. Copia este código: Tri. C1. S03. a.

2. Presiona este enlace, pega el código y completa el formulario

]]> 1 .3333333 0 0 seno del ángulo ABC =#sol1coseno del ángulo ABC=#sol2tangente del ánguloABC=#sol3]]> Muy Bien

]]> *]]> Revisemos el procedimiento para mejoresn resultados ,si aún tienes dudas consulta a tu profesor.

]]> - Santiago Sur 24/6

En la observación:

Indicar el número de decimales, y si se aproxima o no. Corregido

En la retroalimentación:

Escribir la fracción irreductible y colocar también el resultado en decimal.Corregido.

Observaciones; N:G:R:

- Corregido: Algunas faltas de ortografía.

- Pendiente : Se pueden fusionar los ejercicios 6.1.1.a y 6.1.1. b en una sola pregunta dejar variables α y β

- Pendiente : Según acuerdo, en capacitación se indicó que no es conveniente pegar imágenes.

- Pendiente : Se sugiere normalizar el número de decimales, no es bueno que el enunciado contenga cuatro decimales y en la respuesta se pidan solo dos.Corregido

]]> <question><wirisCasSession><![CDATA[<session lang="es" version="2.0"><library closed="false"><mrow style="color:#ffc800"/><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><apply><csymbol definitionURL="http://www.wiris.com/XML/csymbol">repeat</csymbol><mtable><mtr><mtd><mi>x</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>3</mn><mo>,</mo><mn>40</mn><mo>)</mo></mtd></mtr><mtr><mtd><mi>y</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>4</mn><mo>,</mo><mn>50</mn><mo>)</mo></mtd></mtr><mtr><mtd><mi>z</mi><mo>=</mo><msqrt><mrow><msup><mi>x</mi><mn>2</mn></msup><mo>+</mo><msup><mi>y</mi><mn>2</mn></msup></mrow></msqrt></mtd></mtr><mtr><mtd><mi>delta</mi><mo>=</mo><msqrt><mrow><msup><mi>x</mi><mn>2</mn></msup><mo>+</mo><msup><mi>y</mi><mn>2</mn></msup></mrow></msqrt></mtd></mtr><mtr><mtd/></mtr></mtable><mrow><mi>z</mi><mo>></mo><mn>0</mn><mo>∧</mo><mo>(</mo><mi>delta</mi><mo>)</mo><mo>≠</mo><mi>falso</mi><mo> </mo><mo>∧</mo><mi>es</mi><mo>(</mo><mi>delta</mi><mo> </mo><mo>,</mo><naturalnumbers/><mo>)</mo></mrow></apply></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>t1</mi><mo>=</mo><mi>tablero</mi></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>T</mi><mo>=</mo><mi>triángulo</mi><mo>(</mo><mi>punto</mi><mo>(</mo><mo>-</mo><mn>7</mn><mo>,</mo><mn>0</mn><mo>)</mo><mo>,</mo><mi>punto</mi><mo>(</mo><mn>7</mn><mo>,</mo><mn>0</mn><mo>)</mo><mo>,</mo><mi>punto</mi><mo>(</mo><mo>-</mo><mn>7</mn><mo>,</mo><mn>7</mn><mo>)</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>graf</mi><mo>=</mo><mi>dibujar</mi><mo>(</mo><mi>T</mi><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>mostrar_malla</mi><mo>(</mo><mi>falso</mi><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>mostrar_ejes</mi><mo>(</mo><mi>falso</mi><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>A</mi><mo>=</mo><mi>punto</mi><mo>(</mo><mo>-</mo><mn>7</mn><mo>,</mo><mn>0</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>B</mi><mo>=</mo><mi>punto</mi><mo>(</mo><mo> </mo><mn>7</mn><mo>,</mo><mn>0</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>C</mi><mo>=</mo><mi>punto</mi><mo>(</mo><mo>-</mo><mn>7</mn><mo>,</mo><mn>7</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>dibujar</mi><mo>(</mo><mi>B</mi><mo>,</mo><mo>{</mo><mi>color</mi><mo>=</mo><mi>negro</mi><mo>,</mo><mi>tamaño_punto</mi><mo>=</mo><mn>7</mn><mo>,</mo><mi>mostra_etiqueta</mi><mo>=</mo><mi>cierto</mi><mo>}</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>escribir</mi><mo>(</mo><mo>"</mo><mn>90</mn><mo>°</mo><mo> </mo><mo>"</mo><mo>,</mo><mo> </mo><mi>punto</mi><mo>(</mo><mo>-</mo><mn>6</mn><mo>.</mo><mn>6</mn><mo>,</mo><mn>0</mn><mo>.</mo><mn>4</mn><mo>)</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>c</mi><mo>:</mo><mo>=</mo><mi>segmento</mi><mo>(</mo><mi>punto</mi><mo>(</mo><mo>-</mo><mn>7</mn><mo>,</mo><mn>0</mn><mo>)</mo><mo>,</mo><mi>punto</mi><mo>(</mo><mn>7</mn><mo>,</mo><mn>0</mn><mo>)</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>:</mo><mo>=</mo><mi>segmento</mi><mo>(</mo><mi>punto</mi><mo>(</mo><mo>-</mo><mn>7</mn><mo>,</mo><mn>0</mn><mo>)</mo><mo>,</mo><mi>punto</mi><mo>(</mo><mo>-</mo><mn>7</mn><mo>,</mo><mn>7</mn><mo>)</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>escribir</mi><mo>(</mo><mo>"</mo><mi>cateto</mi><mo> </mo><mi>adyacente</mi><mo> </mo><mo>"</mo><mo>,</mo><mi>punto</mi><mo>(</mo><mo>-</mo><mn>3</mn><mo>,</mo><mo>-</mo><mn>1</mn><mo>)</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>:</mo><mo>=</mo><mi>segmento</mi><mo>(</mo><mi>punto</mi><mo>(</mo><mo>-</mo><mn>7</mn><mo>,</mo><mn>7</mn><mo>)</mo><mo>,</mo><mi>punto</mi><mo>(</mo><mn>7</mn><mo>,</mo><mn>0</mn><mo>)</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>escribir</mi><mo>(</mo><mo>"</mo><mi>cateto</mi><mo>"</mo><mo>,</mo><mi>punto</mi><mo>(</mo><mo>-</mo><mn>9</mn><mo>.</mo><mn>9</mn><mo>,</mo><mn>3</mn><mo>.</mo><mn>6</mn><mo>)</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>escribir</mi><mo>(</mo><mo>"</mo><mo> </mo><mi>opuesto</mi><mo> </mo><mo>"</mo><mo>,</mo><mi>punto</mi><mo>(</mo><mo>-</mo><mn>10</mn><mo>.</mo><mn>5</mn><mo>,</mo><mn>3</mn><mo>)</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mo> </mo><mo> </mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>escribir</mi><mo>(</mo><mo>"</mo><mo> </mo><mo> </mo><mi>hipotenusa</mi><mo> </mo><mo> </mo><mo>"</mo><mo>,</mo><mi>punto</mi><mo>(</mo><mn>0</mn><mo>,</mo><mn>4</mn><mo>)</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>escribir</mi><mo>(</mo><mo>"</mo><mi>A</mi><mo>"</mo><mo>,</mo><mi>punto</mi><mo>(</mo><mo>-</mo><mn>8</mn><mo>,</mo><mn>0</mn><mo>)</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>escribir</mi><mo>(</mo><mo>"</mo><mi>B</mi><mo>"</mo><mo>,</mo><mi>punto</mi><mo>(</mo><mn>7</mn><mo>.</mo><mn>5</mn><mo>,</mo><mn>0</mn><mo>)</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>escribir</mi><mo>(</mo><mo>"</mo><mi>C</mi><mo>"</mo><mo>,</mo><mi>punto</mi><mo>(</mo><mo>-</mo><mn>7</mn><mo>.</mo><mn>3</mn><mo>,</mo><mn>7</mn><mo>.</mo><mn>2</mn><mo>)</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>escribir</mi><mo>(</mo><mo>"</mo><mi>α</mi><mo>"</mo><mo>,</mo><mi>punto</mi><mo>(</mo><mn>4</mn><mo>.</mo><mn>8</mn><mo>,</mo><mn>0</mn><mo>.</mo><mn>3</mn><mo>)</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol1</mi><mo>=</mo><mfrac><mi>x</mi><mi>z</mi></mfrac></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol2</mi><mo>=</mo><mfrac><mi>y</mi><mi>z</mi></mfrac><mo> </mo><mo> </mo><mo> </mo><mo> </mo><mo> </mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol3</mi><mo>=</mo><mfrac><mi>x</mi><mi>y</mi></mfrac><mo> </mo><mo> </mo><mo> </mo><mo> </mo><mo> </mo><mo> </mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol11</mi><mo>=</mo><mi>sol1</mi><mo>*</mo><mn>1</mn><mo>.</mo><mn>0</mn></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol12</mi><mo>=</mo><mo> </mo><mi>sol2</mi><mo>*</mo><mn>1</mn><mo>.</mo><mn>0</mn></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol13</mi><mo>=</mo><mi>sol3</mi><mo>*</mo><mn>1</mn><mo>.</mo><mn>0</mn></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>null</mi></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>null</mi></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>atributos</mi><mo>(</mo><mi>tablero1</mi><mo>,</mo><mo>{</mo><mi>centro</mi><mo>=</mo><mi>punto</mi><mo>(</mo><mn>0</mn><mo>,</mo><mn>0</mn><mo>)</mo><mo>,</mo><mi>anchura</mi><mo>=</mo><mn>25</mn><mo>,</mo><mi>altura</mi><mo>=</mo><mn>25</mn><mo>,</mo><mi>anchura_ventana</mi><mo>=</mo><mn>450</mn><mo>,</mo><mi>altura_ventana</mi><mo>=</mo><mn>450</mn><mo>}</mo><mo>)</mo></math></input></command></group></library><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>z</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>51</mn></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>x</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>24</mn></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>y</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>45</mn></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol11</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>0.47059</mn></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol12</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>0.88235</mn></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol13</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>0.53333</mn></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol1</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mn>8</mn><mn>17</mn></mfrac></math></output></command></group><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo> </mo><mi>sen</mi><mi>o</mi><mo> </mo><mi mathvariant="normal">d</mi><mi mathvariant="normal">e</mi><mi>l</mi><mo> </mo><mi>á</mi><mi>n</mi><mi>g</mi><mi>u</mi><mi>l</mi><mi>o</mi><mo> </mo><mi>A</mi><mi>B</mi><mi>C</mi><mo> </mo><mo>=</mo><mo>#</mo><mi>s</mi><mi>o</mi><mi>l</mi><mn>1</mn><mspace linebreak="newline"/><mi>co</mi><mi>sen</mi><mi>o</mi><mo> </mo><mi mathvariant="normal">d</mi><mi mathvariant="normal">e</mi><mi>l</mi><mo> </mo><mi>á</mi><mi>n</mi><mi>g</mi><mi>u</mi><mi>l</mi><mi>o</mi><mo> </mo><mi>A</mi><mi>B</mi><mi>C</mi><mo>=</mo><mo>#</mo><mi>s</mi><mi>o</mi><mi>l</mi><mn>2</mn><mspace linebreak="newline"/><mi>tan</mi><mi>g</mi><mi mathvariant="normal">e</mi><mi>n</mi><mi>t</mi><mi mathvariant="normal">e</mi><mo> </mo><mi mathvariant="normal">d</mi><mi mathvariant="normal">e</mi><mi>l</mi><mo> </mo><mi>á</mi><mi>n</mi><mi>g</mi><mi>u</mi><mi>l</mi><mi>o</mi><mi>A</mi><mi>B</mi><mi>C</mi><mo>=</mo><mo>#</mo><mi>s</mi><mi>o</mi><mi>l</mi><mn>3</mn></math>]]></correctAnswer><correctAnswer id="1" type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>*</mo></math>]]></correctAnswer><correctAnswer id="2">-</correctAnswer></correctAnswers><assertions><assertion name="check_no_more_decimals"><param name="digits">3</param></assertion><assertion name="equivalent_all" correctAnswer="1"/><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-3)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="times_operator">·</option><option name="implicit_times_operator">false</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">popupEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/><data name="inputCompound">true</data></localData></question> Tri C1S03.b Razones trigonometricas ángulo beta (lenguaje algebraico) Dado el triángulo «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»A«/mi»«mi»B«/mi»«mi»C«/mi»«/math» sabiendo que es rectángulo en «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»A«/mi»«/math» , el cateto adyacente = «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»h«/mi»«/math» y el cateto opuesto = «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»y«/mi»«/math» , la hipotenusa = «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»z«/mi»«/math» .Hallar las razones trigonométricas del ángulo «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»A«/mi»«mi»C«/mi»«mi»B«/mi»«/math».

#graf

Observación :

El resultado lo puedes ingresar con el editor y dejar una fracción irreductible.

Si el resultado lo ingresa con decimal utiliza punto. (Ejemplos: 0,7 ingresa 0.7 si es 2,3456 ingresa 2.345 , si el valor es 3,65 ingresa 3.65)

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»s«/mi»«mi»e«/mi»«mi»n«/mi»«mi»o«/mi»«mo»§#32;«/mo»«mo»§#32;«/mo»«mi»§#225;«/mi»«mi»n«/mi»«mi»g«/mi»«mi»u«/mi»«mi»l«/mi»«mi»o«/mi»«mo»§#32;«/mo»«mi»A«/mi»«mi»C«/mi»«mi»B«/mi»«mo»§#32;«/mo»«mo»=«/mo»«mfrac»«mrow»«mi»c«/mi»«mi»a«/mi»«mi»t«/mi»«mi»e«/mi»«mi»t«/mi»«mi»o«/mi»«mo»§#32;«/mo»«mi»o«/mi»«mi»p«/mi»«mi»u«/mi»«mi»e«/mi»«mi»s«/mi»«mi»t«/mi»«mi»o«/mi»«mo»§#32;«/mo»«mi»a«/mi»«mi»l«/mi»«mo»§#32;«/mo»«mi»§#225;«/mi»«mi»n«/mi»«mi»g«/mi»«mi»u«/mi»«mi»l«/mi»«mi»o«/mi»«mo»§#32;«/mo»«mi»A«/mi»«mi»C«/mi»«mi»B«/mi»«/mrow»«mrow»«mi»h«/mi»«mi»i«/mi»«mi»p«/mi»«mi»o«/mi»«mi»t«/mi»«mi»e«/mi»«mi»n«/mi»«mi»u«/mi»«mi»s«/mi»«mi»a«/mi»«/mrow»«/mfrac»«/math»

Reemplazando en la fórmula se obtiene:

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»s«/mi»«mi»e«/mi»«mi»n«/mi»«mi»o«/mi»«mo» «/mo»«mi»§#225;«/mi»«mi»n«/mi»«mi»g«/mi»«mi»u«/mi»«mi»l«/mi»«mi»o«/mi»«mo» «/mo»«mi»A«/mi»«mi»C«/mi»«mi»B«/mi»«mo»=«/mo»«mfrac»«mrow»«mo»#«/mo»«mi»y«/mi»«/mrow»«mrow»«mo»#«/mo»«mi»z«/mi»«/mrow»«/mfrac»«/math»

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»s«/mi»«mi»e«/mi»«mi»n«/mi»«mo» «/mo»«mi»§#225;«/mi»«mi»n«/mi»«mi»g«/mi»«mi»u«/mi»«mi»l«/mi»«mi»o«/mi»«mo» «/mo»«mi»A«/mi»«mi»C«/mi»«mi»B«/mi»«mo»=«/mo»«mo»#«/mo»«mi»s«/mi»«mi»o«/mi»«mi»l«/mi»«mn»1«/mn»«mo»=«/mo»«mo»#«/mo»«mi»s«/mi»«mi»o«/mi»«mi»l«/mi»«mn»11«/mn»«/math»

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»cos«/mi»«mi»e«/mi»«mi»n«/mi»«mi»o«/mi»«mo»§#32;«/mo»«mi»§#225;«/mi»«mi»n«/mi»«mi»g«/mi»«mi»u«/mi»«mi»l«/mi»«mi»o«/mi»«mo»§#32;«/mo»«mi»A«/mi»«mi»C«/mi»«mi»B«/mi»«mo»=«/mo»«mfrac»«mrow»«mi»c«/mi»«mi»a«/mi»«mi»t«/mi»«mi»e«/mi»«mi»t«/mi»«mi»o«/mi»«mo»§#32;«/mo»«mi»a«/mi»«mi»d«/mi»«mi»y«/mi»«mi»a«/mi»«mi»c«/mi»«mi»e«/mi»«mi»n«/mi»«mi»t«/mi»«mi»e«/mi»«mo»§#32;«/mo»«mo»§#32;«/mo»«mi»§#225;«/mi»«mi»n«/mi»«mi»g«/mi»«mi»u«/mi»«mi»l«/mi»«mi»o«/mi»«mo»§#32;«/mo»«mi»A«/mi»«mi»C«/mi»«mi»B«/mi»«/mrow»«mrow»«mi»h«/mi»«mi»i«/mi»«mi»p«/mi»«mi»o«/mi»«mi»t«/mi»«mi»e«/mi»«mi»n«/mi»«mi»u«/mi»«mi»s«/mi»«mi»a«/mi»«/mrow»«/mfrac»«/math»

Reemplazando en la fórmula se obtiene:

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»cos«/mi»«mi»e«/mi»«mi»n«/mi»«mi»o«/mi»«mo» «/mo»«mi»§#225;«/mi»«mi»n«/mi»«mi»g«/mi»«mi»u«/mi»«mi»l«/mi»«mi»o«/mi»«mo» «/mo»«mi»A«/mi»«mi»C«/mi»«mi»B«/mi»«mo»=«/mo»«mfrac»«mrow»«mo»#«/mo»«mi»h«/mi»«/mrow»«mrow»«mo»#«/mo»«mi»z«/mi»«/mrow»«/mfrac»«/math»

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»cos«/mi»«mi»e«/mi»«mi»n«/mi»«mi»o«/mi»«mo» «/mo»«mi»§#225;«/mi»«mi»n«/mi»«mi»g«/mi»«mi»u«/mi»«mi»l«/mi»«mi»o«/mi»«mo» «/mo»«mi»A«/mi»«mi»C«/mi»«mi»B«/mi»«mo»=«/mo»«mo»#«/mo»«mi»s«/mi»«mi»o«/mi»«mi»l«/mi»«mn»2«/mn»«mo» «/mo»«mo»=«/mo»«mo» «/mo»«mo»#«/mo»«mi»s«/mi»«mi»o«/mi»«mi»l«/mi»«mn»12«/mn»«/math»

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»tan«/mi»«mi»g«/mi»«mi»e«/mi»«mi»n«/mi»«mi»t«/mi»«mi»e«/mi»«mo»§#32;«/mo»«mi»§#225;«/mi»«mi»n«/mi»«mi»g«/mi»«mi»u«/mi»«mi»l«/mi»«mi»o«/mi»«mo»§#32;«/mo»«mi»A«/mi»«mi»C«/mi»«mi»B«/mi»«mo»=«/mo»«mfrac»«mrow»«mi»c«/mi»«mi»a«/mi»«mi»t«/mi»«mi»e«/mi»«mi»t«/mi»«mi»o«/mi»«mo»§#32;«/mo»«mi»o«/mi»«mi»p«/mi»«mi»u«/mi»«mi»e«/mi»«mi»s«/mi»«mi»t«/mi»«mi»o«/mi»«mo»§#32;«/mo»«mi»§#225;«/mi»«mi»n«/mi»«mi»g«/mi»«mi»u«/mi»«mi»l«/mi»«mi»o«/mi»«mo»§#32;«/mo»«mi»A«/mi»«mi»C«/mi»«mi»B«/mi»«/mrow»«mrow»«mi»h«/mi»«mi»i«/mi»«mi»p«/mi»«mi»o«/mi»«mi»t«/mi»«mi»e«/mi»«mi»n«/mi»«mi»u«/mi»«mi»s«/mi»«mi»a«/mi»«/mrow»«/mfrac»«/math»

Reemplazando en la fórmula se obtiene :

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»tan«/mi»«mi»g«/mi»«mi»e«/mi»«mi»n«/mi»«mi»t«/mi»«mi»e«/mi»«mo» «/mo»«mi»§#225;«/mi»«mi»n«/mi»«mi»g«/mi»«mi»u«/mi»«mi»l«/mi»«mi»o«/mi»«mo» «/mo»«mi»A«/mi»«mi»C«/mi»«mi»B«/mi»«mo»=«/mo»«mfrac»«mrow»«mo»#«/mo»«mi»y«/mi»«/mrow»«mrow»«mo»#«/mo»«mi»h«/mi»«/mrow»«/mfrac»«/math»

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»tan«/mi»«mi»g«/mi»«mi»e«/mi»«mi»n«/mi»«mi»t«/mi»«mi»e«/mi»«mo» «/mo»«mi»§#225;«/mi»«mi»n«/mi»«mi»g«/mi»«mi»u«/mi»«mi»l«/mi»«mi»o«/mi»«mo» «/mo»«mi»A«/mi»«mi»C«/mi»«mi»B«/mi»«mo»=«/mo»«mo»#«/mo»«mi»s«/mi»«mi»o«/mi»«mi»l«/mi»«mn»3«/mn»«mo»=«/mo»«mo»#«/mo»«mi»s«/mi»«mi»o«/mi»«mi»l«/mi»«mn»13«/mn»«/math»

Reporta y/o califica esta pregunta:

1. Copia este código: Tri. C3. S01. b.

2. Presiona este enlace, pega el código y completa el formulario

]]> 1 .3333333 0 0 sen ángulo ACB=#sol1=#sol11cos ángulo ACB=#sol2=#sol12tg ángulo ACB=#sol3=#sol13]]> Muy Bien

]]> -]]> Revisemos el procedimiento para mejores resultados, si aún tienes dudas consulta a tu profesor.

]]> - Santiago - Sur 24-6-2016

- Arreglar tamaño de letra en motivación "Muy Bien" Corregido PS

- Indicar cantidad de decimales en observaciones CORREGIDO PS

- Centrar las fórmulas en la retroalimentación utilizando el botón que se encuentra en el menú CORREGIDO PS

Observaciones; N:G:R:

- Corregido: Algunas faltas de ortografía.

- Pendiente : Se pueden fusionar los ejercicios 6.1.1.a y 6.1.1. b en una sola pregunta dejar variables α y β

- Pendiente : Según acuerdo, en capacitación se indicó que no es conveniente pegar imágenes.

- Pendiente : Se sugiere normalizar el número de decimales, no es bueno que el enunciado contenga cuatro decimales y en la

respuesta se pidan solo dos.corregido.

]]> <question><wirisCasSession><![CDATA[<session lang="es" version="2.0"><library closed="false"><mrow style="color:#ffc800"/><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><apply><csymbol definitionURL="http://www.wiris.com/XML/csymbol">repeat</csymbol><mtable><mtr><mtd><mi>h</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>3</mn><mo>,</mo><mn>30</mn><mo>)</mo></mtd></mtr><mtr><mtd><mi>y</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>4</mn><mo>,</mo><mn>20</mn><mo>)</mo></mtd></mtr><mtr><mtd><mi>z</mi><mo>=</mo><msqrt><mrow><msup><mi>h</mi><mn>2</mn></msup><mo>+</mo><mo> </mo><msup><mi>y</mi><mn>2</mn></msup></mrow></msqrt></mtd></mtr><mtr><mtd><mi>delta</mi><mo>=</mo><mi>z</mi></mtd></mtr></mtable><mrow><mi>a</mi><mo>></mo><mn>0</mn><mo>∧</mo><mo>(</mo><mi>delta</mi><mo>)</mo><mo>≠</mo><mi>falso</mi><mo> </mo><mo>∧</mo><mi>es</mi><mo>(</mo><mi>delta</mi><mo> </mo><mo>,</mo><naturalnumbers/><mo>)</mo></mrow></apply></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>t1</mi><mo>=</mo><mi>tablero</mi></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>T</mi><mo>=</mo><mi>triángulo</mi><mo>(</mo><mi>punto</mi><mo>(</mo><mo>-</mo><mn>7</mn><mo>,</mo><mn>0</mn><mo>)</mo><mo>,</mo><mi>punto</mi><mo>(</mo><mn>7</mn><mo>,</mo><mn>0</mn><mo>)</mo><mo>,</mo><mi>punto</mi><mo>(</mo><mo>-</mo><mn>7</mn><mo>,</mo><mn>7</mn><mo>)</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>dibujar</mi><mo>(</mo><mi>T</mi><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>mostrar_malla</mi><mo>(</mo><mi>falso</mi><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>mostrar_ejes</mi><mo>(</mo><mi>falso</mi><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>A</mi><mo>=</mo><mi>punto</mi><mo>(</mo><mo>-</mo><mn>7</mn><mo>,</mo><mn>0</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>B</mi><mo>=</mo><mi>punto</mi><mo>(</mo><mn>7</mn><mo>,</mo><mn>0</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>C</mi><mo>=</mo><mi>punto</mi><mo>(</mo><mo>-</mo><mn>7</mn><mo>,</mo><mn>7</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>graf</mi><mo>=</mo><mi>dibujar</mi><mo>(</mo><mi>T</mi><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>dibujar</mi><mo>(</mo><mi>B</mi><mo>,</mo><mo>{</mo><mi>color</mi><mo>=</mo><mi>negro</mi><mo>,</mo><mi>tamaño_punto</mi><mo>=</mo><mn>8</mn><mo>,</mo><mi>mostrar_etiqueta</mi><mo>=</mo><mi>cierto</mi><mo>}</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>:</mo><mo>=</mo><mi>segmento</mi><mo>(</mo><mi>punto</mi><mo>(</mo><mo>-</mo><mn>6</mn><mo>,</mo><mn>6</mn><mo>)</mo><mo>,</mo><mi>punto</mi><mo>(</mo><mn>6</mn><mo>,</mo><mn>0</mn><mo>)</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>escribir</mi><mo>(</mo><mo>"</mo><mi>hipotenusa</mi><mo>"</mo><mo>,</mo><mi>punto</mi><mo>(</mo><mn>1</mn><mo>,</mo><mn>4</mn><mo>)</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>escribir</mi><mo>(</mo><mo>"</mo><mn>90</mn><mo>°</mo><mo>"</mo><mo>,</mo><mi>punto</mi><mo>(</mo><mo>-</mo><mn>6</mn><mo>.</mo><mn>6</mn><mo>,</mo><mn>0</mn><mo>.</mo><mn>2</mn><mo>)</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>:</mo><mo>=</mo><mi>segmento</mi><mo>(</mo><mi>punto</mi><mo>(</mo><mo>-</mo><mn>7</mn><mo>,</mo><mn>0</mn><mo>)</mo><mo>,</mo><mi>punto</mi><mo>(</mo><mo>-</mo><mn>7</mn><mo>,</mo><mn>7</mn><mo>)</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>escribir</mi><mo>(</mo><mo>"</mo><mi>cateto</mi><mo>"</mo><mo>,</mo><mi>punto</mi><mo>(</mo><mo>-</mo><mn>11</mn><mo>,</mo><mn>3</mn><mo>)</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>escribir</mi><mo>(</mo><mo>"</mo><mo> </mo><mi>adyacente</mi><mo> </mo><mi>b</mi><mo>"</mo><mo>,</mo><mi>punto</mi><mo>(</mo><mo>-</mo><mn>12</mn><mo>,</mo><mn>2</mn><mo>)</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>c</mi><mo>:</mo><mo>=</mo><mi>segmento</mi><mo>(</mo><mi>punto</mi><mo>(</mo><mo>-</mo><mn>7</mn><mo>,</mo><mn>0</mn><mo>)</mo><mo>,</mo><mi>punto</mi><mo>(</mo><mn>7</mn><mo>,</mo><mn>0</mn><mo>)</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>escribir</mi><mo>(</mo><mo>"</mo><mi>cateto</mi><mo> </mo><mi>opuesto</mi><mo> </mo><mi>c</mi><mo>"</mo><mo>,</mo><mi>punto</mi><mo>(</mo><mo>-</mo><mn>3</mn><mo>,</mo><mo>-</mo><mn>2</mn><mo>)</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>escribir</mi><mo>(</mo><mo>"</mo><mi>A</mi><mo>"</mo><mo>,</mo><mi>punto</mi><mo>(</mo><mo>-</mo><mn>8</mn><mo>,</mo><mn>0</mn><mo>)</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>escribir</mi><mo>(</mo><mo>"</mo><mi>β</mi><mo>"</mo><mo>,</mo><mi>punto</mi><mo>(</mo><mo>-</mo><mn>6</mn><mo>.</mo><mn>8</mn><mo>,</mo><mn>5</mn><mo>.</mo><mn>8</mn><mo>)</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>escribir</mi><mo>(</mo><mo>"</mo><mi>C</mi><mo>"</mo><mo>,</mo><mi>punto</mi><mo>(</mo><mo>-</mo><mn>7</mn><mo>.</mo><mn>2</mn><mo>,</mo><mn>7</mn><mo>.</mo><mn>5</mn><mo>)</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol1</mi><mo>=</mo><mfrac><mi>y</mi><mi>z</mi></mfrac></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol2</mi><mo>=</mo><mfrac><mi>h</mi><mi>z</mi></mfrac></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol3</mi><mo>=</mo><mfrac><mi>y</mi><mi>h</mi></mfrac></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol11</mi><mo>=</mo><mi>sol1</mi><mo>*</mo><mn>1</mn><mo>.</mo><mn>0</mn></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol12</mi><mo>=</mo><mi>sol2</mi><mo>*</mo><mn>1</mn><mo>.</mo><mn>0</mn></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol13</mi><mo>=</mo><mi>sol3</mi><mo>*</mo><mn>1</mn><mo>.</mo><mn>0</mn></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>null</mi></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>null</mi></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>atributos</mi><mo>(</mo><mi>tablero1</mi><mo>,</mo><mo>{</mo><mi>centro</mi><mo>=</mo><mi>punto</mi><mo>(</mo><mn>0</mn><mo>,</mo><mn>0</mn><mo>)</mo><mo>,</mo><mi>anchura</mi><mo>=</mo><mn>25</mn><mo>,</mo><mi>altura</mi><mo>=</mo><mn>25</mn><mo>,</mo><mi>anchura_ventana</mi><mo>=</mo><mn>450</mn><mo>,</mo><mi>altura_ventana</mi><mo>=</mo><mn>450</mn><mo>}</mo><mo>)</mo></math></input></command></group></library><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>h</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>15</mn></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>y</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>8</mn></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>z</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>17</mn></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol11</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>0.47059</mn></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol12</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>0.88235</mn></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol13</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>0.53333</mn></math></output></command></group><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo> </mo><mi mathvariant="normal">s</mi><mi mathvariant="normal">e</mi><mi>n</mi><mo> </mo><mi>á</mi><mi>n</mi><mi mathvariant="normal">g</mi><mi>u</mi><mi mathvariant="normal">l</mi><mi>o</mi><mo> </mo><mi mathvariant="normal">A</mi><mi mathvariant="normal">C</mi><mi>B</mi><mo>=</mo><mo>#</mo><mi mathvariant="normal">s</mi><mi>o</mi><mi mathvariant="normal">l</mi><mn>1</mn><mo>=</mo><mo>#</mo><mi mathvariant="normal">s</mi><mi>o</mi><mi mathvariant="normal">l</mi><mn>11</mn><mspace linebreak="newline"/><mi>c</mi><mi>o</mi><mi mathvariant="normal">s</mi><mo> </mo><mi>á</mi><mi>n</mi><mi mathvariant="normal">g</mi><mi>u</mi><mi mathvariant="normal">l</mi><mi>o</mi><mo> </mo><mi mathvariant="normal">A</mi><mi mathvariant="normal">C</mi><mi>B</mi><mo>=</mo><mo>#</mo><mi mathvariant="normal">s</mi><mi>o</mi><mi mathvariant="normal">l</mi><mn>2</mn><mo>=</mo><mo>#</mo><mi mathvariant="normal">s</mi><mi>o</mi><mi mathvariant="normal">l</mi><mn>12</mn><mspace linebreak="newline"/><mi>t</mi><mi mathvariant="normal">g</mi><mo> </mo><mi>á</mi><mi>n</mi><mi mathvariant="normal">g</mi><mi>u</mi><mi mathvariant="normal">l</mi><mi>o</mi><mo> </mo><mi mathvariant="normal">A</mi><mi mathvariant="normal">C</mi><mi>B</mi><mo>=</mo><mo>#</mo><mi mathvariant="normal">s</mi><mi>o</mi><mi mathvariant="normal">l</mi><mn>3</mn><mo>=</mo><mo>#</mo><mi mathvariant="normal">s</mi><mi>o</mi><mi mathvariant="normal">l</mi><mn>13</mn></math>]]></correctAnswer><correctAnswer id="1" type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>-</mo></math>]]></correctAnswer><correctAnswer id="2">-</correctAnswer></correctAnswers><assertions><assertion name="equivalent_symbolic" correctAnswer="1"/><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, °, ', ", $, ¥, €, £, kr, Fr, ₩, ₹, руб, BTC, %, ‰, A, K, mol, cd, rad, sr, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="decimalseparators">., \,</param><param name="unitprefixes">M, k, c, m</param><param name="groupoperators">(,[,{</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-3)</option><option name="relative_tolerance">true</option><option name="precision">4</option><option name="times_operator">·</option><option name="implicit_times_operator">false</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">popupEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/><data name="inputCompound">true</data></localData></question> Tri C1S04 Cálculo de relaciones trigonométricas. (Tabla). Se tiene un triángulo rectángulo. Sabiendo que el cateto opuesto al ángulo «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»§#945;«/mi»«/math» es de «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»o«/mi»«/math», el cateto adyacente a «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»§#945;«/mi»«/math» es «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»a«/mi»«/math», y que «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mn»0«/mn»«mo»§#176;«/mo»«mo»§#60;«/mo»«mi»§#945;«/mi»«mo»§#60;«/mo»«mn»90«/mn»«mo»§#176;«/mo»«/math», determinar las relaciones trigonométricas del ángulo «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»§#945;«/mi»«/math».

Observaciones:

- Ingresa los valores decimales con dos cifras, aproximando el segundo decimal, si el tercer decimal es igual o mayir a 5, es decir, si tu resultado es 0.456 debes ingresar 0.46.

- Ingresa las cifras decimales con punto, y no coma

]]>

Al reemplazar el valor de ambos catetos, tenemos lo siguiente:

Podemos obtener además el valor del ángulo «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»§#945;«/mi»«/math», con la fórmula:

es decir:

Asi obtienes que:

sen(«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»§#945;«/mi»«/math»)=#sol1

cos(«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»§#945;«/mi»«/math»)=#sol2

tan(«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»§#945;«/mi»«/math»)=#sol3

Reporta y/o califica esta pregunta:

1. Copia este código: Tri. C1. S04.

2. Presiona este enlace, pega el código y completa el formulario

]]> 1 .3333333 0 0 sen(α)=#sol1cos(α)=#sol2tan(α)=#sol3]]> Felicidades, tu resultado está correcto!

]]> * Tu resultado está incorrecto. Revisa tu ejercicio y si continúas con la duda consulta con tu profesor.

]]> - Santiago Sur 24/6

CORREGIDO En observaciones: Debe indicar que aproxime a 4 decimales ya que con 3 decimales lo toma malo.

En la Retroalimentación: Deben estar presente los cálculos que se indican con palabras.

Observaciones: N.G.R.

-CORREGIDO: Es importante definir número exacto de decimales .

Observaciones : 20-06-2016 N.G.R.

La observación estaba dirigida a que para distintos intentos la tabla apareciera con valores para distintas funciones no siempre para el coseno.

]]>

Por lo tanto el resultado es: «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»a«/mi»«/math»

Reporta y/o califica esta pregunta:

1. Copia este código: Tri. C1. S05.

2. Presiona este enlace, pega el código y completa el formulario

]]> 1 .3333333 0 0 d=#sol]]> Muy bien, felicidades.

]]> + Tu respuesta es incorrecta. Revisa tu ejercicio y continúas con la duda, consulta con tu profesor.

]]> * Santiago Sur 24/6

En la pregunta dice: "para determinar la expresión": debería ser: para determinar el valor de la expresión:

En la Retroalimentación:

Centrar las ecuaciones

Donde dice "por lo tanto el resultado es" debe ingresar el valor ya que la respuesta que nosotros vemos, no la ve el alumno.

#tablero1

Observación

Ingresa el resultado con punto para separadador de decimales y redondea a 4 decimales

]]> Recordar que en un triángulo rectángulo, las funciones trigonométricas

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»s«/mi»«mi»e«/mi»«mi»n«/mi»«mi»o«/mi»«mfenced»«mi»§#945;«/mi»«/mfenced»«mo»=«/mo»«mfrac»«mrow»«mi»c«/mi»«mi»a«/mi»«mi»t«/mi»«mi»e«/mi»«mi»t«/mi»«mi»o«/mi»«mo»§#160;«/mo»«mi»o«/mi»«mi»p«/mi»«mi»u«/mi»«mi»e«/mi»«mi»s«/mi»«mi»t«/mi»«mi»o«/mi»«/mrow»«mrow»«mi»h«/mi»«mi»i«/mi»«mi»p«/mi»«mi»o«/mi»«mi»t«/mi»«mi»e«/mi»«mi»n«/mi»«mi»u«/mi»«mi»s«/mi»«mi»a«/mi»«/mrow»«/mfrac»«/math»

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»c«/mi»«mi»o«/mi»«mi»s«/mi»«mi»e«/mi»«mi»n«/mi»«mi»o«/mi»«mfenced»«mi»§#945;«/mi»«/mfenced»«mo»=«/mo»«mfrac»«mrow»«mi»c«/mi»«mi»a«/mi»«mi»t«/mi»«mi»e«/mi»«mi»t«/mi»«mi»o«/mi»«mo»§#160;«/mo»«mi»a«/mi»«mi»d«/mi»«mi»y«/mi»«mi»a«/mi»«mi»c«/mi»«mi»e«/mi»«mi»n«/mi»«mi»t«/mi»«mi»e«/mi»«/mrow»«mrow»«mi»h«/mi»«mi»i«/mi»«mi»p«/mi»«mi»o«/mi»«mi»t«/mi»«mi»e«/mi»«mi»n«/mi»«mi»u«/mi»«mi»s«/mi»«mi»a«/mi»«/mrow»«/mfrac»«/math»

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»c«/mi»«mi»o«/mi»«mi»s«/mi»«mi»e«/mi»«mi»n«/mi»«mi»o«/mi»«mfenced»«mi»§#945;«/mi»«/mfenced»«mo»=«/mo»«mfrac»«mrow»«mi»c«/mi»«mi»a«/mi»«mi»t«/mi»«mi»e«/mi»«mi»t«/mi»«mi»o«/mi»«mo»§#160;«/mo»«mi»o«/mi»«mi»p«/mi»«mi»u«/mi»«mi»e«/mi»«mi»s«/mi»«mi»t«/mi»«mi»o«/mi»«/mrow»«mrow»«mi»c«/mi»«mi»a«/mi»«mi»t«/mi»«mi»e«/mi»«mi»t«/mi»«mi»o«/mi»«mo»§#160;«/mo»«mi»a«/mi»«mi»d«/mi»«mi»y«/mi»«mi»a«/mi»«mi»c«/mi»«mi»e«/mi»«mi»n«/mi»«mi»t«/mi»«mi»e«/mi»«/mrow»«/mfrac»«/math»

#tri

Si consideramos el ángulo α, la hipotenusa corresponde a «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»C«/mi»«/math», el cateto opuesto a «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»A«/mi»«/math» y el cateto adyacente a «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»B«/mi»«/math»

la hipotenusa («math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»C«/mi»«/math») se calcula aplicando el teorema de pitágoras

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msup»«mi»C«/mi»«mn»2«/mn»«/msup»«mo»=«/mo»«msup»«mi»A«/mi»«mn»2«/mn»«/msup»«mo»+«/mo»«msup»«mi»B«/mi»«mn»2«/mn»«/msup»«/math»

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»C«/mi»«mo»=«/mo»«msqrt»«msup»«mi»A«/mi»«mn»2«/mn»«/msup»«mo»+«/mo»«msup»«mi»B«/mi»«mn»2«/mn»«/msup»«/msqrt»«/math»

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»C«/mi»«mo»=«/mo»«msqrt»«msup»«mfenced»«mrow»«mo»#«/mo»«mi»a«/mi»«/mrow»«/mfenced»«mn»2«/mn»«/msup»«mo»+«/mo»«msup»«mfenced»«mrow»«mo»#«/mo»«mi»b«/mi»«/mrow»«/mfenced»«mn»2«/mn»«/msup»«/msqrt»«/math»

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»C«/mi»«mo»=«/mo»«mo»#«/mo»«mi»c«/mi»«mo»=«/mo»«mo»#«/mo»«mi»s«/mi»«mi»o«/mi»«mi»l«/mi»«mn»5«/mn»«/math»

por lo tanto

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»tan«/mi»«mi»g«/mi»«mi»e«/mi»«mi»n«/mi»«mi»t«/mi»«mi»e«/mi»«mfenced»«mi»§#945;«/mi»«/mfenced»«mo»=«/mo»«mfrac»«mrow»«mo»#«/mo»«mi»b«/mi»«/mrow»«mrow»«mo»#«/mo»«mi»a«/mi»«/mrow»«/mfrac»«mo»=«/mo»«mo»#«/mo»«mi»s«/mi»«mi»o«/mi»«mi»l«/mi»«mn»4«/mn»«/math»

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»s«/mi»«mi»e«/mi»«mi»n«/mi»«mi»o«/mi»«mfenced»«mi»§#945;«/mi»«/mfenced»«mo»=«/mo»«mfrac»«mrow»«mo»#«/mo»«mi»b«/mi»«/mrow»«mrow»«mo»#«/mo»«mi»c«/mi»«/mrow»«/mfrac»«mo»=«/mo»«mo»#«/mo»«mi»s«/mi»«mi»o«/mi»«mi»l«/mi»«mn»1«/mn»«/math»

Reporta y/o califica esta pregunta:

1. Copia este código: Tri. C2. S06.

2. Presiona este enlace, pega el código y completa el formulario

]]> 1 .3333333 0 0 sen(α)=#sol1cos(α)=#sol2tg(α)=#sol3]]> Muy Bien

]]> * Al parecer cometiste un error. Revisa tu ejercicio y si continúas con la duda consulta con tu profesor.

]]> -

Santiago Sur 24/6

En la retroalimentación: corregido

Sugiero escribir la respuesta en fracción y en decimal

Observación N.G.R.

- Pendiente: No me aparece ese error, Después de varios intentos , sucede lo siguiente:

Situación que se puede revertir con indicaciones dadas por Jorge en correos anteriores.

- Corregido : Se hace necesario un signo " =" en " «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»A«/mi»«mfenced»«mrow»«mo»#«/mo»«mi»a«/mi»«mo»,«/mo»«mo»#«/mo»«mi»b«/mi»«/mrow»«/mfenced»«/math»" , para representar el punto A

- corregido : La observación debiera ir después del gráfico.

Observación

Ingresa el resultado con punto para separadador de decimales y ocupa 4 decimales.

]]> Recuerda las identidades trigonométricas,

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»s«/mi»«mi»e«/mi»«mi»n«/mi»«msup»«mi»o«/mi»«mn»2«/mn»«/msup»«mfenced»«mi»§#945;«/mi»«/mfenced»«mo»+«/mo»«mi»cos«/mi»«mi»e«/mi»«mi»n«/mi»«msup»«mi»o«/mi»«mn»2«/mn»«/msup»«mfenced»«mi»§#945;«/mi»«/mfenced»«mo»=«/mo»«mn»1«/mn»«/math»

Dado que «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»s«/mi»«mi»e«/mi»«mi»n«/mi»«mi»o«/mi»«mfenced»«mi»§#945;«/mi»«/mfenced»«mo»=«/mo»«mo»#«/mo»«mi»a«/mi»«/math»

ocupando la identidad anterior y despejando «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»cos«/mi»«mi»e«/mi»«mi»n«/mi»«mi»o«/mi»«mfenced»«mi»§#945;«/mi»«/mfenced»«/math»

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»cos«/mi»«mi»e«/mi»«mi»n«/mi»«msup»«mi»o«/mi»«mn»2«/mn»«/msup»«mfenced»«mi»§#945;«/mi»«/mfenced»«mo»=«/mo»«mn»1«/mn»«mo»-«/mo»«mi»s«/mi»«mi»e«/mi»«mi»n«/mi»«msup»«mi»o«/mi»«mn»2«/mn»«/msup»«mfenced»«mi»§#945;«/mi»«/mfenced»«/math»

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»cos«/mi»«mi»e«/mi»«mi»n«/mi»«msup»«mi»o«/mi»«mn»2«/mn»«/msup»«mfenced»«mi»§#945;«/mi»«/mfenced»«mo»=«/mo»«mn»1«/mn»«mo»-«/mo»«msup»«mfenced»«mrow»«mo»#«/mo»«mi»a«/mi»«/mrow»«/mfenced»«mn»2«/mn»«/msup»«/math»

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»cos«/mi»«mi»e«/mi»«mi»n«/mi»«mi»o«/mi»«mfenced»«mi»§#945;«/mi»«/mfenced»«mo»=«/mo»«msqrt»«mn»1«/mn»«mo»-«/mo»«msup»«mfenced»«mrow»«mo»#«/mo»«mi»a«/mi»«/mrow»«/mfenced»«mn»2«/mn»«/msup»«/msqrt»«mo»=«/mo»«mo»#«/mo»«mi»s«/mi»«mi»o«/mi»«mi»l«/mi»«mn»3«/mn»«/math»

se sabe que

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»tan«/mi»«mi»g«/mi»«mi»e«/mi»«mi»n«/mi»«mi»t«/mi»«mi»e«/mi»«mfenced»«mi»§#945;«/mi»«/mfenced»«mo»=«/mo»«mfrac»«mrow»«mi»s«/mi»«mi»e«/mi»«mi»n«/mi»«mfenced»«mi»§#945;«/mi»«/mfenced»«/mrow»«mrow»«mi»cos«/mi»«mfenced»«mi»§#945;«/mi»«/mfenced»«/mrow»«/mfrac»«/math»

por lo tanto

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»tan«/mi»«mi»g«/mi»«mi»e«/mi»«mi»n«/mi»«mi»t«/mi»«mi»e«/mi»«mfenced»«mi»§#945;«/mi»«/mfenced»«mo»=«/mo»«mfrac»«mrow»«mo»#«/mo»«mi»a«/mi»«/mrow»«mrow»«mo»#«/mo»«mi»b«/mi»«/mrow»«/mfrac»«/math»

Reporta y/o califica esta pregunta:

1. Copia este código: Tri. C2. S07.

2. Presiona este enlace, pega el código y completa el formulario

]]> 1 .3333333 0 0 cosα=#sol1tan(α)=#sol2]]> Muy bien

]]> * Al parecer comestiste un error, si tienes dudas consulta con tu profesor

]]> - Santiago Sur 24/6

En la observación:corregido

Indicar el formato del número decimal, con punto, número de decimales, con o sin aproximación.

En la retroalimentación:

Falta escribir el resulatdo de «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»cos«/mi»«mi»§#945;«/mi»«/math»

01/06/2016 Fatima Toro Lagos

Corregido: Cambiar la palabra "Halle" por "Hallar"

corredido: Se podría mejorar un poco el orden en el encabezado

corregido: Falta colocar la observación de con cuantos decimales se deben colocar las respuestas.

Corregido: En el encabezado colocas «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»cos«/mi»«mi»§#945;«/mi»«/math» y donde se ingresan las respuestas «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»cos«/mi»«mi»e«/mi»«mi»n«/mi»«mi»o«/mi»«mo»§#160;«/mo»«mo»(«/mo»«mi»§#945;«/mi»«mo»)«/mo»«/math», sugiero utilizar la misma nomenclatura.

Pendiente: Sugiero variar el seno por coseno y tan

Corregido: Falta colocar en las retroalimentaciones "Muy bien"....

¿Cuál es el ángulo de descenso del avión?

#tablero1

Observación: Ingresa la respuesta redondeada a dos cifras decimales. Usa punto para expresar los decimales. Agrega el símbolo de grados (º). Por ejemplo: 25.26º.-

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 La solución del problema se obtiene aplicando relación seno, ya que contamos con la medida del lado opuesto al ángulo y con la medida de la hipotenusa.

La altura del avión se obtiene sumando la altura del edificio, más la altura del avión respecto a este.

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»a«/mi»«mo»§#160;«/mo»«mo»+«/mo»«mo»§#160;«/mo»«mo»#«/mo»«mi»b«/mi»«mo»§#160;«/mo»«mo»=«/mo»«mo»§#160;«/mo»«mo»#«/mo»«mi»g«/mi»«/math»

La hipotenusa del triángulo rectángulo descrito corresponde a la recta de descenso del avión. Es decir #c metros.

Con estos datos podemos establecer la siguiente relación:

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»s«/mi»«mi»e«/mi»«mi»n«/mi»«mi»§#945;«/mi»«mo»§#160;«/mo»«mo»=«/mo»«mo»§#160;«/mo»«mfrac»«mrow»«mo»#«/mo»«mi»g«/mi»«/mrow»«mrow»«mo»#«/mo»«mi»c«/mi»«/mrow»«/mfrac»«/math»

Como no piden el ángulo de denscenso del avión debemos aplicar la función arcoseno (sen^-1)

Por lo tanto, ángulo de descenso del avión corresponde a «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»s«/mi»«mi»o«/mi»«mi»l«/mi»«mn»1«/mn»«/math»

Reporta y/o califica esta pregunta:

1. Copia este código: Tri. C3. S08.

2. Presiona este enlace, pega el código y completa el formulario

]]> 1 .3333333 0 0 El ángulo de descenso es=#sol1]]> !Muy bien, felicitaciones¡

]]> xxx Al parecer cometiste un error, revisa tu procedimiento e intentalo nuevamente.-

]]> .---- Santiago Sur 24/6

El título de la pregunta es altura de un avión y pide el ángulo «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»§#945;«/mi»«/math»

Sin Retroalimentación

Comentarios: Arnoldo 02/06/2016

Pendiente: Si el ejercicio es de razón trigonométrica hay que especificar que el triángulo es rectángulo.

PENDIENTE: Según acuerdos tomados en la Serena , incluir fotos en las preguntas genera problemas en la plataforma, la sugerencia es programar los triángulos en el tablero de WIRIS y etiquetar puntos distancias etc..

PENDIENTE: Es bueno incluir dibujar el ángulo de depresión ejemplo:

Pendiente, reformular pregunta: ¿Qué ángulo «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»§#8736;«/mo»«mi»§#945;«/mi»«/math» ..... Luego añadir al cuadro de respuestas:.«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»§#8736;«/mo»«mi»§#945;«/mi»«/math»

Observaciones

-Utiliza punto para separar cifras decimales

-Ocupa tres cifras después del punto, sin aproximación

-Ingresa las cifras sin unidad de medida

]]> 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mpm2CnJylg1d97npwp1Y/wDL1/gZ3g74rXl/DCtxpvlSsPnAj4FehadFFrsIMibCf+mdc9b7IYlMOmz7cfLgKP0px8QX9txHp1x/47Xy+KhGpK9FcvzR6dKo4/E7nSt4WUnavklR0zGuagk8A/av+eH/AH6WsVPiFqVqMHR53I77wM0jfGDVIP8AmW7hvpJXH9Xxa2t96/zNfrNL7X5P/I0Lv4SWGoDy7u2hmz1/drzUFj+zr4Ts5fN/se2Vuudi1UHxb1i5O5fDki+zSc01/ij4lb/V+HW/DmtFHHqPKp2X+L/gh9Yodn9zOgn+FuivDiGxtSBx9wf0rKk+Edt5v7uC3j/7Z1kXvxc8QWX+u8Otu7cYpNN+M+t30m3+xfLp08Pj4rm5tPVGX1ig3azNyT4V+SoGY/8AgMdRP8Mvm7f9+60tJ8XXk8Ba8g8g/wAI9atf8JRms/rGKTs2bfuWrpHPD4abR9zf/wABxil/4Vx/071uy+LNgqtP4wNXGvinsLmpLQyX8Az2q5t7fLN1+bFSReDtSz9zy/8AtrU1x428oZqjc/E77KK2ti5aJXJdSiluXpvBmpSQY+0bfbcG/nTX8P6jbRbfJ833+WsK8+NO1Me/riqNx8aM/wD72tqeBxr+yjnljMOlq2T+JfAOsa5bSR29w9rM/wB0psDCvOtR/Z18UXd7+88TahDzyPOVf5V2c3xsKqdrKp9Wl4rPn+N1xj/j4tv+/lexho5lRVoRX3JnDPE4WW7ZzNz+ytrEyjzdd1Cb1xeuKqv+x7NKPnvr5/8AfvGauhufjhcKp/0m2X3MnArG1H48Xuz5NSsP/Hq9SjUzi/utL0X/AADllWwS+Ipf8MN21x94iT13ytTH/Ye02AZ+zW//AIEtWdqXx11sq+zUrLp/Duz+Fcpf/HrxBGhEmpXDV7GHp59U/wCX1l8zkqYzBL4YnbP+yFpkGf8AR7f/AMCWqqf2WNEB/wCXf/wJavNb/wCK+qaoxLalc5rPfxXdHn7Vcf8Af2vUp5Zmz+Kv+ZySzTDL4Y3PW/8AhlbRP71t/wCBTUp/Zu8NqME2OR/081483iy7B/4+rj/v7VWbxDczdz9Sa3jleZdcQ/6+ZP8AalDpD+vuPZn/AGbfDZP/AC4f+BNRS/s6+E4R87aOPc3PNeJyvcznqfzqB4G3/MTnvzWqyjHdcU/kv+CTLNKXSmv6+R7Jc/BHwLaN899o6f8AbxWbefC74c2Lb21KEsP+eUzEfpXlnkU9NLuJRlOh6cV0U8srr4sTL8ET/aa2VNI7u+0D4cKSv9o3n/AFY1x3jnSvDdvHt0eWaYdmlBDZ+hqsdHuB2/SgaVcj/ljv969LD4d0pc7rSl6tf5GM8U5bxXyMX7Cv2YeZ97tQ9tsUY6Yra/su5P8Ay71FNo15M4CQyY/uj5kP1A+avS+uRW7M1Jt3szI8jFHk5qzq+qW3huHbdhFlxwkW+d2/7Zp89c3L48wj7fD/AIldmP7to9PkiZvoWZcD/eYV42YcXZTgJcuMxEIPzkk/uubRhUl8MTb8ijyKyJ/FOpXQj+z+HNR+09vtDwwxf9tHTef50lxc+K55f3fh7SPtCgZEmst9hI9isBJP1UV87X8WuFaLtPGRv5Nv8kdCwtV/ZNjyKR4Plqky+KM+b/Y2ioNv+qOsOvzf7OYBxU/hXwD4m8QabNc6reWGn3+//R4I4/tFqi+rEBSW/EV5GM8cuEsPFSWI579IpsPqdXsP8ijy9ldlov7Ol34nSAax4903TYcfvfsOntFJL7ZMsi/+OZ960Y/2VPDljdtHJ8SvFN3Ylhtgjt7Um3+jGAOPzNeFW+kXwvTnyxc5Lvy2+Vm0/mbLL6r1uvvPPKNu7ivYIf2WvAn2CbzvHni64QD939p2IUbtv2Issg9twpfD37LXhd9Dl8z4ia0dS52NFZww20Y7fumjMh9yZTTp/SM4Xlu5L5f8Er+zZ90ePeRQsGTXq93+zBbJpzLD8SrKS8/g26MHg/7aYl/9mFT+Hf2Nb3UbZDdePNJk5/ef2dphjXHtm4K5+u76V6UfHzhOUOb20v8AwF/5E/2dV7r7zyXycUeRXst/+w7cl/8AQ/iDpkEPpfaP50n/AJDljqSz/YevvKO3x3pUzY6/2EyqPzuSa0j47cKuHP7Z+nK7h/Z9by+88W8ilWDLD3OK9RvP2Pdf0dpWh8b+HrojpF/ZEsWfx89q5i8+DvjvSI28mLw9Oqt98TyxFvp8jfzqo+OnCMpcrxFvNxlb77E/UKvb8Tc8AfCjTPE2z7bNuzjI8yvZfAXwB8G6SwbyfM/7a18+za7r/gO0ku7jQr3bCMz/AGO4SaUDucfxCuq8DfFlvHmmxX2k3n260kPlia1Zl+zuOquR3HcUo8T4TPYyeWYxSit0nr92/wCB3YdKn8UD6l0Lwj4T09htW3GOx5xXSx6loOnxYT7PxXy9a67qTvt+1XDEcEjvWzY/2lOo/wBIuK8ytw+56zrM9SnmCh8MD6ITWtF3b127j6dKtQ+MrGAfJXhOmaZqLBSWJHqeprq9I0qXaPM615WIyWlTWs7nRHGSfQ9TTx/b+XTG8fW2a5XT9F3QKa1LXRdwrypYWhE7IVpyL83xDt1bFQv8Rbc9qB4Y84ZxR/wif+cVmoYXqir1SC4+KKWvEf8A6Bms+7+LWSf/AI1WpJ4M80ZqF/A+a2gsItWjO9W+5jN8ZWt+PX/Y216V8O9d/wCEl8JWl5/z23/o7L/SuKPgON/9Z+Fd14M09dK8N20CfdTcR+Lk/wBa5c0lh3RXsVZ3/Rm2H9pze89DXooorwTsCiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA+T9J/ZF1AxfvNcuP+/tXtM/ZDbz/3mt3DYP8Az1ryaDx54lgbP9pGtCD4t+JLcD/iZd6/Z6mBzX/n9H7j8pp5plq+Km/v/wCCfVPw9+F3/CLRJHugfYoG4x5JrppfCweTcPs4/wC2dfOGl/tGXdrbQLJc6gXCgMfLXBPtXb+Evjtdasg/0lun8ca18Jjsmx/O6k3qfX4HOcC48tM9fXRdqf8ALH8qY2jE/wDPv+VY+g+MzeRoWIJYckV0C6h9oir5+UasHZs9qnOnPYoSeGPNP+uVPZegqGTwr/081dl1cWy7ducf7eKzr3xHj/8AeU6ftnsTOVOPxF/T9A8iEDzN/PWr0S/Zhtri9S8b3ls5WC0imXH32l5rg/HXxi13RkYxx28ePbdXbh8rxGIfLGxyV81oUI3lse3XFxE5+fbmqs8tqB/9avmCL9pnX5S3mbcg4G1dtP8A+Gk9ar2IcI4xdV955MuLMFfqfSU91GD8nl+++qF3ff8AXtXzy/7Qmo3n+v69qQ/Hi5NdNPhXErexzz4rwrelz3ia4eYfJJFH/u96y9SS4x/x9V43/wAL4uf+mf8AwOo5Pjvc4/5d66IcOYqLvoYS4kwz7npOr2t5dwbY7jnNcpr2ialg/wCk1zNz8crmWPH7v/gHWqU/xpuWNevhcqxUOiOKtneGl1ZPqGgakxP75n9l61mXXhzUiP8Al5pLj4x3Ug+RgjetUbr4malcf8vFe1To4mLtZHk1Mzwz6sJfDGoSHDLcMp6j1qJ/B1yP+Xa5qtL4x1Jjn7S34HBqJ/GGpf8APzN/38rtjTxNuhx/2jh+lyzJ4MunUgW9zntVObwHqGP9RcU1/F2pOMfaJ+f+mlV31zUsf8fNx/39renHErdoHmFDazGz+BNQAP7ib8aybrwtfQA74Qlab6xqMnym4n29CPM61A9jz1NdtGtWXxtHJPF0n8NznriyMDfPPt9qZ5NbzWWTUP2P/Oa71W03JWKT2Zj+TVgaSrY39K0Psm7/APXSx2yzymJWXcOS8nG36Ue3t1KjiOaSiX/DmlWK48yuy0uz0iC33SWdlx0LJktXBSa1DoemzXLXFtBaW/8Arrm6uNsa1ysXxmvfG0wj8IaXNfxg4bVLsGCwT3Q/62T/AICMe9fN5liY3+JuXZat/cfVZTgcRiV7SEfcW8pWUV83b8L3Pb9Tfwzo2kNqF9a6bawRjJlZOlec+LfED/GnSWsfB2nzadDnaNflkW2SP3hU8yVlab8M4NU1KO/8S3EvibUVOYvPOLO3Pby7dev1fJrox8T7Dw1f/Y7zVdPju0H+plu0TyVHrj7v4183iMPWrQaxE/Zwl05tfm76fefS4XNMuyyopYX9/VWqk17ifkn8Xz0fYyv2Y/gZ4q+E3i/XJvFfj+T4g6dfRAWFvd2qxSWTdzj0966jxL8cPCfhy4v7V4v7SvLJdzx6Xp093v8A9kSBfJDe26vNbfxa/wAZPiDNA9zrT6BBkQXGi3E8dvcHurywcMPrXoXhTwppfgfSGs9HsLfTbUuXaKFSN7d2Ynkt7mvxHirxWo5FUeXZdTlOUespXXy1bf5G2a5rWzfEvH4xR5nZWjGMI/dFJfcitbfHSfxB4PluPD3w88TJdyLtt47/AOwxrv8AWRBNv2fhRDqXjPUtMtDe61p2m6htzNDYaWvlwH+6GkJWrl1rX2QmqEvjVI7oLNDNJF3KV+S5t4tcRY5pU6ns0v5dPzucMYa6Gz4f+Alj4x8TR+Ktc16+1DVbGPyIctboqKe2Ioh/Ot65+E/huKH/AEkt5nUAFiR+RrN8NeIvD9yPlt7nzTXT20a30fCCP+75sm3P0r4/F5pi8bU9vi5c8nu3ubdLHDa34B0S0z9n+35/T9a59/Ce9iIM8dc7f6V6vN4Xubr/AFf2b/0KqkvgPV0H7q2juAeu1Nu2vPnCb+Faiex5fJ4OuSKfYeEJUmPmdK76++HupwZeS18vvWXcW01r8r/lXLLnjpJEGVaaJ9lq7H8gxT6VPvVnzAJSxv5T5/qBTZvvVSuF3q1Vo9GC3NKwvbX7d/pr+Vb55/eJWzNf+CodpGoYI5ZfMGD+XNcJc6P9pWqEngje+7HvXRTlCGlk/U0PRpPHfgrTvm+0t/wASmopfj54LsVYC41IsBwq28vP4154/g7AqI+Dxu+bn2ziuqOIjHoVzDvH37TF15pGiwTpH6y157r/AMVte11TvuLhGbtFXeXPgHTrk4k/dn08zNXdK+EYnH+i6ebpf+uWaf1mP8ocx4dDBqep3RaW7aSGPmRJH6/hV3QvhWY9V+329t9mnmOGeJDACPrXvumfArUGk/caD9nJPXyvLrrNL+A+p7P3919lHp5fmV10cwxNLXD3T8m1+Qcx4dpHgC+0adbq11bWtKvM58y0uxIk3s244P02fjW0njD4iaGIbjSvFDbkmG+1v7eOWK6/2TsjBiz/AHuceleqa38N7DwjhtU1ARoe6jBP4Vl6hqvgmwtt0E1/dv6J3r18PxVnuHcXRxEkl0bbX3MjXuaWlftWDTb2C18V+D9TsWkj3vc6eW1KzD+g8pVfPuVAFdh4X/a08La1rEOnwy3CX8oJis7uzeG4YeoDcsP92vDr74jaHNcFbeK58peHWV9pH/jn9a53XrS28TeLbDWNKvnsNU09dtu0sPnoF7/xCv0LIfFjEe3VPNop0+sknf7loW8RUivcR9uaR8SLe5iXOxT6J0FdNpHim3ulH9a+HYPj54j+GOoo/iKPS59Pujti1SwPkyD2aPJx+deh6Z+0Fdi0j+zRpJa/fCxtuds9zX7vlNPA53h/rOV1FKP3NPs13MamcewdqujPrVPEFvGmKX/hI7evlp/2htQk+73HTdjbUifGvULn/wDe13f6n1+o/wDWagtGz6gPihE+55eP9qo38VZH/LtXzjp3xG1e+jLRxeYM9fN6Vcj8Qa3dj/j2P4S1k+GHB2nJDXEUZP3D3ubxVn/nz/4Eua6rwvc/bdDgk/d/Nu+4ML94ivl4X+tD/l2T/gclfQnwNkml+F2mfaFVZj5u4KcgfvXx+leLnWVrC0VNNPW34M9TLsw9vVcbdL/kdhRRRXzR7QUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAHxFD4AyatReAOK9yTSdMgP8Ax71Ks+mwf8u1fpsuIasvss/HY5LSj8UzyPT/AISXF1sJXyVx1ruvB3w4h0lR5jef7V07eMdNtxjHTt6VE/xS0217V5mJzLFV1ZJnq0MPgsNq6i+83NLS2tI1C2/3atXviGS3T93b9K5Cb4w2gLbYJ29CNvNVZvjJbk/8e1x/47XlrA1pu7iztfEmDgrKojf1LxNq5UtHbfJ2/ef0rjfEHj/WrXd/o3/ju6nXXxMW4lLIrKp6BtuapTfEX/Py16eFwrhvTR4mN4joVNFVaMa9+ImuXSkFdg9Ps+f1rmdbutR1MnzM8/8ATPbXaTeNvtD5/e/8B2Yqu3jDA6T/AJJXuYebpawppM+bxGZU5qzqto83l0OTPz9frULaFz0/SvRrrxB9rbOJ/TolVn1Tn/lv+SV6EcyqvdHjSrUm9Jnnx0Qij+xP85r0BNRik/1n2gHt8immve2uP+Xj/v2lbRzGotGjP20P5zz59D4pn9hV6A32a9H/AC04/vxD+lU7qxtjn+kVawzGT0ZhUxCT0dzi/wCwqP7Crp306Nvudf8AcxTf7L+tbfXmc/15rY5l9G2LTP7Jrqf7M2+tL9ho+vMn69Lucr/ZNH9k11D2PFM+xfWj68w+vPuc02lfLUf9k11D2Xy9DUf2P/OaqOOkP69Luc3/AGTTX0nium+y7ajlsPtwqvr3cr680rs5htKyaSTTJIht8vDdl9a27y3XR7aWeRgsUCF3ZmwFA65J4FcBoHxa1r4n2V9/wrnwjrHiqaMmP7aZoIdNhYcHM/mDf9FBNeXmnFGBy+HPjKiintd2vbsfSZHkuZ5q/wDYqba0vJ6RXm27L0NmYLoZMl+/2CEDJk9q46f4gT+MLqWDwjpQ1fko9/e7o7ND/wCzn2GD710fhz9iTxp8TWj1P4i62Fu92Y9MsmFvZx+xUeYZf+BHHtXdw/sSaLosS2pstLkA+crcWyuv4FsBfyr8fzvxuowqeywtKUorqrK/o3f8j9GwvDOEwcL1Gq1T5qCf4OXmtjwK38PaIfEq/wDCZ6sNf1K3O+OCWFksdPPqsPTj1OT71p6T8Tda8RSXn9i6AslpZyeUt5f3DWccw/vQr5chZfxWvbD+zjYeD/32labp8U8ny5sbSMt/32vSqf8AwrHWYpSF0+6Zh3ZNx/Ovgsy8cM05HHLaCpt/ad2/x0OjEYWriWvrU20torSK8klokeK67o3iPxLqUUmo6wI7JRtey02KeB5wf78gc5H4CvYPhb8NPBWneGIRJNa2j4y0BlRiD7u5LH8TUer/AAz1IL/pWnXG3/rnXM3ng4WUpXY0WP4WGCK/Ls24uzPNantMxqyk+z0XyS0/A2o4elSVoRsj1Wyt/BOjxuBJbsB2F+Mfktcxr11pN1qDNp01vHbdgXLc/WvP7uw+y/8A6qhSKaQfu/u18/Ucaj10NOVXujrLoW7E/wCkW1Z15cW9u/30f3SsbyLmmyafc3I2+Tv/ANr0qI0YLqV6l2bxPbWhpsHjmAygr8zA9Cu4GsO++HNzcnduMfesy68H6np8TfZ5PMH8XtVxpwvuNWZ7V4e/aTn8M2KRf2fYeX03fdNejeGPjJb+J9ODM8cLYyQZv5V8S6re6lpUp8zsajtPiLJbHEn0r0IQnb3XoVyo+2PEnie2uoT/AKTN07S8VwGo3cMl03lypIc9A+TXgWlfE7LLy3511Hhj4uwaVeebPGsq4wA3rXHiMPOo0RKF9T07z6PN3VzSfH5dRAhSzt4UPG/0rr/DtjZeJLMSNq1ojnnyzXHPCzRPKVafbQrcTqkkvkITzJ/dq5e+G7q0H+jeTcr6xmsqeG6ibM0dwnqD92sfq9RatC5WtT0K08C+HLzTUN1rfOP7yLVuDwZ4XUxww6q0xc4Ea3Kgv+VeYebn+H9KPtHlfNgjHpwfzrWNSMd4L8f8x857Lb/CnQ1b/jyuH/353atG3+FuiBc/2NatjnL7jXjek/F3WvDQH2O5DQj/AJZyOzf+zVcuf2stejGEttNjPcvExz/49XoUK9B/Z/A0jKMj1TUPBXh+2TdFoun+cOm2PH/stc9f+LL/AMNMVj0X90Pu7Hx/7LXleufta+JCv/Hto/8A37f/AOKrHj/a38SBsm30fjn/AFTf/FVtKz+F29Ev8ijvfFPxb13ym+ywwWJ9V/eEVw958W/FnmnzNWuMeiDy6ztf/a58QeKIfKmt9NRemUtsVzEvjmTU5N803lk/3BtrCSq9HcnlNDXte1PxNv8AtdzcyDPrnNc+U2ybEiuXNX08R2xbrn39atQ+I7Yis4qSJMSx8Kahql+R9ludhPFdz4a+EsqqGkt7npUOjfEibS3ASfCDoPSujX4uXF3Dt+0flU1Kk5K1regPVWL9j4djtYTaLaNJuQpJlPnVTwdrEAj/AIDurhrX4Fah8PpVHhfXJrLSZpGlfTtQgM8Zc8nZJtWRSfqw9q7/AMJfHS50C7w8UM6r/Ex2k/jXQat+0Xp+uYjuNKgfsf8ASN36V6nD+fZjk9Z4nLqzhLrs0/kzCthYVVaornjGn/EKTw3rNtpninT/APhGdVvJjHZKCbm01L0xMFGCfQjNd0toYv3k0MSDdtZDiSMH2zVD4x23h74maFAY9POlaxpj+dpt/G2Eik/2kyBIPYmqnwk8T6j448ef8Ifqtn5Ov2tsLqS8tpc2lyn95uAUPttI96/rDw58Uo5vhvquYzX1hdla67uzPjM5yerQftMIrrrqegaH4iGkIMRpIvbbjC/lXUWnxj+zwbfs9Zw+El4Mbipz02NuX8DUifCO5xX6XWq4KrrKSZ4kMdjYfBGxbHxZ81j/AKPX0R8CdX/tr4Xabc7dvmedx6Ymcf0r5wHwpuUFfR3wC0dtF+FOmWzfejM2fxlc/wBa+U4r+r/VY+x35l+TPs+C8Xi62Nmq+3K/vujs6KKK+DP04KKKM0AFFFFABRRRQAUUUZoAKKM0ZoAKKKKACiiigAooooA4D/hCLej/AIQi3rVWdAP9Uv51Msyn/liv51631ir3Pho4fDy6IyLXwD5J+X7Pg+oqHVPhb/aa/wDLv+VdIt/MOkI/Ol+3z/8APD9an61XvudLy3BSjyyizze4/Z18+Vm/tCRM87Vj4H0qGT9m7/qJT/8AfuvTxfXHoB7elL9uuP8AZreGZYuO0jyanDGTyd3Tf4/5nkc/wCnglKrds+OhIwTTf+FDXP8Az8fpXq82pTB9v2eWT/aUcVE+qTJ/y7TV0xznFdzinwflSd2ml8zys/Axk4kaZ29V24/Wj/hRvtc/+O16U+uNHccwzKf9zNR6h40+yR/6mab2EdVHNMZLZnHPhvJoptt6ep5yPgns4/0j9P6Uf8KYx/FcfnXVXPxOut3+j6Pcbe/7vrVO4+JuoZ/5A9z/AN8V0QxmNl/w6PIrYXIaeiu/+3X/AJGF/wAKaiT7/wBp9qP+FO23/TzWuPiZqDZ/4lckf+9H1pr/ABM1L/oHN/37rX6xje/4nLbIuz/8BZjy/CG3Qf8ALzUL/CO2x/y81szfE7UkH/HkqZ/vpjNQSfFPUiP+Pa2prEYzuY1P7DXf/wABZlr8I7bd96WP3fpTX+Elt/z81cvvilqXlj9zGvulUJ/EWo6j83rW1PEYrZyPMxGKyiGsKbl8mv1Eb4RQsfkuVz/tdKjk+DvH/HzbVG+tX+7ZI2xfWm/2pc/8/FdHtMT/ADnBLH5Z/wA+X99v1HJ8G2d8LPbMx7etVdS+Flzpqn/j24qd9XuY0z5+729aqzanc3Q/u1VOpXTvKRy1sblrXu0mn6/8OYl3o9xaOVbyce3Wq/2Cti4tJyGd/uKMsd23A+vauCvfjnZeIdVm0bwjaTeMNYt8rIbZBFY2p9Jrljs47hSW/wBmt6mYxgvfevbr9xjgctxWPqNYSLa6u6UV5ttpW+Z0c9qsFu8kjpFGgy0jnaqD1JriL74qxeJr06Z4N0yfxPqUZxJOj+RYRH1eU/e+ij8atxfBC98dyC68ea3LqUatlPD+ns1tpEZ/2if3sp9/lHtXoekaTZ6Ro/2C0t7KysoRxbWlvtWuaWJr1l/LH72/8j1vbZVlqTqv6xVXZ2pp9m3rJd7WR5ZafAu48b3bT+NNTGtRkFTpFov2fTbfPrD1mI9ZM1k2N9q/wW1NvC7SXln4WZi2kvuIjjY9iE4A9BxXt6QLJFvCIIkONicNVTxD4UsfEdo9vqVrFeWrD50cebu+h6r+NfN8UcLYfOcC8NN8r3Ur9el+v4nRgePsfTxV6r/d/wAsdIpf3Uml+bPItT/aR8XeD7wWRuWu4x0lkjVmA99vzY/E1Wf9q/xnMcfaNPaPt/o3+NZv7T/waj+HHw61TxZoeu3VpHpsW9rS/t3v7Rh/dDxnzk/Nh7V8kQ/ta63a6La3k+h2N5YswaeS2lZBbp/fCNlj+IzX86Z1wnmGWTVOu0/NPfzP13Jc4oZlQ9th27dmrNH2If2xfE+kffh06T6W1Ubz9tvxSzFoprWMt/CBgD8K+drf41QatAk6w3U1ncp5kUpl8sH/AIDhc0ReI7e6/eN1fnGMY/U/zr5x0aidpXPXcWtz3K8/aq8Sa8+Lq5twtZrfHC7F0d0VjMf77dTXkqa5bCtLStQW4xtxjtWdSjp7xJ6NqPxvufK/49tPrOj+PM8Cc6Vp0wzy67t/6cVhPYi4iqq+jeWuKyjRp31QHomnftM+H7Wy/wBM0bU/Px/yyxjP41ny/tY6LbliNG1lWB4ykZFee3WlZrI1PTtkv4VosPRejiFr6M958JftBeGvE0e681RdLPZJ4v8ACtYfEHw/4guPLttZ0pgvGVVl3fXNfMFxYgg1DEi2UgYqpbOVw2Gz7VX9m0n70VZh7JdD6c1zw5a6ztT7Tp2xv4qz9Q/Ze0qew+1Lr2mQyMM7T3rwi3+Ki+GJ5Lu51JbHyMK6zzf6vPTFdpb/ABIbULON/MaVZAHVt+VYHuKyjhatHVbFOjJasr+KvhxN4bu2WGS1ukB+9HVGHSGMf7zdCfU9K2P+Em+1fjSNdefVqpPqSZXlTWn+ruaZNq2pRJjznkH91OtarnioJI2uGCp97PA3Yz7VdwM6PxXrNv8A6ue6T8alj+JfiSBvl1O549as3lo1t5zfZcXGPlG/Zj2z71yp8b2sN7Db6vb/ANm3RYiKHyvM3+/mdq0UE1sB6V4P+M+tJKq3F5cSetenaB41/tmNd/nszdz0rw3RvEVl5n7vrXV6T4q+zsjoR8vPPSuCtQv0IlC56veW32hcVlXXhnz8/pUPg/xFqniKZVstMe6Zv4o4uK9Z8M/CHUNbgWTVW+wdwrxc156w9dy5Yoy5ZHiOoeFbnbXP3/hO6DGvqC4/Z9aabKaiI/aSOsTxZ8IdQ0mP5D9q/wCuUVdHLXp/FFmnvdj5hutJuRn61lXWk3Javeda8KXIH+l6fsFZEXhW38z92vlmn9eXYrmPD3hurc1C+s3NtXuF34L8/NY198K/tD1tHHQYe0ieWReK7mMA1bi+JNxbV1t38LtkhHpWfc/DGuj2tEPaRMUfGpoH2SQzk92XpVmH432Q/wBZJcR0lz8Lc9Idx9fWsu9+FV4T+7t6I/V5PYq8TpLX426Rc+VE11PuLcZXI/En7o9xWl8MviXfeGf2htJ1rw2tvrWpaqy2F1pwU3CiE8bo16hv9p/lrzO5+F2sCfalnLKG42ryP/sfqaf8MPCuteCPjp4Z1H7dceGw16sTX32EXu8ZHybT8o/3l+avo+G6lOhmVOrSnaW3TYHTjKLurn6qW3hed7dWEbwM4BaGSQO8J9Dj5R+FI/hW4BrYttA1G+sIJv7SaTzIwRKYNvm8DnHUfjTZPC2o/wDQS/8AIdf0jRxH95fcz5ytgnGT/dP71/mYb+GbmI/8s/8AgTYr0TwDA1p4Vto32llLg7Tx941yMvg/UZf+YkeP9nbXaeD7CTS/D8MM0nnSLuJb1yxNY5hW56aV09T1OG6MoYqUnBxXL1atuuxrUUUV459uNzxRjBFG/wCavF/AX7cfhH4iftdeLfgzY2uvR+JPCFn9rmvp7eNdL1BlS0kuILaUSF3lt1v7IygxqF+0oAWIYLO75fV/Jbv0B6K7/q57QRxQOP6V8m69/wAFdvhr8LLDXrn4jX2j+A4dN+Jk3w4sXvddtY/t7RfZt9+32hoBHBGLlWl2mTylG4ls4r6G/wCF5eCT4e1bVv8AhMPC40rw9BHdare/2tB9n0yGSFZ45J5N+2JGhdJFZyAUZWHBBoi1KKlHZ/qk/wAmLm97l/rez/FHWg8Zpc5rgr39pz4a6b8VLfwPcfELwRb+Nrp5I4PD8mvWq6pM0dul1Iq2xfzSVt5I5mAXiORXPykGpfgt+0h8PP2lNIvdQ+HPj7wX4+0/Tbj7JeXXhvW7bVYbWbaG8uR4HcI+0g7SQcEGj/hxnbEE0ZNeB/tAf8FDvh78FvGth4PsPE3gzxL8QJfEWjaJf+FbfxJbJrGlw6jfW1r9rltV3zKkYuo5MMihgyjcu4NXeXX7U3wztPjbD8M5viN4Fh+JFwvmQ+FH1+0XW5V8ozZWzMnnkeUpfIT7oLdBmharmW3+Vv8AML2ly9bJ/J6fozvxxQAATXlX7Mn7Sv8Aw0befESL+xf7H/4QDxle+Es/a/tH2/7NHC/2j7i+Xu87Gz5sbfvHPGR4F/bk8F+P/i98StDs/FHw6bQfhXZpNreqQ+NtPubrT5l803X2q0iZmsreAR7WlunjYyJMPKCRiR0pJpNdUn8rJii738nb53t+Z7f1FIDmvnLxv/wU++EnhH4jeH7JfHnw5vPB96NYh1vxWPFtmum+GbvTzZKbS5k3GNJXa9jUq8iMpKDa28Y9L8YftXfC/wCHXwm0zx9r/wASPAWieBNaER0/xHqHiC1ttJvhKpaLyrp5BFJvUErtY7gCRmn5jWp6GKQrkV454r/a90qw+MPwX8O6FDp/ijQ/jPHqNxYa/YaoklrFBa2H2yOaLYrrcJMpAVldQAQwLdK9ko8gTuFFFFUB4Pp2radcP811qH/gQ1dFp0GhzoN13ff+BDVyI8HX4/5Y/rTv+EP1Bv8Alh+tfXVqFKf2j+WctzjMaGs8KpPzR6xYyWYhQR8qBxmTnHvVxDbhePl/7aV5JaeGNYt+Ybjb7elJew65Cv725yK4ZYCMvhmfa0+PK1GlephJL0sewiS1VfvL+dKJbc91rw3+09SQ4+09Kemraj/z9Uf2W+5jHxSp83LLDtfNHt/2u3Tio3vbfFeS2nivULeEJ9p6VL/wluon/l4o/suXc7H4kYaS0pv7l/mel3Nzbs9V3mts152PE9233rjmnf8ACSXH/PzVLL59zCXHFGWvs/y/zO+e5t1/5abPao3vLbH+vH5VwT67cOf+Pmmf23cH/l5qlg5Lqcc+NKWypndPdR4+Rw/9KrzXmK4uXVLmUf8AHw3/AAFsVH9tuP8An4uP+/laLCtdTlqcXxlooW+46y81mG0UGTZz03JmqM3ie1Uf8u//AH6rBxLe8PcScdNzZp39lf8ATxWkaMVuzy62fYmp/Aj99jU/4SqyB/efZ8dv3VJJ4p03H/LD/v3WZ/ZEZ+9cCo20K3I/4+a05afmcbzbMdmo/gaT+JdLkOGSBl9PLoGu6Lj/AI97f/v3WRJpNvHj/SV+Y4ywOK4DxP8AGnw/pviGXRND+0eLvEVv8rWmlEGG3P8A03fIijH+8c+1Z1JUaavKTS9Tty+jnGNdsPSjK2rdlypd23okepTazoZhbdawyLjJABTHvntXA65+0Z4Se8k0bwzot7421wfKIrIlLe1P/Ta5+4APbJ9q5mD4J+IPiSftHjrWVh08tui0HQ2KWi+0spwZT64UD3NehaF4F03wtpkdrpsEdpbqMBIEwfxasfZzrfC3GPd7/I9r69hMujavCGIqfypJQXrJ6yt2Ss+555cfCeT4nXLP471XfEfmXQNJeS309R/dlkPzTn1Gce1dhpvh638P6ZDY6fa2unadb8RW1pB5Maj6Ct24SOYoqqr7eMqd5H1p32Gu7C4enR2V33erfzPjs8zzG5k/ZzShDpGC5YL5Lf1dzL8hkl83csj4xsQbsClFvmtMWPNSfYK6+dN3Z848LNu7Mgw4/wAKbb2jxyCTdlX+5GePL/4FWz9go+wUvapDjhJ9T5m/bR/Zn8QfGd47221XUdR06zw39j2zeVg+uf8Alt/u18xeLPgZpnhmf7De3/2WVo/3trq2nyWewf3QH4P4V+mwscGvk3/got+yZr3xGvLXxZojat4ie1GyfQDF9pihQf8ALWGP+/8ATmvzfjLhdYxSxtCcuZfZT0P1DgniCpQlHA17KHc+PNS8BaVpdo66frsmmxRt8iQqzwlv9xvlNV7TxBqmmxgXFqmoIv8Ay2s2VZHHqY2KhfwJpiafNcXUyr9rP2d/Klikj/eW7D+B0/gP15qd7AxnbtxjtnOK/F5JxXLU3XkfsekneO3Qu2vjMXnC7on/AOedzCyt+YG3/wAeqQ63cxS9AvspGP0JH61m/ZM//rojspI33I7N6rH85/EVz+5e4/Zm/a+O7m2HXNaNl8R7l0/GuB1vRpNUjKxTfZpv70D7D+K1mR6R4o0OzEcOq6ZKyncVkgZGcehYSLn8hV/VYT6icND2O1+Iyn/WfjU0nj+1nGO9eVpY+I5PBF14jsH0e4ghBjksdjw5fud2Tn8vxrG8J+JNf17T1uIZdKhnxtZQxHk+3I5/zzS+oQWzR6eLyHG4WhHE1o+5LZ6Hsc91/ax/dH8M1j+IPA8+sxhHS7YMMEwzPGoB7HbwfxrhtJ0240nUjdz3UNxeE5JSLGPxz/U/St1PiFfxXQRp3ct/D5vT+X8qh0ZQmuSVzyuXl1OB+IfwBufBF7/aFtpSSaLHzLJ9iDPET/s9X+vaqvhvxL4h8HwNLpN+0dtcD5Ibwvdxp9NxAT6DpXos3jHUZJpUlv76BGif5fM4PFcZ4K8Px3fwwlnXLM105Ll9xbmvSp1JTp3mr2P17gnFRzaLy/HwjJRV4trYksv2hfEGgT/8TW0j1Jf+nH5D+W6uit/j9FqluJH0/WLdD0UQO7Z/4BuNeY+LP3U1tZ/9BNhDXfabpB8P6ZBZj/ligWs6lGklzcup4XH2T5bl1dUsKmpvdX0RcT4t3t5L/o2naoE/vPIsf6M4P6Vt2XxHv7eHzPOkjf8AuMQf1xj9a535vanJndWHLC3wn56dP/wtrUmP/Hw3/jtVNd8dXPinS5LG7P2mCXqhZVz+I5rGoJ2VKpQWtjTkJrfX9WsLQW9jqdwHi4jS7iUxsP7oaPn86taX+0JqHhZd9/p17HJb8yQwWjXCuP7wCZP5is77R9Kktb3yblXwH2nO0nrV8tN/FEp6I9x+B37etp4a1xbayuZre4ni85rZrbLovqYyoYV7/wCGv25L/wARwqlre6G8zfdjaKRJXHqVdwPyr87/AIq3tjeafFcXXl/aPNC6f5AyfO7Ka6OS98Q+DLPS21k2uotcRgyxWltmeA9s96ynlvPHmou3qdmHyfE1qE8TTjeEVdu6/wAz9Bn/AGp/EFs4M9pp7j/Yjx/7Ma3NE/bHaFR52jlz6rJgf+gGvgPwp+0b/YmofZf7Umi/6dr+3lQD8TXXQ/tP+VdeWf7GlB/gjudpP515dXL8THqeTys+ytc/aDsvGE4+0afuX/r4Q4/KrNr4q8EalbBbqP7Gfqx/lXyBb/H9SMxaOJPUpc5rRg/aAsGX/S7PULT/AHDmuP6jVfxK/qTyM+n573wWrt5Oon2/dmqUt/o4/wCPfUh7fu6+fD8d9DEfF/cdPumNsiq8vx40X/npcOPXy1/rWEsum/s/gHKz6FOnWs53i5DBuc461E+kW3/PxXzy/wC1hDog2W1ncTAcA70Wom/aukk/fS2txbL1z9rQVH9l4johcsj6Pi8HLcoJFaFwem6TB/KlPgkbv+PS2k/7bV8qa9+2R4fE6wtqVxLf3BwIVYXAX6kOMfpW3p/x40IWKR3OoJbXT87baKSdiPcAHH6fWr/sqtFXlcXsmfSsHg42qeZFYjd/EsezGPdvvflWdr3wwTxLH5P2JoJPvxtaYDBvcP8Auz/wKvE9E/aN8O6HLvTX2iVuHVYpS/4jZXc237YPgfyIpI/EbbkGJP8AR7lH/AhawWHr0ZxlFN2d76/1+JPLK97H1B+w58Y9U8R+F77w74q1HS21fSbjyLK1Ns9hO0AzjKN8r/70fy171JYfaZ90bKGj+9G4z+tfm58Gf2o/Dvw++M1pB4b1xbiDxJdBZxrVs06bm/55SEC4VueAPlr9DYbZgFC7tpUNl9xbkfn+df0vw3jVjcBCr9q2tyq2KcGlKF0bJ0xnYsSeeg3ZArV0qPyLNV9M/wAzWLZyfZYF5c5/vNn/AOsK2tMk82yVvc/zNetUvynpZfKm6r5Vrb/ItUUUVge0Zfia+utJ8O31xY6fLq15b28ksFlFKkT3ciqSsSs5CKWICgsQozyQK/PD4V/sJ/tL/Cqx+DvxC1HWPh74k8VeHfGdx4s8R+GLDQpbPWGTXZHj1e1bV5tUe1uVtIrkOii1iEg02BUIwob9IelCjFTFWnzrf9Oq+fUHquX+r9/kfBHiX9lb4oeFPhv48v7LwNfeINSX9oS2+Ien6PY6nYRXms6PHcWLNJC89xHAkmyOUiOeWIny8HBK5rftg/Bj4z6/pf7SXh3wf8IdW8Up+0Boenz6ZqR8Q6TY2mgyppi2dzZ3okufO+0L5CtGbeOaCRpkVpoVDyL+gH+etA+9U04qEVBbK34JR/JIlRXM5dX/AJt/m2fGsn7LvxC8L+Jv20PEnhzwf4TuPFXxShsI/CEuuLbXFn4gW28OW1qsF0oYt5C3QuE8ucKp3ucbHLFv/BOr4KfFjwp+1D8V/HHxEs/iNDpvizw74c0/Tbnxxc+GG1ieezl1T7QrxeH0W0RFFxDsLGR2Vxl+PLj+yzkr8uKXdWkW19yX3aX9SpO8VF/1t/kfnZqH7LfxYbTdL+Hc3wfbWF8P/HRfiUfH91rekiyudPl8Qm/863j8z7b9vjtLg2zxyQRJ5UEwSeX91FLS8OfsJ/EXRfjBq3hjxT/w0HrXhPVfitJ4/j1HwzdeBR4Y3Nqq6haTTyXqJr6PAqQwzLE0jbYSkLtGyov6QHt60damn7lrdP8AKK/9tQT95tvr/wAF6f8AgTPnn9i/4LeLvg/F8cH1bTbfT7nxZ8RtX8QaH59xHNHd2s0NusEz+UzFVZkbKthwByoyK+Kbf9i/9pT4n+H/ABW3ijwr4tjv7j4A+KvAMWn6hd+ErPR4NavFsPs9lo0WlhJU0wmGVYX1GVpEVAHERJaX9XAc0E4qYxUUor+Xl+XLy/fYKb5Hdfzc343/ADPjH4s/ADxZ8L/G37MHiTwv8G4fHml/Bvw/qWnXmiaXeaVZXehyTWljbQNp6XcsNu0qCOZcCaFREJcSZKRy8P8ACP8AZW+J37M3if4W/Es/DDUfGgsb7xvdXfgPRNS0ePUPBh8RammpW8lu91Pb2UslvHE9pP5dyObyQxNNGG3foLg4pWOK05nzOfXX8dyV8Cp9Fb8NvzPhv4C/sWePfAHxT+Auu3Xhuz0rTdF8WeOvFWtabbXtu0fhSHWxczWtnwwErq04STyA8YkMm1jHtY/chGBSdTSk+9LqCWrfd3+8cOlFFFMo4NYY/wCG3pfKmP3Leul/su1pp0u39BXofWEfCf2BL+b7rf5HLy6ZfTDiZV9sdKz7rwbqFz/y8V2n2C3BoNnbitI4qaOKtwzRqx5arf3s8vuPCl2kzL5Mr4PLBOtN/wCEYuv+feb/AL4r1A36xfKvbpTJNVxXR/aFXseHPgPL07yqNfJHmf8Awi11/wA+8/8A37pf+EVuv+fe4/7916JNqwUZ4rPvPFiwHpVwxlaX2ThrcJ5XS+Kq/wADjY/DVyi/8e0/5Ypf+EcuP+fWauhuPHMu/wDdiPb/ALXWoJfG9wT/AMsfzrb6xXPNnluUQ09o38kY3/CPuv8ArI3Q9g1RSaKfT9a2X8XXMv8Az71BL4muT/z70c9Tqc1TA5Zb93J/cjMi0gpTv7Jq6NZuJh/B/wABpf7TuBVKpNHN9TwfdlD+zWA+5u/pQbEoP9TVubUrwruXHH3snA/HHNeeeNf2gdH8Far/AGPB9o8Ra83zf2Vp0PnXC5/vP92If7TlaUsTyK8nb1OzA5A8ZPkwqb+X4vsu7Z2smmPcFQLfdzypxg/WuB8bfGvSfDettothaXniLXeiaXpUZkVD/wBNJR+7jHruJPtVKTwd41+Lb58Uaj/wi2jvyuhaJNmedfS4uTjPuq5HvWB+1P4rX9lz9lDXx4PtNO0/xBrTQ+H/AA3bi3Evn6vfyra2fmAg71E0qu4PGxHzxmsJYjEVIXp2Xa+7fRJHu0clynB1FTxE/bVL7R+BP+9Ldruoh4V8P6r+0ha3k+qeKNJk0WxvZtNu9E8L6kskcFxC5Sa2u7lSWMqMCrxqF2kEEZr0zwx4Hs/BWhrpWj6bY6fYR/6uCCMRwx+pw3LH3r5j+EX7UeofszfsPeIodR8Ox+K/FfwP8RReBL7S9LitNFGoBr22hsZYI40S2g82yvLSYIFjiDMyAoo3DotU/b18UeAdG8eaf4v+HOj6Z468I3Xh60stM07xU9/pep/25dCzsXkvnsoXt1W58xZv9Hk2LHuTzdwU1TVGD5lrLTVp31tt/kc2YVsfib0aa5KXM4qMbRW6W3Xde87+p9Hw2bMit+8+Xr5hH6AcCpfIr5r+Gf7eXirXNeXTfFPw/wDDWj3TfEsfDd20bxdNq0InGny3styHksLfKrtjjCYyWZ9xQptbF/aL/ac1bxbrmg2Gkf2j4aPhX48aJ4MvJLPUnH9s2z20NzIJAoTEb/aQjREup8sEk5wNfralZx6tL73FX/8AJkfOTySpGTjNWsm977X/AFi0fVwi+an+V9a+an/b912Qy+Lbf4e2Nx8HLfxj/wAIZJ4i/wCElxrPnjUP7Ke8XTPspiNmt/mMs14svlI8ohOAjehfHr9oTxF4F+LHhT4f+BvCui+LfGfiiwv9aaDWfED6JYWGnWbW8cszzx2t1Izma7t0SNYTnc5LKE5r2/u3/wCH+701IWR1lNU2tXfqrK26bvZNdUz1Ix4607yc18H/AAu/4KXyfA79nP4d2viu68M2/jnx/rfiudW+I/jqPQNN0u1sdYuY3hm1ExXQaWPzLeCKGFJNwUkFY491fQ3wr/bx8J/EL9iTVPjjeKtv4f8ADdjqdzrKaZdpqsKPpzzRXQtLiPCXUJeBzFMoUSoyMVTcVWfrKs5X0jv+vrY6JcP4iCTcdJS5V5v+k7HtQhpxts+lfEvhv/gqRa/tAeDPHnhmG6+HNn4iuPhzq3irR7jwF8RofFUmnfZ4QJIr4w28DWN0jXEDJsMqOVm2y5i+Yu/+Cotr8Cfh38L/AAnNqHw5vPGE3w00jxXq138RfiNH4SivFnhCRJbzy29y13dSyRTs+VREAUvIDIBUfW4c3veXzvzf/Is6I8N4rmVPl9536rZcut72tr3Ptr7Nn0olRpI2jj+XaMljhc/RjXy4P+CqGhXXgHxN4jt/CupSWcHw80n4heFIGugLrxXDqDSwR2aoEIiuEu1ggIVpQTdQsM7sVf8AjN/wUdHwG+PvhHwTrmm/Dm2k8Qano+j3OnP8RLceKY59ReOJJ7XSBbl7izjmlVGleaGTEcziHYis+vtVfk7uy9b2t+gYfJa/M7Q2Tb1Sdkk9vmvXY7z4yfsZ+DPi/wCGb0R6Npdhr8wMlvqNoPssgm7GZ4+XHrXxpP8ABpvDF3e6T4omh0rVNNlMAeWRra21P0aNjy4+tfTVp+2V42+IHgPx74u0f4dw2vw10EeILGx8QJ4mSPW5ZtLW5ie6NhLZtDFbvc2sscb+dPJzC7W2xn2cl4n/AGivGP7Sfw58P+BPAXhu88Sa9/wg+heNfFN7e+No/C9wkF6Ge3sku7bTpme4uTa3IkaCC0VEGUlhLqF+N4i4awuaL3XySVm2l0d99u1z6rJ8TjMGvZTs43fVaNNJ3fe7tq1qeE3HwUt45fLsxG87ru8hZcfiPWuP1DwHqFlLIP7Puzg43MMGvpjxX+1ovx2bS/8AhW3wN0fxTDqXw+tfiG9zrfiRPDstpbzPcIbOQwW10/2vdBgBQYifM3yx7UMmX4v0SaL4RaP8TtFSIeB/FWk2mraZbXcxe7tI7mFJVVycncA4B56ivzfNOCcbhabr4eaqRjo9LNatX37po+oo5onJU6i5ZPu/JOz7aNPU+XNU0KW0b95Dcx/hWXNaRzfK4eYjmNG6qa63xfrOq+I9UfzrrdCw3GHzOIQehrnhotwY2AllBzhGDbl/Kvmo8yS50exCXLJeZH4K8VS+H/HEVvdfv7PWB9jWL+6xrmPHHgm8+A/xTmhuzu8M6kflH92Y9K6HVPB90scU6P5+o2TCa3FzLj5vZa9NsPG3hb4r+GINI8StNbayU2y21zEIGdvVDjke4NawrcrutUfq3CtWhm2UzyfFzSnF3j/X/BPJo5vKbnnAwCKhMsmmzl5P4uBXUeJvgQ3gWYyWmpyJYNykM0Dypj/eDoPzRjWI0UscRJbSb7Z9yC1uv33/AHzKqn8s0K0tYO6PncbwHnOGlb2fP5xad/8AIytb1n/hH9La6/4B/wB9cVraL4eTwl4MS2fbi4/f8/7XNYltZ/8ACyNTaNfOs/7PO64hnhVnlx6EUt94oW+uJEEm9YlMaA5DLgeldkX7lj9G8Ocgr4GnPE4mPLKXR9Dm9PsF1r4rXkL/AOqtYPMt93TfTfGfj3XPB0iNcrpbW87eWmEdmB9woJrV+DWkfb9Ovmm/4/PObP8Au11+peEI9e0x7G7jjlNwm3a3B2/7PvWc68FU5J6pH5rxHj4Vc6nWxMeaMXa1zhPB3jDVfEyTIn9mNNH91Zme3b8Mlvl/CrkviKTw/qUcOs2cls8yl/tCuGtB9H4/lXLeHfhZqdpc3htR5V1ps2y2ZE3SBP7re1HiBvEHirXrfSLvy7m5cZMUUO21iA7uf79dTp05TstjtxnCHLFY+EorDyW7eq8kuv3nX6B4y0zxNdPFaX+nzSoeI4ZPnrVWGdpGMm6PZ/DJJkmsW1+FWl2FpH9ptxqVx3uX4liPoPatCfwXFFZkww2ilFLBYpCnnY/56HmuKSpuVoto+MrU4KtyUZXXexbBJ9KcoJPauH8N/Em+v9VitLXQLGWSWUxZivGbp/d+XrXo0HhXVbybbf6S0AUZ+R3I/wDQetKrT9klNvT1RtjMDXwqTxC5eba/U4zx3apqmqeGEm4mh1RHj/Ouq8YXUmtfEi+abJngIQAHqMVn+M/BV7beIPDrCJTGL1WZZd33fxp3xqsbiH4kSahb3LaaVTy1Maowxj0wc/ka2puM6ahfZNfefoHD+VYjMOHqtCg1Fxmnd6LbuPu4Y5R5U/z4/wCWT9B+NZdxFoDv5Mn9nsy9ISMkn2x3rS0Cz02w0wS3GkXviC7m+/LdzPb2o/4ApXP/AHxV+K8v7SDydO+w6NaPyyaVYouPrJJuP4haiKjHqfMVclwGF93F4lc3aCb/AB2/ExI/BL6rb+ZFoWtRov3ZGnl021hHrIZJE3j/AICaxZbDW7C8MOm69b6vIp6tF9ss7b2W4Upz7bWrrZvDQ1qfde/aL5vW8d7k/wDj/ArQk8Pm3tBFG0UUf9wqgX/vlauWIgo8sVf1OStiMthHkw1KTf8ANNp29EtvxOWin14IBJZ6LLIB80iXjjefXG3inNNrTD/kHWv/AAC+f/4muiOk7UA4/AYFRtpWDXPz+R45gnUNWlkKRaOXlCnL3N6kMK/kGZvxAqufCtxqoh/ta7klTBza2QkSA+zEkA/9810UqeXx6VExyar2tvhSQEOmabb6XZLDa2sFrCv3Y4xwP0FWPm9qSPO2nY5rJu+oEcKKmoAt83mDaMKrbPfB5qHVL5NCgZpOJmbEbZP78/3dora8B+E774jePbDw7ptvfXl5qUgjZLKMtJGM8nIxj8TX6ffBr/glx8IvCH9gavd+Eb6bxJpqJMZL/U7mcpMOrbDKQPpjFe/k/D9XHR521GKfW+pl70XdI8T/AOCYP/BPjVrbxpp/xi13XGs2kgEVvpB0vauw98tz+OK/RS7sbdWzu2ludu7bn8Kq2unyxL8jNt7KT9z2HpUpt7gGv1LB4OnhoKnS2N/bXjaUNCV9NgfnbV6wjWC2VV+6M4/OssrcL6VqaZu+xpu+9zn8zXRUVkb4PkdV8sbaf5FiiiisT0wooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAOdfVeKjfVuaWS9twaia9twa7uX+6fD1MRLpNAb64K9sVC95PmnNeW4qN723zW3yOOpUf8/4kM7ag/I8nafWqlwdQC/8u9WZr2FG2IfnYZyqfdFZs6WccU1xcTFYoATLNI+0RitEediIuT5YNt+v/AKd5cXSSnft/DpVVpRu/eGvnv4zf8FRfhP8K/EVxpVuviDxFfW52ubGACEH/rpIVB/4DmuZsP8Agr/8P4UB1DQfEVrA38ds8UzIPdW2fpmpjjqMJcraOaXBOc4he1jTbj6pn1SI0k5TpQLfdXL/ALPnx28H/tK+F/7Y8Jatd3UOcNHcwtFIp9CpA/Su7ewSeNmB8uRTg+9dirRkrx2Pn8RkdejNwqqzXQzPs/1pDBzVy808Qxrt/wB44PI/Ac1xnxC+M2h/D26TTpp7nVNcuubbS9PiNzqE3+7EmSq/7T4A7mlLEUoK8nY0wOQYzFVFSoRbfZJv/hl56HTNbo06r5eWxkMflx+NcT45+OWi+FNR/s4m61nWjxDpemJ515KewbBCIPeRlrPHg/4hfFsOuvTTeA/DsxylnYSC41W5X0mnXdHED3CEn3Fdr4O+D2m/DXTvL0fR7fTwfvtH966/2pHJJYn/AGifpXP9YnV/h+6vP9Ee/HIcHgYOWNvVqfyw2/7elt9zPPX8DeOfi/EV8SX/APwhHh+XroujTbtQuF9J7yPaUz3EX4k12HgH4aaJ8MtPOm6Dptrotsg3iFIx+/b++7/edz3ZiSa7Cy07zO/PdQm3H4VMNI9hWtOlSg7u7fdnJmGZY7EQVBQVOmvsxVl8+rfm2zJtInYkSbyevzjp9DwcfhXnf7Q/7IXgz9qq/wDCa+PLH/hIdE8I6hLqieH7yOG40jVbhreSBGvIJEYTCISuyKSFDkMQxVceuLpRB+7Tv7KO/pxWkpQej/rqeLSwtenLnhdPb5PQ+aYv+CX/AMK9Bk8Vw+FtLl8B6H40/seXUdC8Mw2un6ULnTLw3cN3HbrDtjnkOyOVhw8caDAZd9cz/wAFBP2I5vi14L8W6r4f0S78Wap40u/Dlvr2kP8A2fMx07S7yWfdYwXwWzluv9Ic7L9mtm2jchxtf69/so88fSl/snms5cko8q7p/c7nZT+twqe1ldvz+X+SPir9mr9iTxBr3wKuPB/iKPxV8M9B8L+JbXXfh9JFa+GbDxL4dljUtO7waTbPo3lySyXAVPJlLx3Evm/MV2+j+Fv+CdfhXw7oMNrceKPHmvXQ8fWvxHuNR1S/gmu77VoIYov3hECoIH8oMYo1RU3FY/LjVI1+jRpPP/1qX+yc/wD6qcXBO630/C2vrovuCpHFVLvZO7t67/LV6edz50i/4J8eHYvGdzN/wl/jxvBN14lHjBvAbXFmfD66p563fnKfs320J9tX7X5H2ryDMSfL2kpXV/Hn9lS2+N3jDw74ms/F3jDwD4s8MQXdjZ614bktPtD2d35RuLWSO7t7m3eN3ggfJi3o0KlHX5t3sK6Vhqk+w+xq4uDVun9f8N6aEqniVP2nX/Pe/dvq3q+p82aN/wAE6/Dfgbwb4V03wj4w+IHg/WPBsmqDTPEdne219qwt9Suzd3drM19b3MNxE8oibdNE8oMEbeZu3M3pc3wMtPFHwRvvAfjTVNW+IGm6xp9xperXespawXWqwTh1dZBZQ28SnY+0GKNCAAfvZY+jmwz2o+xfWj3LNdGHsa7s29ndPrf133PC/DX7JOpWHhDxB4d174vfE7xr4f17RJ9BNlrUeir9hilTyzLFNbafBO8qoSoaeSUHJLBm5qhN+wlY6IfD9z4N8ffED4eaxofhuy8J3Gp6J/ZlxNren2Qb7Kl1HfWVzAXjMkzLJFFG/wC/kGdpCj6DFlkd6edO5H+FTLkv56a9dL2136v5Gip173VvSytrbpa3RPbddzwj4u/sPeGfjr4z+F/iLxRq3iTUNa+FtwtxbXSy28H9usr2822+SOFUdPtNpa3OyJYlEtuhACjacHxr/wAE4vDnjX4m6pr3/CZfEDS9M1zxbpnjjUPDljdWSaXeaxYNZmG4dmtWuSGWygVoftHkkAsI1fDj6V/s7I/+tTvsVL3FK673+en6pGlOGJhZJ7Ky9L3PnPSf+Cfei6A3ivT7Dxv8RLLwX4sl1a6fwjDe2iaRp91qayi7ngItvtJ3PcXEohmuJLdJJi6wgpHsTVP+CfGl20nh248KfEL4kfD3UtF8J2vgy8vdBuNPaXX9NtR/oy3a3dnPGJoi0xSaBIZF+0ygNggL9G/YcUv2Go/drp2XyV7J+WrNv38nd76/ja79Xbfe+p4z4H/Yv8F/DTV/P8Px6hpVnD4LtPAdtp8U4a2tNOtnmeLZvVpDL+/YF3dsgLkZyT1Hwy+DWk/CH4MeGfA1j52paN4X0q10a1a/KPM8NvEsSNIVTYzlUBOFUZzgDpXffYcU5bL5armSTUeu/wCL/NsX1epN3lq/+Al+SR5X8TP2R/h/8X/DwstW8N2O0crPaqLSZD65iAB/EV4jr/8AwTGXRtS8zw5r32i327VtNZjTMY9pIlBx9Qa+xPsNOjtNq15GMyjBYtWrU169Tvo18TS+GR+f/iz9jLxZ4OYXF/4dbVo2k8s/2NIlyI0/vFXCv+SGua1j4O+F7G8GnakIbS5l5WDV9NktJR9BOoLf8BGK/Sb7PzxVbU9Ih1e0a3uLVLqJhysiAr+tfF47w6wtS7w1WUH8mv0PWw+bV4u/5H53W/7O8FhZEaRrtxZJIP8AVmYXVo3/AACTKr9Btrzf4o/sg393ZS3UcGj3cyAvv0+R7eR/cxMSv/fLGv0vn/Zx8CXDNJceD/Dxkbq6WKb8/wC8Oaq6Z+zR4HsL/wA5fDVjOwOY1uZGn2HttV+F/CvEo+HeOpVP94Ul6an2mV+Ima4Kyp1G0vsy1/PVfefivYeIrjwnqt1YNceUQTHJbmHy5vTr3qvFZRWtxIR5hVzuC7fmUn+8a/X79qf9g3wX+054Ims7nR9P0XxBboTYarY2iia3I6Ln+LNflT8VPhRP8FvFl74V1fzU1LT3IaJ5A0sqDo5x0zSzjIK2BimnzR7n7twdxvQzyLpyXLUjuu/obv7M+j6Zp/xLjt9TgWePXMQWK2yszeb9BX19afszvpO6SfwhqVybb5pJHsfJ8tcdd8rKp/A18L+HNTuLXyZbGdbO7tnDxzx/66DHev0F8DftuR/GD9iLXrO7WTTfFsFkdOijmkxNcYGPtH0NcGW5DgMa5PETlFx1snZM+H8ReGayxdPHYWPuTaT8n28z4m8YM/hOXxfezWzWwS5Y2Zf+MenyORWp+yj8P/D3iPwReanNb211d6jJvuSSAbY+nTP61z97aXM/geG3vWW7mjBW5McW0ynPrX1L/wAEetH8GftBeBvF2neI/C+g6vNoF4IbZLuyWVo09MniqwOVxzCpLDUZOLet99F0fc9rxAwcsJw/RhDSMbXX6/ecSngDwrp337WzX/eIOfzq3p9p4UsWn8iLS/OWB8DEYPQ9wM1+hulfAvwb4Ymthp/hXw9B5f8AqUj02PdB/usOleT/ALZn7X+gfBPw9eaDos9jfeMb2PylhgRZFslPB89h9zjpXqy4Bhh4e1xGI0Wu3b5n4flscTjcQqFCDk32/U/IhNBHh3WF8UW/lmyg1Jw4jTfv+bpX1zZeINLs/AMWtXMqRWLQiVpYx+9X2VR1NeC3ega14W8Ua7eSaWj+EdWQzJIqeZGlweXKn61m/Aa0n8RC4nk1K4/4RexnLQaRdHaiTf8APQCvmsyy33lKb93p5r9D90zThGObQorDzXNT92S81Y9An1P/AITHXG16/tpLbSoV/wBHtEVvLuF7Ssp6PXrHwg/YA+IHxAK+KrzQLG606/TzNMjN+nk+X2aSPqHqH9nj4Oz/AB0+N+jaT80f9lyLqbl2zE8Y52hTX6OeP/iB4d+FHh/7Z4g1vS/DGk2y8y3VzHboAOwU8n6CvqOHeHcPjMO6uJvyrbW1j5vjzNHlVOGQZVtypza3bPjH/h3B41kjif8AsfwxOJBtJ/tJ0mjP/fpePxNfN/7WSaP+y34mi8OX1no+s+Jj1Onag8kFgT0Ew+U5/wCAmvpn9qT/AIKx2d9oV9o3whtLvWppI2il8SXELxWFqvQmIN99vQ153/wTl/4Jw3nxc8S/8LL+Ic0usWEs3n2sV6iSnV2zndKDygU9K3qcN5bUqqhg05Pq7uyPl8vyWWGof2lnC5YLSMNpSfp28zhPhB+y58Vvi/4Tt/ENh4OsP7Muf+WgjMU5Hqqy3EZb8AK2Jv2ZNY0HVnh1HTbxTGMvHPoNypz7SKWU/n+NfqpbaWtpbRQxwrFFCgREUYCKOABUpsyf7telW4Fwc4WhOUX30f5nyuNzWVarKdKkorolfT7z8p9R+DUWnxeddaFr1paqPmnm0q5hgH/bR0xj8ayl+F+ha9JmzntblV+8YrlJQv1O5SK/WmLTG8ltrZTP8Q5H0zXK+Mv2e/CHxPvobrxF4P0PVp7Y5invbKKVh9K8yp4dwS/dYh/NI54Yir9qDPy31j4N6XaTqZruOOJvlQ+erIx/ujBIJ9utVj+zTLfSrDFpnidbmY7ooj4eukllHqiLGWce44r9ULL9nrwbomqx6la+EPDNneW42xSRaZFGw9ORXVLYS+aBJJ+8I4UAcD2xW2H4BhH+LWb9EkEsRUXwxbPyg8PfsC+JvF+oSLY+GvGUlxCMtLc6f/Zyw/7j3BiB/ANXd+Av+CP3irxjIkviHxPZ+E9LlkHmxL/pGoyAHoZAQoz7O1fpSNMZ1/xFJ/Y59vyr2sFwfl+HlzSvJ+bM/rWJXwwPLPgB+x/8Nf2Y5/t3hHw5FBrckCwXGqzyvNPc4HLFnZuvoK9bTxFDCBlZGbq7r0qEaTxR/ZWK+kp4ejCKjFWSJ+vY3sixD4hj5Ma7dxz83epP+EjX/Zqn/ZWKT+y/pWvJSD61jnqW38Rj2rW0i5+12Eb/AN7P8zXPf2X9K6DQ4PJ0yNfr/OsMRGCj7p6WT1sTOu1W2t+qLoOaKBwKK5T6YKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigDh4NE8urcX7kVcaDiong5r0Pao+DpZfGn8I3z6PPprwcVE8FBvySJGuVj3N3A6H7v41yXxh+HFn8Z/hxqHh43E2ntqEZxPb/cV8cZrqlVUJX+MjIfy/u14L+37+1W37JHwRudUto/tOoXSlYpd23YT0NVCj7V+z3uXGtOlJSVrryPzh+Lf7CXxf8AAvxhbQINAj16FpiYtVjmC20sef8Alow3FDj1FfQHwK/Yh+FiXMtr420Jv7SukCvBfX8rW6P38qRCFPPqteA/D/4/678WDNrWr3U1vdXzlvtMLymRfTo2K9P+En7Tfif4aePYbyfXLrxXpWm/Oba7B81R6Llq83MeBcxrzVShWUY9rNM++wfHeHjhXTr0W5fzJo++f2bfh/pvwa0SXw9oWjxaX4chG+1VYo+W9coAD9TzXaeNPHln4S01biW3uLySU+XGkcfVq8F+Ef8AwVF+F/xV1E6feXuoeFdUT/WW+qIEX6h8nivSvjB8UtFuvh9BHp99YalDrrC2t5bdxKQx7061Gpl+GcKjakluz5OMnmGNTUdG9TGj/afsdV1r+y7+w1zw9eO3lQeTEgaY9vmPQV6X8NvBGhfD+yuri30nTNLvNTbzbueOFVkumP8AFK4+83vXI6Tp/wDwi1nokckgnkhCxMSOhr0Jx9kkZv8AnqRXBkOInjaLqV2m/I9DOJLA1fZYbRPdb3NOHW7WUbcfd7jJU/Q96l/tO1rNVNgxRXueySPm3j6j1svuL0mp2uPu03+1Lb+7+tUZKbVKmjN46pfZfci82o2rDpim/bLb/IqnRVciI+tze9vuLUl3bsv3d/tUZmt/+eFRJ96n0uVdBfWm1qhRJAzf6vb70j+Rjt+FFFVYxdRsjPk/w/hRUnSimZ77kRXIpPLqak2Cgz9kReVS+Sak2Unl0DVO3QZ5Jp0Wm72z6807ZSx3e049KmV+hpTpQb99E8WkbhSnQ8n/AOtT479gKniv91ZuVRHq06OEkrW1Kn9g/T8qkXw/le1aUN7TmvsGodWojtjl+EauZn/CPD2o/sHFaX2+mvfc0vbVOg45fg0Z/wDYVH9hVdOoA+lA1FV9KaqVSfquDTKX9hUP4eWddrdM5q9/aS+1A1YIe1P2lUI4XB31KP8AYT43D7wxjNfBv/BXv9kuHW9T0nxppMONRuj5WoS9gg6V+gH9sgVwv7RvgFPjV8I9W8P7hHJdxko/90jmvLzLDzxOGlTtuj38hx2Gy/GwxFJ63/PQ/DiPTpPDXirEloREjYlj/wCeq+tdzqejwapYRahoMlxFf2v7xYInx9q/6ZH2r0H45fDaGVcbMTaW32N48f63bxmvGY9TvvhPr+Y4/tFhNyyg/Mh9FPY1+OxrONSS+1ezP6j5YYinFz+FpNHaaPND8Q9ClmAaG+X93c26HcLF/wC6a2/+CeH7Qeg/sZ/tIalb+NtSXQvDmpRPKb+QbIppOyg92PYVxr63Y69dx6pol79gvU5mgA4f/roO/wDvV5t+0n430r4iaFJZXSxWl1D8ySyFTG0o6bCfvDPpzXfluJnhsR7anu+h5vEWW08wwUsLX2eqPvX9oX/gpJrXxbtprTwfJceFvCtw3lRX6Lu1XUweAFXnyge3XPrUn7OH/BNzxF8WrQax4w+1eC/DUn7+QSOP7V1NepMjNxCpHXnmvnv9jH9rHwN+yh8HbHVbfwjrnxB+LMi48/VSLPTtKHYQyYL49gvPqKxv2jP28fiz+1F51t4i1iLT9Ec/Lo2ko8NsPaQZJl+rMfoK+jqY2jf2+Nnzy6RWyPh8HkuJhD6plFH2MNpTfxvvbyPXf+Cj37S3wmi+DcvwR+GGlWWo6XbPs1DUbKdktLVweTFOnDzZ+8K8N+DHhV9H8GW19qd35XhzRYQEeVQGlx0znnPvXJfC3wS1z4isrOGx1C81G7fFnY28fmTXDegVvlUV9f8Awf8A+CaHxT+N00E3jdrD4eaFC37jTWP2i7l/2nSMhPwJrzcRTxua1FKEPdW3kj3MJUyvhyi4TrL2j31u38jwLwt8Yfi+ttfDw14hg8KaTqDFbaa0Mcd7NCemJ8Myj/gS07wF+zR4g+NPi5JbiHxb8StdhbabjEl7FAf7r3Dsyg/8CFfpj8Jv+Cbnwx+GYjkvdKuPFOpRciXUnJtlP+zAAIx+IY+9e46ZYw6JaRWdrbw2trEMJb2sQhhQfRRn8gBXuYPhmu4eyr1Hydkz4zGceYClOVTB4dOo/ty3+4+IvgF/wS21fUtZs774jS6fpmk2bCW38Pae7TTSsOhknXaE7fKN496+3tC0VNC0u3iRY7W3t1EccESqAoHAzt/oK1PtGaPtFfVYHL6WFhyUVY/PM2zqvmVb22KfM+nZfIsKQV7UvHtVf5vaj5vauzkPN9p5CPMA1J5/vS/Z80fZqrQx98abiHPPXvR9ot6etlipE0/Jo9wr2dbsis15bqab9ut6uHS8ntSf2X9KOaJP1fEeRRkuLdzmoZJ7atM6VkdqP7J/3armiZywmIl2MkyQMPl3/wDAaYzwg9Z62f7IHtR/Y1HtomX9n4h9jD3R5+VJH9dx6V0GgnOmR8bevHpzUP8AYy1csofJgVfTP86zrVFKOh25fg6lKq5Ttt/kWKKKK5z2gooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAMdoKieDmrzW+KiaCujnPGqUZFM8LUL9KvNZcVE9jzWvMc3sfIobI7mcb137emZOB+FfIf/BbP4M6h8T/2Pry60uK5udQ0+dHSKBd2U719lnSt0DFfvnjPtXn37Ud1a+H/ANn/AF17v/VvA0Sf7xHFXSqOM17PcJYNyV57dfI/F39naz1m30W3jvPDfiK3toVC+Y+nSshI6/MFIrSufF11a/Ey6gsrCK54xskYwn9Vr6y/Yg/bC0nw46+APEU32G9jlf7MJ+lwpP8ADWz+1V+yLb6oLrx54Qihvp3+a7tW6KPVPeqy/jmosx+oZhD2a2UtdfvPSzDhWEMGsZgpupG2u1l9y/A8A/Zf/ZpX9qr43x2GuaXLosWmkTNJFMJll79No/nX6Px/s/ahZaba2C3Og6lp+mKFtRc2LxvBjp8wY/yr48/4J1+OR4R/aGhtiJVOrkQOsnVD6V+mX9nCOVsdGNPijL6OKxK9v7ytpqznyXMMVh6L9hZfJHnWg+CLu+kj/tgWvkWw3KbeRmViP94AiuqMOAs3y+WPljxWwmmeS59zmpksq8rB4ehhafsqCsisVGviantK7u/uMgWflqv949aPIrYexpv2Cu32yOH+zWZPkUeRWxHY0v2Kl7bsw/svuY3kUeRW19j2UfZqftH3J/szyMZbbc1SfYvY1ptbbRTfs1J1mT/ZyW5nfZNvrSeRWl9mo+zU1VbD+z0Zv2fdS/YvrWj9mo+zUvayQ1gEjOFlj1p/kVe+zUfZqXtmV9RRR8ijyKvfZqk8umqjYfUEZvkUeRWl5dJ5IqvaMf1FGd5FHkVo+SKPJFT7R9RrApGd5FHkVo+SKUQ8Ue08ilgzN8inpb5WtDyTR5Jpe18h/Uu5R+zD0/Sj7P8AWr3kml2bTR7QpYJGf5NO+yb6vYoxS9oP6mij9hqOS12n2PB/GtKo5F2SI3900e0H9UV0z81/24dNHgz9ofWNDgH+iXFr9qH+83NfKnj6W2TRjbP/AKvd8v8Av19t/wDBYrTx4I1LQfEKt/yGpRYn8K+FvjHoX2azhuD06GvyDPsOqGYSf8x/THBeMdfKIN7ptfceWX1y0F6VH+qjfLY9a2/2cfDafE74vzLrJVYof+Pfd021km2U6mJYuw5r2b9m3wLZ+ItKvrq3me31SM/u3T19/avMxEnCmz6OVNSmmzV+Inw9s9J1u1s7KCJIpjg7PuN9a6r4E/sfah8WPiFHpeiW0d03G+Qpvs9LB6lx6ntWRYeDPGWsfEvRtOe1t9SN9IIiB0Ck43j3Ffq9+zb8BNN+A3w7tNNs3kurxkEl1dzY89yRna3sO1etw3lMsbLnqP3F/Vj5DjHiZ5dh/YUNaj/BeRifs2/sp+EP2YNEjtdI0+D+2Jh/pepTruurlu4D9SnovavVgIwwbZ82ecpg/lVry6NnNfq1KnCnFQgrJH8/16tStN1KrvJ9WNoqSgrmtOYy5WRce1HHtTvJFHkindCtLsKMY7UvHtTfJFHkii6K97sIOtSU3y6PLqdAuyyn3aWq6jAopG6q6bFiiq9FA/a+RYoqFOlOoK9p5ElFR1JH1FRLc2jqgp6/dpaKRaVgooooGFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUARmHJo8ipKKAK2+N3KdXHYivIv24fh1N8UP2cNc0+CG4mlijM+2CXYx2gng17Ekexm755qG8sxqNlLbygeXMjRsB6EYpxk1LmW5LimrH81nx51my1PVXKNqVhqGnyshZrtkljKnHBFeqfsV/8FGPiv8AB3xhp2m/apPFfhm8kW3kg1ENKyqTj5Wrn/8AgoT8I5vBn7cXjiyZNuk2826Fj0OTTvh/pVvoPhFFimntpZuUlgHINGYYeOLo/vvefTujjwWJqYWraDfK3rbZ/I/RDX/gZpXw7/aq+HHj3SV1DTrfxROry6VGxaJJGwSRX6IlQ7c/N32ntX5Uf8EpbrxP8Xvjsmm6hqFzqGn+FALlZ7lMtj0zX6qzXapj/aOM5xXBg6deFJU8RJyaPSqOjKbnQVkyDVdWtfDuk3V9ezR21nZxtPPNIcLEigszE9gACfwr46/4J6ftfeP/AIofGi5s/iFqjX2h/GDQJfiJ8NYW0+G0bTNHW+kgaxYoivI62k2k3BaXc+68mGQqKB9NftBfBOx/aQ+CHinwDqmpa1o+k+LtPl0q+utIuVgvUglG2VY5GVwhdCyE7cgMcEHBHl/hv/gll8C/hn8UfBPjP4ffDvwt8LfEnge8kuIb3wdotlpMmrQS2sttJZ3zRw5uLdhKHKsdwkhjcMCDnsh8fNLa1v8Ah/nb8e5lPWFo7/8ADf8ABX3HzL+y9+1T8ek8EfsrWOhjQvFum+PNY8UW2vXfibxVcQX2oi2n1N1jZzYXbhYYokeNllBdo1iYInzj6Un/AG/PJ+HFx4g/4RQ/6P8AFOP4afZ/7T+9v1mPTPtu7yu2/wA3ysdtvmc7qfpn/BODw54U8A/C/Q/DvjTx94auPhHrN9rWi6rZTafNeTm9Nz9qtrhbi0lgeGRbuReIldQqFXVgWNHxJ/wTE8NeJPiXJrTePvidZ+H28Z2vj+LwhaahZxaHDrMNxBcNcf8AHr9qkSWSFmeCW4eANNI6RxyCN45pqXPHm+Hr98f05kS78jS3/wCA/wBbMxPA/wDwUQ8YeNPCXxa8WyfDnwf4d8CfDPXNZ8Mxazr3xCi08X95p+omzN1OHtPKs9O2AySzvM08ZjkVLWf928vYfsIft56b+2l8MPGHiDb4OhfwLr82g6jdeFfFKeJ9Bumjtre6E1rqCwQedGYrmPdmFGR1kQg7cldZ/wCCdHg7VPgj4i8DR614ssYde8cTfEODVbe4tjf6RrD6qNVSW33wNAUiugpSOeKVSo2uJOSeq/Zp/ZO039myx8aeX4m8WeNNS+IGtf2/rmp+JJraW4u7o2dtZkhbeCCKNDHaxny0jVFJYKFXaq0r8jvvZW7X0/4P4fK5ay025n92tl+R80aL+2t8SPjz8aP2YfE1x4Tg8E/C34j6tqer6Te6b4xkvp9a0z+wNRuLZNUshbQLC8ieRcpFHJdorRsHeN0j3zfsuf8ABbzwh+0v8bPA/h+0f4XNovxOuruz8OxaL8R7fWPFto8UM1xC2raItujWCSwW8pJW4nMUjQxyKpclPUPhH/wTB8M/CPxd4Dvl8ffFLxDovwrluB4N8O6tqdpJpPhy1mtbi0a0RYrWOW5jWGcIj3cs88awoqSqrSrL1fwF/Y1uf2c9Z0u28P8AxW+JT+AdBie10rwNeR6NPo2nW20rFbxz/wBnjUjHCCPLD3rEBFUllG2tFy83l0v+tuu22hMlu1/XoeVftDftRj9m79vnxHrniPWdcX4f+DPglqHirUdLt52aB5LfUo8zJAWEZuDGDGrHBw2NwBrSuP2/PiF8MLu6tfiT8Ff7L1S/8Gan4y8M6f4Q8TN4nutX/s9YWuNMmQ2dsYb7FzBsSD7TFJ++xL+7XzPVvid+xf4L+M/xW1jxV4lh1DU/+Eg8FXXgHUdKeZVsLrTbiYSy5CqJRISNu5ZAAp4GcMOX+G37AzeAr1tUvvi/8WvF3irT/D83hnw54i12TR5r/wAKWkxiMxtVj0+O3mmka3ty017Dcu3kICxBcNhRUo0+WW/vee7k1+a+Qcq53K27X3Wj+qZrfsc/tTTftNfA+48cahN8Lv7MEziC68DeNpPFentEiKz+bcPY2ZinRiwaHy2K4GWySo85+DX/AAUT8TfELUfhbr2tfDGw0H4W/G65a28G67b+Kvt+rAyWs15ZPqNh9ljitUuba3kZTDd3LI7wo6guxT1/9nX9lax/Z/fxhe3HibxL468RePNQi1DXdc8QR2Ed3ftFaxWkSNHY2trbKqQwoo2whj/EzcY868C/8E/9H/Z4i0fVLPX/AIqfEbQfhf8Aa7/wL4Au73SjZ+H5mimijhsZGhtpZWjt55raAaheyxxRyY3KVV125veu9tP+D59rE+zfLbrr9/T/AIJyPwo/by8V+K/A/wAO/Dvg/wANjx78SPHB8R6isfizxNBo9pY6ZpWqNZzXFxd2WmtkmSW1jijhsWJD/O/yNK2f4q/4Kw6hpXhnwII/BfhDwz4i8TavrHh3VT478bt4f8O6Pq+mXS2kunR6pFY3QuLi4lLyWqNDC08EUj4jYeVW18Bf+Cfuq337OfwsuNY8ReMvhJ8UvCLaxeLqPhm5024vdPg1a7lu7nSrgXMF5Y3EYLW+/wDduBLaI8UgAy3Y+L/+Cc2m+IPgVH8NtL+JnxJ8L+EtQt9Sh8TW1gujXUvjR9RkeS+mv5r3T7iQSTPLOWNq1uB57BQoWMIrtK271/PT5W+d/IIxVk35flr+P4H0DZtLJbR+cqRzMo3qjl1VscgEgEjPfA+gqbyKr+HNAtfC2h2em2MPk2dhAltBFvLeXGihVXJJJwAOSSavjiqlLXQUaemu5B5FN8urVBOKOYHSTKvl0eXVj5qPmo5ifY+ZX8ujy6sfNR81HMHsfMr+XR5dWPmo+ajmD2PmV/Lo8urHzUfNRzB7HzK/l0qxZqf5qXB9aOYao26kHkUbNlWKKOYr2ZXpsiZG70q0DmorhlK7W6HrSvfQagkfB/8AwXO0T+1PhZ4A/wCmOtbv/Qa+If2h3ktfDVhbxfekINfav/BeDXI9B+G/w7L8RSa3t/QV8FeKr658c+ModTH/ACD9PbaoPqK/NOKtcapdj9p8P5f8J7h5nm0trJYaiVuuhrqPhN8Wbj4V+LIrsxebY7grD0965/xyceI7i5/57SYq94a0pprb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Revisemos el desarrollo de la respuesta correcta:

La altura total del árbol la simbolizaremos como «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»H«/mi»«mi»t«/mi»«/math», la cual estará conformada por la suma de la altura a la cual se encuentran los ojos del observador «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»(«/mo»«mi»H«/mi»«mo»)«/mo»«/math» y el cateto «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»(«/mo»«mi»h«/mi»«mo»)«/mo»«/math», el cual se encuentra opuesto al ángulo de observación «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»(«/mo»«mi»§#945;«/mi»«mo»)«/mo»«/math» . Por lo tanto, se tiene que:

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»H«/mi»«mi»t«/mi»«mo»=«/mo»«mi»H«/mi»«mo»+«/mo»«mi»h«/mi»«/math»

Como «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»H«/mi»«/math» es igual a 1,6 metros solo falta determinar el valor de «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»h«/mi»«/math». Para esto se tiene que utilizar la tangente del ángulo «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»§#945;«/mi»«/math», es decir:

Es decir

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»tan«/mi»«mo»(«/mo»«mi»§#945;«/mi»«mo»)«/mo»«mo»=«/mo»«mfrac»«mi»h«/mi»«mi»d«/mi»«/mfrac»«/math»

Luego, al despejar «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»h«/mi»«/math» se obtiene:

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»h«/mi»«mo»=«/mo»«mi»d«/mi»«mo»§#183;«/mo»«mi»tan«/mi»«mo»(«/mo»«mi»§#945;«/mi»«mo»)«/mo»«/math»

Finalmente, reemplazando «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»h«/mi»«/math» en la fórmula de altura total obtenemos:

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»H«/mi»«mi»t«/mi»«mo»=«/mo»«mi»H«/mi»«mo»+«/mo»«mi»d«/mi»«mo»§#183;«/mo»«mi»tan«/mi»«mo»(«/mo»«mi»§#945;«/mi»«mo»)«/mo»«/math»

Es decir:

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»H«/mi»«mi»t«/mi»«mo»=«/mo»«mn»1«/mn»«mo»,«/mo»«mn»6«/mn»«mo»+«/mo»«mo»#«/mo»«mi»L«/mi»«mn»1«/mn»«mo»§#183;«/mo»«mi»tan«/mi»«mo»(«/mo»«mo»#«/mo»«mi»L«/mi»«mn»2«/mn»«mo»)«/mo»«/math»

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»H«/mi»«mi»t«/mi»«mo»=«/mo»«mo»#«/mo»«mi»s«/mi»«mi»o«/mi»«mi»l«/mi»«/math»

Reporta y/o califica esta pregunta:

1. Copia este código: Tri. C3. S09.

2. Presiona este enlace, pega el código y completa el formulario

]]> 1 .3333333 0 0 Ht=#sol]]> Muy bien!!!

]]> *]]> Al parecer cometiste un error.

]]> --- Santiago Sur 24/6

Corregido-En la pregunta y en la respretroalimentación dice Ht y en la respuesta dice H(t)

Corregido-En la observación: Solo el título con negrita

En la retroalimentación:

Dice ángulo h debe decir «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»§#945;«/mi»«/math» Corregido
Falta escribir el último cálculo, porque no aparece cuando el alumno ve la retroalimentación. Corregido.

Comentarios: Arnoldo 02/06/2016

Realizado-PENDIENTE: Según acuerdos tomados en la serena los decimales deben ser separados por punto no por coma.

Realizado-Pendiente: Es conveniente especificar que el triángulo es rectángulo.

Realizado-PENDIENTE: LA altura de la persona tambien puede ser una variable aleatoria o al menos escribirla en formato WIRIS

Realizado-PENDIENTE: Agregar al cuadro de respuesta «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»H«/mi»«mo»(«/mo»«mi»t«/mi»«mo»)«/mo»«mo»=«/mo»«/math» ..

Realizado-PENDIENTE: Revisar los símbolo que utiliza para poner las tildes

Comentarios: Marco Antonio

- Creo que para una mejor comprensión en donde dice:

tg(α) =

]]> <question><wirisCasSession><![CDATA[<session lang="es" version="2.0"><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>L1</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>10</mn><mo>,</mo><mn>30</mn><mo>)</mo></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>22</mn></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>L2</mi><mo>=</mo><mi>aleatorio</mi><mfenced close="}" open="{"><mtable align="center"><mtr><mtd><mfenced><mrow><mn>10</mn><mo>°</mo><mo>,</mo><mn>40</mn><mo>°</mo></mrow></mfenced></mtd></mtr></mtable></mfenced></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>10</mn><mo> </mo><csymbol definitionURL="http://.../units/degree/angular">°</csymbol></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>g</mi><mo>=</mo><mo> </mo><mi>L1</mi><mo>·</mo><mi>tan</mi><mfenced><mi>L2</mi></mfenced></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>3.8792</mn></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>h</mi><mo>=</mo><mn>1</mn><mo>.</mo><mn>6</mn><mo>+</mo><mi>g</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>5.4792</mn></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol</mi><mo>=</mo><mi>h</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>5.4792</mn></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mi>H</mi><mi>t</mi><mo>=</mo><mo>#</mo><mi>s</mi><mi>o</mi><mi>l</mi></math>]]></correctAnswer><correctAnswer id="1" type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>*</mo></math>]]></correctAnswer><correctAnswer id="2">---</correctAnswer></correctAnswers><assertions><assertion name="equivalent_symbolic" correctAnswer="1"/><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-3)</option><option name="relative_tolerance">true</option><option name="precision">4</option><option name="times_operator">·</option><option name="implicit_times_operator">false</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">popupEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/><data name="inputCompound">true</data></localData></question> Tri C3S10 Aplicaciones trigonometría en el plano (Lenguaje algebraico) Un avión que pasa a «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»a«/mi»«/math» metros sobre la azotea de un edificio de «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»b«/mi»«/math» metros de altura, desciende en un ángulo de «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»c«/mi»«/math» grados hasta tocar tierra en el punto A.-

¿Qué distancia hay entre la base del edificio y el punto A?

Observación: Aproxima todos los resultados a dos cifras decimales. Ingresa la respuesta sin unidad de medida (metros).-

]]> 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 Para resolver este problema debemos considerar la relación tangente en el triángulo rectángulo, ya que esta se define como:

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»tan«/mi»«mi»§#945;«/mi»«mo»=«/mo»«mo»§#160;«/mo»«mfrac»«mrow»«mi»l«/mi»«mi»a«/mi»«mi»d«/mi»«mi»o«/mi»«mo»§#160;«/mo»«mi»o«/mi»«mi»p«/mi»«mi»u«/mi»«mi»e«/mi»«mi»s«/mi»«mi»t«/mi»«mi»o«/mi»«/mrow»«mrow»«mi»l«/mi»«mi»a«/mi»«mi»d«/mi»«mi»o«/mi»«mo»§#160;«/mo»«mi»a«/mi»«mi»d«/mi»«mi»y«/mi»«mi»a«/mi»«mi»c«/mi»«mi»e«/mi»«mi»n«/mi»«mi»t«/mi»«mi»e«/mi»«/mrow»«/mfrac»«/math»

En este caso disponemos del ángulo que corresponde a «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»c«/mi»«/math» grados y el lado opuesto a este ángulo que corresponde a la altura del avión. Dicha altura corresponde a la suma de la altura del edificio, más la altura del avión respecto del edificio.

Por lo tanto, establecemos la siguiente relación:

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»tan«/mi»«mo»§#160;«/mo»«mo»#«/mo»«mi»c«/mi»«mo»§#160;«/mo»«mo»=«/mo»«mo»§#160;«/mo»«mfrac»«mrow»«mo»#«/mo»«mi»g«/mi»«/mrow»«mrow»«mi»l«/mi»«mi»a«/mi»«mi»d«/mi»«mi»o«/mi»«mo»§#160;«/mo»«mi»a«/mi»«mi»d«/mi»«mi»y«/mi»«mi»a«/mi»«mi»c«/mi»«mi»e«/mi»«mi»n«/mi»«mi»t«/mi»«mi»e«/mi»«/mrow»«/mfrac»«/math»

Realizando el despeje correspondiente, nos queda:

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»l«/mi»«mi»a«/mi»«mi»d«/mi»«mi»o«/mi»«mo»§#160;«/mo»«mi»a«/mi»«mi»d«/mi»«mi»y«/mi»«mi»a«/mi»«mi»c«/mi»«mi»e«/mi»«mi»n«/mi»«mi»t«/mi»«mi»e«/mi»«mo»§#160;«/mo»«mo»=«/mo»«mo»§#160;«/mo»«mfrac»«mrow»«mo»#«/mo»«mi»g«/mi»«/mrow»«mrow»«mi»tan«/mi»«mo»§#160;«/mo»«mo»#«/mo»«mi»c«/mi»«/mrow»«/mfrac»«/math»

Como el lado adyacente al ángulo corresponde a la distancia entre el punto A y el edificio. Podemos concluir que dicha distancia es de «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»d«/mi»«/math» metros.

Reporta y/o califica esta pregunta:

1. Copia este código: Tri. C3. S10.

2. Presiona este enlace, pega el código y completa el formulario

]]> 1 .3333333 0 0 La distancia entre la base del edificio y el punto A es =#d]]> !Muy bien, felicitaciones¡

]]> xxx Al parecer cometiste un error, revisa tu procedimiento e intentalo nuevamente.-

]]> .---- Santiago Sur 24/6

Sin Retroalimentación

Comentarios: Arnoldo 02/06/2016

Pendiente: Si el ejercicio es de razón trigonométrica hay que especificar que el triángulo es rectángulo.

PENDIENTE: Es bueno incluir dibujar el ángulo de depresión ejemplo:

Pendiente, reformular pregunta: ¿Qué distancia «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»d«/mi»«/math» hay entre la base del edificio y el punto A (usar wiris) ?. Luego añadir al cuadro de respuestas: «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»d«/mi»«mo»=«/mo»«/math» ....

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 <question><wirisCasSession><![CDATA[<session lang="es" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="es">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><mo> </mo><mi>aleatorio</mi><mo>(</mo><mn>50</mn><mo>,</mo><mn>100</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>50</mn><mo>,</mo><mn>100</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>c</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>30</mn><mo>,</mo><mn>60</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>g</mi><mo>=</mo><mi>a</mi><mo>+</mo><mi>b</mi></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>d</mi><mo>=</mo><mfrac><mi>g</mi><mrow><mi>tan</mi><mo>(</mo><mi>c</mi><mo>°</mo><mo>)</mo></mrow></mfrac></math></input></command></group></library><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>69</mn></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>99</mn></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>c</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>38</mn></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>g</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>168</mn></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>d</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>215.03</mn></math></output></command></group><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mi mathvariant="normal">L</mi><mi>a</mi><mo> </mo><mi>d</mi><mi mathvariant="normal">i</mi><mi mathvariant="normal">s</mi><mi>t</mi><mi>a</mi><mi>n</mi><mi>c</mi><mi mathvariant="normal">i</mi><mi>a</mi><mo> </mo><mi mathvariant="normal">e</mi><mi>n</mi><mi>t</mi><mi>r</mi><mi mathvariant="normal">e</mi><mo> </mo><mi mathvariant="normal">l</mi><mi>a</mi><mo> </mo><mi mathvariant="normal">b</mi><mi>a</mi><mi mathvariant="normal">s</mi><mi mathvariant="normal">e</mi><mo> </mo><mi>d</mi><mi mathvariant="normal">e</mi><mi mathvariant="normal">l</mi><mo> </mo><mi mathvariant="normal">e</mi><mi>d</mi><mi mathvariant="normal">i</mi><mi>f</mi><mi mathvariant="normal">i</mi><mi>c</mi><mi mathvariant="normal">i</mi><mi>o</mi><mo> </mo><mi>y</mi><mo> </mo><mi mathvariant="normal">e</mi><mi mathvariant="normal">l</mi><mo> </mo><mi>p</mi><mi>u</mi><mi>n</mi><mi>t</mi><mi>o</mi><mo> </mo><mi mathvariant="normal">A</mi><mo> </mo><mi mathvariant="normal">e</mi><mi mathvariant="normal">s</mi><mo> </mo><mo>=</mo><mo>#</mo><mi>d</mi></math>]]></correctAnswer><correctAnswer id="1">xxx</correctAnswer><correctAnswer id="2">.----</correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, °, ', ", $, ¥, €, £, kr, Fr, ₩, ₹, руб, BTC, %, ‰, A, K, mol, cd, rad, sr, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="decimalseparators">., \,</param><param name="unitprefixes">M, k, c, m</param><param name="groupoperators">(,[,{</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-3)</option><option name="relative_tolerance">true</option><option name="precision">4</option><option name="times_operator">·</option><option name="implicit_times_operator">false</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">popupEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"></data><data name="inputCompound">true</data></localData></question> Tri C3S11 Ángulo de anclaje (Lenguaje algebraico) Un poste de alumbrado de «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»L«/mi»«mn»1«/mn»«/math» metros de altura debe ser anclado al suelo desde la mitad de su longitud, utilizando un cable de «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»L«/mi»«mn»2«/mn»«/math» metros de largo. Considerando que el poste forma un ángulo recto con el suelo, determine el ángulo «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»§#945;«/mi»«/math» que se forma entre el cable y el suelo.

Observaciones:

-Ingresa las cifras sin unidad de medida

-Utiliza punto para separar las cifras decimales

-Expresa el resultado utilizando el sìmbolo de grado (º) e ingresa 3 cifras después del punto, con aproximación

Si denotamos la altura del poste como «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»h«/mi»«/math», la mitad equivale a «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mfrac»«mi»h«/mi»«mn»2«/mn»«/mfrac»«/math» . Además, designaremos como «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»l«/mi»«mi»c«/mi»«/math» la longitud del cable utilizado para el anclaje y como «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»§#945;«/mi»«/math» al ángulo formado entre el cable y el suelo. De esta forma se tiene que:

Si calculamos el valor del seno del ángulo «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»§#945;«/mi»«/math» se tiene que:

Para determinar el valor del ángulo «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»§#945;«/mi»«/math» es necesario calcular la función inversa de seno. Es decir.

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»§#945;«/mi»«mo»=«/mo»«mi»a«/mi»«mi»r«/mi»«mi»c«/mi»«mi»s«/mi»«mi»e«/mi»«mi»n«/mi»«mfrac»«mstyle displaystyle=¨true¨»«mfrac»«mi»h«/mi»«mn»2«/mn»«/mfrac»«/mstyle»«mrow»«mi»l«/mi»«mi»c«/mi»«/mrow»«/mfrac»«/math»

En tu calculadora «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»a«/mi»«mi»r«/mi»«mi»c«/mi»«mi»s«/mi»«mi»e«/mi»«mi»n«/mi»«mo»(«/mo»«mi»c«/mi»«mi»a«/mi»«mi»n«/mi»«mi»t«/mi»«mi»i«/mi»«mi»d«/mi»«mi»a«/mi»«mi»d«/mi»«mo»)«/mo»«/math» corresponde a «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»s«/mi»«mi»e«/mi»«msup»«mi»n«/mi»«mrow»«mo»-«/mo»«mn»1«/mn»«/mrow»«/msup»«mo»(«/mo»«mi»c«/mi»«mi»a«/mi»«mi»n«/mi»«mi»t«/mi»«mi»i«/mi»«mi»d«/mi»«mi»a«/mi»«mi»d«/mi»«mo»)«/mo»«/math»

Finalmente, se tiene que:

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»§#945;«/mi»«mo»=«/mo»«mi»s«/mi»«mi»e«/mi»«msup»«mi»n«/mi»«mrow»«mo»-«/mo»«mn»1«/mn»«/mrow»«/msup»«mo»(«/mo»«mfrac bevelled=¨true¨»«mstyle displaystyle=¨true¨»«mfrac»«mrow»«mo»#«/mo»«mi»L«/mi»«mn»1«/mn»«/mrow»«mn»2«/mn»«/mfrac»«/mstyle»«mrow»«mo»#«/mo»«mi»L«/mi»«mn»2«/mn»«mo»)«/mo»«/mrow»«/mfrac»«/math»

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»§#945;«/mi»«mo»=«/mo»«mo»#«/mo»«mi»s«/mi»«mi»o«/mi»«mi»l«/mi»«/math»

Reporta y/o califica esta pregunta:

1. Copia este código: Tri. C3. S11.

2. Presiona este enlace, pega el código y completa el formulario

]]> *]]> Al parecer cometiste un error

]]> .- Santiago Sur 24/6

No corresponde a esta pregunta. Al parecer se copió y pegó una observación errónea.-En la pregunta y en la respretroalimentación dice Ht y en la respuesta dice H(t)

En la observación:

Solo el título con negrita Corregido
Quitar la observación de ingresar las cifras sin unidad de medida
Agregar en: "Expresa el resultado utilizando el sìmbolo de grado (º) e ingresa 3 cifras después del punto" sin aproximar. Corregido

En la retroalimentación:

Como sugerencia escribiría el mismo texto, pero en más líneas. Corregido
Falta escribir la respuesta final porque los alumnos cuando hagan el cuestionario no la verán (solo nosotros la vemos al programar) Corregido

Comentarios: Arnoldo 02/06/2016

Realizado-PENDIENTE: Según acuerdos tomados en la serena los decimales deben ser separados por punto no por coma, además debe indicar a cuantos decimales aproximar.

Realizado-Pendiente: Es conveniente especificar que el triángulo es rectángulo.

Realizado-PEndiente: revisar el símbolo utilizado para las tildes

Realizado-PENDIENTE: Reformular pregunta: Determine el ángulo «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»§#8736;«/mo»«mi»§#945;«/mi»«mo»=«/mo»«/math» que ..... o. Luego Agregar al cuadro de respuesta «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»§#8736;«/mo»«mi»§#945;«/mi»«mo»=«/mo»«/math»

#graf

OBSERVACIÓN:

- Ingresa el resultado sin unidad de medida, por ejemplo, si el resultado es «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mn»452«/mn»«mo»§#160;«/mo»«mi»c«/mi»«mi»m«/mi»«/math», ingresa sólo «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mn»452«/mn»«/math»

- Si el resultado tiene decimales, ingresa el valor con una cifra utilizando punto y no coma. Por ejemplo, «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mn»234«/mn»«mo».«/mo»«mn»4«/mn»«/math»

]]>

Aplicando la relación trigonométrica en triángulos rectángulos

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»cos«/mi»«mi»§#945;«/mi»«mo»=«/mo»«mfrac»«mrow»«mi»c«/mi»«mi»a«/mi»«mi»t«/mi»«mi»e«/mi»«mi»t«/mi»«mi»o«/mi»«mo»§#160;«/mo»«mi»a«/mi»«mi»d«/mi»«mi»y«/mi»«mi»a«/mi»«mi»c«/mi»«mi»e«/mi»«mi»n«/mi»«mi»t«/mi»«mi»e«/mi»«/mrow»«mrow»«mi»h«/mi»«mi»i«/mi»«mi»p«/mi»«mi»o«/mi»«mi»t«/mi»«mi»e«/mi»«mi»n«/mi»«mi»u«/mi»«mi»s«/mi»«mi»a«/mi»«/mrow»«/mfrac»«/math»

Se puede calcular el valor del cateto adyacente, despejando esta variable:

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»C«/mi»«mi»a«/mi»«mi»t«/mi»«mi»e«/mi»«mi»t«/mi»«mi»o«/mi»«mo»§#160;«/mo»«mi»a«/mi»«mi»d«/mi»«mi»y«/mi»«mi»a«/mi»«mi»c«/mi»«mi»e«/mi»«mi»n«/mi»«mi»t«/mi»«mi»e«/mi»«mo»=«/mo»«mi»h«/mi»«mi»i«/mi»«mi»p«/mi»«mi»o«/mi»«mi»t«/mi»«mi»e«/mi»«mi»n«/mi»«mi»u«/mi»«mi»s«/mi»«mi»a«/mi»«mo»§#183;«/mo»«mi»cos«/mi»«mi»§#945;«/mi»«/math»

Al reemplazar los valores, obtenemos:

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»C«/mi»«mi»a«/mi»«mi»t«/mi»«mi»e«/mi»«mi»t«/mi»«mi»o«/mi»«mo»§#160;«/mo»«mi»a«/mi»«mi»d«/mi»«mi»y«/mi»«mi»a«/mi»«mi»c«/mi»«mi»e«/mi»«mi»n«/mi»«mi»t«/mi»«mi»e«/mi»«mo»=«/mo»«mo»#«/mo»«mi»h«/mi»«mo»§#183;«/mo»«mi»cos«/mi»«mo»#«/mo»«mi»§#945;«/mi»«/math»

Dando como resultado: #sol

Reporta y/o califica esta pregunta:

1. Copia este código: Tri. C3. S12.

2. Presiona este enlace, pega el código y completa el formulario

]]> 1 .3333333 0 0 Cateto adyacente=#sol]]> Correcto!

]]> + Respuesta incorrecta, revisa tu ejercicio. Si continúas con la duda consulta con tu profesor.

]]> * Santiago Sur 24/6

En el enunciado:

En la figura no se indica cuál es el ángulo alfa, pero se puede sacar por descarte, asumiendo que el ángulo BCA es recto.

En la retroalimentación:

Dice cual es el ángulo alfa, pero debería indicarlo en el enunciado además.

Observación : Si el resultado es un número decimal ingresa con punto y sin unidad de medida

( ejemplo d = 1869.5)

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KKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAP/Z Para resolver este problema debemos utilizar el coseno del ángulo

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»cos«/mi»«mi»§#946;«/mi»«mo»§#160;«/mo»«mo»=«/mo»«mo»§#160;«/mo»«mfrac»«mi»P«/mi»«mi»d«/mi»«/mfrac»«/math»

Despejando «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»P«/mi»«mo»=«/mo»«mi»d«/mi»«mo»§#183;«/mo»«mi»cos«/mi»«mi»§#946;«/mi»«/math»

reemplazando los valores en la fórmula

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»p«/mi»«mo»=«/mo»«mo»#«/mo»«mi»d«/mi»«mo»§#183;«/mo»«mi»cos«/mi»«mo»#«/mo»«mi»x«/mi»«mo»§#176;«/mo»«/math»

con la ayuda de una calculadora cientifica encontramos que

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»cos«/mi»«mo»#«/mo»«mi»x«/mi»«mo»§#176;«/mo»«mo»§#160;«/mo»«mo»§#8776;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»#«/mo»«mi»e«/mi»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mi»d«/mi»«mi»o«/mi»«mi»n«/mi»«mi»d«/mi»«mi»e«/mi»«mo»§#160;«/mo»«mo»§#160;«/mo»«/math»

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»P«/mi»«mo»=«/mo»«mo»#«/mo»«mi»d«/mi»«mo»§#183;«/mo»«mo»#«/mo»«mi»e«/mi»«/math»

Finalmente podemos decir que la distancia P entre la torre de control y el punto de aterrizaje es aproximadamente.

P = #sol

Reporta y/o califica esta pregunta:

1. Copia este código: Tri. C3. S13.

2. Presiona este enlace, pega el código y completa el formulario

]]> 1 .3333333 0 0 p=#sol]]> Muy bien

]]> -. Revisemos el procedimiento para mejores resultados , si aún tienes dudas consuta a tu profesor.

En observaciones, el ejemplo entre paréntesis no tiene decimales, además no se indica la cantidad de decimales, pero la respuesta la aproxima al entero Corregido

En la Retroalimentación

Existe una confusión entre la distancia pedida d en la pregunta que debe decir p y la retroalimentación donde despeja p, pero también escribe d. corregido.

Comentarios: Arnoldo 02/06/2016

Pendiente: Si el ejercicio es de razón trigonométrica hay que especificar que el triángulo es rectángulo.

PENDIENTE: En la observación se puede especificar cuantos decimales debe aproximar y que no incluya la unidad de medida, idealmente con un ejemplo: si son 1500 metros debe ingresar sólo «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»d«/mi»«mo»=«/mo»«/math» 1500 Corregido

PENDIENTE: Es bueno incluir en el dibujo y en el esquema que se trata de un ángulo de depresión.

PENDIENTE: reformular la pregunta de esta forma: Calcula la distancia «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»d«/mi»«/math» entre la torre de control y el punto de aterrizaje .corregido

Luego Agregar al cuadro de respuesta «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»d«/mi»«mo»=«/mo»«/math» #sol Corregido

#graf

Observación:

Si el resultado es un número decimal escríbelo con punto y con dos decimales.

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mfrac»«mrow»«mi»c«/mi»«mi»a«/mi»«mi»t«/mi»«mi»e«/mi»«mi»t«/mi»«mi»o«/mi»«mo»§#32;«/mo»«mo»§#32;«/mo»«mi»o«/mi»«mi»p«/mi»«mi»u«/mi»«mi»e«/mi»«mi»s«/mi»«mi»t«/mi»«mi»o«/mi»«mo»§#32;«/mo»«mi»d«/mi»«mi»e«/mi»«mi»l«/mi»«mo»§#32;«/mo»«mi»§#225;«/mi»«mi»n«/mi»«mi»g«/mi»«mi»u«/mi»«mi»l«/mi»«mi»o«/mi»«/mrow»«mrow»«mi»c«/mi»«mi»a«/mi»«mi»t«/mi»«mi»e«/mi»«mi»t«/mi»«mi»o«/mi»«mo»§#32;«/mo»«mi»a«/mi»«mi»d«/mi»«mi»y«/mi»«mi»a«/mi»«mi»c«/mi»«mi»e«/mi»«mi»n«/mi»«mi»t«/mi»«mi»e«/mi»«mo»§#32;«/mo»«mi»d«/mi»«mi»e«/mi»«mi»l«/mi»«mo»§#32;«/mo»«mi»§#225;«/mi»«mi»n«/mi»«mi»g«/mi»«mi»u«/mi»«mi»l«/mi»«mi»o«/mi»«/mrow»«/mfrac»«mo»=«/mo»«mo»§#32;«/mo»«mi»tan«/mi»«mo»§#32;«/mo»«mi»d«/mi»«mi»e«/mi»«mi»l«/mi»«mo»§#32;«/mo»«mi»§#225;«/mi»«mi»n«/mi»«mi»g«/mi»«mi»u«/mi»«mi»l«/mi»«mi»o«/mi»«/math»

Si «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»h«/mi»«/math» es altura del asta y la longitud de la sombra que proyecta es «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»y«/mi»«/math», entonces

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mfrac»«mi»h«/mi»«mrow»«mo»#«/mo»«mi»y«/mi»«/mrow»«/mfrac»«mo»=«/mo»«mi»tan«/mi»«mo»#«/mo»«mi»x«/mi»«/math»

despejando la altura h

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»h«/mi»«mo»=«/mo»«mo» «/mo»«mo»#«/mo»«mi»y«/mi»«mo»§#183;«/mo»«mi»tan«/mi»«mo»#«/mo»«mi»x«/mi»«mspace linebreak=¨newline¨/»«/math»

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»tan«/mi»«mo»#«/mo»«mi»x«/mi»«mo»§#8776;«/mo»«mo»#«/mo»«mi»d«/mi»«/math»

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»h«/mi»«mo»=«/mo»«mo»#«/mo»«mi»y«/mi»«mo»§#183;«/mo»«mo»#«/mo»«mi»d«/mi»«/math»

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»h«/mi»«mo»=«/mo»«mo»#«/mo»«mi»s«/mi»«mi»o«/mi»«mi»l«/mi»«/math»

Reporta y/o califica esta pregunta:

1. Copia este código: Tri. C3. S14.

2. Presiona este enlace, pega el código y completa el formulario

]]> 1 .3333333 0 0 h=#sol]]> Muy bien

]]> ---- Revisemos el procedimiento para mejores resultados, si aún tienes dudas consulta a tu profesor.

]]> - Santiago Sur 24/6

Modificado: La observación El tamaño y tipo de letra no es el establecido.

En la Retroalimentación: Centrar las fórmulas. Corregido

Comentarios: Arnoldo 02/06/2016

Pendiente: Se sugiere hacer más aleatorio el ejercicio, es decir variar los datos, incluir conceptos cómo ángulo de elevación, determinar la sombra ... etc.

PENDIENTE: Incluir en la observación a cuantos decimales redondear modificado

Pendiente: Incluir en el espacio de respuesta: «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»h«/mi»«mo»=«/mo»«/math»..... modificado

#tablero1

¿Cuál es la altura del árbol?

Observación: Ingresa la respuesta sin unidad de medida.

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aJ45FZWlTyBcLuH7oRrMBujQ0AZn/BKb4t3n/BYz9s3xB+09rGg6ppPw7+HOjW3hT4c6fdQCMw6hewxS+ILhT5si7vMKW/mjAMDqiqkkbNX6safHtiblW+Yg4XqwOCc988fl6cD8VfiT/wAG7Xxo/YP1VviJ+wh8br7wf4ij0iyTWPA+p3Rax8TT2+nzxvcbp/MtppZpX3RW17D5MUtzLKtxAojjT3T9mj/g5G0Lwh8VrX4R/tifD3xB+zD8XRst/teqwSSeFtbImjtPtNvdYJgt5boXZSVvNtEhtixvpDQB+nwGBRWf4T8WaX498Labrmh6lp+taJrVpFf6fqFhcJcWt/byoHimilQlZI3RlZXUkMCCCQa0KACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACgHFIz7exNRSXWx1X5dzNjlgMDueeuB6UAOlyOmeeteUftl/s4t+1h+zP4y+GY8Qar4Vg+IGmy6JeanYQJcTwW0oxcKEf5f3kPmxbj083oc4r1WGdpQv3fmUMOMHn2/T6g1FrFwLaxkZ8Rx7SWZl3cf7o5PtjvgdTigDzD9mT4CeH/ANkb4B+Dfhv4VtltfDnhHTItMs4kPzyoikmZlGCzSsWeTaoLTOcZDfL+OP8AwXQ/4KVN+0/+2IP2b/BvjJrP4d+HLR28ZRaTcy3EXii6+SWTTbiSIAQw2wiAkxL8zzPHnPC/e3xv+L/xA/b7+I3irwD8JfFd58NfhP4LuJ9L8a/Eazihlv8AUruFgtxomks5xG0MPnNNegnypCyR4Klj+Hvwd8S/Drxd8TfiZ8Svh/pej+C/Beoaoum6LpqL5jaTo9ikKQPM0zeY1zNHGLuVRJmWU5ZgAcgHonwu+J3w5/Zg/bT+G/xA+I3hXQ/E/hnSbHVbbWdLvtLF8kFjFaSSxXkSy5iM8DeVDhQxb7SP4mG79FPC3xN8Cf8ABe3/AIJVfErwPa/DPS/hz428J20lnp/g3UJLaSXwvfxWAl0+5iVoozDDKJzH5hhHlh7gfdLtX4/fsY/s3+P/APgrH+3HGPAOnxrZeH9jWV/dO66f4Ps45AYb+7YAedJvGY7ZsyTSuc4hjJb9hf2a/wDggR4j/Z3+LFx8QX/au+Jml6heaINLml8LaPpugZt/MMwL7jdQ+UpWaQq0WdxI81doYAHRf8Exf23fhv8AE3/gjx8MfiL8bNW8H6dqHwmL+HdXl1a0iaXRdSsJWtbcKDG8kV5NaG3JEC+aRcDZ0G7wL9p3/gsj+1X8Zfix4q8L/APwJp2l68szQaL4c1Dw0+qa1DpZjuQuv6ldPKkekTbYohHY3UJlAm3S5Xaz/Ef7Mfwv+G/xr/4LAeFfhb8I/if8SPDPw11h9TGmeO7u9e/1zxVqRjuWvb602/urO4lCTW0N0IN4SIOD52DX01/wUC+OWg+AbrWP2Wv2ZbifwJ8O/C13cy/FPX9Puftl5451SaONbjSZ73LTTXHlnbdSGUtvJhOBD8wB9lf8E1f+C2Wk/tG/Huy+C/iG6tdR1630mG30rx413HbWPxI1S1t4V1E2lqsQMf70TPEC58yFEdVBbafvfxx8UND+HPgfVPE3ia/g0nQtDtJdRv764+WCytYojJJPIASdqbTnpgnHONx/mp8WfCjSdU8Cw6HBKdD0/S0SXTbvS5Pscujy2+J0uLeZeUli2HJ6sSP7tfqJ8MLTxf8A8F5v+COlxB44i1jwR4s1S5vrbSdZ02+uNN0vxdLbw+TBqk9vGGWTTJpXKS28obAikZM5RaAPz+/aT/ae1b/gpF+0fqHxQ8SHzvCWj3N/pHw4sZEVba10OdQftkkYkMguLqHKSbwqgINo5OPgn9oXx98UvAl94O0Lxtda1qXwz8K6xcXfhbwnda6Ws7BISjBoQT8ilZUBY7iEDk5A4+v/AANqOqaY174d8SaTJ4f8aeFXl0fXtFlga3/s67iQlwIsE7JSu+JFxmEjBBOa+cv2qfEDfG/9ojwj8OtGuLOzbQ7uS5udRubUzJFIqeeUTO0ylY0MYh6yNxxxgA93+D3jHwN/wTy/bM1HxF4k0a8+NHxW+E9jpl3pfh2KPdbah4guVS41W/kumSaLy9Oz5Vq8TkyyLEy8bhX9G/7Hv7Tnhj9rj9nzwn8QvCt9DcaP4u06K4QeeJmtH+dZbWTkkzRTCSJyTyY85JJr+Zr4O+N5vDHxl+L1h4u1zVvEt95mmX03iHUr2XUNTkj+z+VFC4BCzpk7vLIUfJDswdqn9eP+CPngXT/+CcfwV8Ra98X/AIj+HPhdL8YNTbWtO8B+JvEVlYrAIYooZrmVZlikhvpVEbTRBsW4WJZB5qzYAPUv+C+V9rHw5/Y/8OfFjRr6+sdS+BvjfQvGhSK58lfIiuvs1z5sIObiARXJ/dAgnd17H7Q8HeJbHxr4dsdR02436ZfW0FzbOrfMyTRLLFIMDknf1PB56mvgX9rXw/8AB7/g4g/Z71D4a/C/46QLa+CvEFlrmry6PafbI9QxHcrDbSQzTR+ZEc+Zkh1WSHoSCtdH/wAEPvj6+mf8E8JfC3jDWIbLVv2bNX1j4d67fTytFY2S6MS26WQ7YxHHamIFuMBMhscgA9P/AOCwGo/DnUv+CfnxI8P/ABG86TTfFFjLommadaQGbUdU1eUD7ElnAhDyXX2gRmNFbJKcgrkH5h/4J3f8Fh/hP8cv2Ofh/wDC/wCPHjzQvDvxm16V/hnrnhbU7V5NQn1GOUWB+0WwixAZFljQtNtjMhlxxE+Z7f42eHvjsbj9uD40Xd1of7PPwxsmn+Fvhu+s3M6z+Z5P/CRS25K7rq6d/LsUlDlY5lnzEHNfkn/wUC/ZR8WeO/2rfFWrfGLwq3ww+Knxu/4rXwzFYysbG3gnjwbCaYgbrqPyQJYwxBM24FW3UAfVv/Bp5+0n4X+DP7QPxg+A+oNoUep65qI1LRNQlYw6hq/2BpopbUjbsdoY8XKBT94XDZcvlP32imRbdgzTeYWZFJdlLkE/KOcno2OT0OMDFfxq/so6f40+CX7Xc2peG9Nj8P8AxE+H5/t/RAryiJZbSVF8sANia3uI/MhI4OZ25Azn+jb4W/8ABxB+z38Q/gFb+PtQ1TxB4ZtEsZL2+0640me6nsli/wBZCDEAgIbEQbAOSvXdkAHwb/wcu/CD4W+OP+Cl/wAAdP8ACt6ujfHjx3qVjpmq6hYu0f2WGaWO00u8mXossdwjADhjHEpJ27QP1C/4Jd/ti6j+1v8AsuR3HjG2js/if4N1G78LeO9NjGz7HrljN5UuYgd0fnDypY2XJ/fqBkJgfgX8WPB3jb4y/wDBTv8AZ6/aU8WeI/CutL8bPiPoc39lWt+Z7nwkF1O3Frpc6qcgJYG2IkO35vOj5kjLN+r3/BWHSdU/4Jm/tCab+2B8PborYXF1aaF8S/AQuUSHxuj3EMFrd2sR2ia+hMh/ekO33OmyQMAeif8ABw38MPhV4+/4Jk/FHUfigul2b+G9Hu7zwlqVxP8AZry21s2kjWVvbHG+QTOEhkiPVGZioC7l/BP9nfU10L/gmlNeQxx3ky6LqsTxKS0jK91OpQNsIVkPlSbBjcrHLgMVr6U+Mf8AwUR1r44aT8bvFX7UHhTWtRuPE3w/1+w+FNnpsyXuhfDi9vNOuofLmsMI6zuGijGo4YLkEYD5HxD+zZ8Efi14w/YB+J/iTw/qnht/h94RhstT1zTtR1a3huhBd3NzbpJbJIwxmeyMckZO5zNb7Y2yWoA/Yj/gn38M/h/4e/4KC/CH4ITfY9K8P/stfDS38Yvpmosbdn8Ya0LVrqS9EgYy3SC8TylAIiB2DlAK7r/gpt8a9Q/4IY+MNI8bfCHWrPVPD/xW1eW0PwXvI90UmpTwSeZrOk5zLDGs4tA9vHCYpHlcAwhxn8ZfhZ8R4f2fP+CtK+L/ANpy11DxJDoPiO48R+MrMQu82rarFbS3VvayRSAbc3gtozDPiNfmBAiLLX6Bf8EkfCPxa/4Kf/8ABcSb47fFzTfO0PwFpQ8RWOnzlZ7fw7FewLJothEI2ASQQ3H2oFkPmCNpH3O+VAP06/4JBfsA6r+x/wDCu68V/Eq6ufEX7QHxQkTXfHviGdxNO1zIBtslkA2BLdS0eIzt5JwBsC/n/wDs+/DLw54m+B83jK+0XT7jxV4V/bois9I1PZtubCG48RaSLiNGX5j5pAyAG5JwAowP2+so49OnmeNY3eZjI8hGdq8OSzdWwW3beABJhcYNfzL/ABj/AGh/in4m/Zb/AGkfhn8K/BesXXh7wT8cPEPxG8Z+NrVSp8MRpfwGyNjdRSjM6i3ndyozsdduM5oA9Y/4Lh/tlaD+0p/wVX8D+H9FsdLm0H4bWF/4OvvElvI11Dq+p3EG+eylKg+YLWRhEEXzB5sztkcKL3/BOP8A4KAal/wSW+IUmg3HhvTrj4G+NNbtNT8S6zcmSPUfBg2rbSyEgvLcwxKIjFD5WUjjOwbt7jpf+Cfn/BEW3/bg/ZIuviJrV1q3wrtY44ZPg1awrKY9IgiYzHUryCQbJWuj5Z3tj90nmkjzBXzf4l8K6peL42+G/jTR18M/EDQzdaFrGmAyQ/ZJ5ot0VxEpAk+zymWOWF85MRDkAYAAP3Q/b6/bu1H9mGT4D2PhXQ9H8U618YviHpfhRtNu5H86PTZY5Zbm/ihQeZL9lIiJwrAb2LYOCG/Gr/gmB4S+NX7ZPgz49aDr/ibwH8UvCIW2uNU0OTbaeINPGMWl7A+cgrhdo2sPLAPyqgX84v8Agnp+3r4N/bc/4KFfse2PibxXpX9sfDH4N3TPbXl69y2s+K5G/s8WMnmnab02sP2sS58xzKq5Jxj9xIJY/sULKY5PLRAsjN5y84xtJ6k5wDwSSuRgigDzD9rn9o/w/wDsg/ADxh8RfEmoW1jpPhHT5NRuXuXKmSTb+5jAxh5pJxFGiDA+c1+WH/Btd8C9T/au+KfxW/bQ+I0l3N8RvFXiC70XS0mhKWtlCyWjXU0LSKf9Wx+zRkEqixyo3m7/AJeY/wCDnb9rPWPit8afBn7O/g9LzUxo9va+KL6zsnZn1nXb6f7JounhRlWIeRLoxuCGXZwK/Vv9hH9m/S/2Of2UfAXwt0yZrpfBGkJaXszSFme7/wBZcSMmCV86aWaYJgcHIHTAB84+Hf8Agp94k+Fv/Babxd+zv8SP+Ec0/wAG6ppWlS/Dy9t7ef7beX1xErfZLp8tEJJvLugm4xgC2UDcWNfUn7XH7CnwZ/4KE/DyHw98Xfh/4e8eadZhmsbi5Robyw3SQyObS8hZLi38xreISeTKm9U2PuXIPw7/AMFW/wBkPwz42/bb8E+KvG0mm6D8N/ir4Rl+Gd74nt7aKO98KeIPtJv9CvxcNIZI5POjnjili5WYRRyjZKCPc/2Af23tY1HxvqXwF+MN5Z6Z8fPBAa38u5cq/wAQdKhhVLfxHYoPlm+1LHmWKOT9w8UwIXa4AB8UePP+Cc/7bn/BDm/uNa/Y48bah8cPgTp9mLiT4Y+M511PUNOZYL2W4aC3QW4ePz5GnC6bJBcTzTxRvb3AiMj/AF9+wB/wcK/Aj9tzxXH4D1y71D4LfGa1uxpOoeBfHC/2fdDUleCCW0tZ32xXEn2uZoEgbyrtzDIxtkAr6o+Bf7SHg79pDw/dat4N8SaX4j0+y1S50aS4sw8ardWz7JoCH+behwCSADuGMjk+J/8ABSb/AIIv/Af/AIKuabZTfE7w/qNr4q0m0FjpfirQrv7DrenW/nrM0BZleGaPKuAtxFKsYuJ2iEbyM5APrMjAFJX4i6j4/wD28f8Ag3Q0a10W60X/AIa//ZX8I6VDHZarFZmw1fwxaxWt5LJC7Qm4ubO3gZAWluUu7VLaC2jjltmcxx/pZ/wT/wD+CsnwH/4KZeFkvPhT460/UtbitBd6h4Yv/wDQtf0kBIDL5to53NHG9zFE1xD5luZCVSVyKAPo6iiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKAMmpBBxzQBHRTpF2NRQA2gnAooYbh+NAFXU9QFpaSNuC4Vjk8AYBPX/ADwCe1fi/wD8Fg/+C2HxU+CX7fui+Dvg/qm3wL8IdX0kfEhYDbN/bdxcXlu7WHnyxv5KxReXG5TBBu5gxPlDH3P/AMFiP+ChU3/BPf8AZgXUdEihuPiV44vx4c8G2r4lAvZVJF08WRvhhADP7FR0Yg/gtqHwjl1nwlonwh0yG48VePPjBqUui20txL+81HVrorLNqM8mCxjhnYSHhi2HAGMkAH9TWm3O8XA3GTY3yOoyDnBGD0JOd2AP4sfw5Pyv/wAFZf21Jv2U/wBme8s9Bvo5fil8QLhPCfw/0xDMZNQ1q6ZYIvLdEx+684SnJAQxj5i7Jj2668W6b+zR8Cf7Q8Ya1b2fh/wbokba1q18WgRIoIMSzt8uAe5Ib+EHP3iPwm8RfthftF/8FfP+Ck/iy+/Z/wDD8Wj6DY6VH4T0PxN4msrg3nw006Q7LvV4T5rRWN1dBG3SeWbgRoIk5SWRwD7H8Q/DLXfiR4K0P9h79nm/trf4d+C9EXw58a/HqsJpdPeZh9r021bdsk1O7aW5llO3900nJXHlD8mf+Cyn7Jum/s1/8FTfEXwe0/SdB+Fvwp8ZaloetaDeXEks9no9pLaxWt3fKfMO2IyC7aRJU5ERAVRtJ/pJ/YW/Yv8ADv7EX7L3hn4Y+G7u61CDw3G/2m+unWWfV7meb7TdXchyc+dKTxxgLgYwMeffFX/gij+zD8W/jR4s+IXi34W6P4o8TeNriK61e91i9urolo4vK3RxtJtQY2ZCgD5RxQB8ffBf/gqP+wn/AMEef2d4vhn8LvF0njq4s5RcXp8O6edVutavpYwzXtxeFooJjKEjTCSkR7oY/LPCn5q+JH/BQD9qr/gvV47/AOFF/Dn4d3vwd8JvcQXPjTULHXp5NTsLKYPFLHeXKmJFileR5DZ+SHlEEe4iKMivzR/a6/4JyfEL9lrxN8VLpY7rUNA+GPjN/CesXtuPNn0x2Cy6bJdYw0cN3HtMUuPL8yPYcMIxX9I3/BBbxr8HPiD/AME+fD918I7OLTLXzJJPGMNxepe6udczm5nvpgN00kzbXjlIOYmhKDtEAfLP/BY3/gmJ4a/Yc/4Jo/D3xl8G9B1ZPE/7Nviey8STaosv/EyvzK0C3l5fPENz48qzY+WoEMcCiIRwxqtfKH/BRm88H/Av4+eH/jZ4TlWH4F/tSaI3jaHUcfutP8QHAvQgTBTrG5gJefzPPXZwSv8AQf8AG74NeH/jX8MfEHg3xBazXGh+KNOudG1KCNVLS21zG0bxkjrzJnBJzuyc5xX4efsL/sO/EDXP+CenxO1v4wXGneOvhR+zfb+Kp/g/pE6y3um+JtSs455BqDtHJH9psYZbWT7MkuYpBdzk4IBoA+efgJo6/wDBQP4qfCf4Y+Gv7SWx+MeqSQ6pMIGS607QLaY/b5iceVH+7huIupYmUDILgD+lr4UfC7R/hN8NtB8LeH9Mh0XRfC9hDp+nWkeP9BhiiEaJgZXcASdw5O7nvn81P+DY/wD4JjW/7M/7Klr8W9a1G11fxb8WNGsrmwa2cSw6ToUo+2W1rygAmMspklXLYaOMZK8H9VrezW1TYPlXA+Ufd/Lt+FAH5Mf8F/f+Ce/irUrnS/jr8EfAuoeJviEJ49D8W6DpFkJJ/Fdo8Ui219NFH81xPazJCoKxO4gY8pHDg8l+0h/wQx/4Q3/gjLouheGdIvte/aE+H8g+I9rfWEqJe6prdxNFLfxpCm9WUW8ZhhSLAZrSLozEn9kr6yjvIdkmWDfmT0Hbpzj6HByDXxH/AMFov22bj9jX9ly48O+DtQkj+MHxclXwp8P4A215b2Yw2zzAA5jMUb71k2lfNWHOBwQD80f+CP8A/wAEpPAf/BVrU/HHxe+JFn4y0fTdD1Cx0DwydF1L+xvtr2qCWaZ+PO8yOVolBH+raMrktHuH6reB/wDgjh+zL8L9TW6074G+B7vWLe9N9HqWtwDX9SNzISyyvc30sk0rCTDZlJOc4zk4+a/DH/BYn9j/AP4JF/sx+D/hV4d8cv8AEK88H6THbCx8GoNYbULhxE8k0k8LfYjJNNO0pIkY5fBAbivB/jz/AMHB/wC0R8WZbiT4Z/C/wX8LtItT5n27xndyatqki7zEFitYtkcL7/3ikjnyxyRmgD6u/wCCPeg2vxE/av8A2wvijptva22j6l46tfA2iS2UQsrMWehW/kJDHbjb5flyS46c5r5U/wCCh37J3i74Zf8ABXnwX4f1a8t7P9m39qb4kaXda7oUWrNC3iLUrWyiLW95ERt+zSSiLch3NIc/eOK+iP8Ag3E+OGk6/wDAHxx8M5rK6j+JPgHxLdap4x1WeQyp4outSkN1/au9o9sbzKFj8pSdogOQMg19e/t3fsD+B/2+fg3H4P8AGD6pps1peWt7aa3o0sVtrOjSx3EMnmW11LHIYGzFEcpgt5Y9KAPj/wCDPxP8N/8ABVP/AIKheNNL/tG11D4Xfsd39m2i6PaxLJpfiTX7qKeKW/uYnPKadNA8dvDFFzKom80l9o8p/wCCvH7LLf8ABWX/AIKyfCP4NaXeeJLzwr8MdCv9Q+IeqaK6tb+Fb66gMlkGcfu4b6QWkQ2yMf3TQk5zg5P7MnxLk/ZH1v8AaJ+Gv7Pfgvw7p/xd8bfEr/hB/hxpcFuiWaWug6dbWVxrGoSoDiCBGluX8wL51xK4w/nyiv0w/YW/Y50P9iz9n3TPAui6lfauy3k+oa1q2ozvJqHiDULkia7vbl+00srdi2UwNxzgAH8q/wDwUD8P/ED9nz9piHw/rH9saX8V/B63fhzWWtrOaBNRt4Wc22oxMeXhuYnDfcXmIkAYJPY+Hf2ZNYtNWsdF0jV21X4P+JLy21i7a4uT9uvEiiMhj4b5YpP3LSYAxwOsRJ+q/wBtv48av+1n/wAE4tC/ai1iMeIfjR+zn8a5PDc+pjSbe0s49J88TW8FzHbpELiIEWSYJz+9lAI8wmsH9oP4Sab+xT+0tZ+EdKinPw1+L1ifG/wwvCghWHTr7fcLpUm4F/Nh8xTxuBEwDADqAV9f0yLxdp01vemeNboG43Wn7mUzthkaF+kUiuDMZPuwuu7BODXUeOvB3xY/4KEfCL4c/tH2/wDanxivPhXc6p8PvExt9QFzqNpbWt7ttvEFvYxHO+S1u41uAmziz875TMXTw39s34y2/wAH/hBNGtxNDc+Irj+zoZIFJeO3x+9mjXOCsUQAbJGZZIycjcrfcH7QXwa8Qf8ABC34oeG/2lfgHHqU37Mfiyy0STx/4QUQysoCkW10Y/LCxSyRSLKsxk+S6Zh8ySRQAA/Ov9sT4n/8Jl8LJPD/AIN1a0uoNZ0a81fVL6y/ebbC0hA2tyCPOkSNCBwAw4IQs9H/AIJlfsPeIPDPwTb9rLxlYaSvwR+Gt1c3N1aahcvG3inULZfM06x+y4K3lrNqq2ELglc7ZRuHlZHqH7Yn7MGr/tM6P43+IHw9vNLh8VfE/wAKa/8AHTxto2nXsH9leGvCUUqvZWrSoGY6i8wumlRZSJCw+RBuz518LPj98RP2o/2Hv2dfgLodk8PhPSdV1HwjpdhJdGP/AISPxPqOqXMyX+Ii0rQ2FtqsBwY8JK4b955n7oA1/wDghr8DdF/4KRf8FgtNf4zRjxst/DqninVYdRPnRaxdxgyqs6ckwl5M7MjmPaTsyp/pU/Yq/YE+Hn7AvhXxBovw703UtH0fxRrba7cQ3d+148Uxhgto4klf94LaGKJBHFvIQK2Dya/Df/gjr8H/AA7+xJ/wcn614G0try10DS7zxB4I0J5QJZJbiG2jkzL/AB/vI45ZMEAKWwCcMB/Qn8U/izonwa+FuueKPEV3Y6J4f8N6bc61qd1cOfLtbWCHzZZTgElcEAgZPOACTQB4R/wVH/a61z9lT9nWVfh/b2/iL4yeNZRonw98NtJuvNW1CSRYxJGgO947WKSWeUviMLH88kQIJ/Ff9vxz8BLjRv2GfgjqwsvBfh7The/GHxDaWSzz+ItbmXzTFeny9hMQhgwkc43ifyy25Gx7N8Ov2t/2mP8AgoN+2j8bPj18E/hn4X8YW/wt0aTw74Ct/E9wVvNJhvYy5ksYhuhbU5IgrXMRmTbE/k4DHc3TfCb/AIIt/Dn9or9nuy8bfs5fFPUD8UdJjmt/GcXiu3u3XxRrsKlbpdUtLgfa9KmN15obpt84PmbaDQB7F/wTJ/4LxWGqXn/Cr/2kpPDHw18XWbR2+geIo42tfD/iuIkYRFCmK1kiTyE2GVldigGwbY295/4K7f8ABL7TP27PhdqHijwjpUWn/Hbwpp06+CvECSCCeSaORpDpkzqwiaKZjPHmU/uvtDuGLGQD8dPF3hK6sNe1X4e/Ebwbf+F/Fmj2cc+reF9UiSW4t4JV8o3EMw/cXMUxdm82I8FyNm1Aa/Qj/glZ+03r37PH/BubrnxS1zXBdab4d0/xLe+FXkvgL3TrKKae2tLN5psgym6BaL5pRtmiioA/FP8AY78Pab8RP2kviBrcUE1pZeSJfKaVRLBdSXcEi+TPGQIpI5YnMM0TbjmJcjcd37nfsG/8FsvDvhf4WeIfDvx+8WHRfFngu2uLzTvEF1D9lPjbS4LfzPM80kWv9qKYpIJIyYTLiOSMAEKv5gRfsK61+wv8NfhF8TNXtbdPC/x48Jad9uu4JBPb6RqhIujFdSlQkLXSTRvECPll8xAR5QrI/a60W11v9m/xhFqFtC5sNOkkjhkXb5MkWPJmyRjcQoBB64UncMBQD2r/AIIe/D/xB/wUl/4K22fxe8baTd6x5Nze/FfWmu0xa2F7JNJbaJbRscM6weU8sTAIuUAAKpz90/8ABTT/AIJYeD/G37Sh8YfC3446x8CP2jviFHPqGg6XY+J3s4/H95bQjB2SS745TEWhM0IKxhwTGxwr9D/wbPfsnD4M/sGyfELVLGxtfEvxquYvEE5tjK01vpUURtdMti8nJ8pEmk5B5nJyRgD0D/guF/wTFT9vj9nNNS8Lr9j+L3w7car4J1OOV4ZlkjHmNp8cqEGETiPhycLIkZPHFAH5F/EX/gqz+1v8G/DniP4EftI6H4T+INjqFjc6dr3hbxlEuiazqNowJBt9QtvKiusRxLJHcRmVmknBy23C637J3/BQzT/iR8W/2a/j34y8XWlr8WPhd4og+EnjXTNWnC32o+F7wTRweIbiZ+Y2tWuZYZmhgImdiZJYxKQ3qH7G3/BWLS/iX8LfDfgf9rDwrpnxt+D+pQMtr4t1/Shda34Xbi3ii1SMg+YIiWje/h/fEyBnBLMx+NPGn/BKeOT4aa3p0PjXw/qXj7wf5txd2VtqKXFtaWJufNsNVg/juNJktrqE/a7UeTGzgSxl9oIB+nEfxU/4dM/8HBGseGb3UYdJ+C/7W9q+uXAv7uT7JY67+/VJIpSmI/NuysRVQdpu0JIjjTP7E2Nz9qkk8tlbJBychhwByD04AI5J57V/MpougftRf8FR/C2ufBT4iaVp3xS8YfB+1/4S/wAN63f3H2DXtOaSEFIpXJil1CC68pbf+CSO4ubOQymKJ4V/X3/ggT/wUtu/2/P2GtMk8T3aN8S/ApOg+J45spdXskWPLuxGBj97EyZK5PmK42kFTQB98AZHUcda/OP/AIKK/wDBtJ8G/wBtD4p3HxU8A654g+Avxsm1Vde/4SrwyzSW1zqAmt5Ptk1n5ke24XyZHWW0ltnM87zSmZ+vpf7f/wDwV78M/wDBNr4xfDPQfiD4a1tfB3xB+3x3PimBm+z+HXhMAUTx+WWmDCTzCIsypGCfJfBr6x8E+O7Pxrpcd/p91aX2myRI9td28olhvomyUlidSVZCOM5zuDDAwMgH5Cah/wAFsv2qv+CM/jq18G/txfDH/hZ3gmfyVsPiz8PrMRQ3ss0d5OLdleO3s57gNGsIgIsZY4rWSYpch0kf9XP2af2qfhz+2N8LLTxr8LvGnh/xx4Zu9i/bNKulm+zStDHN9nuI/wDWW9wsc0TPBMqSx7wHRTxXX+LPCWl+PPCmpaHr2mafrOi61aS2Ooadf26XNrfW0qFJIZYnBSSN0ZlZGBVgSCCDX5R/tV/8Gz2qfDX4+ah8bP2JPi1qH7PfxIvLv7VP4deR4vC92GuLSVraPyEZrez3wyzPaSw3dvK/lRLHBCgAAP1sor8k/hL/AMHMOqfsrfGRfhD+3j8JdQ+A/wAQY7SO/XxBoMb6v4dvbeUXMiTCKF7iZI8Rw24e2kvQ9x54c2/lOq/q54T8WaX498Labrmh6lp+taJrVpFf6fqFhcJcWt/byoHimilQlZI3RlZXUkMCCCQaANCiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKAMmipo49v1oAI49g96dRUcsmeBQA2VtzUU2igAoI3ArydwxRS5+XHPzEDjrQB+Rn/B09oFpp0H7MPiaOOOHXLD4gSaRDeksVt7a6tCZ0I6fvPIjyeoCHGOteD/APBt14E0P9qb9uv4rfFy+0qPXNN+F2l2Ph7wfczRRTW1pcSyyyS3EW9C6XXlxMVdOPKmkDAkqR9Af8Hd3wv8ReLv2BvC/irQLuxtLP4c+K49U1OV73ybmNZo2sovKT/lo5kuR05AB4YnFes/8G2H7Gzfsjf8EwvB41G1ig8TfEQt4yv2HzsIblIzZIT1AFosIKEkgs/JBWgDwb/g4o+KvxI/aC+KPw5/Y5+Cum2PiLxJ8QB/bvi/TYQUittNhljFr58m0C1tTMjzSASZHkp03kP+hn/BP79h/wAL/sLfs5aL4D0GW+1ie0Bu9V1i8RY7rWryT7104A+VQoEUSA5hhjSMH5ST2HhX9mHwL8P/AIk+IvGWj+FdA0fxV41hjTX9VtbFYrjVBDgxCR84KjBynCtnk9m4v9qj/goB8P8A9ixvDNl4w1K7uPEfjW/j0/w94e0m0l1DWteundF8q3to1A+YuT5jmNcnpjmgD3yGBVTAZs53H69z6c9TgAZye9FxZxzBt8e5dpBGPp/PFN0u/bUbOORlkjZhu8uQBWUHOMj8O/5DpU0km35fm5UnA7+31yRQB8H/APBWH9ivVNc1e0+NXw78IWfizxZ4fsZtN8X+EGgUW3xQ8Myqxu9LueMPMg3SW7MDiRiDkbQv5V6t4S8af8ET/Gmk/tNfsj6hefE79mX4jW5TW7G4tpXbQY4p5Hl0+7CHzbR4leRIrmQB4JGnSXkh5v3i/bJ/a/8AA/7EfwR1r4hfEPWF0vw/osWGYPsnvpv+Wdpaqf8AXXEhDYjBywVuihyPgH4ZeI/ih4l8H2f7Wnwm+Dsln4R+NGmvN48+Dc97FM/iK1M5kj8S2H7tYJtSkg3RC3ki/wBLjeIjzCIzQB9RXX/BSr4afHb/AIJqfFD40/DfxQuseH/DfhPU725Wzfy7/RLlbAzG0lQZMVwhKkbhksR1xk/Df7Z3xu8L/sA/8G4Xw7+F+p61q2l+Mvip8PLDQNN08LGt9Fc3cUVzfM8fymK0iEkqyZOAJ0QZbOfkH9uz9h61/Zn8OD4zfsq/Eq90/wDZp/aLnTwX4t03T51kuPDS3Uw82wktZCZpFQFx5TAT2pMiN1Nesa38RvgP/wAFfviL8eJPiP8AEbRfDXxPvtF/4RH4Had4nim0+PTtIUiXTr9HkijjN5qcjxXBA3OsMoMJdXcRAH7ffsj+HdL8Gfs2+BtG0htL/svS/Dum2dkNKYtp/lR2kQBgLc+WSSVyFO3bkdCfSZD8y5b5mOMevBP9K/MD/g1y/bkb9on9ghfh7rHnSeLvghcx+HbhLiVfNk0+V5msByQMRKktqGwd32Tnnr+hnxW+L+h/CH4d674m8Rapa6Tovh+wl1LUb24bZHaRw4JcqecA5BG7gEZI3A0AdRPexxqr+ZGGDBN2ODyCVHr8o6Drg9MGvmn9s3/glv8ABX9v3xpomvfFXwZL4rvfC8MtrZxvqN1axpE4/wBTKkUqiRd580HAOY4f7rbvyu/4KGftCfE7xn+3r+y78SfFvh3Vfh3e6p498PN4D8OXc6y3Gi6Bc3csEz38XKLqV0RI0sYLJFCLSPiZJq/enT7MW9vHGFbyoW/dgkn5QOP5np7UAfiv/wAHGf8AwRm8K+D/ANjq++KHwN8B6H4O1DweIz4o0nw1Yxabp+oaHETJ9qe2hj/eXVrKVkWUEHyfPMnmBEC/FHwt+OC6B8F9C8fzSWcNjZ6PHqVw0kK3yRGGPCw7Hy77Bg7m/u5A+Y1/SP8AtK/CeH45fs/eNPA9yt5NaeLdAvdDnSCYxSPFcW8kLfMpB/5aD7pBwe4yrfzq/wDBEn/gjz4j/b20HSb3XfHFjbfDHwH45l0zxt4OvLR2vpp7XypzaLOnE0cymMSANhB5mCBjIB+gf/BNf4t6L/wSm/4Jm/DvVfGnhvV9T+OH7RurX/iaHwj4ftfteueJry4fz4IktwpMcMVjJaNKQCITKAcdK7Hw1ff8FFP20fFFnNqkfgX9lD4f3kcyyRxW8PirxTDCyxSQsYpCYjIWxHnCGLcxKEgbeg/4LdWUehfEb9i++t8Wklv+0L4d02K8hURbbWWOVZIDIBtVJehQg7wMjAwB+gcN9CJWESbRCSDgg+Q5OGBwSoIVtxXHAHfPAB+Stn+xfo//AAR8/wCCo/7Ovi/QvFfjbxBpPxz1bxB4J8Z6x4l1H7XLd6heYvLG4SKKOJUmmuUaNsKUAjAI+fJ/Wu0VhZRq+6ORVjUqYxlSpzyq/KFAGcDkAjoev5L/APBdH/got8IvjX4J0/4Q/CrxFc/Ef9pDTvFen6v4LsfCqNfx2usWl9En2ee6iHloyxfaWMcUob/RwJfLypb6813/AILT/swfDr41XHw18TfF7wroPjqwvPsWo2NytxFDY3SoUeKW6Ef2dCuPvlwOgYAg4APxj/ZOa3+Nv/BF3/got4FYf2bbeEfGMXjb7cD5v2wC7MotvK+9CT/ZaIG55lBOFUmvtj9mz4EaT/wV3/4N3Ph1bX2n2eofFTwP4evdM8J6oLlbjUdB1jS5RFb4lGZoxcra2pkVAAYpYxj7rnzf9iT4C32pft8/8FLvgDBZ+G9T0zx1pNxrVlbxQmGKSS+WWaxQSLyscX29BwQTIm75cbRh/wDBqV+3N4O+Dv7JXxS8G/EDx74e8I2+i+KLe6tptdvbfT7XN/CY+J5APOaWW0OBzt68kkOAfIXx4/YM8WeN/wDglV8Vv2hvi94R8UeB/EnhnV9B0Lwpp2rW8umyBPN8rUWNtKg3xyy3MYEvGfsucHaQ33V+138aI/2q9c+HPwz8RXmtx/slfBj4f6br3xzn07FvHe6iNPjmsNFluQR5lz5kFli3t9j+dcJj94sRT6w/4OMfHfgnwr/wSE+KzeKPIkTxPHbaTocbrnz9RknjmtzDtH3YxHLKSWxxKDtxtr8zv+CTPwC8Qf8ABVT4BeH/AIRQx+IvCv7Mfgm6h1/4pardzxC++KHiWVBO0QuANiW8AgihwspaOGCGWTE8sPlAHxD8Cfjr8Rv2a/hh8bP2d9P8ZeHfAvh/4iaBeazr9wpgutRmFlot1epoy3UB2KZ9wtJomIKyvNGAh86KX7U/4NN/+CavjTx58btI/aA8SaTDB8N/D1tqll4bkurnynvtRlCW0lxBbbCLiONfORpHG0SRRhSWgITvf+CrP7FOk/8ABQH9jm68U/s7+D/C/hH4Cfsr+E9Xk0XXbl3jbx6sJWW/j0sP801lbeXNKb2Zc3N1LIIycmZvpH/g1W/bl8I+Jf8Agnd4P+Cl3Lf+H/HHg+LUr21tNRmFuniTT7jU76c31jzvkhhcXEMrINqyQEfMSQoB8jfs9bpf+DrczbpFiX4weKgpJ+TjR3AOc4JK5/h3HGS2ASPuv9rHxrrX/BUf9re++FNreQ2f7KHwTYXvxb1WSdbaHW9ZtGa7g0qKQfvvKhMcE0ksOQMc/dTzPy3/AGgrr4gaX/wXp8S3nwx1qy8N+MNU+NepeFdK126tlnGjPqltDYm7ETDDeVDLLMMkYKK3RTX6RL8ArP4/+ONL/Yr+DunTWv7NPwjntX+Mvi5btpb7X78+beT+H/n/AHryXbiO4uZoGzGzCP8AdsnlSgHK/wDBNL9rLxd+ybcXviDxF4N03w9+xn8WfFusX3gXxleq8epaALrUWjsF1ZnIlht7kZ8q6ulYxiaMGUREsPuL9qX/AIJv+Gfj78QdO8feHfEniP4X/GDTY/L07xl4VuBb3NwVLNF9ttmzDqUKnjybnI8p5cyfOd3rfxQtvh94E+Dtxo/jaTwrp/gCTTzol5Ya5JDBpb2vkGFrabf+4MJH7sxngCQLkDCV8X634N+Kf/BJPw5c6l8N7fXvjH+zfDayX0ukXt42o+IvABAwklmGONR035Yn2srzxQxysrd6ANr4UfDjwr/wWa/Zd8QaT8bPCNsnxE+FvirWPBeoa74egl0trLWbB545rvR5i7ThfLkiH70BTN5mYuK+Rv8Agsf8MNJ/Yv8A2LP2c/2Dfhpb65rmkfFHxGtrdTvq8bazHDFqsMufL8ra4uLi6kwQqpG9qDtJJr7w/wCCFXwM174Cf8EyPAdj4p0y80XxTqs1/wCINbsbqIxTWt1eXs1wcx/eTEZjHlkl+RnAwK+G/iW0n7fH/B1z4b09oItS8H/s32UbkpNI8aXltbvdoqPHEpWUXlzEDHI/WCTlsbaAPs7/AILXfEPwX+zp/wAEpPiJp/ifSLXxBpt7pdt4d0TRrqZrc31/J+7t4oTH8wkXy2ut0eCRD90jIr8A/hb8arnxT8DvFXgfxXNpsfinRtJu7OGxBCrqvl20hDqM+U8sRi2yELktCRnINfdX/BZT9qy6/a1/aV+Kd1BfP/wqT9kWO3s9Nt4Asy+KPHl6ws7QYwB5Fq6ySFcSsBpsmcLcr5fH/wDBLT/ghbY/8FC/2Yvih411vxB4g03xLYyS+FfAGqiWeCz/ALQigBvdRkVcyTxy3U0iZOz5C/LsxEQB+2v/AAS98T2fjP8A4J7/AAT1GxvI9St5PAeiRrcqBiTy7GKJ/wCI/wDLSOQ44Az65r3G7Rdse1pFVXG4AZU5IGDj698jjkGvEP8Agnf+z7qX7H37D/w1+GWs3mn3+seCvD9vplxcWBkNrczIOCgk/eYIZM5AA/l5F+2T/wAF2/2ff2StWu/DbeIr7x58QLeI48J+DLdtW1Iybc7HePMERG5c+Y6kckBsEAA/Pz/gsH/wTi1z9iP4ta58XvAOgx3nwU8SPNqXjLS7UyXdz4Y1K5aVbi/it1+7aTN5KS+SA0fmAjjG34i8S/t8+LP2dPBvgfwr4R8K6DrzaT4nXVfAPjdh5L2Ok3SSx3/hYb4hDLYSyTy5im2xA3BPlkCPy/qL9qr/AIK//tKftU6RfSXfi7Q/2efhnNGYZtM0GaO61ie2chcXGqt/qJSu4b7XymO6RcnbX54/tH/BC5f9mTUvFfw9074hSfDS0uIEudbvLGY+G725BCbIrq4BL3Q88kLG2M+aQAzDIB+m/hb/AILq/s5z/wDBYLwv8XP7c1Dwr4HvPg7/AGB4kWLQ7mNl1T7Z9rjspIYohLKbWI+WJ/8AVFogYjtXFfK3ib/grx4N/Y//AOCxHin48fs6+BdZfw/490ZbPxL4X8S2UGiNcX9ym+bZ5ayCFTLDDckshDuJuQCDXkHiL9jS3/4UzpN5pUd9a6guhxx6pBozeTeXkcsSkOo5811+7LAcs+0gYkAVf1p/4IyftA/Az9sz4EeIP2afGXwr+GKXDab/AGtPbaD4ct7DRPF+nobeOPU8A+ZHqPnuS8ecx+UjRnO3cAeY/wDBX3xD8X/iz/wTx/Zp+Kvxx8J6L4J+IFj8RxpbeF9K81rSS11K3m+zTu32mRomEMD/ALvcCWlZVaIgA6H/AASd/wCClV9+w78TND+DviqNR8EfE1/NBous3DS3Fz4M1K5fNvp+0MV+wSMCY1RF8uSZlIAGW8v/AOChfwq8XfsNeFl/Zn+Md5cXv7Nt3rk2sfBL4l3BuLq5+H1/aeb9j0+98sETQRAyxSRzciGYzRFRB5KfM/j65uviX8CfGOjPJb2XiTQ7VxNHBfKgsry2WGeK6SaNstBKIopo7jOZo/KPHVgD+qvTy/2Zd/Leu7d+GcD+Q61PXlf7GHx3sf2lf2VPhv4+00QpbeMvDljqvlLeG7Nu0sKu8RlPLFJGeMk9SleqHigDgP2lv2Vvhz+2N8LLvwV8UfBfh/xx4Zu97fY9VtVm+zStDJD9ot5P9Zb3CxzSqk8LJLHvJR1PNflH8Qf+CJv7VX/BKf4p6x47/YH+J39reA9S1VtTufg14mvB9j2yTWO+CF7qT7PcblhdWuXktLyK1gSJbieRizfs3RQB+eX7B/8AwcX/AAw/ac+Mln8H/it4R8Yfs3/He7u4LCPwd4ztZY47y4uBJLbwwXTRRESPALdgl1DbGR7uKOETlgT+htfOP/BQD/gk38B/+CmXhZ7P4reBdP1HW4rQ2mn+J7D/AELX9JAScReVdoNzRxvcyyrbzeZbmQhnicivzi1X4K/8FBv+CEfimU/CW41D9rn9mHT7tItP8Kak8mo+KPD+mh7CGK2jVFF1HIkStbw/Yhc2kaJNcSWcO7YoB+1dFfIP/BOr/gud+zl/wU3+z6b4B8Zf2P42uN3/ABRviZE03XWx9ob9zHveK7/c20kzfZJZvKjKGXyydtfX1ABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFAG41MkW3r1oASKPbyafRTZH2D3oASWTbwKiozRQAUUUUAFNkk2Ywyq2fl3d+QP64+pFOqpq0bSwqq+ufQ5HII45IOCB1JA54NAH5Wf8F+9HuP2s/2p/2Xf2W7O4tpbX4jeLJfFfiqDg/ZdM0+PfulU8spi+3nAKgtCoPUV+omi2Vtpmlw2sdnFYxRx7IYIsL5QHAiAz12gED1J/H5H+C/7FviqH/gqX8Wv2gviBLo/wBhuNFtvBfgG1gIu5NO02M+bd3dw3WOWScHhdqhN6sRkE/G3/BYb/gtT4o+An/BRv4UfCnwV46ufA3w+8O69pH/AAtXXY4bWZVhvpoXa3MkiSlDHaxSyyGMMR5+OSuKAP0M/wCCkP7dHhf/AIJ4/ss+IviP4kkN4dNDWel6VGWWXVr8wyvFbBw3y/c3ySKCYoopmwQDj5J/4IdfsleLvjva6h+1t+0ZpsPiT4ufFfy5fDqajp67fBehxGT7OLKKRW+zNMT5mFJ/deSdxMkgPhvwm8Dt/wAFzv2uNZ/aQ+MH23w7+yl8IGu9L8CaNeCa1tfFMKCSS4v7n5s+SqoizYASVyluTmKZW9w/4IR/ta+NP+CiPxn/AGhPi5rGqahB8No9UtPDngTwuS1naaJZQQzyhzFH+78yWGS3MjkltyBD8saAAH6e2RMEEjMr5bdK2cY3HJwADwOOnGTzySTUGt30ttbq0KhpFJbazbVfac4z/DkqBuPA3dzgH4X+IX/BcPwf8LP2+rj4Iax4B+Ilna2vijS/Cs/ixLKM6dBqWoRCawhMK/vTHPxGJMnJ3HAAOPRf+Cr/AO11N+yj+x14mutHuGk+I3iKP/hH/BFktwkN3e6tdKLeGSAs6h/JEouZGTPlxpIwyUJUA/PX/gprrmvft1+E/FviHULS3uV8U/EuD4FfBq0jll2yQvcrb67qQHzRxXEzJeWxu5VMUUUEsRQiUvN+wnwr8FaF8L/h5pfhjRbOOz0rw/p9tpcFsqBWSGFFiiPkx9FZVBy2GxjI4GPzY/4J8/APR/iX4++GXje0+xaT+zj+yP4cudI8DeImU2lp421WWzMeseIA8u3y7GNopFhf/VzMZpfOz8p/Q/8AZi/az+G/7YHgm58QfC/xho3jTw/pl8+mXF5pMzeTHOiKSmCAQNrq3A2kEEEigD8xP+C1v/BLbS/+F8+H/ireX3izTf2e9V8R22rfG3w3oETSQs9qhMWtGzj/ANcrLI0V1MoZoIAZRFIUavz8/wCChf7HHw1/Y2/ajs/DPxAs9Z8Qfst/EbTWuPht8RLW9kv5vCaXUUcpktZEOb60tnP/AB6OT5kOZYsTSOZv6edWtI5bVY7nyZomdRIrxqRjcCrEHA4IBz1BC4yeD+YP7VH7M2n/ALE2jeOvBni7wPr3jr9iP4nTfa7rTdBhkub34L6hIyi6v442w8WmEiS7LQNm1kaUCEocSgH41fAP47/Gb/gkl+2xp8fwfsY4dW8aaXa2j6JPFHrGgeMIZpfMRrCdJdt5azKUkikimhkLTeXwy4f9Rv2ZP2uNA/4Lzf8ABQb4c6F4+0fxd4Ztfgn4SvvFXiXwBfho9JPiaLVLO1ge5glUNcRxRzygF1jlSRCOE3eb+ev/AAUF/Y/+InwT8IafoeheJodTsfhXdXPjbwW9mdkGueHpfLmPifRZIz5S4eK2kv8AT13NFPH9ojHlTSCL7Y/4IYft9+Mv2zv+Ckf/AAm3xHXwhHfaL8A5Yr/VrHYsmpCHWrRZri7fymkik/dxxvFcMCDbmaMCObc4Af8ABb65muf+CuPwatbi4mnFn8RfBDJCZAzp+8LzKmB1IG45JxhQAR0/c6xmaSBlbk7gGPvgE474Gcc88GvwR/aqPx6/aO/bC0/9tb4J+D7PxN8JfA14+meGYrjSTrF3raWtrNbv4gGlr5Mkls8qukc0cq3CBN8cTcq/0B8Fv+DpDwr4p+GmvLrnwm8eXHxC8I6Td6rq+meHLiPUNOgs7QP9onnuZxFPZBBFITFdwCbcVjHmGSJnAP1q1OFUjjeTywsMm8eYwVVwRhz9P5kHqAR/PL+w3+1n4k/4Jh/8HDHxQ+C92bPQfhX8UPiJc21xpLSO8GkNdedNpl1bt5gjhffcWiSnAUxuFOMJj91/gH+0B4f/AGnPgl4b8feF75brQfFGlW2o2EpaOaSISxiQxypGzbZIuVkjP3XTAY84/m0/4OrvhH/wp/8A4Kzz+IrQQ6W3jzQdP8QrNbTy+cLqFZbSSckABWD2oz5bZxGOm4UAftJ/wW/+C/j74wfs1+A9e+FPhHV/GHxI+GPxD0Lxn4fsLVhGyS28kxkDpLiNdsbk5l5Al4AwK/M7/grb4a/b4u/hvL8Qvjo15YfCv+zLn7T4U+GetyW+m+HCuUhg1VEw1xHLKV8yQzzBR5n3AQD+z3/BN39q2x/bV/Yl+H/xL861a68SaKkmrLDKHeyvo8QXMDbSGjIuEkOMnO4njIr4W/4On/2lNetfgx8O/wBnrwultfeIPj5ri6Y8C3c0N49vFNa+VFbuf3OZpJRG/mBgQcYyQQAO/wCDb/8A4JUP+z58KNJ+OfjrSbWH4j+PNBjh0W1j05bSPw/obss0OY41xHdXLMJJS7FgmU7vnk/2pvhppHwq/wCCk/xS/ZtvPDtqnwx/bW8LX2u6ZfXcEMg0TxN9nnMz2XLeZJNcpbyGNymJXjIPzMw/W7wn4Xsvhl4E0fQ9Nj8nT9Gs4LG2EiCSREjhEUfT7zYQjqWJBGDuBX86f+Cj/hw/8FVv2kPCfw9+DuirPrnwH8YWusal8YbS/Daf8Nb2KSKU2ltbn91qd7iCPzYSCLYtGHUljQB8Lf8ABIH9tXRYv+CourfEPxhrtp4fTS/gG0fxBxcti81DSPssM0jRA5kufIgim8uEbQQyRhsFq+ev2Wv2cPh58P8Ax14o1rxN8Po9T8I+MtS1K0/snxDaLLqej+HbhpIoTErAi01GNJAwlHMU8MIGSwA/Tz9s/wD4I1/Dn9iG7+DXx2+G/wAM5/FknwF1Fb3xboskzS6l4ssQpmudVkk3j7ZqVrIr3nI/fr+5KmOJYxL+39+xXofxe+F837SHwb1K11jwr4qsBr2o21sp2Xqyossl9EpbG3ysPLAcLhZlO1i4YA+FrP8AaR+IH7Q/gTXLf4xDS/ije/s+yaV4A+Enhua1GfGPi3U3xpuq3ymXdcSR2NsXMUwEUipukXz1lEv0h+x7+zv8SNP+O2ifsL/FzxX4f8F/DXSbK51y9trQS2HiD47w3Zmv3hM7D5o4ZI3jvvKkimliiCEzRN5sXRf8G+H/AAT7tPi18Z9S/aw8SaPJbxukmi/Di0njKTz2qkpPrJyMsXLyxRebkjypWwQYin6Y/th/seaX+1l8PYdNk1DV/DPiXQ7hNQ8L+KtIAj1DwxfxLmK5tx/F82RJHwssSeWeCBQByH/BSbwfpfgn/gkl+0Pp2l6fb6Xptr8J/EcENpa2q20Fqsek3aqqRgAquVA5HOR36fz2/sYaF40/Zl/Y++EfxGuL618K2fiPSdb174YfEmW0aebwh4ks9Tu7eXRJZyfLi0++trafMMscima6aRNjNNv/AGm+M/7SWo/Fn/gk7+1R4L8caXNonxW+GXww8S6P4kskh8uz1IDSbsRatp+fv6dc7PMjA/1DFoT/AKvJ8z/4Infsm+Ef22/+DaH4c/DPxpb/AGzRfE0Ovx74hF9p064Gval5N1CXOFmhcCVCRgkYIZSVIB+N/if9prXv2qv21JPH3wjt2034gfED402viTwzp91iW7tr6VF8vKDI8uKaQYf5jkAbQEOf19uvjj4w/YF8cfB/9j/9lfwj4b+I3ja208eK/Gur6pfssK5nM9xPcSjzYopNQMM3lAzF4zLbHH3APxH/AGu/h+P2Vf8AgoR4u8B+GdQ8S6hN8P8AxNN4Ht57e7hsNS1bTTbGyS1ZbZIl3yQtLDNNuJl83nG7n+kX/gix/wAEzLP/AIJp/sk2uj31rat4+8WXJ1vxbdWhxbpcSE+TZxnOSlpGAgDFh5jSyrgzHAB8z/t3/tOeAv8AgrL8WP2VPg/Y6bqk2k+KviTqV7418IeIbYabdaamhWHn3Ok6jF5okt7n/Sf3YDGFzKMStjn0Dxb8Kfjh/wAEkPGFnP8ACXR9a+MH7L73LNq/gyUm51v4Y2ocyO2jkO0lxbCOUyC1k812WJIto8xpK93/AGsv2Cr7V/2htJ+O/wAIZ9D8OfHTQ7VtGnfUoCumeLtIlKmSwu5Il86F18sPDcQkPGVKsGh3BfYf2Xv2l9C/ah8CXWoaaq6fqGkalJouu6C95DNeeGNTthH9psbgwu8Kywh4iVQgguDgMAaAD4IftP8AgP8AaL+DNn8QPAvirRfE3gu+t/tEerWVwBCBAmJo5C53wspGDE3zLt5bnA/DH9k/9vw/swf8E7f2xP2lrfWpLH4kfHvx1caZ4JGoaqn9o3Zjc7cW8ZG6a1j1GaQuBjcIztO3I9u/4OAfEdz/AME8Pivfa/8ACma28G2nxm+G3iG18a6fps1vFa+IX8zT7C3uYLVoigus3qCVogsrxRZLZj3H88/+CWGn/CuDQrH4lfHK+03xLpvwzt5NM+H/AMKtKh/4mvjvUrppZGaUKcQxRyPEGncYIhU/8syJADx/xB8atXufC+i+CfDdzeL4J8DlPEUNqzi4/wCEs8VXH+ijW2BWVZpTM5iiVgIvs9qoLGWWV5v19/Yc/wCDgX9nX9kf/gnr4V+GPhvQPHH/AAsPwDoiaIfCVlpR1A3d+CPOmF4jeT5UtzJPIZOGGSfLD4jf8gvGXwJ1jUPiRpnhTw74X8TeIIfPl8QapZ+FPtesS29vbozrZRTLwDa28uzzTjMbJJkCRVf0r4ZXHjj4peMfhd4J+Hq+FPhvH8VNdttL0e003ZfXjxT3BR71pRiMbPl2wnIHmAAqc7QD6C/a2/4KC/Gr9tCPUJvjz46i+H/g3VJP+Jf4C8Mah9iiYltsYmdcXV84VQfLEoUEn7rFohrfsy/8Eyv2gfjxoKQfB/4S6X8N/BE5UN4l8b2EmjrMP3hlMNoMXMiELFiWSIHHfGSf1s+An/BNP9mr/gmT4WtPGF5Y+H49etbiOObx3431CG41CW4mcxRSpczsIbUySyBRHCYC2PvEjB+yY9VgaxlvC0KrKwKySTHY3AAO8jCrk4wBjO7AO40AfCH7Lf8AwQL+B/wH1nTPEvjCz1L4y+OdNy0er+Mbn7TaW83mBdtppuBZRlMAx5R2BDA4PJ/Iv/gvF+0b40/b+/bN8aWfhq417Vf2fv2ebrTdI1iSwhkXSLbUBeLa3ExTLJJL51zMkS9PJi4GBIX/AFe/4Lcf8FkPDP7Gv7HXjyHwH4m0PVvi1HqQ8HWWnpc+bdaPqLRGSSeWEsHj8q3DSxvnDSiMHdu2n4d/4I5f8G+vxE/aB/Z08P6h8d/FnibQvhLq+qt4rh+FqCSFvErmJPKutQuo5EZd5LAROC4QsQY2dgoB46024DyZIpkkJaBhEohZ1BBbA4D7gwGcfKMbgODw/wCx58Z/Df7If/Bcj4Pa59uu9NsvFl8uk+Jd0i+VH9taW2jYs4Kogn8qaQ4ORE3zkMwPtX7bP7Gd5/wTH/aZtvh7CjP8JfGklxcfD68nvA0iJGu+40W4lfH7yIygws5IeMYbzGww+dbL9h/xx+3p+2B400X4XzabN448E+A7fxBYWdztb+0Givkbyom34jb94k0YYFf3YjIHmFgAf0yfHv8AZw8K/tO/CXWPBfjrQdP8TeH9eie2v7aaMurMAR5kYGNsse1WSRd0kTKAuSox/M7/AMFAf2Q/iv8A8Eqfj7pmm33hHVvFnw48K3H2Tw346js5ZV1TQLuaeSLT7qSP/RI5vtE0hEcsayZaMA+SY8/0a/FH4/6/+zN+x/pvjrxh4A8ReIvEujaZp0viTQPCoGpXdm8nlrfvDgoLiKItLLjrKY8YBOU31b4Z/t5fs9+WP7F+Inw3+IWllQj7pNP1i3lAzjJBR9pJOMSQyA5CuDuAPlr/AINnfjDZ/Ff/AIJQ+CbWx1SHV4fCGqan4cikSJYZIYbe4LQJKgPyyG3lgkI4z5mcDOB+hO7dyM46c1+Lv/BDHxlN/wAEv/8AgoZ8Yv2J/Fy3arq+pS+MvA2ry3DbdVgaGIKhhwEE8tqiTERKo3208ePlQL+zkdz5kjc9G27fTHQ/iCDQBNRRnIooAKKKKAPhL/goB/wb1/Af9tzxS/jzQ7PUPgr8aLW7Oraf478Dt/Z90NSV554ru6gTbFcSfa5lnedfKu3MMai5QCvkHVf+Cjf7bn/BCTxTLof7SngnUP2kv2eNKu0stP8Aipo8KxatbWAewt4pruRC6rIEkK+TqIjlubuWQLfzIm8/tXRQB5B+x3+318G/2/vAs3iL4PfELw/440+02/bIrSRob7Td0k0cf2qzmVLi28xoJjH50aeYqFk3Lhj6/X5Z/tX/APBsX4Ns/jJafGr9kvxjqH7Nvxo8PXcuraZHZg3Xhq6uiLp2jNu2WtI5nmjhdYvMtVtkeMWUgdgeP+D3/BwH8Uv+Cfnx1j+DX/BQH4f/APCF+R9ptNK+Lnh/TbuXQvFH2W3tmWYW8cLef528vJNabfJkuoIZLO2xIYwD9fKK5/4XfFjwt8cPAtj4o8FeJfD/AIw8M6p5n2PV9E1GHULG78uRopPLnhZo32yI6HaThkYHkEV0FABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFOSMvQibzUw4FACImwUtFI77BQAO+wVATk0rNuNJQAUUUUAFFFFABQduV3DPzDHsaKGGR+n5+lAHg/7f/7V+ifsM/sk+PvidrEkcNt4Y06U2iYTzLu+kxFbwqoKs7SzyJ90g8Mc4r+fX/gnL/wTY1z/AIKQ/to+G9E8cSLrnhfwfu+IPxSup7z7NdahqepzmR7YvHGNk8/lRdgViSQebGWjr9Iv+Dsn4kWfg39jj4dafqFu32HXPiFZTz3W3zGs0sra6n3In8TvkLg5HTvivoj/AIIu/sZal+x5+xtpc3iWxS1+I3xAu28XeLfOYmWyubsfu7Yknafslr5SYPTbJjls0AeU/wDBc/xppfwk/Y48E/Bnw3a2uk6D451iDQtT03T8WkNv4X0uzlvdTs4XiP7nNtaJCEAf93KflB/ej0H/AIN7/gb/AMKl/wCCU/w5ub+0t7PVfGBvvF+pNanyxcS391LJHJKMqvmLaNawkEbf3GRu3E18W/8ABUSz1/8A4Kdf8F1fAf7NehX0MPgvwh4WC+MZLdoftFlY3Elvc6gIpYm8yBpoUsrMNkbVvJlA8uWVW/Z3wh4fsPDOl29jptta2FjZRC1tIba3EK21umUSNB1CALhVBG0KAMDFAH4s/wDBev4M3nhD9tfxdrGkxNZyfFT4VjxJYyWMUf2pfEvhW/g1JZVvJMNbn7B5yZtZVkxxnHBxf+CpdjrX/BTr41/B74p6rJq3gP8AZk+Gfg3TvE3izxhc2k1jp8h1Ty55bbT5fKF1fzzRC2thDErAPOfmXzDn7I/4OEPAtnofwE+H/wAYptJk1dPgz40tNQ1KxmsxcpqOi3wNlqcIEmY13RPGTLL8kYQkkA4Pwn/wTmsNf/aZ/ba/Zj+A1yLzxJY/sS3niV/FupRa1uXUYre/I0aVIl/dzRQywWGIopJTsDY6A0AfZP7P37KXij/go/qVjcfEnw1ffDb9lLwo9nJ8L/hnaKmk3XiiyiGY7jxBbZObdfIiligVo9wIEgYKwfqf+DbjTNOi/YQ1rV4bOyt73xD8R/Et5qc9vHFCLuUXjRiYpH8o+SKJMYGOAPlUKPor9rz9sbQf2Q/ANhNe2914m8Y+J706b4Q8JabcbtW8X6kOUt4AvSMMG3zybUhQHeMld3zf8KvH/hn/AIIC/wDBMWG6+L3ia3k164vNT19tJtpIYZdR1i9Y3cum2G+RvOWGQtD5hGMfvGCjAYA9S/4K2f8ABUHwz/wTI/Z2utc1a7tL7x5rFu9r4R8PFfOl1O+ccNJHExm+yx5USSLtBLbQ6yPFTf8AglR8BPiF8PP2aF1340ap4m8UfFH4pMda8XWWt3yXVnYSPv2abbQD9zBDFGxPlw/uz5ZHfA+aP+CZX/BPrxF+3R8cdM/bW/aY0mwvvFuvWUc3w88FRw40/wAF6aoLQTskoJe4xL5kJLMEL+bxJ5Yt/wBTUmtoG2nY25TKRvJIyckkZJGD1btn3NAH47ft0/sM6X8A/GninwTqU+peFvg74wlmufg74k025+yJ8L/Fd1DJHdaQ7bgYNN1MTKphlDWxDlP3e1FP5M/sW+F/iJ+z58aviB8JdUtbbRYb+O1T4paJm20rxfPoun3u6+0zS7i58vzJJrZzP5du2ZY0hYtiIEf1kfE34c+Hfjd4E1Pwr4k0ix17wzr1nJb6lYXK+da38EuFKOwOWB5GGA4YkcpX8rP/AAXq/Yi8afsLfttadb+KNX/4S/w9f6dHN4V1m5Yvc3emWkhhht71pCPNmtoxHaeYTl4YoSF5GAD6pg/4LgfGT4R6jpfwA/ZWk0r4reD9P8RWulfD7xDeaTLdale6WtvDINAmgkSHd5RzHLdY4ji5l/5br+yH7Pn7A+l/DP4F+NrLWpptU+I3xYiubrx54siiYzalfTxTxFoEz/x52on2WttgCGLoPNMlfjH/AMEf/hZdfD3/AIKVfs3/ABlm8Max4B+G/jy+1jw1oCXubWC7v7jRZ5fNsrPgR226aOISKoWSV2PO01/Qd8UfiFovws8Dat4l168tdG0HR7OW/v7u5wIrW3SIyytzgbscckcZxycMAfze/wDBPpfil+yR8DJPG0b698E9D0m61LwzH8QPC4l1CzsdcsLsrHZeM9EJkaG3C+aPtRtRdRQmIESAhq4z/gvx+1V4t/bA8JfCHXPiDY/C+z8XaTZ3qWt/4F1T+19L8XWFyy4uLe8HmkeRd2tyktvLKTF58O0nzXNftD/wRD8LXOtfA/4q/FBlj07wH8e/iLq/jrwvpNwyXNzFYXeIjPPJ93zLp4lkFqo/djZ/EzY8D/4LQ/8ABC/9mfxb8JdS8ZWOoeEfgR8QrwN/ZCHUrbTfDniLUXVMWzW8zRQxySBQPOg8oD5JZN6xlaAPNv8Agzc/acsvEPwh+Kfwjm1FfO8O6pb+J9NtZTGy/ZbmH7NdCLJ8zPnRRM24AAyIRnJFP/4KK+MX/af/AODpX9nP4cw2d3qui/C+zsr7UdPuJ0NrDKDNq0twp9IkFmxB5/0fGcV+YP8AwRF/ahuP2Hf+Cqnw31TWpH0ex1HVR4O15bw4+ywXRFvIJg24qsUyxNgZ2+UScbSp/VT/AIIY+FNB/bZ/4LI/taftAXml6HqA8K69/ZHhe5jMsMlqJBeWoKxs5O2Wxgw4cffLbdoBFAH6f/t3eBvHHxG/Y9+JXh74c6pqOhePNU8O3cXh7ULKWONlvfL3RYfy2AEpXYRt6Hgq21h5p/wRp8X+CfGf/BOP4W3ngfR7LQLGx05bHUdIhhEY0zVof3WoQS7y0qy/aUkkZpD5jiZSWYAY+tLi1Wa1G6Rm+bJKNtLc7gPlwQSMHIIwVHbIP5nfC74iw/8ABKz/AIKva58JdQtfs/wy/ax1uTxX4M1CV0VdK8TtEY9Rs5nIG83UsVsIgehkjHJZiQD9IfEyW0ejtJdfZvJhHmuJtvkluwPQHJIHHYkfxHP52f8ABJex0fxT8KP2hr/T44Yf2OvGOr6lP4FtdSSRZo7R4p4tdfYqhY9Me7WYW8ZYSD94G5Va+fv+DpD/AIK1zfDT4Z6l+zv8Pb1m1rxQkcXjXWUljNppmmzwysmmyFdxSa5jUu2AjeSCBxIcfEf7Q3/BXPx9+1X/AMExPgr8ENLlu/Cfge30eLwp8U/FVxory6bbyx3Spp1t5yx/uQLa3hneOIqALoxcGMmgD9T/APg3m/a3s/if8OPFnwltbzWJtH+Hepyar8OP7WhMN3rHga4keDTbmZlz5ssTRvC5UJjEZIPNfpPq900UJmURtJFnAdmVFAZgS2cfKPmJHOQobsK/ml/Zr+IPxu+B/wAEv2Xf2pdB0HVNe+Fnwh0yfw1e2OkQrutLaO8lj1aG9URByLwPbywSk+TCIgH2nMh/Ur/grt/wVv8ABfwS/wCCbNn4j8H+JLGTxN8dtG+z+CG27TPBcwRLJfsVI2/ZYbhQwJXbJ5ZK7GIIB5r8QryX9rH9nP8Ab2/aTumt7/Qbz4e+KPhp8ObxCs0R0LTNOuxeXML87lutSNx8/BIg4ABFe1/8GxkRP/BCH4HuDJuU67tweBt8RakwODxnI64zXyz+xP8AsYeMv2RP+Dfb9pjU/GH9veG7Hx78Ode1TR/B2pqEbQLf+x7mGK4mB4jurxVWSSIbBGyxr5e93FfUH/BsJqG7/ghj8EoP+WgGv7MdMDX9RJ3Enr83QdsetAH51ftH/Azwt+0X+0P408G+LNPjvNO8U/ts2nha5bcy3kdhcaXOsscUwBkRT8hwvG5IiSNvP6Wf8E8v2y9W+HfxM1r9nP47axDH8WvDeoXUPgu51CIW918QfC8eBYaorRk28twyLKskcTeaDGD5OM4/P/xcf+M1NSDKssMn7f8AomRJlUYmxmHPHb8c+3f9S/2+/wBiTTf2wvhdDfafqkHhP4leDZf7W8FeOFg23HhS/iIZpC2CTaykN5sRxE6EZwVU0Adj+3t+1Pb/ALG37JXxE+KF4bPd4K8Pz3sP2kb4ZpwF+zRDDozCadoYwQOu4ZFfnj+zP8TfiN/wQlsvhX4Z+KK+IvEPwJ+IGnWmqeI/E+oW63U3wx8T3uJdQhnniOBZPc3EcnmyrId3m85ya8z+OP8AwWN+GP7c3jf9nX4V/EvxFoPhLT/DfjZdR+LDtPLeaDNd6Wwjsre3vLVGtpdNvrt5ZRO0ojiSDMu0AMPrT/gqp/wVq8GfCTwBqXwt8NadpPxc8deONGP2SwJW78PadaXMQMd7q0ijyfJlha4mijjYtKEiG5RIkqgH50/8Ha2va1+0B+3B8D/Afhy3tdb03/hBH17R5rIiZZjfXsySSs6fdi8mwjfeARjeeAQU87/4Jwf8E4PEn7Q3xQ0nwT8OtDs5/D2h332X4m/EKSCJv7K81fMmtLVpBte58rYUiBlijxEZUdwRXS/8Etf+Cdmtfty/tI33ha1+JHimXwT8LvC1voF54ithbi+0O3lkuZBo2myq03lPM0sjsZTKIYvNhbzN26v3f8BeAvhP/wAE9f2edE8MafN4d+G/w/8ADqjTLM3upCxtFjdmw8ryyDfLKyg7wfMlkPJALGgDoP2av2bvCP7N3wp0vwZ4PsE0vQdBh8i2CEedKzfPPI86nzJZJZsySys2ZJcnqDnyvw//AMEhfgL4M/bOh+PWheCE0P4iWcbC3l024ks9NgnkjkhnuVs4yIBPNDIUdwnOA42y5kP05purw3cRmhaOSM5UyiXdHvBw2G6EZP8ACOuQcEEVHe6o0E0ZZtzFh8oH+rOCdrenrk4B4A5IyAfPv/BUT9jWx/by/Yr8efDO4m09L/WbIXek3l9L5drYarD89pJLmOQCLzVQSbYy3lebtw2GH4m+Kv28vix/wSo0zwJ8MPg94s8SaH4/sUs9C1/4G+L/AA5Lrttp+sT28IEujXA8yVba7kuXuY4FuD/rApUkNFX1v+2b/wAFqviF+2j+0HN+zx+xGy6p40jubqHxJ8QpUhfSdDtUAhee3kxKFt/NmQfayODGvlCTzBjw79sD/gnf8E/+CWn7B9x4R8Tab4b+Kn7WnxN0y4gGuazLLf3OiRSgS32sonW3tbFLecpdKpl8xCx5mkhjAPzn+G+mftJf8FJP2wvFfxLmkufF3xE+Hemt4x1ufVbSL/iW2djLGqwx2gj2MsUgTZbRRfMwbbGQWev6If8Agmb/AMFePBn7ZWkeG/AnijVtD0j40XGlC7vNKispRY+JlyWOoaTOcxz288Qaby8+dCPOaRf3EzV+a/7Bv/BNn9o79hX4GfDj9p34M+EdP8Xa9qEb6xqHhuV3s/ED+G5do/s+WES/ZbtpraKK6IjEV1HcOATKW8mvuf8Aao/4JTW/7W3he2+NHwhuvFnwi+I+tWcWujQbtBodvcX3kTeXPIqsJdN1SMuVN7bkxyHzFkjuYpX3AH2H+2b+yF4P/bj/AGb/ABB8O/FySR2WuWu6HULTY97pdyBiO9tsrkSROIz0G7bgjPB/mP8ACWnfF/8AYm/bI+JHxCur20074kfAm9isrq2S/lA1JrJohLvizmawu4IpVx8pzMvI2Zb92/8AgkF/wUe8Q/tT+HNW+FfxusV8C/tJfD8+X4h0LULF9Nm1q0iHlxanCmBG8Z/5a+UzRjHTypY9v53/APBbf/gnb8fP2e/2hbz4+aPocPxK+G2k2k02saxboYdYl02aXP2PVI9+6eK2jPkRXKQhobWGIy7hDigD92vg38RNG+OXwi8M+LNNmim0zxTpNrrNnNCxaKSOZI5o5IwfXf0OcEMDkl93xj+018DvFn/BM/4nXXxv+Dv9tXnwtv79tQ+KXw1t0WW0itpBm917SbZsGO7hZIJpY422TguWAOWHJ/8ABsd+1VY/GT9gCPwbb6g95cfCfWX0aATSb5J9OmDXFm+M5GY5Z4gMD95ZSqQuABY/4OKf+ChL/s7/ALLg+EvgbWh/wuP4zCDw7pEdrcmO8tbC6laKa+BBDIu2N7cTLz5kuQuASADyP/gu54H0n9oT4C/Cn9tz4EeIbfWNa+DeoQahFrWgTC6bUtHa6+cxkkb5baYZeFsYFxcxuVZRX6qfBH4w6H8ePhX4e8beHL+C/wDD/i+wi1fS5UbmW2mQPH292z6Hjtk/nrqH7Bnij/glp8G7Oz+DPhaX40fDHWNCt9G+Inwou/mOsTPElne6xpaN5yR3MsXnLc2JzDKsm7goccr/AMEIP2iNQ+DfxG1z4EaVpviDxD8Dr37b4s+Ffjc2801tY6fNIJn0S6LLmG4tHa5EkUhWQSrIMBSjOAfrVAcjoBwON2SDUlU9KnNxC0jKFZnO4dcH0z34wenerpGAKAEooooAKKKKACuf+KPwn8LfHDwLfeF/Gvhnw/4w8M6p5f2zSNb06HULG78uRZY/MgmVo32yIjjcDhkUjkA10FFAH45+PP8Ag3j+Ln/BN74yXPxe/YI+K2oaLJHdjU9T+Ffi2/kbRvEiRC9dbHz1ZVuI9kyW0EV4A8Rlkm+3xyBXHoH/AAT/AP8Ag508G/FP4mJ8JP2nvB2ofsx/GHT7QNfN4nJ03QJ3W0gny73nlzafJOHlliguFZPLWIC6lklRG/UyvIP2xP2Bfg3+394Fh8O/GH4e+H/HGn2m77HLdxtDfabukhkk+y3kLJcW3mNBCJPJkTzFQK+5cqQD1+ivxU0r/gnJ+25/wQk8Uxa5+zX421D9pL9njSrt73UPhXrEyxatbWAe/uJYbSNw6rIEkDedpxjlubuaMtYTImw/X3/BK7/g4U+A/wDwVM1HTfCmj3moeBfixdWjzyeDtdX95dGGCKW4axul/c3UaF5dqkx3DJbTStbxxqSAD7tooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigApUXeaSp1XYuKABV2ClooZtooAR32CoWbcaGbe1JQAUUUUAFFFFABRRRQAUobaP4eOeTikoBwf/rUAfGP/AAUL/wCCblx+3J+17+zn4u1LVtNk8C/B/VtW1rXNCu5SZdWuJYbcWJhXYUYRzQkOH/hlwOSSPry9t1SJmUNHJyRuwfLOc5Jz/sqOCc5x3FaEkW9wwLIwz93gHIxyOh/GmSWccrfMuV/uEArn1x/n88YAPzi/4I4fsb67a/tK/tJ/tGfETw34l0Xxl8VvHN/a+HYPEUfl6jpvhuOQNbxGPJCCRDHGVOT5drDgg/Mf0chj2WzZ+bc5Yg+5JNFtZLbDCs7cDl23Mfck8n8T2qwv3TQB4l+3/wDBOL9pD9j74n/D14bGZvF3hm/0qyW9DPCtzJay+VIeoHlSBZcjB/dn3r8R/wDgiP8At3+FfgzdfGbx9fQr4q+N/j6x8MeBvCfgeO2M3ijxDqWm6NDFcyOF2rDbT3BjnmkkkjAFnIHMjjI/oW1IhY8fxdjv24wQSSOmAASSc8ZGDnB/nE/aD+EY/wCCef8AwUz8aePtB0VtHt/gn8aLPxnreopbCyj/AOEV8Rx2kR35YXE0NrdBrbEZkjke9kyFAUkA/Yb9hD9gU/CLUbj4ufFLZ4s/aM8ZWn/FSeKGuJZoNMHmfaDpumpkx29nCf3YEOGlIbfvCjHBN/wTA1L9sP8Ab/8AFHxW/aGs9O8UeCPAs6ab8J/B63BaysYB5Ulxe3cMYVZpJJ4lwlxvVl3CSI7Itn3T4fEdzaRsTI33X80OcTEgHk8FuCM5UDnHOKvtB5X+rRnOMHGMsBnjORjr9BzwKAMTXA+mZMVuk10yExRFg2+TDvglvT5m+UM2MnBC4H42/Av45/tuf8FUP2OPiz4u1LWrr4XzeCVvZPA194IuIrBPF+pWsqGWB5WlmWe3i8kxRSJJFDM90f3uEbH2x+3J8Q/Evx8/a58K/su6N4gg8EeG/FPha68W+LdYhvBBqmtaZFcm0l0fTyMtFLKS5ln5aOFXZCrDNfWXhbwNpngDwjp+j6HptjoulaLbxWdhZ20K21rawQBRFDHEFPlRjHCgHAQdc4oA8u/4J8/tG2H7Yv7FPw5+JljPezR+L9GtryaV4285buICK44wQ37+CYBuFAwNvJz87f8ABw3+ydpP7TP/AATI+JOoTeHdL1LxL8PrCXxPot5dyraNpb2nlm5khnyOFtkuD5ch2O2zJyAK+V0/b0m/4Io/E/8AaA/Z30Xw7N4i1TVtaj8a/CeO/R5rdbPWIDJeyXs5yFtLS7jwcsJZt7qMtg17N/wRi+NXxd/b+/Z2/aA8MfHLXLXxdbxa9P4X0q8utDgjtXtrmw3PA0cUXkXMGLmP5ZHYYIJzwSAfHf8AwS68d6P8RP2DP2RlmvL3Urj4T/tNjw1purXspRTaXWmXV7tgik+aOMebaPhhgyDC5BwPob/gpLP8Uf8AgqZ8dp7P4O6bZ+OPgn+zZrlu/jTw3f6iLOz+JWs21zFLPplvKku25WOHIInEEQlC5MpG1fgn/glR+xzrP7aFr42+Bul+NtV+G3iCG50T4h6Pq+q2z6y+oah4fubvSpXii/d+XbR+fGNkg80SQxnd5Y2H+hr9kP8AZY8M/sgfs2eFfhj4TjuIdF8L2P2MSvMftF1JI3mXF1LyB5kkjSSFgcjcBjHy0AfnBp/7SMX7JHxa+G/xH/Zl1b/hL/hZ8eNbv9O1X4IwRLba0NdA/wBKudOgk2/2Y9tJj7fHNLFbQ7/MH+uTZ6X8SP8Agk/qH7X/AOxr4t1n9oCztfHH7R2veG9Tg01gscuneBppd8ltY6YjKLaJYG8tZLhh5kjqG80RNFXZf8ErvhvofiT9qv8Aat8deIvD/g9PjDB8UtR8N3utaXEGuo9JFrp0tjCN2dqiPBkAAEssbs27oPtLxTrel+CNLu9W1S+tdOsdPgmvrjUL6dIYbJIwxaeaVhiKPO5sfdzngDIoA/kT/wCCm/w1k1zQfhL8ftP/ANK0n9oHwxDqepX+5mhj8S2M32PVogXHzHzIEnfI2+ZdS+XiIKK/bf8A4NAPhQ3gz/gmLqWvTTWbXXjbxjfahbiFB5sEdtFDZiGVufmEkM8mDzi4z/FX52/t6fE34b/EP/gm5+0ZdeEr6z8QfDvUP2g4b34dXiwNJfWtzdWkj6kPLJMqW8kaERyTOGlBRfLh+UL6J/wae/t9P+z18WNQ/Z78VzzQ6f8AFO5TXfDk7XUTWsF3BbTfaW+/n99FbRoAMEyRKMZyCAf0WPB5sLZXaxzuTjHIxtPt06c8da+Xv+Cr/wCxwv7Zf7I2ueH9J1DQ/D/jLTZbTWPDfiXUpJreHw1eWt1DcG48+EF4cRwEAjqypkg819P2N2Xg6KvAbHBHv0J75H1U18af8Fiv+Cd+qf8ABRH9n9fD/hzxtrHhLXtDFze22mnUJLfQ/FQbyi1nqaR4aS2PlgZDAx7y+GxtIB+LX/BSH49eC/EP7BF78IfAcNv8ZvG2k69/wmfxY+LklnJ9l1bXY0k8yOzuJBFLcbVnMYYxGIWwXYCSXHh3wC/aZ03X/wDghx8fPgzqni/RNJ1bQfGOieMtB0m8uI1k8QW8k/2a6jsg2XkkVkikIKnagyclia96sPhz4o0X4kaT8G3+Gutab8VJj/ZNp4EForXKbYjm4MwGxLBY/m+0DMYg2kAMSqfnz+0x+zx4p/YF/aU8QfDfx54dsP7c0WGS3ks7jN1aqt1alYp0mTyvPMcU4ljkHyb9pKkAqQD+hn/g1M8YaT8W/wDgkI3hn+z/ADk8KeJtX0LUYLpIpbfUHufKuhmLJLxGK6ZcTLgndjIHHQfD3/g26+F/hb9rux8e694i8ReJPBfgu/kuPAvgS4y+j6DHJPLdi1AIEnkR3MjyxxeYE3gl92cHw/8A4Mtvifca5+yP8XvB8loPsmg+LbbVre7J+aUXdosXl8HgILIHpnMrZJ4A/Z3V7YTpt2b/ADAUZAT864yV9lIBBzxkgdSCAD8U/wDg6V/bGk8d+DJv2e/BurJHPb6XdeMvH13bSKjRW1vatJYWTNn5vtLqspAxmKKEAHnPyb/wQo/4KjeMv+Cc/wAH/B6+I7+PVP2e9eu7o+ILd7OO5vvCt3JcTQpd22wrKbd2ETSxkSH9xIY8Fmx9c/Hz4OeG/gx8Nf20vhf8ZdD0/wAUfGDxZ4R8W/Fjwn8QrqMQ3Pi/Tl0ydEtw4KCO906RVjks4VSEQKkgixnd8/8A7BX/AATtgv8A/ghBonx2uvF1jb6bb6Pr95qej6npwkt7i3g1O+txCpViJRIYz8sqHlmA4AJAO/8Aga0Xiv8A4L/aNbTXEF9p1x+0P42vvKafzrVp4PDUUtrPtyU8yJgTG2AQzHI6V9/f8F8PBXxD8Y/sF3Fn4CtfE19Zw6zDceL7XQpRHf6hoXlTfaYhtIlaPeYPMSAB2SKTDLwa/In/AIIN+E5rP9oX9j/xJJcLJB4u+KHjpLeyEj4txa+G7SIYyM7cSE52/eQDAByv6F/8FLP+C3uqeG/Guu/Cv9nma1u/EujubXxB8RLqOO70jw3NGVeaztoDkXk4UjzQcpEJd2G8t2jAPya8UeJNH8eaVH4F+HFnost34itBaahPa2MYg0jTsDeZON3msUCRxDaFkBPGGzx09hJYfDvxVo/wn0lT8M/h/ZPdeOvFEqSRQXEkrukNh9tj4SaUYjDDO5lYIxiB3/X/AOyt/wAEsvit/wAFEfgr4p8TeBdSsPD+h39xLcy+LPHD3L3XxKvluQbplkhDTG0AzFNd7WjkX91HEv73bl/HD9g6HS/2u/gD+wT4Y1qabVrrUD4v+MF7p8k4sby/nSG8aLy/l861t7CzzAksX7k3ceXJkYUAfpv/AMG4P7Ltv+zP/wAEoPh/cfYbi3134lJL421Vbifi4ku+LfywuCubRLQkAEY46kVwV38J1/4Kr/8ABYy/8X6p/Z+tfAv9l+KfwvY2WpJm11bxPdRO19IkcmDLDa4SGVZfLGYItivuY19qftq+I/FHwM/YX+IWqfCrw+uoeL/C/ha5k8N6ZbwLMizQxYhVYF+SURdNnrGoAGVI4X/gjZ4A8C/Dj/gnP8KF8A67F4k07XNPbXbzWhcNNca1qN1I0t7PPNw0kgud8TeZlgIyh+5mgDynwD46/wCHPfxD8SeFfHXiSax/Ztm01Ln4datqy3GoSeGpoVKXHhqS9P74oqqZbCGRQZI/3MUpMG1vz4/ag/aU/aS/4OD/AI4eIPhf8BtY1Lw18CLi4bRdQj1PS5bBbGK3UB5dXuxHLL511MJmjsY5QzRW8RljBCtX7e/tM/szeB/2o/gjr3w98baXa6x4W8RWzW97bOzZYLiVHVxlkkjnxIkgB2MMY+bFfmr/AME5f+CoPh/9hj4AWvg34meD/E/h/wCB+ja1qXhz4e/Fez8NqNE8Q6faX0tlG+pm15t7oyRjM0sG2TZJKQN3AB91fsM/sC/Df/gnP8ALXwb8P9Jgs7e2jWbVddmib+0tanKEPdXMm0ZzmQrz5ahcHaM4/GnxHJp//BU/9vHTp49N1DXPEvx+8dQf2YziSOx034UaPc5lMo3CWKa/ltZXKpyfJb95i5LS/fX/AAWe/ao0H4l/C3wj8HPDvizTrXQfjBaXniPxt4jsLxZotL8BWUf2vVLqKSHcf9KTMEXeYxmIg7sjxn/gn3+23+zh+xd4a8QfGX4veJvA/hb4v/Fdzead4X0qFbzWvBPhe1t4Ro+hrBaxma1UWsdrKUmWJZVxkERjcAfsBpelw2enpb2dtDbrbR/Z440wDAu0EKcZwy/ITjIyTT9QW1luZE+SaaRiRiYZ4+YfdO7jbuAA3BuVxjj8bvjr/wAHZ/h/UPG0PhX9nn4M+NvizqJkjtra5vRJZm+xK2xra1topblhMBGR5phfLj91jk4+neFf+Cq3/BSTT7STWPEnh39m/wAF+IIIbqUQGPTLyzt+EeIJF5+oCVopRKEmkiB2YbYcUAfpH+194N/Z88M+PfAvxa+M194F8N+I/h1cST+G/E2u6+NDlhEqiOWNG8yMTxFWH7lxLETI3y5JFfPHjP8A4OOfgDJ8RYvDfwxsfiR8dfE0Lxg2vgTQpbxdpmCttnkZCwB2scs0b4O7GQRyf7Nv/Brn8IdL1iHxb8dPFHj79oDx+zQvf33iHU5o7GaVQp27VleWRUK7MSTvyrcYIA/Rf4Y/Ajwj8GPD8Gk+D/D3h7wnpts7tFaaTYW9jFETgZCpHyckZJyT3yCRQB/PP4luv2pv+CPP7Ss37TDfDrwX8KfDPxkvbqXWfAt94iV9Ehvdst0LKbEpW1uJfJkvLYRy/Jhotu391XR/sX3ms/8ABWH/AIOJNF+OMmk6ifh7pdtJ4u0C2vbe6t/K0uxjl03TioBMUcp1JHlB84xecl0CMK8Y/Rb/AIL5eN28Yfs0aL8BdB0GTxl4/wDjrq0elabpghFzcWNlZj7VfalH52NhtooyY5S3Ek+45AOPxT/Zmg8S/sSfELwT8TLrQPihpfgvxPdvqXgTxLYXX9l67q+l29zNa29rFd58uRZbe1AbTZov38CiSOWISxsAD+rGz0631ayCyIu10Lld2FfdweAx4LBjnkEMeSGbPMfD/wCBfh34aa94k1TQ9Lj0i98Yaudd1o2TGNNRvvJihNzKvQyMkMIJxg+UOOWzm/s+/HXQv2gPhX4Z8aeFtQj1Pw34uso77T54zkbWLDDKdu2XC7JIl4ikRl+bk16Wh3O23cvrg/ofcUAJDFtUbjk4HJHPA7/571ITmgniigAooooAKKKKACiiigAooooAK+Qf+Civ/BDH9nL/AIKb/aNS8feDf7H8bXG3/isvDLppuutj7Ov76TY8V3+5to4V+1xTeVGXEXlk7h9fUUAfippXxq/4KDf8EI/FMQ+LVvqH7XP7MOn3by6h4r01JNR8UeH9ND380tzIzsLqORIlW4m+2m5tI0SG3jvId29f0d/4J/8A/BWT4D/8FMvCyXnwp8dafqWtxWgu9Q8MX/8AoWv6SAkBl820c7mjje5iia4h8y3MhKpK5FfR1fmn+3h/wbW/DD4p6jefEj9m+/1D9mb476XaTvoWreDL6XRtGnuGgjgEc9vbjNrG8CSxGSxERzdyyyJcn92wB+llFfjn8Jf+C1X7S3/BK74hL4G/4KEfD3ULzwbeXcen6F8YPCOjpcafdzSXtyA959nKQNGbeOSVIoYYb2OG0UvZzPNvT9Tf2af2qfhz+2N8LLTxr8LvGnh/xx4Zu9i/bNKulm+zStDHN9nuI/8AWW9wsc0TPBMqSx7wHRTxQB39FFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRTov8AWCgBtFTSDKGoaACiigcmgBU++PrU9Njj2D3pxOBQAM20VC77zRJJvPtTaACiiigAooooAKKKKACiiigAooooAKKKUDINACUbsU3cS1Q3V0yDaqqzMcDLAe/8gT9ATzjBAINYAEfzGFjgttfPABB3H2U4POO3Ir8KP+DkLxRo/wACf29vBusNqV1/YPj/AOF/iHwj4z8O+FRb/wBprAltM1lcXsWMbEkurd4jKuEazlaNgVwP0s/bR/aa8SeIviNo/wABvhNeWLfFDxhavfatq6XY8z4f+HwViuNb8obi1yTKILWEglpnMxzDbyB/zF/bE/Zj1f47/A74xeAf2U9Qa2+Efw60671b4ofEO/1FrzV/jJrSW81w9mNRSXyryGMBRchpoI4ZLhtsQGyGcA/Rj/ggl+054i/al/4Jf/CvxV4mtbG1urewfQllhuZGGoRafI1jHc/vfnLuLf5ycgspIPWvtZod4XdtDDttBDKe3Pb1x6Cvyx/4N0fjDpuv6f8AGbwRo8i2mjr4mtviBoFiwbbZadr1nFdC2jiAEEcUM0c8YEXlDcrsUO4Gv1NtpPP+Zg2cDCsu0jPIB9wCM47/AKAHw1/wUEtP+FVf8FSf2M/iDDJoWn2Or6pr/wAO9Yu7iPFxcfb7EXWn26MBhVNzaSLnqfO28hzWN8R/+Dgj4Dfs9fEjWPDPxItfix4Bj0W/vNPi1bWvBN6NL1Sa2do5Ft54jJJK2AFE2AnAPyjOet/4Ls6VqWjfsLTePNHF5Hqfwf8AFnh/x/GLSEXM3lWGqW5uH2YJEcVvLNM7AHAh6EEivmL9r34Y/EH/AIL7fF298I/D/wAe/wDCE/s1fDHxN/wj+t6p500L+PdRMZkvRaw5zIbEiFYllHkSySTPmQJ5agH42/tuftzax/wUC/br8QfEq38caH4Vm1ie8j8O3OqtNp8nhXTLYTtbWUwhWWMzXUZGQol/fzYeSNQ23+jL/glh+0Z+zj4h/ZR+HGmfB/xB4b0Wz1qwWSHw1qWtW0viIXJIkvFu0eVpJLkPuaZ8ncNoAGEIt6r/AMETP2Z9d+A2n/D28+Dvg5tG0m0ktLK/ksYpNUgEsEsUlz9sI86WQNIZQX5WTGAMLj8Q/wBoD/gjb4X+An7T83gzxFoutPafC3Tpde16y0HUfs2teOvCgEhPiOx+1F4vt9ocx3NkvDiPzYoQXk3AH0N8GLQ/sp/8HLWrQW8kN1p2v/EvVtKvCWNtrmtR+ItLivU87dzNYW11CVRskjJ6kk1+80FxDDo7+dJDJHyd0q7YnXdn7nIxgqN3XJGR6/yp/wDBSH/gmZ4f/Y98U+DfE/wR+IvirXvh78RPBs/xB8LXsj/6fGdPuImYkjyGiW102cSxTyhXLiSLyoXLCvrb4/8AwN/4KTfsQeFvC/jr4a/Hrxx8etB1SaCHQbbw/YX+t6gbWW2Mkd1d2dzaSxGMRZHzzS7ZJUzyPmAP0Y/Ys1LR/Bv/AAV4/bM8Mw2/2W6u5vCPi11bhZmfTfJlkDZHAlBB3MAGJIBBOzwf9p/T/ix/wWf0L4geIvhvq2mr8IfhnqEEPg3w5q0zRaD8XNTsLuOe+k1BkH+kaR8higYyQxtKBJKAAqr+W/x/+Jf/AAUc+MCeNNU8a/D745W9p4u8OWfhvxHcR/DtrCG40qxmlnWItHbDEQkubpXAJE8Nw0b7k+WodI/4Lpftz/CX4exWEPje28GeGdFhis9Otv8AhWtlptla20YCxQwr9gWGOMbcBSV4AHKgAAHD/wDBYD9nHR4/j9J8Tvhvoc3hH4dfE7WTY3Ph69Js7zwP4ji3LqGm6rHL8trIJpZZI9+E8mX90PKjAHjXxS8Rap+yR+3VLfeH9J1jwPqPw38Tm+0fRNXE0c3hmeCU3Is3QSsZFjcCIuJP3oQyEDzq6H9of9rn4vftleK7/W/Gl9Y+KPGOsWMWj6lf6Nomm2iTWUaoIY7meyCRSKXOS00SvAI4hHIqKIxw/wC018ZPGvxs8O+F7fx9pmvTeLPAekv4bbV9RsxbzXmmxyg2kNyDCJpJYQ8kQlkk/wBWsEQUFMyAH9mX7OHxr0r9oj4L+F/Hehytc6L420q11qyzJuPlTRh8EZO1lyARnjoeQSe01JCYVdWXy43yGAzsPAGPfnHOBznIxg/iB/waMf8ABS6z1/4fat+zX4p1LGtaLNJrfg3dLueazmw97abm+XfDKRLtByRcSYA8oqP0j/4KH/8ABQ7Q/wBij4eaLDDFHr3xQ8fzf2J8P/DEaSI3iLWH8uKKFn4jhh8y5t2leWQKFyvLDIAPJ/2+P2wPEnwu/aAg8G/AH4b+D/iL8fbXQZ9XvrnVYXEOi+GYUllFrLcxOs6S3V3FGlrbKSjk+cSBtx+af/BxJ8LdJ/b0/Zd+Gf7ZPw8h8mzh08+F/F2n3E6PqGiTfaM29k8WXRJbeaS5jmyYzlkbaxkJX9bv+CYH7Gfiz9lH4eeLtQ+Ims6R4g+K3xO1yXxF4r1nTpZdt9LLGEigWVzuEFqA8UUUZVIUztzuBHl//BTX/glLrnxc8MfEzxJ8HdTk0fxN4/0G5sfGPgyaONvD/wARkEXlwtNvOLXUo05ivE+7KqsysMhgD4P/AODKjx7dWviT48eFTbWqadcW+ka0lwfkkMvnXVvswCcKQD8pGcqTnBAr9+HTcOf4cE+5/u1/Nz/wZ8eOdS8J/wDBR/4keEWgt7ePUvAc1zfWzKC5ubG/tY4vnHHP2qU72ByQBnkV/SLaq2zLHdt6HHDckZ+pxn8RQB8Ff8HBP7I+m/tJ/wDBOT4la0lxLpXiv4ZeGtW8S6Lqiyuk0EcVlML+2GwfNHdWHnWz+YSD+5z82GH5Z/sH/tX6R+05/wAEuf2Wf2JfD8estrXxB8YXX/CdTxLJFDbeH7fXbjUrhN8YLgSQ/MZQNqiCQOyriv3C/wCCsUm7/glv+0n98t/wq3xPgKxGf+JRdenYdeeO3evwr/YM+OHwT/4Ji/8ABJ3wH8YPAfh+PV/2xPih4b8QaZaRWupXF1JDZrq99E2oXNq/mWscUEFjG6K0WJWt+QQ0pIB4vr3jvxr45+Pur+Gfh/Lr3gPRfhL8R/HV5d6zZXSW97A2szfZpYLeQZaGU2Fr5Hyg+UcuWUM237M/4Jy/8Eete/bN1vwTrGvaXY6D+y79nec6bFcvaat48MWDAIiQJTp823d5knlySrHOysRJHMfiL/gnT4v+HHwr8f8Agm1+OGn+KNe+DunaUviPWYdNsWmtHurmTFsNRt2US3VjujH7uMgzFjj9y4if+gr9n7/grn8A/wBoP9rrVPgb4S8XWuqeJNNgim0+a0K3GmeJoJbEXkrWM0IMHyRBfNL+WMyN5fBJAB9GldH+C3w6kXGn6F4b8OWYw0WLS006zhiwWVACIo4YonIGedh5GcV+aX/BvP4cu/2iPFP7QX7VmvaIsFz8afF1xB4YeaDzZhp1oZ1CRKFYR7RKqArKTJ9nfOFUEet/8HEH7SOrfDH9g2XwH4LvpY/iH8cNVt/Afh+KBxDdXP2ucLcpG6rgKYyqHaxJEigjktXzt8V/+CiHh/8AYL/Zv8E/syfszzaP4s8SaLp6+D7vxZoapqFvZ6xKw8630u1yTqmqyOS32fzRFbGaL7TKVJNAH1H/AMFZ/wDgpxdfsleCde8P/DVdH1T4oQ2MWqXNxqUgGjeENNZxENV1GUTKVB+aO1tlYzXUxPlxS8Kfzd/YH/aT/aW/4Im6NpbfF/QNR1T4S/Hi9udd0VTbeTcaHq00oEKXMYAh09rtnhmktixYLgBY5fOA+1v+CbP/AARoWTXLP4xftAWN5rnxGuNSPiHStG1XUP7UfRrssAb/AFBsCK81Qr82SghtdsUcUSeUGP1X/wAFINO+Fd/+xZ8QdN+N19BY/Da60ryNbuZZXk8rAby5IzuM00wdovLRAx80LkHcaAPAv28f+CvPgV/+CcPxK8Y/DnxZZW/jT+zjo2kaTfxvHeW19fS/ZIXNpjdIu6XcJPnjHlZz2r85PBfjT48f8EXdG0T4f/ENtS8LaHYBdOS48pb7wT4ttxGRL+8ljEUMrRZikhlMUplKPkhgtfJXiDwd4u134m+CvhX8TvDGsaPqfhmyPiDWNO1lI43vrJ4MabJMQXWOWSKdRJGdx2lBkOmV9E+OfjX496H+x1rXwP8ABfj2/wBa+Ft20Ey+HNTma51KzihYg2NtM5+ezJcv5Eu9d0cewKTmgDx79nbTPij+1F8dvG/wo+DvgXwnoOnftDWtusFqGmWHQdAtr37ZiG4lmkktLQzReZJGd/KpwP3dfrX+wX/wa8afongnT2/aI8WX3irVFliuZtE8Lz/2fpNx9+YNe3EMUVxe3Qe6u4jceaN0bBcfKpGH/wAGxvwH0nx749+JH7QFmbjw3JDAfh3ZeCH1VtWk0C3iWwmlM08v+kLHJdwSCKNi4jjaWPLEbq/aWCG3RDIq7FYALtBX7vy47E4x39eKAPLv2aP2Nfhj+yL4TTRfhn4I8N+DbHLbk0uzWGaYlt26Wb/XSt7yOxI65wMerQWCx2wj3SKVwSFbaAcAdB246dPapo9rKD/SnAABsUAVUt47Zt0aquAF4UdASQPXA3HjoO2KhnYys3yhVIwxGeckZXHXkA9PT3qzIfnVdwG44x3P0/xr47/4K5/tj6x+z3+zVL4f8A3FrN8Xvild2/g3wLZLORcf2lfboWuWjALLHaoJZt+Cu6OMHjIYA+Dv2zvjHqHx3+JH7VHx/wDD0s1xa6Lo1t+zh8Mbi2QzPqWsX9xDFqU1sjSAllkuTGssWOAc5aPdX6Nf8O+Ph74w/Yn8MfAbxt4N0nxP4O8L6Pb6VFbSeYzWksFq0ZvLbc3nW8hDSeXIs3mRmUgEjivyO8fftDW/7B/7dfws/Zr+IXhu41j4G/sua3aeLodT8PWn27WtSmudMX7NfXlvuy3+n3U93J5I8z9+ML+74/bH9mj9rn4ZftWeBIta+HPjjw7410eaI3IOn3aTug3HO+A/vkk3HkOMAqeRgigD8ff2c/GvxY/4IAf8FB4fBPxh1Rf+GW/itrdzBYeK5pjeW1vfZMkF28m0JBdSj7OlztjjjfEkuB5TEfuhoOswanEZreRJrefMscquCJA3zDofQ/iCO4IHG/G34FeEf2l/h9feE/H3hzTfFfhvWCj3Gn30fmQyFeVxjBGMkmRSMFgASCwrzr/gnz+xPffsJ/Ce88Ax+OvEHjLwjY6nJJ4UttVt40l8NaX/AMstNEo+edYjuxJJk7WUA4GAAfQqSFsdOnNSkYApgT52Pqc04nNABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAGf4s8J6X498Laloeuabp+taJrVpLYahp9/bpcWt/byoUlhlicFZI3RmVkYEMCQQQa/JP9ob/AINt9e/Yz8dap8bv2AviJ4g+EvxM0zSrmGLwZfzx6ppGvxNHApsop70v5e/ypZgt99pia5a3Ia0WJZE/XyigD8o/2O/+Dki88E/Gub4M/txfDv8A4Zq+JkW1bDWpYLqPw5r7PfzWoZN4k+zW42qFvDcT2coguZDPCqojfqZ4T8WaX498Labrmh6lp+taJrVpFf6fqFhcJcWt/byoHimilQlZI3RlZXUkMCCCQa5D9pb9lb4c/tjfCy78FfFHwX4f8ceGbve32PVbVZvs0rQyQ/aLeT/WW9wsc0qpPCySx7yUdTzX5J65/wAEcv2ov+CGeo658Sv2KfiVqHxU+H1haXd/qvwi8ZpNdSagWgtY3mggtTFDe3mYmmDxLZ3AS1igQ3XmNFIAftXRX55f8E0f+Djb4Sft2/EK++GvjjSNQ+APxo0q7/s648J+Lr2OKO9vTevaCxs7mQQtNeK/kq9tLDDNvmZY0mEUjr+htABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFOjOHFNooAsVXPBqwDkVFMMPQAypo49v1oij2jPf+VOzQAE4FQySbz7USSbvpTaACiiigAooooAKKKKACiiigAooooAKKKKAClGcGkqG8kKlArY6kgDJYd8Ac5Gc9D0x3FADwzKW+Xd6ADqfT2r5s/4KNf8FCfBH/BO/wCAGreNfHOpQWyyQTwaLZBN02tXyoZFs40JUbyqMdxlj4ztycAfLP7Tv/By58MfhX8SfHHgHwb8Ofi98TvHPgfUbzRtTsNK0U21rBPA7xsHm3O4TzI2Afy+QpIr8+P2i/8AgqR8Sv2/vj54Z8U+K/2aNJ8Ef8K9Wa68OX3iDwbr3i7yi0cPmLJFGYbOUFlicSSQ5iMSYJ3NkA+lP2Ef2T/jH/wUb02HVPiCuqeFfg18R5ZfE3xC1iMSaL4k+M+pyIq232UrGtzbaFDGbdIYj5WY4fMPMoWL9JfEPij4AfsOfC/T/B+rax8KfhX4JW0uobLRrzU7PRbIwkkXJhgkKiTJlKyk8lptxIL8/kGP2qbz4xyC1+NP7Qn7dvi7QQwibRPBfwhPgu2lQAFoZjbyPLLhsZZip6/eycdv8JviD/wT/wDgr9purf8AZf8Ajh4i126eKa71jxd8OdR17ULqaPkXDPcTSBGYg+YIBErllJGFGADnP+CPGpX37Jf/AAVNs/An264tdHvW8U/C2ez1ZsyXdvp12uqaJPMkWDLcC0uJI43w0Ith5cXl7d1fvHdPJaL8iySKWww/1jFyAAvX5c8HJO0fjkfy8aHDqHwq/wCCivnfAmx8XQ+GbXxOnxM8HRfEBrnw7eWEmnWNxNqejmW7OZVlsP3LjzojJHFblnbyW3fr74D8LfGD/grt4I03xxrnxC1z4KfAXxUr6h4Z8OeEwbHxV4hsJjKsEmpam7E2yzRpu+z2ylSHQtIcLQB6H+0//wAFIP2dtT+Kun/s++MNctfGep/ErUn8D6xo+jxNfWemy3cMyC31WWGUraeZ5U0flgtMd24ARxzsv0x8B/gJ4V/Z4+F+jeDfBWi2/h/wx4dtfsen2NmcxW0RYuQC2S3zE88jOSCCSB+e/wATv2ePBZ/4K5/szfBn4b+GdJ0XwP8ABvStX+LGs6Vp8KzxXl/I32PTp7r5sfalnE8kdzKZHzKxyCAa/Ty3RYrLhgyKgOVOcoBgYP8ATJ/WgCVINjMyqq7ssSoGSeASTjk4AHP+FfKf/BTb9gbTf24/hRHJaXV5oPxI8AtNr/gLxNZy/ZrzQNWihItpGuMZNv5oj8yNj84O7IMeR9J+KPFVj4J0a41DVL2z07T7OJri5uZpfKjtYf77s3HH1HWvjmX9rz4pftr6rdW37NcehaD8O7PEF78WfFdlcTabev5rR3C6HbGOP7f5PlOBczPFas/yr5wAagD8X/jC+vP8Vfhr4f1zw3Z+FfAuveNL3SvFWivYGZ/hd4s1q1lstR0MR+cPJ0e5k2ajaxKfLkgEphlmlhlr9uP+CGHxgm/aD/4JL/A/Xb46gl7Z6AdCuDdXPmXE8unzzae5OPl2lrYMOpPy7uQRX4x/8Fav2BPGf7PX7VXx18OeEPH3jDxhFefD7Tfirr9nrV1DqFz4phtb1YdQv7mRnEVvc2syl0WOI/uWmjA8omOT7a/4NlP2iYfh/ovxM+CPjPxtouseOINbtPGWjype/ap/EVlrFnDeG6ikkk826lKuskmA7puAY7vlAB+wZsBc2ZjHzNtC5x8rD3HT6gDFUL/wrbapZSWt5D9ohmQLJFMfMg2gjIEbZUNjOCAMYrSsZ1eH+5x6MOeefmAODxziqmuXy2CwySNiOOTzHdmUbFUEk4JBPYcZ+9QB+cH/AAXh+F37OfwL/Y+8TeJvEXwS+G/iD4i+MHTQPCEy+HrWHUbrVZkzbsbmPyZvJiYGSVvOHyRsMN0r8wPh78GPgf42/ZT+J3hPxBri/A/9oq2sZr3w9dReMr7S/Cfje1glEyGKGTzI4pStvLE8MoLed9nmjJ88eX6P+3f+1dL+3/8At76541t5Nngn4ai48F+D7a5O6QzxSbtS1FoWGA8kpMCrwSkSepLXv+CVXwL+Gf7VH/BSn+zPivq0Mc3w8tItc8GeCr2GKXTfFOYJhNfz8APJapDC/lgbh5Q565AMX/gmF/wQV+Mnj79mTWP2hrrUG8F/Hu7Sw1r4SwX032HyLiCZJTc3kSptAuol8mMSHHzyNIpMoNfq5b6t8P8A/gth/wAE6LhbjT9U0P8AtqKXTri1vY1tdZ8Ia5by7B+7b/j1uYbpUZZdhOzkY8zNfYqWmbaaOaNot64ZhkKuV4OMAfKQFG3J4UnpX5O/8FM/izf/APBM7/gor4L8SfBrxN4cs/Fnx+vzb+Jvh/qiSyaf4ium3WtrrF1Ivmy2ccPmMJXjXEotGOB8pUA+t/8Agk7+1B4g+OfwHv8Awv8AEUL/AMLt+EeqSeF/iDaJAYyb6JmMF0hbCSRXdt5My3GQJtz4xhQOD/4Lv/t52f7HX7GOs6ZpOvWOjfE/4jW02geEPO+YrPIYY7q7B+9GbeCVm5AIkkT5JccfPfxb8Ex/8EkPGOhftKL8Wbj4jeKvEV7/AGZ8cVbUDNL4wt5JIIhfabp8bmNJ9KJIihUkpbxvknLPX5Q/t/8A7an/AA80/wCCsGpa/f6hdaf8P9SmXQPDVncJJFJf6RG4aNFAB8v7XLG0uSQR52ORgkAy/wDgnF+27cf8E7/+Cmtj4+8NeF7y18CyWM1tqeh2sn2jVNQ8NSJH5jsZDmW4wkd8ULQ5ngPEMZEdf1hfCX4q6L8YfBGleJdD1S21TRddtIrzTr2LKreQyjdG3pyDnIxndwNu0t/Jd8ebC30D9v8A+GetfutJ0/WIoI0uFXCTypJJDnHtuij2t6Dg5yP1L/4N0/G/xXtP2nviF4J8JX1vb/s/+CY7e413Rr9i66Vq9/HLL5Oj9kh/dtPJFjapJ2pEZStAH6Y/8FZs/wDDrT9pBXVU/wCLXeJwQxxkjSLojBxzzjA46V/M98L/ANjD4mfA7/glFo/7QWg+H4fFHw78d6LqcGtX8AS6v/Cd1Fqd7p8bPFlHFq6oGVlZljlkkdsgqo/pd/4Kmo0f/BKv9pFZXaVl+FXihAxyA5Gk3XOP5Hv+Nfk98PvHGo/Dj/gyes9Q0lYGur201DSrgvEHb7Ld+Mp7WZV46lZe57Z7UAfn7+yzrdv8OPFfj6a6uprfTfDPhXQPtDPLuaOM2EskkYPYfvHA2jBCk4AJYan/AAS603WP2Xv+C1PwD1TxPNH4HXxjqNlrYgtpZbVLey1e2kNtbuH2hRKsqjZk/wCtYDj5h7J/wTv/AOCXnjj/AIKB/GTxd/Z+p+D7T4U6B430vQ/GE17dMmq/YrC3g8tEjVdkoniiWPaCMPtYYGRUH/B4NJZj/gpx4Lt7VoUjs/hpp0EltEELWzHUdTfBjJwknkyoVHJG5SMZUgA9N/4LX/tCz/8ABSD/AIK6/DP4f/B+Pxx4/sfhTpz2CjwXJukfVpZWNwsN6jhbeFvLtrWa7aTykZJWOREcfp7/AMEuP+CQvw//AGD/AArp/iC+8O+G9a+LWpW7LretWhV7bT5XBEtnpitGDb2oyYjtw8pDCYyYOfyA/wCCcn/BIP8AbS+Ff7OXhn9pL9nfxhpmi69440qaY6FDN9h1C6sgZhEHjuoha3Ak8pXRSRkvHIS3WvsTQP8Ag4Q/aO/Yo1D+w/2tP2ZfFGkw2LD7R4m8L25SFgoMSzGOQy286mVY13R3MfHIVjhSAfr18R/iJ4f+B/gPVPEvijU9N0Pw1o9s95qV/O3kxWkEf+slcr1X5h0Gf3i9RX5//svfC7/h8B+07ov7UXjyHxPa/CnwLqUUnwZ8K3gexN55Q3Pr97bgkP5lx/x6jKhY4SHWQncfMdN/bI8P/wDBer9qSPwDY+OPD/hP9nHwPe2V5q/h2/1GG08TfFDUCYZk06WxlO+PTom/dyqcq8kR/wBYVBg/WLSbeLQ9OMfkx2sGPuC3aGNDhRkr046ABicLwSPugH5V/wDBwR+wz4lsfGuiftOeHYJvEEvhHw83h3xnYTahb26waNFLLdx3NtBIiia486SYyfvS20II4WOQPgLw74i07xZoFnfaXfR6jpd3CJoblGwLhQhDNg84xvIbAHDBdrg7P1k/bjvZP2/P2/vh/wDs12ouJvAnw3+zfEz4oh9phuPLkB0fRpDyv76UC5dcn5I4xnJr4O+I37A17+2H4o/aj/aU+BlsnhzRfDHid7Hw94NsLQi18fPp0R/te7liB/cXM05ZohGI8tCRJETKHoA81/4Jg/t8aN+wP/wV81CHxh4gsfDfgD4p+Fba28QX18+21srqJXksbmWTgoD5ZjL5ABuwXJKk1+4Hh3/gop8FfE/j7XvCtp8XPAM3iLw7BDe3dp/btujNbSW32oSRySyYnjEWZDJH8qLnOSDX4k/8EDr/AMM/tOf8FY9Q8T3kWrWun6Z8J7qVrC9003Ubi6uYrQx3MAiIlttl0ZSxPlfdLNj5V+wf+CgX/Brz8MfjJpGsa98FI7P4deIL2d7658N3sAk8PXtwGP7iKXPmaeQXJ/cloW27TE6gBQD9WfA/jrT/AB/4fs9T0XUrDWdL1KLzrO+srmO6tLpMkbo5oyVccY47j3wN6GbJPysV6HAr8Ef+CX//AAUT8ff8EWH1b9nn47+A/ETeDfB94L06hp7DUL/wgl3tmYeXEfKu7GZ2lkSS3xJCzv5sYBjWv3M8FePdL+JHhix1XSb/AE/UtN1C3F1bXVncedDdxHOGjYEH04IHUgE4JoA19YRbm3dGEnlvhCNp+bcwA6c/kR+lfmJ+z74CvP8Agov/AMFq/F37QNxLZ6h8Kv2f/O+HfgK5jmaKS71pRbJfXiQ9JYYZLm6i8zzADmABHKuaz/8AguX/AMFh/iN+wP8AESf4ZaH4HhhsfiB4Hubjw741kupT/ZF8JzBd3UsUIkcQWttJ5hwm7cynJAK12Wt/Gf4b/sFf8EFGvPgn4k0zxnpmj+FotC8L6hp0yH+19b1QCCJ51IBWSW4u1upYpiHTcAQCoIAPzn/b1+G+pfGTxR4p/bY0mTW7jw3cfFLVPANxcRK9zb2/hW2tks4dRMMVvuhDXkF2xkll3RGWzyrDiuBsvBv/AAi3xHi8deDby48C/EG0ze2Pinw6xS5gIXdyi/ubqGQo0Uhud5Pc+n76fskfsk6L+zf+xJ4J+Edxa2Gs6f4X8PwaNqCXkKzw6jdBB9omliJlXbJdSSSFDlV4znC4+Dv2wv8Ag3Zn8KS6l4y/Zj1iTw7dxyrer8N9ZvWuPDdwBskdNPc75baSaResuYg00n+qVVCgH2L/AMEk/wBuO8/b0/Yx0TxprcOk2Xi6zv7rw94msbIbbOy1O1YrJFGfMkzCYvLn2hyAJcZ7D6yt0G9pNv7xuHJUbmIJHJHX/PrX84//AATe/b+03/gnH/wUZurf4lR3Hw503xRH/wAIt8RNF1CaGZtIv4V82y1ESxtKs0JYTWjyMwxHJkcnFftN+xb/AMFYvgX+394j1XRfhH46j8ZajoNjHqd/Gmj6hZCGGSRogxa6gi+bcrfKMnA6DIJAPpbvRTUfLFf4l6/mRn9KdQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAHzj/wAFAP8Agk38B/8Agpl4Wez+K3gXT9R1uK0Npp/iew/0LX9JAScReVdoNzRxvcyyrbzeZbmQhnicivzi0bw1+3R/wbk/D3VrqGTT/wBsX9mHw3aLeXC3F/caf4i8G2VtZRQAQpI87WlmrshMcIvoY7ewkkK2XmSOf2rooA+Uf+CaP/BaL4D/APBVnTr6H4Y+INQtfFekWn2/U/CmvWn2LWdPt/PeFZiqs8M0ZIQl7eWURi4gEhjeRUr6ur4C/wCCkv8AwbxfBv8Abm1geOvBR/4UP8crTVbfWbPx/wCE7VoZjdR3UlzJNcWsMsMc1w8kryfalaO6EqQsZmSMxP8AMPw6/wCCkf7ZH/BDjR5NA/bO+HviD46/COx8iOw+LHgmaLUJtIgS1ghEN2XjhM2+6ltYll1E2s7ytdOJbz5FUA/ZuivIP2O/2+vg3+394Fm8RfB74heH/HGn2m37ZFaSNDfabukmjj+1WcypcW3mNBMY/OjTzFQsm5cMfX6ACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigCWE5SnkZP0pkSbR9e1PoAKilk3HHanzHCVDQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFQahafbLZl+b6Bc+4/IgH8PrU9Gzd68ehoAzbLwrbWs0k0Ua28s+fOMKeS0xznJK4Oc9T3zRqjfZmz/pDSZ3KqzbWYjoo6A9c7WzkA8HHF7bl/wCZJ6Cvk/8A4K+ftY6f+yV/wTw+KfjBdQgs9auNEu9H0CL92011qdwhgt9kUjDzWRpPMIXpGkp9DQB9L6DrVrrVtG9jcfaItmwSpcmQkdRkt8wP+8M+5rVmtfLhVVabO3aMS7TzweR3weM9wK/EH/g2U+O1v+y78Q9V+AGuXxjs/HWmw+LvDPmXfmwHUbe3SDWLOLHyrIfLS5AAAKpIvXBH7cPesNwjjyY2wy57jkjOMZA5ySAc0AfBf/Bd/wCHej/tGfs/eA/gvPa2Ou+KPi1450nRdDhmthc3OmWscom1HUIWMscqGCwLF5Q7ZMoi488CrX7e/wDwVx8A/sCeENQ8EeDbK88XfETRNBLwadpVm91p3hK24s7e71i5GDY2sMgjEplIkwgGR8pPE/tr/sZ/tHftf/8ABTjS9Y0LV4/hn8H/AAj4Ul8OW/iyO+t7rXbd759+oz6NbRsRa3MkaRae1zdf6pPPlj+Yptm+Pf8AwQ68NeFPg9pMn7O8tv8ADv4l6GJEvdY1bzdVh+IdvKc3dj4g3OGvoLmbyzIJIZWiffsh+dTQB69/wTL/AGNPFXgKPU/jH8YvFmk/EL43fEK3ia61jTUP9m6HpEnk3MOj2XOJLeN1VxKRufcpz3P2HAjLGTnPzHAxgY7D8uPoBX5Rf8Eb/wBuxvhT4nb4H+KYNc8N+FW1S50bwi2vzGS48K6rDJ/pfgmafL/aLi18xJbJwSbmzl6q0JjX9XLa58uHbIwZk+Tbu5zzgdByf1oA+Av+C3yp4u8ffsm/D3VoYdQ8G/EX4x6dYeJNJuYRLba1bRxSyrbzKeGi3gEoeGxg5GQfua30BLC0h8hNsccalVj/AHQRsqcls5xkcjnO48MAFr4Z/wCCzn+l/tQfsM7l+f8A4XhZkbT93FtL8p/DOSOmOhzx88/8FB/+C6virx/4j1j4bfs3vo8OjQBdO1j4nzz+bHaXRBNxDpEOCJ5IkKgXJJjDk7VI2S0ATf8ABVj4+/CvXv8Agqp8F9B/4S+T7ZJpWvfCb4g2mkpPHLoVprln5Fit1dwxtFxcO0kVvIMKVDnyyGz+Qn/BOP4e/DnQ/wBofT9E8VeP7rwx8TPEmhXB8C6xHcyWP/Ct/FlvqMwtI9Skk2o6Si18vb+9jK34VvLLeavoH7Tfwdsbn9l3xBp1nY3V1LbwnVWvHBu7q8njl86SR3YiWaSRg3muSCflbAPA8o+M37Vfwn1P4UxeE7Xwy2sQ29httrezc29ppEssGQyTkB2IbBKiNgSoQ7wSCAf09f8ABN/9s6b9rP4IW767YL4e+JXhWb+w/Hnh14Ps9xoesxkrPEsTMD5Lt+9icM+Y3GfU/SCJJfLuO+PaSFQKykH7u7LAH+90GMGv5qv2EP2m/ij4R1HUviv8Rvil4m+E/wAQLwab4asPGU1hBqHgm4FpbmGLT/F1tAvmxyzQyxyWt8+fNS6MocJHtb9eP2TP+Cvfh/xhrGm/D34z2+mfBn4uagqXdnpV3qMc+heJrSVEjtrrSdTRvss0MpZQIvMEglDpjOKAPhf/AILh/skSfse/tkx/GPSLKOy+F/xelSw8RLbyytBpfigAtFcTiTIhiukBXdEFHmQqWPIB+KviT8ZtS/Za/aw+C3xQ8Lx6tN4y8H6w97JZaWokutW0qFRJexD5gBC0IuULNC53BsnBAr+kv9pn4A+F/wBrT4E+Jfh74xsJtU8P+KLSTTtQRHImA4QvCZB8kyMPMjZQfni/iAIP59f8Em/+CHHi79ln9pHXvHnxul8H+M9Q0PS/+Ec8F3emzXMkgs5TexXV7ceaYsPLFOkbxjeB5m4FeMgH3T49/bR+Hvwp/ZJvPjdfa9awfDc6ND4gh1SXYrXUDwiWIoGUb7iUvHDHD1MoRerYr+cj4v8A7RHj/wCIn/BS3UvE/wAW7OWPVvi9o1l4g8GyXLxCTR9FvFe50y2ifZ8v7mXyPkw6S+YGYOCF/UT9mj/gj78RNQ8X+Hfgj8XdP0vVP2Ufgfq2r6j4St11FLyX4hm6mlksItQRR5irYRS3PHBaWTgeWNo+HP2zv2Jde8efsKeONFGpzS/Fj9gTXbrSY7sWpkl8T+GLm5S40y5hYbpI1tY/NcK3m4ETZcl+ADJFvGJJZII7WGaZPLDfZl3vnlVyBlcE5yCNu3AAzx1n7FP/AASS1X/grN48k8dX8VvpfwR8OadqWmeG9UiupLO713WfLkiEto0UR861tbtY8yusStMpVN5ZhXn+leOfgb+0j8Pvgj4bi+Mt94TvPifIg+I2t3MccEXw/tsFPs55OWuLiKWFLzmKGKaOWaOEsq1/Rz8G/hF4X+Cvw803w34W0XT9A8O6bbR2dhp1shCW1vlvkwwB2jOcNyQCSAzNkA/ki/bWm1v4Y/E/wha+P/KtPHXwx12fS/FGmzRf6y5t50kMkJGQ0M0KQvDMOJRNwSAS39F//Bv5+zFcfs4/8E2fB8+rRvb+LviNJL4511nT98LnUMSxZEilwUt/LTLMxJ8wknjHxp/wd7fsUafqnwg8GftE6dp98/irwbrdtoOrzQnKXWmytNLbmRfuhorjEQbGT5+DnAx+xXwe8UWfxF+GHhnXNPt2s7LWNLtr+C2cYa1ilhR0jIyfuhsenHFAHlP/AAVUhjs/+CV37SSKuF/4VV4nVfbGkXWB9ABj8K/EjXdZuo/+DTr9lvS4bqaG11j4oCzvbdXJjvoTr2uSCGWMEb4zJHG3sUFftz/wVbbd/wAEtP2k/l4X4WeKOfQ/2Pdgfzr+cTX9YW4/YL/4Js6N/aDSK03jG9udOSYqqqviWfyZZE6ElkmCufuqknuaAP1z/wCDY/SNLb9lb4t+JrWGSC51/wCLGrwz/vP3PkW0dpEiFOn/AC0YZ7Zzxg1+K/7XOoXv/BXL/guh4g0fwvdTalY+PvHMPh7TLnzC3labayrbi6O1kAjW0t3nyAcRjn5hur9Ov2BfjTD+xJ/wbYfEz4sR65ZtP4t1XxNd6JPbRhn8+5vRpcEQRpY9w8yISkhtwTJHK8+S/wDBpF/wTtm1XU9e/aU1vcbHQ4tQ8I+H7Sa0ki8y6kiiNzeeZwQqRSfZfkEhLPOBgxEkA/d7wl4b0z4f+BdL0XS4I7fSNBsYLG2A2MlrBFGIkUgHCjbnnjCk9ga/MX/gon8fPiD/AMFYPi/qf7MH7PMqXPw70/UksvjF46V5P7M0yIAM+l2siSjzH2QvDLFER5jSxpmIGWSvVP8Agp/+278RfHPxd0/9mP8AZka1m+M3iuAv4n8TeZIV+F+kH7P/AKRcuqnZcymRfLRG8zGzEZkeHP0x+wt+wp8P/wBgL4DaT8P/AADpCWum2P7y81Bwst5rd39yW7upAAJJpAvzHG1AxjTCg5APDPj9/wAEB/2RPiz4WtvtXwr0fwa2i2b2Vtqfh28k0e5sUijKxzM8bjzZIox9oDTLIWKAtnivzm/Za8ZftEfsJeDYP2w7fx58TPHv7Kt1qt/Pd+EvFPi2XUPEmoaB9qOn6dfvFcRlFlkkeKRmi8siOMDlXGP1U/4LRWfiCT/gm38Uo/C66q00mltNrCadKkeoXGjLNE+rLbPLuH2n+zxdNGACSUwOgU/DnxQ+O3wx/wCCl/7UHhn4S6R8Rfh34U/ZA+CUOlXeq2k+v21rH8RL0xw3Vlp0UVzLsa1thbwwyFmDGV5sBhkxgGhpHxC8Vfsf/wDBFHxJ8a5rmPUv2h/2qJra6Oq2Y8+a71LV5fK09I0jcoTa6fIAI7YBR5Y/dErIx/Rz9ij9lzRv2Of2TvAvw10K3Edr4M0mLT124R7u5JaSeYSn7yyyvJICDg+YRwcgfil8O/21fgL8E/8AgqtpvhJvidq3j/8AZz+DMV54q+Emh+HdHn1uKy8S37QeRplqIfMe5EXn3K2zTGOOORhGD/HX6BW3/BaDxt8SrRpvhX+yD+0p4oVo2hivNZ0y28O29vdryttLJNLKdm1UElxu5Y4/uhQDw20/4Ir/ALQX7Fn7XnxS+N37PvjLwmn2vUI/+EY8EXrulnq2hyPLc3+hSC5h8i1/0gQG1aKYon70/ugCW+3/ANkX9sz4YftzabqGq+G59S8O+ONEY6f4n8Oawv8AZfiDw7cFElktbu2blgvkgeY3mlTFIAP9YB8SftFf8FhP2j/Ad3qFl4ob9kP9ne4jhntZ9E8Q+N5/FXiWBow7m6httLDxSgbgkdtLD5jykAE5JT5f+I3ww+MX7cH7U/h/4sLr37RHxE+JfguW3tND1rwF8GrfwjpR80f6O8Oq38kcwjGHEz3VqqqyyQsI4n84AHff8Fo/BupeGP8Agr417dNHPpmsfC3TZbWXzona6NrfyQSNLEQzEnzJFAkjZdzBQTghffP+CKX/AAU1+C/7LH/BOdfBPxI+KHhfwXq3wn1/V9Aay1zWbdtUksDdfa7eSC2jzK8fk3McWTH8ssMwHGAPhT9qyD9o/wDbr/4Ku/s//Cf4o6bofwh+PkPhu506/wBUS7i1DRdWtG+23gnEFtJOV82COSHys5MxMv7rnHhfjL9hjx0//BUbRvhl8RPgH4o8YeNNYhOnyeHtJ8SnQbDxDdWyzBru21Ga1lAszaxRTkjyzyu85yKAPWf+Dgn/AIKX+E/2rv2z/hp4l+EviCz8WeBfhdpsk80lpo86LGbq5i+1zbpoo1kt5AYYgDko6nnD4rk734WtpHjbRfH/AMLLq18O+MtJ1qx8TWUzXMkmm6vJC4urb7TbbWVi8qxjzWzjJySOnoWt/sa/Cj9nHxnbeJNQ8E/tafs4+INOnjmN74i8C6X8SvC/h+wjYK0kLlQ0DidH/egvNCQRg+bXnPg/4H2vwymiu/hn+0V8D/id4Tjjkkj8Dz3Vx4Y1yYrIZGFpp2qxKkTlQZTHJJskZWVDmRSoB9Efs/fG7/gqR/wVO0K78QeDfGOkeA/Bf/CQTwLqHlafpEWkSQyyxNaEIsuomOA7k8qXzZyPLbMuSa9y+G//AAbP/Er40arZzftNftS/ED4iaKYXub3RNF1S8kaz1SQhfNjmvDMhRVdxzaxMAVwI+S3zz/wSc/4K36H+xF8YdYX+zfFvij4d/Fu4hlOkeHoBqGs+H/E6QGPP2P5RKbqM4PkMS32ZXy2cV+nnwp/4OEv2WviP43h0C/8AiNP4B8RZ8m50rxhpd7oj6dKDj7JcXMsfkpLuLMP3vKqQyggEgH5+/wDBAf8A4Jbfs+/tvfsU/E7wv8UvAmn3fxG8H+MbzQdR1Hz7i21zS48W32YmbPlRvvju0O1CWCAMODu/cz4Y/Cbw98HfC2m6F4a0u00fRdHto7KztILZY0ihjARFzjJwEXnPO0E5JJP4o/8ABup8ep5f+Cwn7YHg+yuDqXhnxVqms+Lba+ju/Ms3a21/yfNgziOUTJqCneAMeVGADuyP3SgnSVmXcpkUnIBPBzz19wenGcjtQBKg8scfxEk/WpCMAUwD9KcTmgAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigArP8WeE9L8e+FtS0PXNN0/WtE1q0lsNQ0+/t0uLW/t5UKSwyxOCskbozKyMCGBIIINaFFAH5Z/td/8G4Fv4G+IU3xg/Yj8cah+zb8aFu4ZZLC31OeHwjrMJvTc3EM0CxzNDGz+Swt1SSyK2ccJtFDmVOP/AGaf+DhT4jfsQeIrT4X/APBRL4a+IPhT4mk2RaN4+0rQ2u9C12KGxjkne4No80ctwJHh3vpoliEl6I3htBCS36+Vx/x9+AXg39qT4N+Ifh98QfD2n+KvBviq0NnqemXikx3CZDKQykNHIjqrpIhV43RHRldVYAGh8Lvix4W+OHgWx8UeCvEvh/xh4Z1TzPser6JqMOoWN35cjRSeXPCzRvtkR0O0nDIwPIIroK/IP4o/8ETf2gf+CWGsX3j7/gn78TvEFxpNxqsd7qXwU8WXkN1ompLNdK1wbee5kjiXbDDZwZkKXn2eGbF+XZYn9A/4J7/8HLfgX4teIrn4aftQaJ/wy78bNF+zw3Om+KluNN0rU91iLl7gS3Uaf2du2sywXj8pNbCOe4eQhQD9PKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAJIVyvTvT9g9B+VNg+5+NPoAjljxyKIoscmpKKACiignFADJ/ufjUVPlk3cUygAooooAKKKKACiiigAooooAKKKKACiiigAooooAKcvQ01VLN/Oo5LjywxGPlBLJ/EAAT+tADZ2ZGUjpuAJx05GST9M/pX4l/8AB1j4svPGnxU/Zj+GU63Vn4T1jXLvxBf3N0vlWeoSwtDEkEcq/OsqxNKflB4uos47/tlLOv74q21owQWDA7OccjOOcd/8a/P/AP4OGv2Frf8Aar/YV1rxJpK30Pjr4Nyy+NvD09soVpmhhBnt9/lvJseGMYSEpukhgBJOAQD4C/4Ja+A7j4v/APBYD4RrPb2t5b+DNF1/xpeNcXLbYsxRWUMkaZ4bzp4DxwV6rnr+/dtZ7bby9z524HOflLE9ehyAB6ivwN/4IE/tR/CXw3+0l8X/AIw+MvHHw58JRaZ4P0jRdKbV9ais9QkEiPqF0kMMkhErDyYY38vndFjsGb9CPGH/AAcZfso+FdRihtvibJ4gilG5LjQPDepanawjcBseSKI/vMclVBxjPsQD7ovdkCjzPna5fZtJO1yRyCMEY2g9eBtz1ya8v8EftOeCfi78T/H3gHQPEFtqni74az29r4j0jymWfT3uYjLEWLEeYPJDEFeSEIJ55+OvCH/BbL4ifte+DrfUv2f/ANk/4veMtP1NSlprXi6a18K6NLJnfxMZZt8bQCQB0J/eFY+Ccn8pP2Fv2pfjZ46/4K2eP/EGnfE7w78I/E3x91jUtMstSutCj8WadeXVrcQtDYW8rhUMcUb+ULncAPKIIPGQD9Ev+Dgr9htrPwvq37RHhPS5JL3wzoclp4xt9Ojmg1CSOCFn0rX7RoliBv8ASnJlDyS5+zeZCXAwC7/gkP8A8Fmfg34L/wCCTPgu8+KvxMj8M674Mil0PV4fFN68mpX07EzRXVtGGluLqORZUEZYrnZcdFiyPyr/AOCjH7deu/HKx8ReHPC/7TXxe+LC2emTDxB4gvtSi8FeFbzT5wu+yttJixPfK88qoXk+TiP5GiPmnwn9n79mlfiJ488CQ+H4/H/xmvvE+gede6d8P4JbfVvBd+8ixxRXEsttNFLDCDDIYzLHEQ6gyREFQAfa/wDwWR/4KvRf8FGPiR4a021eb4f/AAn8EXJ1HSRNdFvF3iS4Mc8JlitYstarIpMeyUb8KWbCymJfHv2FdautT/Zk8Nu0zSSWYvIIwi7YmjiklEWcY43bFbgkjC4IJFd38WdB+FvwF/4JqaHHY+D4dF+IngvWo9Z8J/FKztpBZfEh4isV9pmoSTZuNIvoreR0+xXP7tZLPELfvCjeEfs0+NvEXxg174f/AAo+GNjJFcfEDxpc6DFq/wBhljGni5v/ADVa2HKsYbWVZXdixjjmHGcOQD60/Zu/ZS13/goR8X7rwPoNxJo/w78Ny+f8SPFksoht9J0xEDyafDM2Qb6RPNXOR5a7pJAT1+X/ANsz40eGP2jf21fGk/gvwtp+n/DXxN4Sk8K/DMNaxr9m0zTLbZHdgNH5hEr20rbZGMoMpUkjGf6bPhF+xN8N/wBn79llfg34c8L29r4DmsJ9I1CwkYt/ay3MBhuXuZQA0803mYklbGQWPHljH8zP/BSb9njVv+Cc37WnhT4ca6099B8PfEMV94Wvb5BbDxRoN25lR3kGSpjeI2sxPOUzg0Aez/8ABNz46yfDH4qfA7xNodnP4g/4WRLp3w813w7NJuTxhZ3H+iyR3eQVaSCTNxG8wcqiSrnZhR+hP7Z//BH7xl8IbtX+B+heDfih8D951DXvgj4odfKmu/NkikPh+6uIZTpRxIzjy5U3SKR+8DLHX5K/8Esv2jrP9nX9uP4eazqWhTa58OPhn4ruIH1K7WW1iSHVbk20GotH5TFZI0l80b8YRXA5ya/rGsYI5BI0zfMuVBx8+dxyw7/eBwRgHAIFAH47/sFf8FJNW/ZJ1XxHZ+Ida8YePv2e/DpgtLs+JFJ+IHwPQAHyPEFgbc3Nzab5kSK9ieeOJLc8oGMK/rT8MPir4f8AjT4N0vxV4W1Kw17RdahW5s9QsJ0khu0wPmMifLwGYfeI4OMnp4h+2j/wTK+Gv7Y2p6f4gki8QeCPiNocaxab478J3Z07xFaRgbBB9oX5p4sMT5Mwkj+VvlBYk/mJ4x+F/wAd/wDgkp8SJtUttY1LwJperyjUbjxb4X0CS8+FfiSXaonu/EGiw7pNA3ebBEbq0GxjHu8n93kgH7nyxpeqrSfNHllkyDtZSGBGDjj7pPGDwa/K3/grl8KL/wDZl/4KB/Bf9ottPuP+FRarb/8ACAfGieCQtHqFhcf6HbyX0GSZY40u5f3yoZFWIAsCUI+mP2AP+Csnhf8AbKvrXwzqWkX3w/8AiY+nRayfDGoTi8h1TTpdhjutO1CINDfW3luj74S4JlAyM8e0ftg/s9aT+13+zH42+G/iKy+2af400eXTCI3G6OSTZ5UufuhoplWQDcwHlKTuBK0Afz0/8Erf+COGueJ/+C1/izwR420WS5+HfwV1KSbxB9mlZbDUoyPtGjw4YgvHcMYLnypQWkjgl3b3LEfXn7P37dHij/gi58b/ABZ8HfGui6z4j+COj6/Glh5F0JL74d2Eo5mih2eZqFrM0iSeVGIniUzeWJdpRfVP+DcD4+eDfD/g7x58D/E9zqWn/tFaD4pvb7x9b6xc7b7XbmJ3iN1bSELI9vCkMUPlg/uxGDkpLx+lQ+DXhm78TDxFJ4X8OyeItnlnV49LiW+cEBWXzcLIAckFR1Ck8EgAA+IP+C+15of7W/8AwQ++KGreFfEmm6tocul2HiW0v9PmW9sb6K3vYJflljPR+uV3YIXOM4P0j/wSq+It58V/+CdvwO8Tah5P9oax4F0ea4EcRjG42idjkkejZ554Ffn1418D6P8AGbS/+ClE3hPT4dK+B+m6Bf6VfaVbH7FZ6t41sdPlu9Q1CNd37tkljtI5DAY0mAVpElfL19Tf8G4XjC98a/8ABFz4G3WpX8mpXlpp9/p4l2nKw2+p3cNvHtIBwsKRqCRyAD0IoA9k/wCCs3/KLf8AaS2nay/CzxPzjgg6Tc5H+fSv5hfhRdW/iG3/AGP49OeK4vNB+GHiNNSVcyfZRL4j8TqnmjpGrGeFd/UCUEA44/p5/wCCr43f8Euf2ktxXP8AwqvxRhCcHP8AZF1zj6Zr+UX9kaK48ReDZ9S09ma18M/D2/0q/YlotlxNf6hcQp0+YMCrblOVwemDkA+r/wBrH44X3wg/4IOfsd/Bm586z1zxRcat45msoreK+NzZC/1CXTN0O4RzRzS3EZySrx+WcRykiM5f/BTLU/jF/wAEcfjp8EPDvw1+LevaEmjfDDRp4bbSNRENnpN6TL9vEluBmWKW5+0T7LmNgTcNnd5Rr5I139rTUviz8b/gzq91oLa9afC/QdC0HR9BJaJb77FszGWt1DqZrkyvuXMh81E4yWr9Mf8AgoT/AMESNf8A+HZnxD/ai+MGtaxrv7TniSay8Wa55UtvYWOh2s0kEc2meRnMs0UEwVgpwHjiijJCsZgD9R/+CMP/AATutf2Hf2YE1LUdQt/EnxV+J23xH438Sm+kmk1e7meSSMCUkebBCl1KBKOJpXln2ky4H15qnjCy8L+Hr6+1Ga1sdM06KWW4up5PJgt44kLPLLKfkiAC8q+NoGSR0r8x/wBhP/gtZpsn/BO74H+G/B/h7UvjN8f77wpDZr4M0K8hklR7JmtHur+4DGGwhZYjKpk2KFwAQx2D4v8A+Clt98f/AI+/tZJ8O/i5rGqeO/GWtW6tpvwg+Gupyy6HaQSEukWoMgzvj3kSXdyYztRiMIS1AH07/wAFKf8Agvrd/EWw1LwH+y/cRzWdvI8GufE+9aJNHskHmQyJp6zEfaiGBP2kBogUVQsokr8kP2YP2Wf+E4+PkOlXnwX1/wCLurePtQv73wR9pn/sHS/GMNoZBdPaXUstmJl3b3KwjGMnaCCi/tH+wf8A8G/9q9to/ij9opdL1y801YpdN+HemSE+GtEl5I+1KR/p0kYIBB/0Z8yExzBlZfrn/goF+wPbfthfCGxs9C1OHwD8RfBd1Bq3gDxdb2PnXnhC/jkjkAiI58mXy9k8Zysq8NnZHsAPzb/4JifCf9pj9oD4Z+I9P/Zy/wCFL/sl/Bax8ZXmkpqFpZSeKfEWrNbKYp5o72YmPVIWn/dfad0bboQImAhG37P8Pf8ABCL4f/ED4eJp/wAc/HHxa+PGuX1nbQXs/iHxxq0emyyxoATDZ200MUcHnK0nkP52w7fm5O73X/gm3+xrb/sH/sb+D/hXDqkWqzeH7SQajqsEBt/7Uvpp5p7ibacsP3kuQSS3A545+gIbbyVyoZWb+MnczD0JPOPrQB4n8B/+Cf8A8If2Yf3vw8+GvgHwdqDGTzrvTdHjhurh5F2Snzx++AZcDh/UdCQfPP8Agsr4z1j4Lf8ABMH43a9oupSadqFn4QvvJu4hua0aTy4R5fZdsckhUD0PT5s/WIHk8r8v0r4K/wCDlnxtqHgP/gjP8XbjTJoYZtQj07Sp96bg9vc6naRTZ54Hlswz1APUUAfE/wDwRC+EmofttfFr4P8AjTxh8Qrlvit+yiNQsrsXsUl9deLtA1qzl/sthM8u2I20lxeR5MbqF8qMgAAN+1Uvg231GW3aSGzult3M1uDGGjtC0ZjKxjoBtJ42455ySSf5/P8AgmN4uvvhP/wWT/Zz03w/OlrpvjHStd8M6smzm9sbXTzewW8h65jnht5gwwcgc4yD/RFaJsXafmZSSSe+STQBTfR94YCTYeenvnOf7wyScNkEnJBry/4rfsNfCj49pqUfjb4Z+AfFiavLEbx9T0C1uJZghUqDIybyAyK3JPI9OK9hZFY/dFJs4wPl+lAH5e/tr/8ABsN8F/i74OvL74K2kvwR+JjarbXtprOm6heHTodk0W5ja+btVkiEpiWHywrE4wvFed/Ff/glV+3doHg0eH7H9qPwD8ZfDV5Gb/UNJ+Jng2C/kv7tV4to0ube7+R48qAs8bL85XHzEfsQ48w8+mMY69R/WqstjDCi7cwoCCQjlABwvAHTGc8Y6CgD+TfRPB/7W3/BLn/gqNeWfw58A2+h/F7W9N/tMeG/A+gvrWkavpFxtkmigt8Sebah0IzGSYjC3zqVLL+4n/BPf/guHp/7VfxA0D4eeMvhf8Svhf8AFi+uLnTrrTNT0KWTSjPbWsk0jpdgL5akxn91IMruHLbt5xf26P2b/F1h/wAFyf2T/i14R8Lz3Wm31pqvhPxdqtnpMt0ttAIpXje6kVCkaFpCY2bad5JB4Ir9GItHhupIppoy7RlXj8352jOMHBPIPLA9CQxzmgC1ZXQvBI442sUIx3HXnvU1MggECKo3HaoXJ7gU+gAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACvAf+ChH/BMf4N/8FPvhZbeF/i54X/tb+yftEmiavZ3DWmq+H55oTE01tOv/AHMUokgkeGEyRSeWoHv1FAH4yf8Mkftqf8ABvf4d+0fs/ax/wANTfs22Wq+a3w11HS5X8U6HFd326U2X2ZGkfbGkamWEmITX1xcNpoVZJR9e/8ABKb/AIL3/A//AIKraPFpui6h/wAIJ8TIvLiuPBXiC8gjvryU2pnlfTmDf6fbx+XcAuipKqwF5YYVePd9vV8Q/wDBVn/ggh8D/wDgqvo8upa1p/8AwgnxMi8yW38a+H7OCO+vJTaiCJNRUr/p9vH5duQjskqrAEimhV5NwB9vUV+Mn/DW/wC2p/wb3+Hfs/7QOj/8NTfs22Wq+UvxK07VJX8U6HFd322IXv2l2kfbGkjCKYGITX1vbrqQVY4h+jv/AAT3/wCCnHwb/wCCn3wsufFHwj8Uf2t/ZP2ePW9IvLdrTVfD880IlWG5gb/gaCWIyQSPDMI5ZPLYgA9+ooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAAMRT42JccmmUA7TQBYqOWTsPxpvmt602gBd59TSUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABSimb/AJqc6ZAoAbcPtXCtjIOPr24r89v+CjX/AAXBt/2L/iN4g8EeFfgj8XPi14v0CS0N5NpGmyx6GjSxQzxI96sUuSVkIKhP4WBI4r9CTET930PPcVwnxR+Inhz4JeGrzxF4k17SfCuj24e4u7+/vodPtYkjjUyM8j+kUWeAf9WOR3AP59L39uD/AIKBftgXzXen6p+0NovhnUi8+r6P4J+HZs7nwoMuttHBdSGKSbf5ZLMJP4WOFyK7DQP2YfHnjrwfJdePf2df2wPjJ4r063a/8Wap8SfilF4D8N6tZwt1dpZJY2Xy22eWJGbbJMxKhcr9rfHT/gvlefGLxNqHgr9jz4X+LP2gvG0YZX10W01h4U0xlYKN003lLIB8zbmMcRBGJHzx47pv/BCX9oT/AIKJ+KrfxZ+2J8fbqTS1lgubXwP4JkP2LTwBmSMEr9lidYRIoeNJeXJWU4oA/Mz9nL9qrw7+zVb+OPAfhn9nP4O6t4xuPHqX+geMfFmo23i9fB9nK8KwaXGI4ZDqIj8qdRJbN5krvKRbmTER98/Z4/YN/wCClX7XfxAvvHvh3xb4g+FNhrkccK6muot4LsLu2DMIXt9Ot44ZPLAwweS1idt2Bu+av21/Yk/4I9fs+/8ABP8Ah06b4d/D7S7LxFYRCN9f1AfbtYlO3axNw/3Cy4DCEICCRjBIr6at9MW1LMrtuZduQBwMAentnnPOfU0Afi7+z1/wQY/bI+CXwsj+Htn+19ceBPh/or3GpaPpngmwuluvtsm6R4RK4tVgjk3y4JmMayS5Ef3dvw7/AMEJv2HfhT+2F+3RF4M+Lmh6h46YeFtf1vUbC+vry0VbyHVbKON8QvG/nArdiRPMeMlwR2x/UNLbK2/jhlbcSSSAcbsHtwOmccD0r8QP+Dd/4Z2ngb/gsj+114dtbK5lsvhzeahomj3FzF5lxb239v3koj8wHA8wZbcRmQAEcYAAPpn/AIKCf8Emf2c/2Xf+CYvxv1LwX8F/Aej6p4b8Ca1cabqhtjd6paN9jmGRc3BknHzSSHiTnjORnPov/BALwza6Z/wR5+B82m2sNk154fa5ufskf2VrmT7XMGd2HLOx53ZAyWyCHYH2f/gpj8N/EPxn/wCCfHxp8G+F7CfWNe8T+CtV0rTLSJVEl3cywSpHHluhOOSeMk9Olcx/wSH+BPif9mT/AIJp/CXwB4302TTfEXh/w+bXU7aSQOtrIZZHaNipJBG9enXj0OQD5G/4K7fsGeHfGH7RXw/8M/C+6n8J/ET9prX59H+Itjp+xbTxf4btojJqF7ewyEwxTWgRWiu44xKZrpgG3y7q+YfF/wAIPDX/AAS4/wCDgzVtes/g/Jrnw60nw1H4v8O6doOpCxbwdayRxR6nf2VnmL7bJA7XY+yx+YxhnDggRKh/R74+TX3wW/4LN/A/xcs2oNovxZ8E638PrxikbWFneWGNZtWLuSw86Nb4ELtLG3iBycGvln/g598Lat8N7r9m34veBfEN54R+KWheNT4Q0u809UuLyKG9gL/KpwJvKeHcI8fMbzbwOgB+jPgD9tX4U/Fz9m+b4seGPiB4Zuvh3b2Ut/ca6Jwthp0MUYMq3JYZjKM+THKEk+YjGDmvkrR/2M5/+Cq/7WGk/Gj4w+CbzRfhT8NWWx+Gfg3X9L+z6nq7ecksmr6nCY/NW1lkjiEdlMGbMe6URnO/4Q/4KE+ILH9m74jeG/Fnj7wtdfCP42eBfHGh+I/Fuk6ZbBfBfx7tre+2PrGnRuPKmv4Y7tpZI5SjwrcShzIYf3X796FNDdWMdxat9otZTvinUoftWc7WHbkkHPTpwOgAPwt/4Lsf8E8vEVz/AMFGvDz+DdM02z0b9qZLbwfqV/cMi22j+II3haS5lV/k/wCPDa8apJ5kjwT9o1Sv2o8JXWm/BT4Yafb6rqpgs9E0+3iuNR1CcwoyxQiIyOZyojP7rcVPUZI3Z4/NH/g58/b1+GPwj/ZUtvhvdXUer/FTWdRstY8Ox2Uwe48KSW0xmj1My5zE3yzRxLjM28g4jJK/lv8Atk/8FGPiV/wUz/aX+E3xMufhZ4i8QfCq31nS/CVh4Q1m/Muk+JtSGJruIOvkxyXNx5jHcIx5YmjHAKqQD91PjH/wXh+BPh7xzJ4N8Balrnx18fKpWDw78OdLfW59xk8oO9zH+4ij83y0JMmVaeLIA3MPI/i38YP2+v25k8j4S/Dnwz+zX4NvxNDdah8R7q21PXNSglUAS/2ckc32dkWOZPKmV1kLHkKpanfCH4e/tleMPCVv4V+F/wAL/gR+xv4BictAVgj8RazbQMq+SwtrTNoZsLGJFnJMi3GcnyiT8mweNfC/xs/bC8P+Afjr8fv2mvHnhPxlr9x4U0Xxxo2u23hLwN4g1dfJOo6UtrBH5i2/mzRWxk8zONyJgZwAeJ/t/wD/AATg8P8A/BK2++G2seIvi23xSvLjxLet4m8NeGtWi0XWdF1a8tJZ9P1fS7GKUlGtZZIpN0UUXmhI/ljExEf39+wf/wAFlW+FHwj0HSPj/qWsap4auJzoWh/GG7snbTdYnEpQWmuW0IZ9H1K2MkVvLDcEl3V5fOMREp+uf2Yf+CRX7OP7It/Zan4F+E/hnTfEFiA0Wtajby6jqaN5wlJFxdl33h0B3ghhgY2ALXDftq/8EztU8b+Ode+Ifwb8aW/gHxl4ltceJfDmp6bFqPg34iyRhUSPV7Rx8olgMlrLPDtleKUKS20KwB8Y/wDBR/8AZVv/AAF/wVY0/wAR+Ab610nxz8btLXxT8OdfjXctt4r0OHdJZXBfaZYdU0vdbFFk2GaRvkcrg/WXww/4LVfDf4xf8E1/iF8eNJlbS9Y+GOiXE3iXwzqEnk6hoerLCxitZBKASJ7kiOKZQVlZduRKssS/nb8cfhX47/4Z+u7H4BzLpfiD4F69Y+K9V+Afie5Fzr3wn1mzkSS9uNMv3m82/wBJmUliplMUsN0syOOIa+Hf+CjXxM8L6L+1PB8XvhVquoXnwe/aFisvF+r+HYdSmWFNRju/M1HSLpdoMjQ3QeUF4gf36yIeFkYA9g/Ze+Kv7Lcf7ONxpPiH46ftAfs8/HvWjPc+KvEbQahqOh3F9LLtvoRp9tNumkmtnMH7wEAZZiCNpvfBX9pLR/2B/CEPhH9n3/gphoukeDbiWTUrm01b4R6tF5N1JhZniRrG7IzsU7SyEALlTncfpH/grv4JuP2Yf2q/g7+2t8HbeG88K/Eh9J1O606ItFDPfzW/mJ5oI2C11OwZbQh0XbOpcnexJ9F/4NIPjq3xcP7UWl3Xh9LGz/4TW28VANvluYZNR+1q1rJxn90LOMZOACzZzwAAfE37Rv8AwW7+OWs/s8ePvh5N+1J8Cfi94Y8ReG9R0i7u38H6tpusatBd2ssMkcW7TYY0mCM6qWKqGcZOBkfD3wF13WPhP+y74svLSTwnfWvjK3W02L4nsl1fTgWuLeXbpu/7VIzKQdwXakZ3cbga/rV/4KsaZaj/AIJdftKZhg86P4W+JmOyFcxH+yrnAyucY469iT2NfycfsY+CdQ+Ptv4T+DegeCbHXvF3xF8QQyWM94Y7U3dskhRrdLhkPlqzJKPNOQh3cHdigD1n/ghN+138D/2Gf2u774ifGbQ77W003S3Tw1Pp9qL+bStVM8P75Y/OiyxgExEiklS20AFhn7t/bu/4L4+GP+Cit7qHwz8HfEyw+Avwb1jTzpviPW/EHhi41bxDrhlJlRrK1tY5PLjxCsC+dLCQLlWBUACvRPgV/wAE2vgb/wAE7fivHaeJPC8/7WX7VHiS2aWw8C6Jp0cei+G4vLnj8yf7WfsdpajasXnagC2U3xREg4+qPh5/wQ/8E/GTxLb+K/j54Z+G+o6gd9xZ/D/wboVto/hPQZCJRHtkjiiudSmEUqCSWWURFj/qsLCYwD8n/wDgiL+2lrfhn9mvxj8D/CvxI+H37POqeJvE1pqeofEbX72ytNQtLGWKKGPT7G1khEl9cmXf+9lmSK3jfIaPzFJ/e79gz4F/BT4EeD9R0X4NTeH7qK4mEuu6lp+qwapqOq3J3Znvb3zpLiWT7w/eOe/lkAZr8g/hB/wT7+DPwM/4OPPHHwM8RfDPQPEHw5+I2hzan4J0vUFknTT7lbRLrZC8Z/dqDDfx5JJWNVG75TnW+Fn/AAU6039kH9sTxb4g/Z+8B+G9G/Zh0LVRpF/4X8N6Isl58QI7YET61azyKCssXm7o4AdkkUTHCsxkAB++kNtHGfmVd2Bg4+YjnPvg5bqSeTzVhVGO+WGCQcE/l+P51wfwK+Nvhn9oT4WaH4y8J61Z614Z8QWcV9p2oxErHdRSDIfnoTjlDhkIw3PA77btAx6UADjfjnAHYd6AoXoKKRn29j/h/T8yKABgSv8AOvHv27P2cbX9r79kX4ifDW6tLG7Hi/QrvTrf7WpaO3upImW2n45/dzFJM9AUFesxXZnjjZSu2QkA7gATg8DBOeR6jgioLsbtnyxtuYY/vjpkEYOBnOTkY4oA/nF/4IreHfEHxQ/4Km/s0jU4Vj8QfDmHxXF4mgu5d1xDc29gNOk+eMGIt5ssIIDE4HOMiv6RLZjg+54yuO59z/Sv5/8A/gofceNv+CMH/BbFfjh4Q+HepeNfCPxWt7m4SC4aRLU6rfSRx30Ed1EDmYtYrOkcmBicnJr9t/2XP2mvCv7WPwS8N/EXwfqUOpeHfF1kl7YXXl7ZWU5DRSpgGOWKTzEZDnBHU80AeoEYApKVD5kYNML4NADqRk3jndjuAcZoVs0tAEc1qkw+bnK7ST83H4574P1FOVNpY7mbdzyf6frTwMg0zf8ANQA6ilIwBSUAFFKBkGmb/moAdRSkYApKACiilAyDQAlFNL4NAfJoAdRSkYApKACilAyDTN/zUAOopSMAUlABRRSgZBoASim7/mp5GAKAEoopQMg0AJRTd/zU8jAFACUUUoGQaAEopu/5qeRgCgBK/MP/AIKEf8G0ngX4teIrb4l/sv63/wAMufGzRftE1tqXhVrjTdK1PdYm2S3MVrIn9nbtqq09mnKTXJkguHkBX9PKKAPxz+G//Bd742f8EpPiFovwk/4KEeA9Qkk1q7u20L4t+Fo7a40/XLUXscQlltLdI18uFHklcwql0kJtA9iZJfMk/Vz4BfH3wb+1J8G/D3xB+H3iHT/FXg3xVaC80zU7NiY7hMlWBVgGjkR1ZHjcK8bo6OqurKND4o/Cfwt8cPAt94X8a+GfD/jDwzqnl/bNI1vTodQsbvy5Flj8yCZWjfbIiONwOGRSOQDX5SftK/8ABvV8Rv2IfEV58UP+CdnxK8QfCnxNJvm1nwDquuNd6FrsUNjJHAluLtJo5bgSPNsTUjLEJL0yJNaCEBgD9e6K/LL9kT/g5At/A3xCh+D/AO254H1D9m74zrdzRR39xpk8PhHWITei2t5oZ2kmaGNn85TcM8lkVs5JhdqHESfp94V8V6V488K6Xruhalp+taJrVpFf6fqFhcJc2t/byoHimilQlZI3RlZXUkMCCCQaAL9FFKBkGgBKKbv+ankYAoASiilAyDQAlFN3/NTyMAUAJRRRQAUUoGQaZv8AmoAdRSkYApKACilAyDTC+DQA6imh8mnkYAoASiiigAopQMg0zf8ANQA6ilIwBSUAFFKBkGmb/moAdRSkYApKACilAyDTN/zUAOopSMAUlABRSgZBpm/5qAHUUpGAKSgAoopQMg0AJRTS+DQHyaAHUUpGAKSgAopyruooAZt5pSc0UUAG3c3UivHv2sv2Ovh7+2f4Es/DfxK8K6f4w0PSdSj1S1s70zbIrlUkjEo8uSP5gksi5OeJGHc17Dnim+WpB4ByMcjNAHJ/DP4VaH8KPBWn+HPDOhab4b8P6PB9lsNN06yjs7Gzh3FgkUEf7tRkn+HJ7knmuoa1juA27c3JOGw23IwQM5wMZ496kSJY/uqF4A4GM07pQA0QqO3vTmUEdMfSiigCvdwbgrdfLYMAQOCO/r6jjsTXlPwY/ZC8I/BD40/Erx3osOpf298WLqxu9fe6vXmjd7OAW8HlqT8gEYAOCdx5OTXrxGRTchCvpQBFPGC6ltpYZOSORnP+JqC9hjigaWPC7Tvd0ABUBDznIJ6evepNQl28gZyePl6cjJJyOgz6nvg4Ir8w/wDg5f8A+CmWo/sW/skWvgvwjdpB45+LM1zo8USKTeafpXlmG6u4tpyJ/wB/FHHuAH76X+OJcgHyf+2h+2fr/wC2P+3B4g+N+j6tcR/BL9i/x14cs7N9QlSDRtQvrjVYrPUrgGBfNusqodPm2qkWcnzRFJ9dfEHwDY/t1/8ABffS4dSaa88G/sk+DbHxLbRKbfyf7f1KXz7VpI5wDL/o0UTxyQgGKWBMyjhW+Ofh/wDHr4L/ALE3/BJ+T9kTwzYa58bvjx8SNGvoPEuhfD+A6gNH1nUYdjxS3MYkhb7N+7gJiaWQGKYfugWUbn7Cv/BFX9t74i2mtTfFb4/a78GdH8dXza34htdFu0vvE3iO5ljjjmkuZ7RgpwqbYxJNJ5WD+7XMgYA+nv8Ag4M/bc/ZX0b9lnxh8K/itrWl+LfF15ZTS6P4b0xvtl/oupmNvs1y0qHFook2lt8gOxjiKToYvhx/wWL8J/s2f8EZvgJ8TNf1S11Xxh4w8OxaBoOlPGtlJrOsWyiwkVml8tbW2huARLcsphWMcEmW3Fe8fsH/APBC/wDZ+/YItrbUvD/g+DxH422Ry3PirxKw1HVGlVxL5kbOoitmWQZ/dxgkBQS3OYv2TP8Agh98DP2bbnxXfX2i2vxIuPE19PKW8X6dbX0OkWEsk0x0+xtjCsVta+dM7YiVQxOD8oxQB+Fv/BUX9i/41fso+LfiV8R/2gNA0T4i638VIrPWtF+Jfh+Ca807w9qkNxDJJZA5jiiheMfZl86NxkQ+V0lz+mn/AAbhf8E6rzwj+zxpfxx+KlqviLx541updY8Hf2rDFJJ4W06682U3FrGWaO3lv2eWaR4hkxmPn5SB2nxz/ZzvP+CfPgq68M+JPBvir9pT9km+aOe98J6nAuta58LWhlDxS2sbHzLrSYkIURjMtssIKs3mPnzj4yfGmx/4I9/CTS/jB8Dfjd4K8Z/s8+I2N9p/wr8T60Z2ukcBnHhy8CyyW6xJJCogmh8qIZDkluQD6n/4KkfHDxN4kg8P/s6/C24dfiZ8ZJjZXt1EZHbwj4a3mPU9cLliEZFISPILeZKw+YrXqXxG/wCCdPw08e/sY/8ACi18P2+j+C7WxisdKFkIYrnR7iMLKl1E4TC3SS5l80LlnXJ6kH86fCP/AAUu1TTP+CvngXxz4s+GWqfCmPxh4e0fwfr+nahqov76XRdUlN34f1gFYlSJIrtjbXMIX9zJOA8kp+7+y1leNPbKuxfMGBjGAr8ckdcjKcHkA46g0AfJP/BI39qPxR8d/wBm1PDPxMZY/jd8K75/C3jvTXZY7lbyPc1tcMh5IurMRzrKSQ5SQcEcfX0K7oWONoXqU4zxwfVT3x2z3r88vA4T4sf8F7fEmqfD9H0bQPht4GTRvijqEOTB4j1G6mL6Xp03Utc28OZC+dyK20nBwf0NsHxuJbe33ST3AJH45YMc9wR6UAfMP/BQH9hf/hf1jD468A3Vn4L+PvhOAS+DfGCfurlJIm3Lp92+0mbT5dzpJC+VJkB681+B/ij9grwr8Rfh5+1N4b1z4aa58I/2ivBdwfG3g7wV9tdLO60w7ZtUe0twvl3UcMVvdiIRBdsMkSgOygH+pO4Hnpg/dwQQOhyMV+Vn/ByZ+xXf+JPhl4Y/aM8C674i8O+PvgQfNa801FurhtJluYWuZPLc5kFsglfy+I2iknEp2ZyAeMf8EGvjf8L/APgoz/wSS1L9k74ka3Y3vijTIb3SYNI1C+C3M9hMDeWVzZFV3D7LKBwA5jFp5v8AqjivmD/g39Gp/s1f8F3h4B8fQ6z4d8aah4f1XQNa0+6RhFqGrww+cWYBhhHt4JLgSkY/fDAxIpry79jH9mTw3+zH/wAFgrD4T+PfEcN5oHxEtrebwd8RtAX+zNRSS9EN/oWu6c7f6maSQQRGBjNExlnjYy4Rq9p/aE1L4pfsL/8ABxt8FNY8da94P8eeJbeOw0x9asHRb7xJp7pc2CSX0JOYdSktWCg8RSvHC43K2aAP1c/4Lp/tIaT8B/8AgnN8TdIurfUNY174jeCte8PaDpFoqPPk6VcSXl43mZeOC1tFeSRxx/BnfJEK/m2/YYPxz8Kaf4F8cfC9tc0m2uNRl+Fum+K9RmP9l+GtT1iSRXFvNg/Y/wBxPvLoDIjPJLuUmEH9wfGNnp/x7/4JPftF/tc/EXUvDN342+Lnws8QW/hwQTy3Fn4H0iWwe1t9Dt5ZiQbxrhSLt1jiZrqbygAsKkw/8G9n7F3gP42f8G+ul+E/Fmmw3Wh/GaXXZdbEEYildl1Ca0Wffzma3WwhkRznbhQBwcgH6Hfsn/sgfD/9kDwTNofgHw9/Zp1S4ku9Z1C5lNzrGt3jOzNd312xM09w29v3kjbsNjPZfYpdOWOIFtvz4WToDICeQeMckk4GOT2r8sf2Of8AgsW37JPx5039kj4/Q61L8TvB+qw+EovGkH2X+xdYFx8+kTyJ5wkja4tTEDhWPnNiVlL7q/UpNV+1ORwjZ5UjcODjqOMggjHUcZwaAPxB/wCDrv4OeItG/aE/Zv8AiR8P9YfQ/Ht8dR8Lxy2935F9FEB58MkNuOVijU3IlfPIkiU8Eg/KHgvwdpvw78IaXpNnttrHSIoYFmDEK/IxL8uMfOVwCMgovP3dv6p/8HHP7HS/FT9lDT/jFo7L/wAJZ+z6LvXbS0kcxxarp0wj/tK2kmOXjJgi8xWGfmhEeP3gr8s/Bvi/TvHHh2x1vR76O40/WkDwSBPvMWXBKHn5sqCCAU8sDJbLUAfS3/BJf9vDUP2H/wBqnTfAHiTxBND8HviddfY7PT7i2eVNB8TSy4iSFgMW1vd7naSNhI/mgS5JklY/uVo95IbMPJuZpBvU7G3OpGRgY445A6+uMED+YXwnrvxuu/2tvDuqfATwXefEDxj8KY11KPTn8Nza3p8N5fedBCborhbaWGPfPDcSyI3OAxAIr9QP2bvE3/BTTxlp8WvfEm4/Z5+Feg2kwvNQsdT024utRW2jfNy220lliQuiF/8AWcGbkqSAQD9QItYjlufLEke4oGAX5jgjIYjIOCO2OCOtOS6a6baq5KMPMGA2zkHyzgnDcqeR0JxjqP5uZv24/G/xL/b88UftaeAbqKPUm1SS18G6dq65h1Tw5bQfZDZS26kJHDdBBJ5qgPDJxvmAJr94P2Ov2tfCn7a3wA8N+P8AwdcTyaPrkYja3n3LPpU8GVuIZVPMTxsPLwcPlwTkFaAPgP8Abd/bF+KH/BOv/gtZofiC88TeNdc/Z1+Knhc3viTRVjm1e18LRWKGK6vrOJTiEwj7HcS+SZSIpbqR0wkYX9PPCnjex8feG9N1zRdUtNY0nVrOO7sbyzm86K9ikHmRyxupUPHs5yQM4IHJ48r/AG2P2RP+GoPh7pT6Lr0vg/4geDtX/tvwh4pW3+2TaFfx7ogXRyTNazQloLmBiFljnI+U4I/Nn9gP9uy4/wCCfv7VnhX9n3xFY2uj/D/xJrTeHtQ0m5WeG5+F/i2WTcunWsj7hdaFeyxLPYMd0hhu/v8A7i4CgGP/AMHD/wAS1+JX/BRj4M+BQ1rNZ/DvwxqXit4UyT9ovpVtYjOCvlgeXaK0YA3fO+T0zR/4I/ft1ap+xl+1To/wm1+8gX4SfFjU2g0Vp5D5mheJbn95FbxryI7a7VeV2kC4k3AomUrL/wCC3Hwh1r4J/wDBUweO9avri88M/G3QrSz0WefMi6Hd6dGom0tQvyI0oKXAyWyZZQAMA15F+wdo9z8XP+CxX7PfhAT6P/Zmn3N94zvbW7TzJFNtbXYhDHsQAMehK4xigD+j+CTdu2kMM7eO2OCD7g5/Shxio7PJi3HrIdxJGCT059+B6VKy7j1AoAYZRH69ecDccd+P89abbXi3HHmxBgATjkD0P4j9QetVtWaRraSOKRllYAoY0LMDkc4BB/p61+O3/BNb/gud4w+Fvxo8R/Az9p5Y2vPD3iq/8OQfEUTJHZwXZuJPs1lqcXS3jJ37LkSFVV4VkC5MoAP2ZBIH3cfj1pu3moLG8+2xbk+6PUcj/ZPPUd/qKsCgAJzRRRQAA4pNvNLRQAE5ooooAKAcUUUANKZoCYp1FAATmiiigABxSbeaWigAJzRRRQAUA4oooATbzSk5oooAKAcUUUAJt5pSc0UUAFAOKKKAE280pOaKKACiiigAoBxRRQB4/wDth/sB/Bv9v7wLD4d+MHw90Dxxp9pu+xy3cbQ32m7pIZJPst5CyXFt5jQRCTyZE8xUCvuXKn8xPiL/AME3P2yP+CHGjx6/+xj8QvEHx1+Edj58l98J/G0MWoTaPAlrPMZrQJJCZt91LdStFpwtZ3la1QxXnzsv7N0UAfAX/BNr/g4d+Df7c2sHwL41H/Ch/jlaarcaNeeAPFl00Mxuo7qO2jht7qaKGOa4eSVI/srLHdCVJlELJGJX+/QcV8o/8FLv+CLvwH/4Ks6dYzfE7w/qFr4r0i0+waZ4r0G7+xazYW/npM0IZleGaMkOAlxFKIxcTmMRvIz18Baz4l/bo/4Nyfh7pNrNHp/7Yv7MPhu0azt2t7C40/xF4NsraylnJmeNJ2tLNXZwJJjfQx29hHGGsvMjQgH7VbeaUnNfOP8AwT//AOCsnwH/AOCmXhZLz4U+OtP1LW4rQXeoeGL/AP0LX9JASAy+baOdzRxvcxRNcQ+ZbmQlUlcivo6gAoBxRRQAm3mlJzRRQAUUUUAAOKTbzS0UABOaKKKAAHFNKZp1FADQmKcTmiigAooooAAcUm3mlooACc0UUUAAOKTbzS0UABOaKKKAAHFJt5paKAAnNFFFAADik280tFAATmiiigAoBxRRQA0pmgJinUUABOaKKKAFDYopKKACvzD+NH7eeufDv/gsR4S1nUlm0/4d3Fs3hS0kkk2wXljJdPBcXnP3VW+hLZ43R2qEZVlJ++v2nfiFqXw/+El7/wAI/Z3mo+KdcYaRodpaNCLia7mBAdPOdIz5SCSYh2VdsLZIHNfAP/BYf4Mah41/ZY8J6ppvwm8d+Erf4Toln9s1K80eaFNOkEcO1ha380zMJEgIOwgAyEkZJr5nP8TUpqOIpX/cyUmknZ3umm7WVou7u9nfex+4+CuX5fUzL2Gaxi4YyM8OnKcVKPPG3PGMpKTk5uEIuKf2+qP0y8S+GdN8aaBeaTrGn2Wq6XqERhurO8gWeC5jPVXRgVZT6EYr8uv+CD2oWXw8+J3x6nNvfNp+jxWuIbK0mvrjy0nugFSKJXlkbAwFVWY+9fbf/BNb9pNf2pv2OvCPiKa5+1a1ZW40jWSSN/2y3Co7MBwDIuyXHHEo4FfHP/BAv/kv/wAdv+ult/6U3VVi2p5zg50n8UK1n3XInF+e916vudvDWX4nK+FuKcqxt70Xh4yinZXVdptXTWqWjs9LbnqH7FX/AAVCn/ap/bB8cLd6Z4s0nwlY2NrpuhaTb6LeahJDIbhw9ze/Zo5Egkb5QWkKxxqu0McO7fR9r+3j8K7r9oJfhX/wkV5b+PnuXtF0m50PULdndUZ8iSSBYihRSyuH2OuCpIIJ+Fv+CC0TQftR/G5HVkdERWVhgqRdzZBFWvi7/wArEXhP/rnbf+muSuPK82xP1DAVJ2br1FGV07pSlNtp33VtNLWsraa/QcU+HuQYjirMsroQnShhMF7aHJKNnKFKm1dODbT5ryfNzSd3zK59vfDf9vT4VfFn403Hw70PxJdTeNLMzLPpVzol/ZSwmHmQMZoEUFfQnntmm6l+358JdE+Os3w11DxW2m+NLd3WSxvNKvbZECRNMzmd4RD5flKX8zfsK8gniviH4BeX/wARCPjjytm3be529N32KLd+Oc5980n7Snhax8U/8HAPgOzvreOa3khsrl0I4keK1mkQt6/NGvB6gY6VtRzrFTo4ado3q1VTejtZt6rXy633PHl4WZEsylhZTrKn/Z31xe9ByU+Xm5X+7ScPK0Zf3j7v+EX7bHwp+Ong3xD4h8NeNtHutD8KSiHVr6532MFgSMhna4VBsPOHHyHBwTg1k2X7ffwp1fxxofhpvEl1pereKFEmjLq+h6hpcOrKSNpt5rmCOKUPnCFHIcsoXcWAPl//AAUB+BnwL+CP7JPxK1DxLo+qaHpHjbVbfUtWPh2fy9Q1XUfMDRCPzd0QywZipXyxmR9u7mvzx/bVn1y68Afsw6pqE7WtjcaORoOnrN9ol03T47iEW3nXBAaa5aPaXdVjjGEVIY9rF7xGcYmhVjRmot+4pWvvK993ptond21dieCfC/IOJX7bDTr06VSc4U3PkunCh7TdRaqWmpc1lTSha8lKSR+gH7dH/BT6D9nr4iS/DX4e+AfHPxg+NP8AZf8Aath4e8P6WWtNNjkWQRXN9eSgQQx5Tb8pZ/mKgDdX40/s6fCaX/gsT+2j4r+I37aHi6/g8PeFb+DwP4d0fwkq3Ca3fpdhpNN097VLqW6tokLrLPAzSSG7t/353gN/RN8QfhVa+PfCOu6NJdalY2eu2UljcS6fObW6iEiFPMilX5kcAtjnb8x4NflX8Af2bPDf7G//AAWY+H/wt0GxuLHwT4NtTa+HYbxlZwk2nT3JfdhQzNeTztkAfMTgZr1cwxkqM6VOFr1JKN3st2+13pZK/wCR+b8AcJ0M9xGL+syap4bD1a7UWlKfs0rQi2mk22rtxdknoUrf4WfDn4P/APBWf4L+HPhXpNrovhCwTTYobKIzl7eRTMrxzLcEzLMm0I6S4dShVgCCK/V/4v8Ax38HfAmDS5fFWtfYbjWLgWemWUUM17e6lMWVdkFpCryzMCy52I23d2Br87/2stGs9K/4L4fDOS1t4YJL86VcXDIoBmkAljDN6kJGi59FA7Va+OnxE8Qt/wAF79FsZda0nQGsbKLS/Dl1rmnvqFjEZ9PLALCs8B3SzyyRqVkB3sOvSvn8tx08PSlCKvKpiJx8tk3bVb2slfr1sftvEXCtHiOOVe0nKNOhljru7vOSg3aPMoy1u1eSg3yptQvoffngP4rfD39rLwNrVnpt5ZeKNMt55NK1rS9Qs3jmt5UZkkgu7O4RZIzlWGyWMA4yARX56f8ABAmC38PfGf43WkMOLa3FrBFETldiz3QCkseOBjLHrjqSAfqr4G/sa6z8A/2xfFnxM1b4kaLqmofEazK3vh6y0KTS7eZ43t1FxHvu7h/3ZPzEg4NweQDivy9/ZH0T4lfEHUvjFD4A8RWPh/wk0b6l4xuklMOoanpkH2uf7BZzqd0D3IV0aaMeYibijIx3rtKpVea4GpWhyzcayklrrypLa+lm2uyb82/CyfC5fQ4S4joZRiHVoOnhJrm5laTqe/H3ow5nGSceZRSkktFsv2f8F/Gfwr490fVNT8P+JNA1rT9BvJrLUrjTb+3uIbK4txumt5pI2/dyxrlirHCgckhhX5NSfBj9m3Wv+Ctk3iTQ/wDhE/Bfwd0zULSDXZntrqXRvGOvkXM5jhnjdre2jRJbCWVpWSKWMriNo2aSvbf+CTHgPwX8Of8Ag3q8Or4yvtTh8F694c1TWr37GSk1tb3l7M5ggwceYHdACQVLMAdyHaPzx+NXguTwNFo+teGbHXNP+GfxOSe402DUdQhvZjPpEz2/nXBjhjVJ3XUHHygK0cKKdxiDnTPsfOnJ0owUlGKm029lK2trK3a97y6aHm+DPB9HMZ/XZ16tCUqnsIzhyxS9pTndRlKMm5tbqKi1C7c1dH2Z/wAHRn7Pdx4t+Bvgnx74Phb/AITayu7jwzcrFLJbx6lpd5CZ28yRAFBjuktpkEkqsQJCPMZSK9W+Cf8AwWn+H/hj/gm94d8RfEjWWvvidp/g24n1nw/HAbq41DU7GKWKYPJEjRBrqWGRtrsCwuuxwom/4KY6rCf+CQngdblv31xFoCwmUgsZPsgcrk8lipkkGM/K7ggYr8/PhR+zdb6j4y8D+Ovhp8bPhn4w/sO8i1TWPhH4vvZdHOpa1HHG1xY29y6tHCZ4orZVeQBHmt0yfKkc1vUxuNnmNTB0uTljZ+9e7Ttfrr11tZaJnmU+DeHMHwvHPczlXdT6xVofu3DlvGDlCVpQuteXmXO21dqx69/wRM8Zp+yv+0x4i1T4yarpvhjUvD/hG6bXJJwqJb3n2i1aSCOOMfMwYsixxqScYUZxX6+/s2ftWfDn9qrQLy++H/iix8Qw6W6w3UaRyW9xa5yU3Qyqkiofm2sVw21gCdpx+ZX/AASE+JWl/tC/8FSfHHjz+x7jTW1jT9U1i0stTtlS/wBInluoVeErkhZ0EksLbG5zIASp5779lTS77w9/wXf+J8Phe3toNL+zahNqkVu+YCkkcEh5x3u2iJ44JPFeflOPrUKVCFSK5Z+0ukndNOT72a6Wsrdz9E8QuGMuzytXqynOOIw2AoVlNyi6ckoxTg0483NK91Pns27OOl394fEn9sv4c/CjxrfeHdS1y6utd0mybUNSsdI0e91ibS7cBW825Wzhl+zrtZWzLtyrA9DmsD9pU+Df2l/2KfF2oWbaL4w8Nah4c1C7tLiCRbiFmSCTE0ZGR5kUqjGMMjr2ZcV8gf8ABBLUL/xV4w/aE1rxQXm8QXV1YNqU11zJ5jtftMHz/tDnPpXI/wDBGHVtauv2LP2jtPm8w+H7XTpLizyfkW5ksLpZ9vvsjt84IPC+tVUzapiMK41Yr95SlNW6Wvo310trpqtndW+azDwvwuTYjGTwleXtstqYPmk2uWo69m3BJJw5JNWvKd432Z+TH7e/wRi8UfsTaX8RtMab+0vAHjRdM1ryFIeCz1K2X7JMxVRhFnsZ497yosbXCYy0grsP29fh94R+Enwy/YZ/aDuPFnijx74h+KF2fFfj7xX4hvjeX15Jby6UXtFI+RIbZ4rhI4VZpD+95yGA9i+CPw1jk0ixl8RTI3w0+PN1ffAzxCsrSSLpep6hDbXWhX6wxsrO0d7DIC3KqpYEjeM/NLfG68tP+CQvxo/Zj8T3jaP46+DPxCtPEosZI5d0tijfYb/7Owj2+dFdyxuYZGizFOfLZgktexkPN/Z9LmVtOnbp961fmfJ+OnL/AK95jyu/vR37+zhf7novI+7vi58VNH8cfAP/AIKcfszaPqscVz4dm1P4naBbakPLY2wEGo6xDEcvkxXEbbUCDDXQG7C5j9q/4I1ftZ6F+w3/AMGzngH4o+KBPdaT4ZttcaK0t2UTX1y/iDUI7e0UNhMySyfxEckctyo/P/8Aal1rw78Kf+CKvwjvvC/irwz4s/aC8Yar4k1vxWmm3SzX0FhruhXx1lZIYpPLCLbpaNKV2rHJGhCcyK3x/wDB79vvXvGPw6+Afwf8QapdW/ww+GovI00sylNPn1K61HULyPULmPH79oZLqAKCcKIyF2l3Leufkp9NeH/Al94z8B+IJviZMviDxN8Qr241bxdLJgefdXSeYdx4w0KkkEgeSIzt2hi1fqh/wQl/4KcS/EHw3pf7PPxQ17ULz40+D7KVbDUbxt0HjLSoAGhubeZyPNuI4CsckWRIfJeVgNszD847w7bjcvyRlC5QKPmUHLDKgAFsHKjAGcjGarfs3/C3UP2yP+CkHw1+E+gtcafP4evrXxx4h1+1aSO40CyspUmzA8QxDJKxjhLYAUyRY2gEEA/op/aH8AH42/BTxb4RaaOyHibRrzSPtNxBvREubZ4g5HoHdDhsH5CSMAV/Jh+wb8Z/+FdWUng/XmmWPVrq6FjcPNE0cH2dGN1FOoJmjbkS7Tg5IAPc/wBXH7Qfx+8L/swfBXxF8RPFGoDSvD/hS0m1W8uFxIxXJZljXrJNJhok2g7i/G7AA/AD9lg+MPjNpP7WPhXT/wBlWP8AaG8N+IfFDePtXil8VnTrnwvPdwXF1b2f7uLFxeR4PmxQMoEsJiwflyAfPv8AwTi/aM+MXwZ8X+K/jh8M9Ti/trUNVWyfStQWT+xPEdjgLJa3ERxkRZtvLcSM8Zi5G2Uk/r3/AMFFf+Cr2g/H7/gih8RfGXwz1DUNB8WazcweB9Utb+BItU8FX17PDBdR6gMMYAYmkUXEeFDzQlCrfd/LL9k/Q7Hwr+zn4bt4biOaa5s2m1CTO6RbrYY5QwHzxyxJut8YyPJz/Fk0/wBqbS28HfC/xd4o0vXtV8NX7eHZtN1JrUiSHWraRjD5FzA3M3zzlUfaGi3ebljHggHpXhPwxb+CvC9no+lwx2tnpqQ2UK7ypiMW3ggAfMOhbvk+1fQf/BErxJ8Qrz/grXeaD4N1LXIfhu3hqXXvH+mpby3OmzXrRTxaeHkVSsF1IPs8hZvmmFtITuKjHxd+x58WLL4g+CrrQV1y31W68H3f9mvqW2WP7XYbzDHfvFKC5PkBcbT8uE35Od36nf8ABuJ41+H3gT9nrxZ4z1/xt4B07xP8YvGs15p9hcazaR6jJZ2v/Evs0MTvvz8k7quB/rXPcYAP1iZlZGmaRll6hsYcKeBke+M8jB44yM1+ff8AwXF/4JA2v/BR74Izax4OSHTfjH4a09rXQb9rprWPVLWN2uRp1yw+V1LovlPJzFIdwZdztX6CWl/HNGnkyRyRtkJsBaM4JGcjIA44HbFEuoWl0NnnQtt/e7QxyAvcDqxHX2ODwcGgD8ofj42uf8Fdf+DfuTxBdaXqX/C4PA+nNqgS50uW11S08R6RxcxLbsAfMmiEpyCAftIOMgqPnv8A4Nu/Auq/Hv8A4KQeNvjOthpt54T0HwBb6HFeNtN3Y6hfm0uowqc+aAq3URdCoAQgjPJ/dByGa4k2SqLh9w3x7S/A+bbgBjhehGSFIzjFfE/wOn/Yz/4JR/8ACdf2H8S/hv4Gj8ceJ5NQ1a3uPFtrJ9lvisn+jpGh/wBGWJTKBDgDj71AH3osuT8qls8kKM4PI57djx7UCdJG25VmH8I+Y1+c/wAbf+Do79kL4TTta2fjfXPG11BPLbXP/CNeHruaC1ZDlpfNmEUMsfIOY5HyCME5r5mk/wCDuHUvi/4y0/TPgz+zB48+IUk1ubiaOTV1jvIx5jJhYrO3uQFO378jLyvAoA/aHWJbeWHZ8pRiSwkTcsmAeNpB+vGTwMA5r+eH/gtZ8FV+FX/Ba7WrjVNN+16P8dPBlnd3FtcRtdQXd7HCLeRPLiXKg/ZEIYqG5JAOePqvwT8e/wDgqb+2HbbrP4f/AAr/AGdNFuGktGv9bt5P7QUzSCJTFbSS3EzSw48wMYo0kPsMVq+MP+Dfz4y/tf6bZr+0t+15458Y6bp4cr4f8MaPbabYW9xEHaCWNG/dLL5RyT9mEnI/eHOaAOs/4N5f2ufFnjXSPiF8GfF2uLq3/Crf7Ol8KG4fN6mgTQyJGrv/AMtlhliEAYgOpIVsKqKv6iRNuTj7vUE1/OP+zrbeNP8Agi1/wUk+Fuk/EyGS1m0W/k8IapqzXEq6f4h8N6ncwJFqsUspPmi0uWhkliBJjcsScOir/RXpOrf2gJGKhSWycdAem3kA5wAcFQQGHHcgF+ijORRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAH55f8FLv+Dcn4Sft2/EKx+JXgfV9Q+APxo0q7/tG38WeEbKOKO9vTepdm+vLaMwtNeK/nMlzFNDNvlVpHmEUaL8w6H/wWN/ai/wCCGeo6H8Nf21vhrqHxU+H1haWlhpXxd8GPNdSagWgupEhnnuhFDe3mYlhKStZ3AS1lncXXmLLJ+1dZ/izwnpfj3wtqWh65pun61omtWkthqGn39ulxa39vKhSWGWJwVkjdGZWRgQwJBBBoA5D9mn9qn4c/tjfCy08a/C7xp4f8ceGbvYv2zSrpZvs0rQxzfZ7iP/WW9wsc0TPBMqSx7wHRTxXf1+Uf7Yn/AAbb3ngn41w/Gb9h34if8M1fEyLc1/osU91H4c19nv4boq+wyfZrcbWLWYt57OUQW0YghVXduf8A2ef+DkjXv2M/HWl/BH9v34d+IPhL8TNM0q2ml8Z2EEeqaRr8TRzsL2WCyD+Xv8qKEtY/aYmuTcAraLE0aAH6+UVn+E/Fml+PfC2m65oepafrWia1aRX+n6hYXCXFrf28qB4popUJWSN0ZWV1JDAggkGtCgAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigDx34qfsht8UvjbpHjv/hZnxI0HUfDqyLpNjpsum/2dp/mw+TKVhms5fMZ1LEtKXYFjtKgKB1nx5+Cq/Hz4aXvhW68R69oOm6rDJa6g2mRWTyX0EkbRvC/2m3mVVYNnKKrggYYdD21Fc8sLScJQa0lurvXv9/Xvsew8/wAc5UJ8yvQVqfux91J3X2dbNuWt/eblu2381/suf8EytA/Y5g1uHwJ8RPifp9rr8RS4t7i5025hSUKVS4RHsiFlXPBxg4AYMAAHfsjf8ExfCf7FvxEv/EXhHxl8QrqTWIzHqdnql3ZXFtqQ+YqZNtqsgZWYuGR1OeCSpZT9JUVnTy/DwlCcI2cE1HfRPdL169z18Zx7n2KWIjiMQ5fWElVuo3qKPw8z5bvl+y3rHdWZ82eDP+CVnwx+H/7QmrfELSbjxdZvrlx9qvfD8WrlNEuZNyyfvIVUSSJ5w83ypJGjDHATaFUW/wBp7/gmf4D/AGo/jDpPj681jxt4R8YaPCsEep+GdTSynkCHMbFnjkKumWAZNrYbBJwuPoiip/szCKmqSprli7pdn3Xbdijx5xCsXHHfXJ+1jD2ak3d8lrOLvumkr3veyvsj5g+Gf/BJ74ffBn9pKL4oeFfEHjzR9cjl3vai+trmzuEZQsscnn27zOJQCXcymQs7MHDYIm+JP/BLrwr8TP2oV+ME/jj4jab40t7iK4tJrGfTkgsvKXbGiRvZtuQL8uJC5YZ3FsmvpmiiOW4VRjFQVovmXk+67P8Azfdmj8QeIniPrUsVKVT2fsnJqLbp/wAjbTbi+qd79Tzf9qz9lfwt+2N8ILnwX4uF+mmzXEV1FcWMqxXVpNGfleNmVlB2llO5SCrtxnBHhvjf/gix8IfHPw+8I6BNqXxAtW8Gq0dnqUeu+beOjEExnzkkijQMN4SCONVZmIALNn66op1ctwtWbqVIJt2u7dtv67abHPk/HGf5VRhh8uxc6cISc0oyslKS5W7ea0a262uU9C0OHw7otnYW8l5JDYwrBE91dS3U7KoABeWVmkkbjlnZmJ5JJ5rxT9rL/gnb8P8A9r/xLofiDW5PEHh7xZ4ekR7PX/D14tnqKKhLJGXZHUhXO9W270YfKygsG93orfEYelXjyVY3V7/Pv6nlZVnmYZbi1jsBWlTq6+8nrrun3T6p3T6ny1B/wSD+E8nxd0vxtqF54+1bXtLtIoTcXPiSdLi8uU5F/LdRbLpronncJggAVVRVVVHU/tif8E3fhp+2ymk3HiqDWNP1rRUFvbaxpN0sV8bcEnyHaRJFkTcSw3qWUlirDc+73ymTsUTco3cYwOtc/wDZuF9m6Xs1yt3tbr39f002PZ/1+4j+t0cd9dqe0opxg+Z+6nul0s+qtr1ufKH7THhzS/8Agn7+wh8WPF1r4q8X634g8P8AhLUr+DxJ4o1L+2dTkligmkt4i0qsqxiRwgSOIL+8LFS53H8//iH+zz4T/Ys/4JfyaPL4m8V3Xxy/aO+HUXh3TvAOiiO5j8Sahf2gVEt7f7N9rhigeYvveRCPIcFpAWWvpr/g48/aT8PfB79ivwv4U8USXDaL8SPHGk6TrUWm6hLZ6pPosM4vdRS08s7pJZI7ZLcRn5T9qBPQV6B+w3+x54m8UfEaf9oL48aHYyfGfXmf+wNMm2XcPw20Ykm20y0yu2O42O/2ieL/AFjuVDYXA1+p0VONRR1jovK97/fd379Tkjxdm6p4ij7Z8uIt7RWi+dLZO62j9lKyi9Y2PWPhJ+yBZ6h/wT88H/Bfx5DBdGx8Fab4c1ubTnWNWu7e2hjllhIzgrPDuDMDkoNwbFfKv7fn/BJLw78Lv+Cc3jK1+GbatqnjLwVa3PiPQ5/EOoy3iyNEPNubdYI2iiXzYY2QeTGrM6wl9+wY/SKzgWGAKqKgYZ2qMBT3AHYd8epPrVe605r6VeWQxt8rLnKZBGRg9cZGfQkdCaivl+GrSc6sE21a77Xvb7ysn4xzvKaP1fLcVOlDnU7RdlzpWUrd7aPo9L7I/JXVIPC//BS74q/s/wDwN8Baz4kuvhL4D8Dw/EHxfrNxepfXtrJqVokej2X2hiyx3bGa5PlHMaRyOFThBF6N+2z/AMEKdM8Q/AOU/CnWNQj+Knh+0Nro134gnt1stes0ZGGnakIYYTNEFWVYpmUuhkRd5jVFT6b/AOCfv/BM74c/8E2vD/i7Tfh3b6gkPjDXZNYu3u5Q8kI2hYraMqq7beJQBHHj5QOpyc/R8EClY0jDRiM5VEYqoP4Y9T9c854xtGhTVR1Uveat8lsjDFcTZpicG8vxFZypObqOLS/iPed7X5ns3fbTY/mX+GHxz+K37OXxEPiL4bNqXgr4heCtRn0bxV4d1m2jivIDIQZrNvPDIJSgHkyuGt2MqEszhdv7af8ABJrxj8Hviv8ABTUvH/wzvNV1rWvE15L/AMJhe62+/X7fVUbdJY3oCIkUkJl2rGqxoRhlDfM1Z/8AwU4/4JU6D+2Z4fm8SeF7bR/Cfxk0uHbpfib7GojvlUApY6iIwJJ7Q4xwd8PLoSQYZvxp+HHjr4ofsZ/tLalqfh241D4YfGbwa6WPibwdqN4RpXiCKElo4LuIEJdW8olma2u7dWKiZ2OV+aop4OhTkpQik1e3lfe3a/Xv1LxvFmcYyg8NicRKUWoxd3q4w+CDe7hF6xg3yp6pX1P3o1v9gLwyfiX4u8UeE/EnjL4b6p44ge18Rr4ZurVINWZssZ2S4t5hFP8AO37yHYwLM2dzMx19B/Yh8G+A/wBmS8+FPg+bWPBfh7Uo5Y7y60mWJtSuzKmyd2lnjlBkkT5S+3cq7QhQKu3iP+CeH/BSHwb+338FpNe8PK2j+ItB8vTvEvhu+m333hy8ALMkhH+sg5JilUfvRt+6xKr9Jx3RJk6DaRtJGG9+PT36Hn0yYjl+HUXFQVmrP0vdryTbu0tGVU4uzipCFOpiJSUHFq9ndwVoOV17/ItIc1+VaKy0PhD4z/8ABGDwrof7C/xh+GfhbWfGWvQ+MdGmutL0rWLyzEMOtwBJbG5WeO3jkhYTwwqTvCFC2QSFI/nm/wCCvzN8SPFfwv8AjYLP7HffF3wjAvi12ha1EfirTAlhrCPCP9TKJY7aQxrtyJYpNoEoz/YJd/6REm5V3bwwb+6RyG/Dr+B7E1/Mv/wcEfCKT9gP/goX4ftb3RJNW+C/iO/1Xx5omhTx/wCjx3uoRxxavCjH+Hz7W1m2dQJU5xgDoo0oUoKnTVktjz84zjGZri5Y7MJupVl8Una7srXdkru3Xc4Twfob/GvWLh7q0mmXwr8A/G/jO+W1gXy9Omm8MT20ZYkHbC0k6AAclyhLHFeA/BP/AIJveO7/APYM0349T2dvffD3xVq174RMsV0iz6Pclo0sbiYMDtgkvh5eV2kMgGR5ma9v/wCCZXjlb79ir9tD4iTLNfap4V+CEHw/tlmcrC9tq1wY5XlI6yxGGLywAAdmDnnP6wf8EAf2V/Cf7RP/AAbq+GfAfiSGW90T4oweILXVYg6b4zLqt9bK8eV+VkFrE8ZLcS85AAxoeYfk5+yj8Zhe/B68sfFL3Om678OTLY+IFulKyWywmQZkB5wEj8jceTNG2cjAr9lv+Dcn9mjUvg3+w3qXj3xJp8Nn4i+NniGTxhAlyoN1b2EqQx6ZFK5IXiN3ljXBI+1Eclc1+S2n/wDBPWbxJ+3F4f8AD/xM8YXHhuG+8Ux/D34x3awbbOa7iMc2myGVsCGPV7WONYpZcg3kNwxAjJJ/ZT9uj9r/AFLxR8S4P2R/gXNHZ/EDUbCKXxVrNrEq6d8M/CzoYru8V+S18I2VbeAA8zxuQFCqwB8tf8FT/wBqy/8A2qPj7eaH4NX/AISzw/8ACnXIvB3gfQi5f/hLfiU+FLski+bLaaNazNdSl8RrKYz5vIA9s+DH/BtX8Mfhd4GsbbS/id+0N4T1a4trX+3pfC3jV9Lt9V1COIQyXhhEf3nlUSg8jCDBPzZz/wDgjr+zD4d+MHxQs/jRoenSRfBn4WadN4C+BttKi+Zd6cu1NR19xuI+1X11HIBMEimEaFX3HAT9Qbaz8i1gjkG/aM5b5ucYJ/3jkknuSaAP53v22P8Agkd4s/4JETz+MrPxhqHjz4K+KNfu0vkvbeX7Z4MMs3+i3F1cAlpI5AVjldQnzhWOM14v8cPDGvfFDwzoPgvwraWt54g8aeJdH0nRIb6GKSA3Ml9GYHnabhlby36k5Bb+FyK/pw8e+CdJ8c+Gr7R9YsbbUdI1KGWC/tLhA8F1BIpEokQ8MpGRjsWz2r8YvDn/AAQE+LHwM/4KXfBJ/COoTax+zv8AD3xRH4rttTm1KM6jpqwsJ7bSrq3llBuPJeEJHNGvC3RBwRmgDxb/AIKEfsM/t7fGDxPZ/FPx98NfAepap4b0Kfwj53wzh+1avqFtNgRObZJS0vkzuHYgIERn6jBX0r4a/sa2/hH4QaZ4Z8T/APBKa+1L/hH9Hg0/Wdfj8e6beatfmKNYpbhWj8lXuWAMhaNuJCyhV3Cv3PtIUlVZgrNvVGVyTub5RyT69RjJ7+tPi0+NJAwRVZc4YIoIGc7Rx0yF4HXaM55yAfyiaB8BvCWt/tX+MPgrb/sk69pPxG+J1+J/hdp/xJ8X6p4fXwzphyIo7mBZIhO0pgkx++B81/KBYgmvoPwP/wAGjHxy+L2tQ6x4n8Z/Cn4X6PrRY3ukaLcX+s/2VniNI0eQrL5g2vzcZAYcjoP0X/4OGP8AgmvrH7Vn7PWk/E74YtJZfGb4H3Q13w/cWcZF5e2sWZ5bZH6mSNohcRA53SRFMFpQR7v/AMEkf+Cg+n/8FGv2NPDvjtZGh8TQxQ6V4utQfKex1eNYjKCM/LDKJIpYmHJjk4HGFAPzx8E/8EdP2a/D/izwv+yr8Zf2lvjHrXxYksItVg8PQ+IZdP0O/ieadbcWdvLFcQrMiwhjH5jOC3BIJA9hi/4NBP2Vriaa4bXfjUrSqQGbxLa7h0wRmz3cY24b05HQ18nf8FzvC2n/ABA/4LH69ZXnmQrD8NNEmt7i3cRXen3Ed1LLDdRy58yJ48k+aDu5KkANX0l/wTp/4LjeIvh/4k0n4a/tHXMWpRapcRWmjfE+C1jsobi4k2pFZ6xABm2mBVz9p+4VMe5QWLEA+kPgB/wbxfsq/Am5sb1fh2fG3iKxWOGLVvGOoSa3OFjP7kCOT/R08pQqLsiX5VGckZr7K8E/DLRfAHh+DSNG0vT9H02zT7NBZ2NrHb29vDlT5SIigBTjnuc8k8V0FqcSZb8CFwMgkHnv27DPXvxYJy/TvmgCra6fHAx271UdtxOQc5Bz1HPQ8DtinR6ZCpxt+Tg7eMcHI+uMAc9h9c2Mc0Z4oA+Rv+CvH/BN/Tf+Clf7J2qeB2k0/S/FmnMupeFtfubdV/sm/jcMCZkG+NZejhMbtoPBUV7J+yr4N8ZfD/4EeCtH8daraa54q0fQLLTta1C3GYry7hQrJMjdSHPzEEcEn1r1RUCvux83TNRR2SRnjPJyenP49T+NAEkRB+7nb2zTqAMdKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACuA/aW/ZW+HP7Y3wsu/BXxR8F+H/HHhm73t9j1W1Wb7NK0MkP2i3k/wBZb3CxzSqk8LJLHvJR1PNd/RQB+Ofxa/4Iq/tLf8ErfiE3jn/gnv8AELULzwbeXcmoa78H/F2sJcafdzSXtsSln9oCQNGbeOOJ5Zpob2OG0YJeTPNsT2D9g/8A4OUvhh8U9Rs/hv8AtIWGofszfHfS7SBNd0nxnYy6No09w0Ek5kguLg5tY3gSKUR3xiObuKKN7k/vG/SyvnH/AIKAf8Em/gP/AMFMvCz2fxW8C6fqOtxWhtNP8T2H+ha/pICTiLyrtBuaON7mWVbebzLcyEM8TkUAfR1FfipqvwV/4KDf8EI/FMp+EtxqH7XP7MOn3aRaf4U1J5NR8UeH9ND2EMVtGqKLqORIla3h+xC5tI0Sa4ks4d2xfu3/AIJ1f8Fzv2cv+Cm/2fTfAPjL+x/G1xu/4o3xMiabrrY+0N+5j3vFd/ubaSZvsks3lRlDL5ZO2gD6+ooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACkf7hxwfWlooA8/8Ail+z74M+MmreH77xV4V0PxFd+E74anosmoWq3B0u7GCJ4d2QsgKjDDkY9znttNtFt4I1/wBrf0HXqfxJJJJ5JPWrWPakC4bNAClNp/EmkZAx5H60pOaKADav90UD5egAoooAZMgkdWKIzAHqoOeh/mAfwFfMH7f3/BO/wb+3D8O7q31TS9PsfHENtJHoPjFbRX1TQbokGKSOQkF4zIF32rERTR+ZH8u7n6iBwaimsFuoGjPKtwyH7sgPUMO4/wD1dCQQD+ajw/rfxm/4J9ftZ2d8LOPw38ePh2qrq+lRFbex8faMZWM7W8zERTWNyC5STy0WzlhZMRTct+8/7DP7a/gf9un4IWfjTwJdXNxp7M9tfabcIIb/AES8jO2WzuYjzDKh42vtXaF2bhkjE/bu/wCCePw9/bq8CW+l+LNNa38QaSH/ALA8TWcO7VtAumIcTQv1ZCybpIXzFIAcjOM/h54ii+Mv/BLf9tG3SLVF8HfFKEGaxFvNIfC3xi0+MOYC0YOZWbdIgjOZYJJsnIlyAD+ksMDbZOPkPIxkE4wRz1GD2r8Cf+D4D9z/AMM1IrMV2+JSQTnccaQM/lj24r9Vf+Cdv/BT/wCH3/BQfwPcReG5f7E8ceHLZI/E3hC+l/07QJd2CS/KywZ3FZUJG1owQhOD+VX/AAe9webN+zYzeYFVvEysQmQg/wCJ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 Como disponemos de un ángulo y un lado adyacente, podemos aplicar tangente del ángulo y luego despejar:

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»tan«/mi»«mo»§#160;«/mo»«mo»#«/mo»«mi»a«/mi»«mo»§#160;«/mo»«mo»=«/mo»«mo»§#160;«/mo»«mfrac»«mi»x«/mi»«mrow»«mo»#«/mo»«mi»b«/mi»«/mrow»«/mfrac»«/math»

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»x«/mi»«mo»§#160;«/mo»«mo»=«/mo»«mo»§#160;«/mo»«mi»tan«/mi»«mo»§#160;«/mo»«mo»#«/mo»«mi»a«/mi»«mo»§#160;«/mo»«mo»*«/mo»«mo»#«/mo»«mi»b«/mi»«/math»

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»x«/mi»«mo»§#160;«/mo»«mo»=«/mo»«mo»§#160;«/mo»«mo»#«/mo»«mi»s«/mi»«mi»o«/mi»«mi»l«/mi»«mn»1«/mn»«/math»

Reporta y/o califica esta pregunta:

1. Copia este código: Tri. C3. S15.

2. Presiona este enlace, pega el código y completa el formulario

]]> 1 .3333333 0 0 #sol1 Muy bien. Felicitaciones.-

]]> - Al parecer cometiste un error, revisa tus cálculos.-

]]> - Santiago Sur 24/6

En la observación:

Falta como ingresar los decimales, con punto, cuántos y si se aproxima o no

En la retroalimentación:

Separar con líneas los textos
Explicar más detalladamente el procedimiento
escribir las fómulas de las razones trigonométricas

Falta mensaje de cuando el alumno responde incorrectamente

Observación: N.G.R.

Pendiente : - Según recuerdo, en capacitación se indicó que no es conveniente pegar imágenes.

Pendiente :- Se sugiere dejar variables la altura , la sombra y el ángulo, preguntar por cualquiera de las tres magnitudes..

OBSERVACIONES : N.G.R 20-06-2016...

Pendiente : - No aparece el comentario en caso de error en la retroalimentación de la pregunta.

Pendiente : - Antes de «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»tan«/mi»«mo»§#160;«/mo»«mo»#«/mo»«mi»a«/mi»«mo»§#160;«/mo»«mo»=«/mo»«mo»§#160;«/mo»«mfrac»«mi»x«/mi»«mrow»«mo»#«/mo»«mi»b«/mi»«/mrow»«/mfrac»«/math» , indicar definición de la función tangente.

Corregido : - Error al digitar . Feliictaciones.-

Observaciones

- Debes ingresar tu respuesta sin unidades de medida, es decir, si el resultado es «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mn»56«/mn»«mo»§#160;«/mo»«mi»K«/mi»«mi»m«/mi»«/math», ingresa «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mn»56«/mn»«/math»

- Utiliza punto como separador decimal.Por ejemplo, «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mn»34«/mn»«mo».«/mo»«mn»6«/mn»«/math»

- Sólo utiliza una cifra en los decimales.

#graf

Para calcular la distancia «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»(«/mo»«mi»c«/mi»«mo»)«/mo»«/math» que separa a los dos aviones en un determinado instante, ocuparemos el teorema del coseno:

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msup»«mi»c«/mi»«mn»2«/mn»«/msup»«mo»=«/mo»«msup»«mi»a«/mi»«mn»2«/mn»«/msup»«mo»+«/mo»«msup»«mi»b«/mi»«mn»2«/mn»«/msup»«mo»-«/mo»«mn»2«/mn»«mo»§#183;«/mo»«mi»a«/mi»«mo»§#183;«/mo»«mi»b«/mi»«mo»§#183;«/mo»«mi»cos«/mi»«mi»§#947;«/mi»«/math»

Reemplazando en la fórmula los datos del ejercicio, obtenemos:

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msup»«mi»c«/mi»«mn»2«/mn»«/msup»«mo»=«/mo»«mo»(«/mo»«mo»#«/mo»«mi»a«/mi»«msup»«mo»)«/mo»«mn»2«/mn»«/msup»«mo»+«/mo»«mo»(«/mo»«mo»#«/mo»«mi»b«/mi»«msup»«mo»)«/mo»«mn»2«/mn»«/msup»«mo»-«/mo»«mo»(«/mo»«mn»2«/mn»«mo»§#183;«/mo»«mo»#«/mo»«mi»a«/mi»«mo»§#183;«/mo»«mo»#«/mo»«mi»b«/mi»«mo»§#183;«/mo»«mi»cos«/mi»«mo»#«/mo»«mi»§#947;«/mi»«mo»)«/mo»«/math»

Luego, la respuesta correcta es:«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»c«/mi»«mo»=«/mo»«msqrt»«mo»(«/mo»«mo»(«/mo»«mo»#«/mo»«mi»a«/mi»«msup»«mo»)«/mo»«mn»2«/mn»«/msup»«mo»+«/mo»«mo»(«/mo»«mo»#«/mo»«mi»b«/mi»«msup»«mo»)«/mo»«mn»2«/mn»«/msup»«mo»-«/mo»«mo»(«/mo»«mn»2«/mn»«mo»§#183;«/mo»«mo»#«/mo»«mi»a«/mi»«mo»§#183;«/mo»«mo»#«/mo»«mi»b«/mi»«mo»§#183;«/mo»«mo»(«/mo»«mi»cos«/mi»«mo»(«/mo»«mo»#«/mo»«mi»§#947;«/mi»«mo»)«/mo»«mo»)«/mo»«mo»)«/mo»«/msqrt»«/math»

Reporta y/o califica esta pregunta:

1. Copia este código: Tri. C4. S01.

2. Presiona este enlace, pega el código y completa el formulario

]]> 1 .3333333 0 0 Distancia=#sol]]> Muy bien, felicidades.

]]> - Al parecer has cometido un error. Si sigues con la duda, consulta con tu profesor.

]]> * Santiago - Sur 24-06-2016

- Las fórmulas deben estar centradas en la retroalimentación

- Realizar los desarrollos de las diferentes operaciones en la retroalimentación (anotar los resultados de los cuadrados, de las multiplicaciones, del coseno y finalmente de la raíz con varios decimales, para luego aproximar)

- Al final de la frase "Por lo tanto" se debe anotar la respuesta correcta, ya que la última linea de la retroalimentación la da Wiris por defecto y no es visible para el alumno.

- La respuesta acepta varios decimales,se debería agregar en la observación que aproxime o lo trunca.

Observaciones:

Ingresa las cifras sin unidad de medida

Expresa el resultado utilizando punto para separar las cifras decimales, y aproximando a la centésima en caso de ser necesario. Ejemplo si tu resultado es 4,379, ingresa solo 4.38
.

Asumamos que:

-Distancia A: «math style=¨font-family:Arial¨ xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo mathvariant=¨italic¨»#«/mo»«mi»L«/mi»«mn mathvariant=¨italic¨»1«/mn»«mo mathvariant=¨italic¨»§#160;«/mo»«mi»m«/mi»«/math»

-Distancia B: «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»L«/mi»«mn»2«/mn»«mo»§#160;«/mo»«mi»m«/mi»«/math»

-Distancia entre barcos: «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»d«/mi»«/math»

-Ángulo de observación: «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»§#945;«/mi»«mo»§#160;«/mo»«mo»=«/mo»«mo»§#160;«/mo»«mo»#«/mo»«mi»L«/mi»«mn»3«/mn»«/math»

Por el teorema del coseno se tiene que la distancia entre los barcos «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»(«/mo»«mi»d«/mi»«mo»)«/mo»«/math» se puede representar como:

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msup»«mi»d«/mi»«mrow»«mn»2«/mn»«mo»§#160;«/mo»«/mrow»«/msup»«mo»=«/mo»«msup»«mi»A«/mi»«mn»2«/mn»«/msup»«mo»+«/mo»«msup»«mi»B«/mi»«mn»2«/mn»«/msup»«mo»-«/mo»«mn»2«/mn»«mo»§#183;«/mo»«mi»A«/mi»«mo»§#183;«/mo»«mi»B«/mi»«mo»§#183;«/mo»«mi»cos«/mi»«mo»(«/mo»«mi»§#945;«/mi»«mo»)«/mo»«/math»

Luego, despejando la distancia entre los barcos obtenemos:

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»d«/mi»«mo»=«/mo»«msqrt»«msup»«mi»A«/mi»«mn»2«/mn»«/msup»«mo»+«/mo»«msup»«mi»B«/mi»«mn»2«/mn»«/msup»«mo»-«/mo»«mn»2«/mn»«mo»§#183;«/mo»«mi»A«/mi»«mo»§#183;«/mo»«mi»B«/mi»«mo»§#183;«/mo»«mi»cos«/mi»«mo»(«/mo»«mi»§#945;«/mi»«mo»)«/mo»«/msqrt»«/math»

Es decir:

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»d«/mi»«mo»=«/mo»«msqrt»«mo»(«/mo»«mo»#«/mo»«mi»L«/mi»«mn»1«/mn»«msup»«mo»)«/mo»«mn»2«/mn»«/msup»«mo»+«/mo»«mo»(«/mo»«mo»#«/mo»«mi»L«/mi»«mn»2«/mn»«msup»«mo»)«/mo»«mn»2«/mn»«/msup»«mo»-«/mo»«mn»2«/mn»«mo»§#183;«/mo»«mo»#«/mo»«mi»L«/mi»«mn»1«/mn»«mo»§#183;«/mo»«mo»#«/mo»«mi»L«/mi»«mn»2«/mn»«mo»§#183;«/mo»«mi»cos«/mi»«mo»(«/mo»«mo»#«/mo»«mi»L«/mi»«mn»3«/mn»«mo»)«/mo»«/msqrt»«/math»

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»d«/mi»«mo»=«/mo»«mo»#«/mo»«mi»s«/mi»«mi»o«/mi»«mi»l«/mi»«/math»

Reporta y/o califica esta pregunta:

1. Copia este código: Tri. C4. S16.

2. Presiona este enlace, pega el código y completa el formulario

]]> 1 .3333333 0 0 d=#sol]]> Muy bien!!!

]]> *]]> Al parecer, cometiste un error.

]]> - Santiago Sur 24/6

En la pregunta sugiero espaciar un poco el dibujo de los textos. Corregido

En la observación:

Solo el título con negrita Corregido
Agregar en: "-Ocupa hasta tres cifras decimales para expresar el resultado final" sin aproximar. Corregido

En la retroalimentación:

Falta escribir la respuesta final porque los alumnos cuando hagan el cuestionario no la verán (solo nosotros la vemos al programar) Corregido

02/06/2016 Fatima Toro Lagos

Realizado-Pendiente: Al ingresar la respuesta, podrías dejar fijo "distancia = "

Realizado-Pendiente: El resultado lo pides ingresando la coma para separar decimales y es con punto.

Pendiente: Las imágenes no cargan bien, por lo cual los dibujos o representaciones deben ser hechos en wiris, allí puedes etiquetar.

Realizado-Pendiente: Dice "observación" y debe decir "observaciones", además debe estar en negrita.

Realizado-Pendiente: Colocas " «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»L«/mi»«mn»3«/mn»«/math» grados sexagesimales", podrías solo dejar " «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»L«/mi»«mn»3«/mn»«/math» ", pues ya esta con el símbolo y se entiende.

Realizado-Pendiente: En la retroalimentación la distancia esta con raíces, como los estudiantes ingresan un numero decimal, creo que la respuesta tendría que estar en el mismo formato.

Realizado-Pendiente: El ángulo solo alterna entre 30º y 50º, se podrían agregar más.

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 <question><wirisCasSession><![CDATA[<session lang="es" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="es">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>L1</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>300</mn><mo>,</mo><mn>900</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>L2</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>600</mn><mo>,</mo><mn>1500</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>L3</mi><mo>=</mo><mi>aleatorio</mi><mfenced close="}" open="{"><mtable align="center"><mtr><mtd><mfenced><mrow><mn>30</mn><mo>°</mo><mo>,</mo><mn>45</mn><mo>°</mo><mo>,</mo><mn>60</mn><mo>°</mo><mo>,</mo><mn>75</mn><mo>°</mo><mo>,</mo><mn>90</mn><mo>°</mo><mo>,</mo><mn>120</mn><mo>°</mo><mo>,</mo><mn>150</mn><mo>°</mo></mrow></mfenced></mtd></mtr></mtable></mfenced></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>a</mi><mo>=</mo><msup><mi>L1</mi><mn>2</mn></msup></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi><mo>=</mo><msup><mi>L2</mi><mn>2</mn></msup></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>c</mi><mo>=</mo><mi>L1</mi><mo>·</mo><mi>L2</mi></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>d</mi><mo>=</mo><mi>a</mi><mo>+</mo><mi>b</mi></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>e</mi><mo>=</mo><mn>2</mn><mo>·</mo><mi>c</mi></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>f</mi><mo>=</mo><mi>e</mi><mo>·</mo><mo>(</mo><mi>cos</mi><mo>(</mo><mi>L3</mi><mo>)</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>g</mi><mo>=</mo><mi>d</mi><mo>-</mo><mi>f</mi></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol</mi><mo>=</mo><msup><mi>g</mi><mrow><mn>0</mn><mo>.</mo><mn>5</mn></mrow></msup></math></input></command></group></library><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>L3</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>75</mn><mo> </mo><csymbol definitionURL="http://.../units/degree/angular">°</csymbol></math></output></command></group><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mi mathvariant="normal">d</mi><mo>=</mo><mo>#</mo><mi>s</mi><mi>o</mi><mi>l</mi></math>]]></correctAnswer><correctAnswer id="1" type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>*</mo></math>]]></correctAnswer><correctAnswer id="2">-</correctAnswer></correctAnswers><assertions><assertion name="equivalent_symbolic" correctAnswer="1"/><assertion name="check_no_more_decimals"><param name="digits">2</param></assertion><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-2)</option><option name="relative_tolerance">false</option><option name="precision">2</option><option name="times_operator">·</option><option name="implicit_times_operator">false</option><option name="imaginary_unit">i</option><option name="float_format">f</option></options><localData><data name="inputField">popupEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/><data name="inputCompound">true</data></localData></question> Tri C4S17 calcular un ángulo aplicando la ley del coseno (lenguaje algebraico) En el siguiente triángulo AB=#AB, BC=#BC y AC=#AC mediante el teorema del coseno calcular el ángulo BAC

Observación:

Ingresa la resuesta ocupando punto como separador decimal

Ingresa tu respuesta con dos decimales

#tablero1

]]> Recuerda la ley del coseno

#tri

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msup»«mi»a«/mi»«mn»2«/mn»«/msup»«mo»=«/mo»«msup»«mi»b«/mi»«mn»2«/mn»«/msup»«mo»+«/mo»«msup»«mi»c«/mi»«mn»2«/mn»«/msup»«mo»-«/mo»«mn»2«/mn»«mo»§#183;«/mo»«mi»b«/mi»«mo»§#183;«/mo»«mi»c«/mi»«mo»§#183;«/mo»«mi»cos«/mi»«mfenced»«mi»§#945;«/mi»«/mfenced»«mspace linebreak=¨newline¨/»«msup»«mi»b«/mi»«mn»2«/mn»«/msup»«mo»=«/mo»«msup»«mi»a«/mi»«mn»2«/mn»«/msup»«mo»+«/mo»«msup»«mi»c«/mi»«mn»2«/mn»«/msup»«mo»-«/mo»«mn»2«/mn»«mo»§#183;«/mo»«mi»a«/mi»«mo»§#183;«/mo»«mi»c«/mi»«mo»§#183;«/mo»«mi»c«/mi»«mi»o«/mi»«mi»s«/mi»«mfenced»«mi»§#946;«/mi»«/mfenced»«mspace linebreak=¨newline¨/»«msup»«mi»c«/mi»«mn»2«/mn»«/msup»«mo»=«/mo»«msup»«mi»a«/mi»«mn»2«/mn»«/msup»«mo»+«/mo»«msup»«mi»b«/mi»«mn»2«/mn»«/msup»«mo»-«/mo»«mn»2«/mn»«mo»§#183;«/mo»«mi»a«/mi»«mo»§#183;«/mo»«mi»b«/mi»«mo»§#183;«/mo»«mi»c«/mi»«mi»o«/mi»«mi»s«/mi»«mfenced»«mi»§#947;«/mi»«/mfenced»«/math»

con «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»a«/mi»«mo»=«/mo»«mo»#«/mo»«mi»B«/mi»«mi»C«/mi»«/math», «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»b«/mi»«mo»=«/mo»«mo»#«/mo»«mi»A«/mi»«mi»C«/mi»«/math» y «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»c«/mi»«mo»=«/mo»«mo»#«/mo»«mi»A«/mi»«mi»B«/mi»«/math»

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msup»«mfenced»«mrow»«mo»#«/mo»«mi»B«/mi»«mi»C«/mi»«/mrow»«/mfenced»«mn»2«/mn»«/msup»«mo»=«/mo»«msup»«mfenced»«mrow»«mo»#«/mo»«mi»A«/mi»«mi»B«/mi»«/mrow»«/mfenced»«mn»2«/mn»«/msup»«mo»+«/mo»«msup»«mfenced»«mrow»«mo»#«/mo»«mi»A«/mi»«mi»C«/mi»«/mrow»«/mfenced»«mn»2«/mn»«/msup»«mo»-«/mo»«mn»2«/mn»«mo»§#183;«/mo»«mo»#«/mo»«mi»A«/mi»«mi»B«/mi»«mo»§#183;«/mo»«mo»#«/mo»«mi»A«/mi»«mi»C«/mi»«mo»§#183;«/mo»«mi»cos«/mi»«mfenced»«mi»§#945;«/mi»«/mfenced»«/math»

despejando «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»cos«/mi»«mfenced»«mi»§#945;«/mi»«/mfenced»«/math»

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mfrac»«mrow»«msup»«mfenced»«mrow»«mo»#«/mo»«mi»B«/mi»«mi»C«/mi»«/mrow»«/mfenced»«mn»2«/mn»«/msup»«mo»-«/mo»«msup»«mfenced»«mrow»«mo»#«/mo»«mi»A«/mi»«mi»B«/mi»«/mrow»«/mfenced»«mn»2«/mn»«/msup»«mo»-«/mo»«msup»«mfenced»«mrow»«mo»#«/mo»«mi»A«/mi»«mi»C«/mi»«/mrow»«/mfenced»«mn»2«/mn»«/msup»«/mrow»«mrow»«mo»-«/mo»«mn»2«/mn»«mo»§#183;«/mo»«mo»#«/mo»«mi»A«/mi»«mi»B«/mi»«mo»§#183;«/mo»«mo»#«/mo»«mi»A«/mi»«mi»C«/mi»«/mrow»«/mfrac»«mo»=«/mo»«mi»cos«/mi»«mfenced»«mi»§#945;«/mi»«/mfenced»«/math»

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mfrac»«mrow»«mo»#«/mo»«mi»s«/mi»«mi»o«/mi»«mi»l«/mi»«mn»2«/mn»«/mrow»«mrow»«mo»#«/mo»«mi»s«/mi»«mi»o«/mi»«mi»l«/mi»«mn»3«/mn»«/mrow»«/mfrac»«mo»=«/mo»«mi»cos«/mi»«mfenced»«mi»§#945;«/mi»«/mfenced»«/math»

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»cos«/mi»«mfenced»«mi»§#945;«/mi»«/mfenced»«mo»=«/mo»«mo»#«/mo»«mi»s«/mi»«mi»o«/mi»«mi»l«/mi»«mn»4«/mn»«/math»

aplicando arcocoseno se obtiene

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»§#945;«/mi»«mo»=«/mo»«mo»#«/mo»«mi»s«/mi»«mi»o«/mi»«mi»l«/mi»«/math»

Reporta y/o califica esta pregunta:

1. Copia este código: Tri. C4. S17.

2. Presiona este enlace, pega el código y completa el formulario

]]> 1 .3333333 0 0 #sol]]> Muy bien

]]> -]]> Al parecer cometiste un error, si tienes dudas consulta a tu profesor

]]> - Santiago Sur 24/6

En la observación:

Indicar si el número decimal es con o sin aproximación.

En la retroalimentación: corregido, se trabajo con números enteros

La figura de la pregunta es distinta de la figura de la retroalimentación

Con los datos 8.94, 2 y 10 la respuesta dice 53.1 y es 52.993

Observaciones a la pregunta

01/06/2016 Fatima Toro Lagos

corregido: no creo que sea necesario ya que aparece el tríangulo .En el encabezado de la pregunta dice: "En el siguiente triángulo AB=#AB, ...", sugiero que podría decir: En el triángulo ABC, las medidas de sus lados son AB=#AB" o algo parecido.

Corregido: es punto el separador decimal no coma (,)

corregido: ABC no esta en wiris

Pendiente: sugiero que se roto el ángulo (ABC, BCA, CAB, BAC)

Pendiente: Se podría ajustar el tablero, ya que a veces la figura queda muy pequeña.

corregido: Centrar tablero.

corregido: Darle mas espacio entre párrafos, se ve demasiado junto.

Pendiente: Al ingresar la respuesta, la tolerancia no coincide con la cantidad de decimales que se solicita en el encabezado, por lo que hay casos en que se ingresa correctamente pero la corrige como mala.

Pendiente: Sugiero que la respuesta se ingrese solo el valor del ángulo y no BAC=..., ya que los estudiantes suelen confundirse un poco, de lo contrario, debieras agregar que las letras son en mayusculas.

Pendiente: Falta agregar comentario en las retroalimentaciones.

]]> <question><wirisCasSession><![CDATA[<session lang="es" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="es">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><apply><csymbol definitionURL="http://www.wiris.com/XML/csymbol">repeat</csymbol><mtable><mtr><mtd><mi>AB</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>8</mn><mo>)</mo></mtd></mtr><mtr><mtd><mi>BC</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>5</mn><mo>,</mo><mn>8</mn><mo>)</mo></mtd></mtr><mtr><mtd><mi>AC</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>8</mn><mo>)</mo></mtd></mtr><mtr><mtd/></mtr><mtr><mtd><mi>ang</mi><mo>=</mo><mi>acos</mi><mfenced><mfrac><mrow><msup><mfenced><mi>BC</mi></mfenced><mn>2</mn></msup><mo>-</mo><mfenced><msup><mi>AB</mi><mn>2</mn></msup></mfenced><mo>-</mo><msup><mfenced><mi>AC</mi></mfenced><mn>2</mn></msup></mrow><mrow><mo>-</mo><mn>2</mn><mo>*</mo><mi>AB</mi><mo>*</mo><mi>AC</mi></mrow></mfrac></mfenced></mtd></mtr><mtr><mtd/></mtr></mtable><mrow><mi>ang</mi><mo>≠</mo><mn>0</mn><mo> </mo><mo>∧</mo><mo> </mo><mi>ang</mi><mo>≠</mo><mn>180</mn></mrow></apply></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>tablero</mi><mo>(</mo><mi>punto</mi><mo>(</mo><mn>3</mn><mo>,</mo><mn>3</mn><mo>)</mo><mo>,</mo><mn>20</mn><mo>,</mo><mn>20</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>t</mi><mo>=</mo><mi>triángulo</mi><mfenced><mrow><mi>punto</mi><mo>(</mo><mn>0</mn><mo>,</mo><mn>0</mn><mo>)</mo><mo>,</mo><mi>punto</mi><mo>(</mo><mn>0</mn><mo>,</mo><mi>AB</mi><mo>)</mo><mo>,</mo><mi>punto</mi><mo>(</mo><mi>sin</mi><mo>(</mo><mi>ang</mi><mo>)</mo><mo>*</mo><mi>AC</mi><mo>,</mo><mi>cos</mi><mo>(</mo><mi>ang</mi><mo>)</mo><mo>*</mo><mi>AC</mi><mo>)</mo></mrow></mfenced></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>escribir</mi><mo>(</mo><mo>"</mo><mi>A</mi><mo>"</mo><mo>,</mo><mo> </mo><mi>punto</mi><mo>(</mo><mo>-</mo><mn>0</mn><mo>.</mo><mn>5</mn><mo>,</mo><mo>-</mo><mn>0</mn><mo>.</mo><mn>5</mn><mo>)</mo><mo>,</mo><mo> </mo><mfenced close="}" open="{"><mtable align="center"><mtr><mtd><mi>color</mi><mo>=</mo><mi>azul</mi></mtd></mtr></mtable></mfenced><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>escribir</mi><mo>(</mo><mo>"</mo><mi>B</mi><mo>"</mo><mo>,</mo><mo> </mo><mi>punto</mi><mo>(</mo><mn>0</mn><mo>,</mo><mi>AB</mi><mo>+</mo><mn>0</mn><mo>.</mo><mn>5</mn><mo>)</mo><mo>,</mo><mo> </mo><mfenced close="}" open="{"><mtable align="center"><mtr><mtd><mi>color</mi><mo>=</mo><mi>azul</mi></mtd></mtr></mtable></mfenced><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>escribir</mi><mo>(</mo><mo>"</mo><mi>C</mi><mo>"</mo><mo>,</mo><mo> </mo><mi>punto</mi><mo>(</mo><mi>sin</mi><mo>(</mo><mi>ang</mi><mo>)</mo><mo>*</mo><mi>AC</mi><mo>+</mo><mn>0</mn><mo>.</mo><mn>3</mn><mo>,</mo><mo> </mo><mi>cos</mi><mo>(</mo><mi>ang</mi><mo>)</mo><mo>*</mo><mi>AC</mi><mo>+</mo><mn>0</mn><mo>.</mo><mn>3</mn><mo>)</mo><mo>,</mo><mfenced close="}" open="{"><mtable align="center"><mtr><mtd><mi>color</mi><mo>=</mo><mi>azul</mi></mtd></mtr></mtable></mfenced><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>dibujar</mi><mfenced><mrow><mi>t</mi><mo>,</mo><mfenced close="}" open="{"><mtable align="center"><mtr><mtd><mi>color</mi><mo>=</mo><mi>rojo</mi></mtd></mtr></mtable></mfenced></mrow></mfenced></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>mostrar_ejes</mi><mo>(</mo><mi>falso</mi><mo>)</mo><mo>;</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>mostrar_malla</mi><mo>(</mo><mi>falso</mi><mo>)</mo><mo>;</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>altura_ventana</mi><mo>(</mo><mn>450</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>anchura_ventana</mi><mo>(</mo><mn>450</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>ang</mi><mo>=</mo><mi>acos</mi><mfenced><mfrac><mrow><msup><mfenced><mi>BC</mi></mfenced><mn>2</mn></msup><mo>-</mo><mfenced><msup><mi>AB</mi><mn>2</mn></msup></mfenced><mo>-</mo><msup><mfenced><mi>AC</mi></mfenced><mn>2</mn></msup></mrow><mrow><mo>-</mo><mn>2</mn><mo>*</mo><mi>AB</mi><mo>*</mo><mi>AC</mi></mrow></mfrac></mfenced></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol2</mi><mo>=</mo><mo>(</mo><msup><mfenced><mi>BC</mi></mfenced><mn>2</mn></msup><mo>-</mo><mfenced><msup><mi>AB</mi><mn>2</mn></msup></mfenced><mo>-</mo><msup><mfenced><mi>AC</mi></mfenced><mn>2</mn></msup><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol3</mi><mo>=</mo><mo>-</mo><mn>2</mn><mo>*</mo><mi>AB</mi><mo>*</mo><mi>AC</mi></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol4</mi><mo>=</mo><mi>sol2</mi><mo>/</mo><mi>sol3</mi><mo>*</mo><mn>1</mn><mo>.</mo><mn>0</mn></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol</mi><mo>=</mo><mn>180</mn><mo>*</mo><mi>ang</mi><mo>/</mo><mn>3</mn><mo>.</mo><mn>141592654</mn></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>tablero2</mi><mo>=</mo><mi>tablero</mi><mo>(</mo><mi>punto</mi><mo>(</mo><mn>3</mn><mo>,</mo><mn>3</mn><mo>)</mo><mo>,</mo><mn>20</mn><mo>,</mo><mn>20</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>te</mi><mo>=</mo><mi>triángulo</mi><mo>(</mo><mi>punto</mi><mo>(</mo><mn>0</mn><mo>,</mo><mn>0</mn><mo>)</mo><mo>,</mo><mo> </mo><mi>punto</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>8</mn><mo>)</mo><mo>,</mo><mo> </mo><mi>punto</mi><mo>(</mo><mn>8</mn><mo>,</mo><mn>4</mn><mo>)</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>tri</mi><mo>=</mo><mi>dibujar</mi><mo>(</mo><mi>te</mi><mo>,</mo><mo>{</mo><mi>color</mi><mo>=</mo><mi>rojo</mi><mo>}</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>mostrar_ejes</mi><mo>(</mo><mi>falso</mi><mo>)</mo><mo>;</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>mostrar_malla</mi><mo>(</mo><mi>falso</mi><mo>)</mo><mo>;</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>escribir</mi><mo>(</mo><mo>"</mo><mi>α</mi><mo>"</mo><mo>,</mo><mo> </mo><mi>punto</mi><mo>(</mo><mn>0</mn><mo>.</mo><mn>2</mn><mo>,</mo><mn>0</mn><mo>.</mo><mn>4</mn><mo>)</mo><mo>,</mo><mo> </mo><mo>{</mo><mi>color</mi><mo>=</mo><mi>azul</mi><mo>}</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>escribir</mi><mo>(</mo><mo>"</mo><mi>A</mi><mo>"</mo><mo>,</mo><mo> </mo><mi>punto</mi><mo>(</mo><mo>-</mo><mn>0</mn><mo>.</mo><mn>4</mn><mo>,</mo><mo>-</mo><mn>0</mn><mo>.</mo><mn>4</mn><mo>)</mo><mo>,</mo><mo>{</mo><mi>color</mi><mo>=</mo><mi>azul</mi><mo>}</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>escribir</mi><mo>(</mo><mo>"</mo><mi>a</mi><mo>"</mo><mo>,</mo><mo> </mo><mi>punto</mi><mo>(</mo><mn>5</mn><mo>.</mo><mn>3</mn><mo>,</mo><mn>6</mn><mo>)</mo><mo>,</mo><mo> </mo><mo>{</mo><mi>color</mi><mo>=</mo><mi>azul</mi><mo>}</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>escribir</mi><mo>(</mo><mo>"</mo><mi>β</mi><mo>"</mo><mo>,</mo><mo> </mo><mi>punto</mi><mo>(</mo><mn>6</mn><mo>.</mo><mn>5</mn><mo>,</mo><mn>3</mn><mo>.</mo><mn>8</mn><mo>)</mo><mo>,</mo><mo>{</mo><mi>color</mi><mo>=</mo><mi>azul</mi><mo>}</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>escribir</mi><mo>(</mo><mo>"</mo><mi>C</mi><mo>"</mo><mo>,</mo><mo> </mo><mi>punto</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>8</mn><mo>.</mo><mn>3</mn><mo>)</mo><mo>,</mo><mo>{</mo><mi>color</mi><mo>=</mo><mi>azul</mi><mo>}</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>escribir</mi><mo>(</mo><mo>"</mo><mi>c</mi><mo>"</mo><mo>,</mo><mo> </mo><mi>punto</mi><mo>(</mo><mn>4</mn><mo>,</mo><mn>1</mn><mo>.</mo><mn>2</mn><mo>)</mo><mo>,</mo><mo> </mo><mo>{</mo><mi>color</mi><mo>=</mo><mi>azul</mi><mo>}</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>escribir</mi><mo>(</mo><mo>"</mo><mi>b</mi><mo>"</mo><mo>,</mo><mo> </mo><mi>punto</mi><mo>(</mo><mn>0</mn><mo>.</mo><mn>4</mn><mo>,</mo><mn>4</mn><mo>)</mo><mo>,</mo><mo> </mo><mo>{</mo><mi>color</mi><mo>=</mo><mi>azul</mi><mo>}</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>escribir</mi><mo>(</mo><mo>"</mo><mi>γ</mi><mo>"</mo><mo>,</mo><mo> </mo><mi>punto</mi><mo>(</mo><mn>2</mn><mo>,</mo><mo> </mo><mn>7</mn><mo>.</mo><mn>0</mn><mo>)</mo><mo>,</mo><mo> </mo><mo>{</mo><mi>color</mi><mo>=</mo><mi>azul</mi><mo>}</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>escribir</mi><mo>(</mo><mo>"</mo><mi>B</mi><mo>"</mo><mo>,</mo><mo> </mo><mi>punto</mi><mo>(</mo><mn>8</mn><mo>,</mo><mn>3</mn><mo>.</mo><mn>5</mn><mo>)</mo><mo>,</mo><mo>{</mo><mi>color</mi><mo>=</mo><mi>azul</mi><mo>}</mo><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group></library><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>t</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mfenced><mrow><mn>0</mn><mo>,</mo><mn>0</mn></mrow></mfenced><mo>-</mo><mfenced><mrow><mn>0</mn><mo>,</mo><mn>7</mn></mrow></mfenced><mo>-</mo><mfenced><mrow><mn>8</mn><mo>,</mo><mn>8</mn></mrow></mfenced></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>45.</mn><mo> </mo><csymbol definitionURL="http://.../units/degree/angular">°</csymbol></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>BC</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>8.0623</mn></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>AB</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>7</mn></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>CA</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>11.314</mn></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>ang</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>0.7854</mn></math></output></command></group><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>CA</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>8.0623</mn></math></output></command></group><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>tablero1</mi></math></input></command></group><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo> </mo><mo>#</mo><mi mathvariant="normal">s</mi><mi>o</mi><mi mathvariant="normal">l</mi></math>]]></correctAnswer><correctAnswer id="1" type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>-</mo></math>]]></correctAnswer><correctAnswer id="2">-</correctAnswer></correctAnswers><assertions><assertion name="equivalent_all" correctAnswer="1"/><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, °, ', ", $, ¥, €, £, kr, Fr, ₩, ₹, руб, BTC, %, ‰, A, K, mol, cd, rad, sr, h, min, l, N, Pa, Hz, W, J, C, V, Ω, F, S, Wb, b, H, T, lx, lm, Gy, Bq, Sv, kat]]></param><param name="decimalseparators">., \,</param><param name="unitprefixes">M, k, c, m</param><param name="groupoperators">(,[,{</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-2)</option><option name="relative_tolerance">true</option><option name="precision">4</option><option name="times_operator">·</option><option name="implicit_times_operator">false</option><option name="imaginary_unit">i</option><option name="float_format">mr</option></options><localData><data name="inputField">popupEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question> Tri C4S18. Teorema del coseno.(Lenguaje natural) Dos vías aéreas se cruzan bajo un ángulo de «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»§#947;«/mi»«/math». En cierto instante, el avión «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»A«/mi»«/math» está a «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»a«/mi»«mo»§#160;«/mo»«mi»K«/mi»«mi»m«/mi»«/math» del cruce, en tanto que el avión «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»B«/mi»«/math» se encuentra a «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»b«/mi»«mo»§#160;«/mo»«mi»K«/mi»«mi»m«/mi»«/math» del mismo cruce. Calcula la distancia «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»(«/mo»«mi»c«/mi»«mo»)«/mo»«/math» que separa a los dos aviones en ese instante.

Observaciones

- Utiliza punto como separador decimal.Por ejemplo, «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mn»34«/mn»«mo».«/mo»«mn»6«/mn»«/math»

- Sólo utiliza una cifra en los decimales.

#graf

Reemplazando en la fórmula los datos del ejercicio, obtenemos:

Luego, la respuesta correcta es: «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»c«/mi»«/math»

Reporta y/o califica esta pregunta:

1. Copia este código: Tri. C4. S18.

2. Presiona este enlace, pega el código y completa el formulario

]]> 1 .3333333 0 0 Distancia=#sol]]> Muy bien, felicidades.

]]> - Al parecer has cometido un error. Si sigues con la duda, consulta con tu profesor.

]]> * Santiago - Sur 24-06-2016

- Las fórmulas deben estar centradas en la retroalimentación

- Al final de la frase "Por lo tanto" se debe anotar la respuesta correcta, ya que la última linea de la retroalimentación la da Wiris por defecto y no es visible para el alumno.

- La respuesta acepta varios decimales,se debería agregar en la observación que aproxime o lo trunca.

Calcula la distancia entre ambas casas.

Observaciónes:

Ingresa la respuesta sin unidad de medida (kilómetros).

Ingresa tu respuesta con dos decimales en caso de ser necesario y usa punto en vez de coma para los decimales. Ejemplo si tu respuesta es 5,346 km, ingresa solo 5.35

]]> 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 Para resolver este problema usaremos el teorema del coseno, el cual se define de la siguiente manera:

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msup»«mi»d«/mi»«mn»2«/mn»«/msup»«mo»§#160;«/mo»«mo»=«/mo»«mo»§#160;«/mo»«msup»«mi»c«/mi»«mn»2«/mn»«/msup»«mo»§#160;«/mo»«mo»+«/mo»«mo»§#160;«/mo»«msup»«mi»d«/mi»«mn»2«/mn»«/msup»«mo»§#160;«/mo»«mo»-«/mo»«mn»2«/mn»«mo»§#183;«/mo»«mi»c«/mi»«mo»§#183;«/mo»«mi»d«/mi»«mo»§#183;«/mo»«mi»cos«/mi»«mo»(«/mo»«mi»§#945;«/mi»«mo»)«/mo»«/math»

Donde «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»d«/mi»«/math» es la distancia entre ambas casas.

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»c«/mi»«/math» representa la distancia entre el globo y la casa A y «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»d«/mi»«/math» la distancia entre el globo y la casa B.

El ángulo «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»§#945;«/mi»«/math» corresponde a la suma de los ángulos que se definen desde el globo hacia la casa A y hacia la casa B.-

Reemplazando en la fórmula del Teorema del Coseno obtenemos lo siguiente:

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msup»«mi»d«/mi»«mn»2«/mn»«/msup»«mo»=«/mo»«mo»§#160;«/mo»«mo»#«/mo»«mi»c«/mi»«msup»«mo»§#160;«/mo»«mn»2«/mn»«/msup»«mo»§#160;«/mo»«mo»+«/mo»«mo»§#160;«/mo»«mo»#«/mo»«mi»d«/mi»«msup»«mo»§#160;«/mo»«mn»2«/mn»«/msup»«mo»§#160;«/mo»«mo»-«/mo»«mo»§#160;«/mo»«mn»2«/mn»«mo»§#183;«/mo»«mo»#«/mo»«mi»c«/mi»«mo»§#183;«/mo»«mo»#«/mo»«mi»d«/mi»«mo»§#183;«/mo»«mi»cos«/mi»«mo»§#160;«/mo»«mo»(«/mo»«mo»#«/mo»«mi»a«/mi»«mo»§#160;«/mo»«mo»+«/mo»«mo»#«/mo»«mi»b«/mi»«mo»)«/mo»«/math»

Al resolver la expresión nos queda:

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msup»«mi»d«/mi»«mrow/»«/msup»«mo»§#160;«/mo»«mo»=«/mo»«mo»§#160;«/mo»«mo»#«/mo»«mi»s«/mi»«mi»o«/mi»«mi»l«/mi»«mn»1«/mn»«/math»

Por lo tanto, la distancia entre la casa A y la casa B es de «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»s«/mi»«mi»o«/mi»«mi»l«/mi»«mn»1«/mn»«/math» kilómetros.-

Reporta y/o califica esta pregunta:

1. Copia este código: Tri. C4. S19.

2. Presiona este enlace, pega el código y completa el formulario

]]> 1 .3333333 0 0 La distancia entre ambas casas es de=#sol1]]> Muy bien, Felicitaciones¡

]]> *]]> Al parecer cometiste un error, revisa tus cálculos.-

]]> .-]]> Santiago Sur 24/6

En Observación: Indicar que no incluya unidades.

Con cuántos decimales trabajar y con o sin aproximación y escribirlos con punto decimal

Sin Retroalimentación

Comentarios: Arnoldo 02/06/2016

PENDIENTE: Los puntos A,B;C deben estar en formato WIRIS

PENDIENTE: Se puede agregar una observación dónde especifique que no debe ingresar la unidad de distancia.

PENDIENTE: reformular pregunta: Calcula la distancia «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»d«/mi»«/math» entre ambas casas. Luego agregar Agregar al cuadro de respuesta «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»d«/mi»«mo»=«/mo»«/math»

Observación

la distancia entre dos puntos «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mfenced mathcolor=¨#FF0000¨»«mrow»«msub»«mi»x«/mi»«mn»1«/mn»«/msub»«mo»,«/mo»«msub»«mi»y«/mi»«mn»1«/mn»«/msub»«/mrow»«/mfenced»«mo mathcolor=¨#FF0000¨»,«/mo»«mo mathcolor=¨#FF0000¨»§#160;«/mo»«mo mathcolor=¨#FF0000¨»§#160;«/mo»«mfenced mathcolor=¨#FF0000¨»«mrow»«msub»«mi»x«/mi»«mn»2«/mn»«/msub»«mo»,«/mo»«msub»«mi»y«/mi»«mn»2«/mn»«/msub»«/mrow»«/mfenced»«/math» se calcula con la fórmula «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi mathcolor=¨#FF0000¨»d«/mi»«mo mathcolor=¨#FF0000¨»=«/mo»«msqrt mathcolor=¨#FF0000¨»«msup»«mfenced»«mrow»«msub»«mi»x«/mi»«mn»2«/mn»«/msub»«mo»-«/mo»«msub»«mi»x«/mi»«mn»1«/mn»«/msub»«/mrow»«/mfenced»«mn»2«/mn»«/msup»«mo»+«/mo»«msup»«mfenced»«mrow»«msub»«mi»y«/mi»«mn»2«/mn»«/msub»«mo»-«/mo»«msub»«mi»y«/mi»«mn»1«/mn»«/msub»«/mrow»«/mfenced»«mn»2«/mn»«/msup»«/msqrt»«/math»

Ingresa el resultado con punto para el separador de decimal y ocupa dos decimales para el resultado final

#tablero1

]]> comenzamos calculando las distancias «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»A«/mi»«mi»B«/mi»«mo»,«/mo»«mo»§#160;«/mo»«mi»B«/mi»«mi»C«/mi»«mo»§#160;«/mo»«mi»y«/mi»«mo»§#160;«/mo»«mi»C«/mi»«mi»A«/mi»«/math»

distancia «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»A«/mi»«mi»B«/mi»«mo»=«/mo»«msqrt»«msup»«mfenced»«mrow»«mo»#«/mo»«mi»b«/mi»«mo»-«/mo»«mn»0«/mn»«/mrow»«/mfenced»«mn»2«/mn»«/msup»«mo»+«/mo»«msup»«mfenced»«mrow»«mo»#«/mo»«mi»c«/mi»«mo»-«/mo»«mn»0«/mn»«/mrow»«/mfenced»«mn»2«/mn»«/msup»«/msqrt»«mo»=«/mo»«mo»#«/mo»«mi»A«/mi»«mi»B«/mi»«mo»=«/mo»«mo»#«/mo»«mi»B«/mi»«mi»A«/mi»«/math»

distancia «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»B«/mi»«mi»C«/mi»«mo»=«/mo»«msqrt»«msup»«mfenced»«mrow»«mo»#«/mo»«mi»d«/mi»«mo»-«/mo»«mo»#«/mo»«mi»b«/mi»«/mrow»«/mfenced»«mn»2«/mn»«/msup»«mo»+«/mo»«msup»«mfenced»«mrow»«mo»#«/mo»«mi»e«/mi»«mo»-«/mo»«mo»#«/mo»«mi»c«/mi»«/mrow»«/mfenced»«mn»2«/mn»«/msup»«/msqrt»«mo»=«/mo»«mo»#«/mo»«mi»C«/mi»«mi»B«/mi»«mo»=«/mo»«mo»#«/mo»«mi»B«/mi»«mi»C«/mi»«/math»

distancia «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»C«/mi»«mi»A«/mi»«mo»=«/mo»«msqrt»«msup»«mfenced»«mrow»«mo»#«/mo»«mi»d«/mi»«mo»-«/mo»«mn»0«/mn»«/mrow»«/mfenced»«mn»2«/mn»«/msup»«mo»+«/mo»«msup»«mfenced»«mrow»«mo»#«/mo»«mi»e«/mi»«mo»-«/mo»«mn»0«/mn»«/mrow»«/mfenced»«mn»2«/mn»«/msup»«/msqrt»«mo»=«/mo»«mo»#«/mo»«mi»A«/mi»«mi»C«/mi»«mo»=«/mo»«mo»#«/mo»«mi»C«/mi»«mi»A«/mi»«/math»

#tablero2

Aplicando la ley del coseno para el ángulo «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»B«/mi»«mi»A«/mi»«mi»C«/mi»«/math»

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msup»«mfenced»«mrow»«mo»#«/mo»«mi»B«/mi»«mi»C«/mi»«/mrow»«/mfenced»«mn»2«/mn»«/msup»«mo»=«/mo»«msup»«mfenced»«mrow»«mo»#«/mo»«mi»B«/mi»«mi»A«/mi»«/mrow»«/mfenced»«mn»2«/mn»«/msup»«mo»+«/mo»«msup»«mfenced»«mrow»«mo»#«/mo»«mi»C«/mi»«mi»A«/mi»«/mrow»«/mfenced»«mn»2«/mn»«/msup»«mo»-«/mo»«mn»2«/mn»«mo»§#183;«/mo»«mo»#«/mo»«mi»B«/mi»«mi»A«/mi»«mo»§#183;«/mo»«mo»#«/mo»«mi»C«/mi»«mi»A«/mi»«mo»§#183;«/mo»«mi»cos«/mi»«mfenced»«mi»§#945;«/mi»«/mfenced»«/math»

despejando «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»cos«/mi»«mfenced»«mi»§#945;«/mi»«/mfenced»«/math»

se obtiene

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»cos«/mi»«mfenced»«mi»§#945;«/mi»«/mfenced»«mo»=«/mo»«mfrac»«mrow»«msup»«mfenced»«mrow»«mo»#«/mo»«mi»B«/mi»«mi»C«/mi»«/mrow»«/mfenced»«mn»2«/mn»«/msup»«mo»-«/mo»«msup»«mfenced»«mrow»«mo»#«/mo»«mi»B«/mi»«mi»A«/mi»«/mrow»«/mfenced»«mn»2«/mn»«/msup»«mo»-«/mo»«msup»«mfenced»«mrow»«mo»#«/mo»«mi»C«/mi»«mi»A«/mi»«/mrow»«/mfenced»«mn»2«/mn»«/msup»«/mrow»«mrow»«mo»-«/mo»«mn»2«/mn»«mo»§#183;«/mo»«mo»#«/mo»«mi»B«/mi»«mi»A«/mi»«mo»§#183;«/mo»«mo»#«/mo»«mi»C«/mi»«mi»A«/mi»«/mrow»«/mfrac»«/math»

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»cos«/mi»«mfenced»«mi»§#945;«/mi»«/mfenced»«mo»=«/mo»«mfrac»«mrow»«mo»#«/mo»«mi»s«/mi»«mi»o«/mi»«mi»l«/mi»«mn»4«/mn»«/mrow»«mrow»«mo»#«/mo»«mi»s«/mi»«mi»o«/mi»«mi»l«/mi»«mn»5«/mn»«/mrow»«/mfrac»«mo»=«/mo»«mo»#«/mo»«mi»s«/mi»«mi»o«/mi»«mi»l«/mi»«mn»6«/mn»«mspace linebreak=¨newline¨/»«/math»

aplicando arco coseno ángulo «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»B«/mi»«mi»A«/mi»«mi»C«/mi»«mo»=«/mo»«mo»#«/mo»«mi»s«/mi»«mi»o«/mi»«mi»l«/mi»«mn»1«/mn»«/math»

Aplicando la ley del coseno para el ángulo «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»C«/mi»«mi»B«/mi»«mi»A«/mi»«/math»

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msup»«mfenced»«mrow»«mo»#«/mo»«mi»C«/mi»«mi»A«/mi»«/mrow»«/mfenced»«mn»2«/mn»«/msup»«mo»=«/mo»«msup»«mfenced»«mrow»«mo»#«/mo»«mi»B«/mi»«mi»A«/mi»«/mrow»«/mfenced»«mn»2«/mn»«/msup»«mo»+«/mo»«msup»«mfenced»«mrow»«mo»#«/mo»«mi»B«/mi»«mi»C«/mi»«/mrow»«/mfenced»«mn»2«/mn»«/msup»«mo»-«/mo»«mn»2«/mn»«mo»§#183;«/mo»«mo»#«/mo»«mi»B«/mi»«mi»A«/mi»«mo»§#183;«/mo»«mo»#«/mo»«mi»B«/mi»«mi»C«/mi»«mo»§#183;«/mo»«mi»cos«/mi»«mfenced»«mi»§#946;«/mi»«/mfenced»«/math»

despejando «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»cos«/mi»«mfenced»«mi»§#945;«/mi»«/mfenced»«/math»

se obtiene

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»cos«/mi»«mfenced»«mi»§#946;«/mi»«/mfenced»«mo»=«/mo»«mfrac»«mrow»«msup»«mfenced»«mrow»«mo»#«/mo»«mi»C«/mi»«mi»A«/mi»«/mrow»«/mfenced»«mn»2«/mn»«/msup»«mo»-«/mo»«msup»«mfenced»«mrow»«mo»#«/mo»«mi»B«/mi»«mi»A«/mi»«/mrow»«/mfenced»«mn»2«/mn»«/msup»«mo»-«/mo»«msup»«mfenced»«mrow»«mo»#«/mo»«mi»B«/mi»«mi»C«/mi»«/mrow»«/mfenced»«mn»2«/mn»«/msup»«/mrow»«mrow»«mo»-«/mo»«mn»2«/mn»«mo»§#183;«/mo»«mo»#«/mo»«mi»B«/mi»«mi»A«/mi»«mo»§#183;«/mo»«mo»#«/mo»«mi»B«/mi»«mi»C«/mi»«/mrow»«/mfrac»«/math»

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»cos«/mi»«mfenced»«mi»§#946;«/mi»«/mfenced»«mo»=«/mo»«mfrac»«mrow»«mo»#«/mo»«mi»s«/mi»«mi»o«/mi»«mi»l«/mi»«mn»7«/mn»«/mrow»«mrow»«mo»#«/mo»«mi»s«/mi»«mi»o«/mi»«mi»l«/mi»«mn»8«/mn»«/mrow»«/mfrac»«mo»=«/mo»«mo»#«/mo»«mi»s«/mi»«mi»o«/mi»«mi»l«/mi»«mn»9«/mn»«mspace linebreak=¨newline¨/»«/math»

aplicando arco coseno se obtiene el ángulo «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»C«/mi»«mi»B«/mi»«mi»A«/mi»«mo»=«/mo»«mo»#«/mo»«mi»s«/mi»«mi»o«/mi»«mi»l«/mi»«mn»2«/mn»«/math»

Aplicando la ley del coseno para el ángulo «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»A«/mi»«mi»C«/mi»«mi»B«/mi»«/math»

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msup»«mfenced»«mrow»«mo»#«/mo»«mi»B«/mi»«mi»A«/mi»«/mrow»«/mfenced»«mn»2«/mn»«/msup»«mo»=«/mo»«msup»«mfenced»«mrow»«mo»#«/mo»«mi»C«/mi»«mi»A«/mi»«/mrow»«/mfenced»«mn»2«/mn»«/msup»«mo»+«/mo»«msup»«mfenced»«mrow»«mo»#«/mo»«mi»B«/mi»«mi»C«/mi»«/mrow»«/mfenced»«mn»2«/mn»«/msup»«mo»-«/mo»«mn»2«/mn»«mo»§#183;«/mo»«mo»#«/mo»«mi»C«/mi»«mi»A«/mi»«mo»§#183;«/mo»«mo»#«/mo»«mi»B«/mi»«mi»C«/mi»«mo»§#183;«/mo»«mi»cos«/mi»«mfenced»«mi»§#947;«/mi»«/mfenced»«/math»

despejando «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»cos«/mi»«mfenced»«mi»§#947;«/mi»«/mfenced»«/math»

se obtiene

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»cos«/mi»«mfenced»«mi»§#947;«/mi»«/mfenced»«mo»=«/mo»«mfrac»«mrow»«msup»«mfenced»«mrow»«mo»#«/mo»«mi»B«/mi»«mi»A«/mi»«/mrow»«/mfenced»«mn»2«/mn»«/msup»«mo»-«/mo»«msup»«mfenced»«mrow»«mo»#«/mo»«mi»B«/mi»«mi»C«/mi»«/mrow»«/mfenced»«mn»2«/mn»«/msup»«mo»-«/mo»«msup»«mfenced»«mrow»«mo»#«/mo»«mi»C«/mi»«mi»A«/mi»«/mrow»«/mfenced»«mn»2«/mn»«/msup»«/mrow»«mrow»«mo»-«/mo»«mn»2«/mn»«mo»§#183;«/mo»«mo»#«/mo»«mi»B«/mi»«mi»C«/mi»«mo»§#183;«/mo»«mo»#«/mo»«mi»C«/mi»«mi»A«/mi»«/mrow»«/mfrac»«/math»

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»cos«/mi»«mfenced»«mi»§#947;«/mi»«/mfenced»«mo»=«/mo»«mfrac»«mrow»«mo»#«/mo»«mi»s«/mi»«mi»o«/mi»«mi»l«/mi»«mn»10«/mn»«/mrow»«mrow»«mo»#«/mo»«mi»s«/mi»«mi»o«/mi»«mi»l«/mi»«mn»11«/mn»«/mrow»«/mfrac»«mo»=«/mo»«mo»#«/mo»«mi»s«/mi»«mi»o«/mi»«mi»l«/mi»«mn»12«/mn»«mspace linebreak=¨newline¨/»«/math»

aplicando arco coseno se obtiene el ángulo «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»A«/mi»«mi»B«/mi»«mi»C«/mi»«mo»=«/mo»«mo»#«/mo»«mi»s«/mi»«mi»o«/mi»«mi»l«/mi»«mn»3«/mn»«/math»

Reporta y/o califica esta pregunta:

1. Copia este código: Tri. C4. S20.

2. Presiona este enlace, pega el código y completa el formulario

]]> 1 .3333333 0 0 BAC=#sol1CBA=#sol2ACB=#sol3]]> Muy Bien

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CCCAAAIIIIAAAghY4TlXmVsPtGdpG9YFXVoedJZk1vfssqHtue9TgOZ7ggACCCCAAAIIIIAAAggggAACCCCAAAIIIDB/AZcB7Xu20KAtNhiHoXU+l275QStI7yo82wF0QM/flXcggAACCCCAAAIIIIAAAggggAACCCCAAAJ9L1C4hQdtxcHAC5RkqWwNQhcFrSCK1Ol05LMIYd9/RwBAAAEEEEAAAQQQQAABBBBAAAEEEEAAAQQOSqBqiw2GUawsteKznaGwn+4+TzPl3cI0ixAeFCxvQgABBBBAAAEEEEAAAQQQQAABBBBAAAEE+l0gjCPX8OxyOFSW1gkdh4qsKJ0mqWIL3/CtE5oIjn7/lnD9CCCAAAIIIIAAAggggAACCCCAAAIIIIDAQQq4BQgrVoi23A1VKjUlSUteJbZFCX0lnZQC9EG68jYEEEAAAQQQQAABBBBAAAEEEEAAAQQQQKCvBaIgUGndz5WoplaaqJ20VeSFPOuGzvLM4jgKCtB9/Q3h4hFAAAEEEEAAAQQQQAABBBBAAAEEEEAAgYMUyIpChbVAe2VHnnVCdywLWlZ2drEcRWYrEoYBBeiDtOVtCCCAAAIIIIAAAggggAACCCCAAAIIIIBAXwuk1uXs+4Hcvecq0IXrebZFCItcsR92c6H9vhbi4hFAAAEEEEAAAQQQQAABBBBAAAEEEEAAAQQOSiAMbRFCz1dmkRuu8BzYooOuDm2rEloftC1KmJd0QB+U7AK/yU3Ovptnu+bav+9x833OeafFcMBh5u+O+w3k9032z2dwcN8LHKZ/O5aaw/So+YkAAggggAACCCCAAAIIILCQAkmnoziqWMtzLhfHYbkb8kIrPltB2v4ftVIyoBeSn3MjgAACCCCAAAIIIIAAAggggAACCCCAAALLVyC0mI28tOJzlsnCOBQHvvIsV2Bd0bkVpFPLhCaCY/nOP1eGAAIIIIAAAggggAACCCCAAAIIIIAAAggsmIAfeCqt8dm3KA5ZIdp1PRfW/ZxmHRXWFR3HFSI4FkyfEyOAAAIIIIAAAggggAACCCCAAAIIIIAAAstYoBrVVLjas2/Bzy11O6E9W5QwsM5ot0XWCe1ZHocL5GBbBIEt49msT71p00adPXj5rP3sQACBwyfw0W9eoYuedcHh+0A+CQEE9hLYMHGxTl67bq99PEEAAQQQQAABBBBAAAEEEOgtgTVDodac8HiNj49a13OhLM+6cRzVWl2h5UKn7bb1Q4sO6N6atunRlE/54Kxhef/5B5pr/6wD57mD806D4YDDXr8637S/uZvj93CvYw7iCd8zvmczvzZ8Hx7k+7DhezOpeIwAAggggAACCCCAAAIIINCjAju232vrD+a21GCpILS4jcA6n63dOU06lsthcRyWBz3dC92jF8CwEEAAAQQQQAABBBBAAAEEEEAAAQQQQAABBHpT4MhHHaup8Qm5kI2p9pQqlZoS64QukrYVpktXg2YRwt6cOkaFAAIIIIAAAggggAACCCCAAAIIIIAAAgj0tkDcGJAXx1r1qOM0csTRarebKgorQHuegijsFqbpgO7tOWR0CCCAAAIIIIAAAggggAACCCCAAAIIIIBATwokE5PqTI1pworQRx/7GIVhZB3RO7V61WoVFsex/e67iODoyZljUAgggAACCCCAAAIIIIAAAggggAACCCCAQI8LjO24X2WRqzO6U/fktyq2CI7QD3TkI4+Tb5nQEztHieDo8TlkeAgggAACCCCAAAIIIIAAAggggAACCCCAQM8KuPznuNaQb4XnHdu2anJiXDvuvUe1qKoTT3gcHdA9O3MMDAEEEEAAAQQQQAABBBBAAAEEEEAAAQQQ6GUBW2Uwa+faObpd9YFBNQaG1Wm1tWXLz7uLEx5z3AkUoHt5/hgbAggggAACCCCAAAIIIIAAAggggAACCCDQqwKxdTlnca6ppKNk233yLAM6rg8o8Hz5Uawtd95GBEevTh7jQgABBBBAAAEEEEAAAQQQQAABBBBAAAEEelkgTaZ0jOU9x9YJHccVVSoVBTbgIPTsp6fhFavpgO7lCWRsCCCAAAIIIIAAAggggAACCCCAAAIIIIBArwqsOe4kdZJUfhCqURu0mrOnaq2uJEvVbI6rVq1QgO7VyWNcCCCAAAIIIIAAAggggAACCCCAAAIIIIBALwsUXqkd27dqaGSV0k5bWZopL3OV1v2cJm0rQNeJ4OjlCWRsCCCAAAIIIIAAAggggAACCCCAAAIIIIBArwr8/PabVPqBAovgiOLYFiEcseKzlKZJ9/H4+E4K0L06eYwLAQQQQAABBBBAAAEEEEAAAQQQQAABBBDoaYGyVMUWG1yx6hGqVuoKLQD6qKPX6IiVR8izTuh6pUYER09PIINDAAEEEEAAAQQQQAABBBBAAAEEEEAAAQR6VCAII8uAtuiNLFGWJ1Iu+UWhii1IGFlndCWu0QHdo3PHsBBAAAEEEEAAAQQQQAABBBBAAAEEEEAAgZ4WGBpapZEVRylrNa3YXFWSdNTpdCwB2rfndYviaNMB3dMzyOAQQAABBBBAAAEEEEAAAQQQQAABBBBAAIEeFRhZdWQ387ladZ3OnmqVhrbdv1WdIOpGcAwNraQDukfnjmEhgMASFbj/nlBf/tTQrNFPTQb6l+/9nf718hG5x2wIIIAAAggggAACCCCAAAIIIIDAUhdoTU0qbbfUmphQbtEbtfqAVq08Skcdc6wGhlao9CySY6lfJONHAAEEekng+9+q696fz/6j9UffqekJj/53nf6Utn783VovDZmxIIAAAggggAACCCCAAAIIIIAAAgcl4Pm+Yut+Hj7yCFXqje454potRhhVNDS8Wn5JAfqgYHkTAgggsD+BF/zG+Jwv3XVbqBNWfVOPPa2j/7o1nPMYdiKAAAIIIIAAAggggAACCCCAAAJLScB1PTcGhlXmhTzrdpYVpMMwVm1gQEmnqdxus9v0ltIVMlYEEEBgiQi0Jm2gXiLfK9V9vETGzTARQAABBBBAAAEEEEAAAQQQQACB/Qlsv/cu7bTM5zxJlTabiqNYYRwrsUUJt951m0aOOpZFCPeHx34EEEAAAQQQQAABBBBAAAEEEEAAAQQQQACBBxEIfCXttrZsvkUqS8uDbqvpOp+TXEHo6/rrr7XFCG17kFPw0gIKbBnPZp39pk0bdfbg5bP2swMBBBZe4KPfvGLWh1z0rAtm7XM79j125nHutZnP3fGf3vRB/caTX2N/GAf69Pfep99Y+wduNxsCCMwhsGHiYp28dt0cr7ALAQQQQAABBBBAAAEEEECgVwTWDIUaOPJYPfLINdb1HHXjN9q2KOHExKj9C3DPuqErKi2igyDSXpmxGeMon/LBGc+mH3r/+Qeaa/+sA+e5g/PiO/Mr0+/fhwufMtrlWP/uEV34hunHpWb/PrqDdh+722+v475pdeZ9fo/XTA3otu3PUnrsb+pRp4azXt99noO57/d5222Gw7TEsnDY8L3d08o9AggggAACCCCAAAIIIIBADwvkaabxqXENhyssBzpVY3DYsqCt+BxGqtUaypI2GdA9PH8MDQEElqCAK167bff97kt4/C829YPN5+n671b1+Ke2du/mHgEEEEAAAQQQQAABBBBAAAEEEFiyAtVKrKYVoDtZR7I4jnanpcnmhJLUnqvQ8MgqOqCX7OwycAQQ6EmB3Z3T+w6uVi/060961cPa+bzvZ/AcAQQQQAABBBBAAAEEEEAAAQQQOJwCWZFbxrOUp4mi+qDaeVO+FaJzlVaIHlfaaVOAPpwTwmchgAACCCCAAAIIIIAAAggggAACCCCAAALLRWCwMSjPQjYmx8Yt+3lcUcVyn23JwTJLVHqRiswVqFmEcNHme3+LEC7agPhgBBBAAAEEekSARQh7ZCIYBgIIIIAAAggggAACCCCwHwG3COGjjj/NOp4DKzpLTet2npwcV2ZP6nHFMqCrWrXqaArQ+/E7LLvnKkAflg/mQxBAAAEEEEAAAQQQQAABBBBAAAEEEEAAgUMQcAXoY447WVFoXc92nqIo1Oo07bFv9xa9EYYKfZ9FCA/BmLcigAACCCCAAAIIIIAAAggggAACCCCAAAJ9K+CKzh0rNqdpKldpDvxAYeCpGsdauXKVcuuGDvtWhwtHAAEEEEAAAQQQQAABBBBAAAEEEEAAAQQQOGgBF70ReL6KMpPFPauTJArCQL7nKbOitN9NiD7o0/NGBBBAAAEEEEAAAQQQQAABBBBAAAEEEEAAgX4ViALfojYCjQytVCWIulnQueuKdoVoL5CiiAiOfv1ycN0IIIAAAggggAACCCCAAAIIIIAAAggggMChCOR5qazIuzEcWZqptMcuENoVpdOkraTVpAB9KMC8FwEEEEAAAQQQQAABBBBAAAEEEEAAAQQQ6FcBz124FZ3LvFBSJJb/HNiihGE3gmPKis9lnpMB3a9fDq4bAQQQQAABBBBAAAEEEEAAAQQQQAABBBA4FIEVK49QpT6oidEdUmtKg4PDlgdtxeisY8Vny4W2dmgWITwUYd6LAAIIIIAAAggggAACCCCAAAIIIIAAAgj0qcD42HYNWORGFMeqNQa6Cw9mRarE4jjiSsXiOTIiOPr0u8FlI4AAAggggAACCCCAAAIIIIAAAggggAAChyQQRbFCu6WdlqaaE/JDT1mWWSpHpqTTluf7FKAPSZg3I4AAAggggAACCCCAAAIIIIAAAggggAACfSpQlJ4mJ8bUbLWm85/juqrVhmTZzxNTU5YPXVKA7tPvBpeNAAIIIIAAAggggAACCCCAAAIIIIAAAggcksDOnfdrdGyH6gMDStNcY6P3W+25o8I6n+u1qp3bIwP6kIR5MwIIIIAAAggggAACCCCAAAIIIIAAAggg0KcCI8MrbZlBt/7glCrVmiLPIjeqoZJ20o3fCC0b2u9TGy4bAQQQQAABBBBAAAEEEEAAAQQQQAABBBBA4BAEwjDU8MgK1er1bgb0lGVBF1mp1BYfLMvSuqFzOqAPwZe3IoAAAggggAACCCCAAAIIIIAAAggggAACfSvQbFnOsx/YooOFfLufnBxXlqRK7RbWrfuZRQj79rvBhSOAAAIIIIAAAggggAACCCCAAAIIIIAAAockEMcVVaz7ufQ9i9ywmxdYFnRi3c9uHcJCnXaHDuhDEubNCCCAAAIIIIAAAggggAACCCCAAAIIIIBAnwo0BocUV0IrPDcUBL62ZfepnXTkWzRHWeTyvZAM6D79bnDZCCCAAAIIIIAAAggggAACCCCAAAIIIIDAIQmklvmctjM1x8cUh5FiW3Qw2BW74fKhy8ASOg7pE3gzAggggAACCCCAAAIIIIAAAggggAACCCCAQF8K7Ni5XUmaKq41lGWpoiBSnhUqCovgSO2H/S/sSxkuGgEEEEAAAQQQQAABBBBAAAEEEEAAAQQQQOCQBDzrem4nTaVZ3j1PszVpURyeMqtAZ16hgWqVDuhDEubNCCCAAAIIIIAAAggggAACCCCAAAIIIIBAnwoUeaoyL5V02tb53JGn0hYhzORbDIdbiTBpJRSg+/S7wWUjgAACCCCAAAIIIIAAAggggAACCCCAAAKHJJB0EskrLXrD12Bj0B4HKu2553t23tJq0AUF6EMS5s0IIIAAAggggAACCCCAAAIIIIAAAggggECfCriFBlu2EGG30Gxdz0Weu8ZnlUWpwPMVVmIyoPv0u8FlI4AAAggggAACCCCAAAIIIIAAAggggAAChyTg2SqDtaiiSrWiLM/sWaHQD6332TKgbQHCyM5uYRxsCCCAAAIIIIAAAggggAACCCCAAAIIIIAAAgjMT8ALAlWtC9qzRQg963p23c95kdmPspsDnbk86PmdkqMRQAABBBBAAAEEEEAAAQQQQAABBBBAAAEEEHBRG26twaLb8Zy6BQndDst/doXpoijUqNcoQPNFQQABBBBAAAEEEEAAAQQQQAABBBBAAAEEEJi/gMU8yy03aCVnucyNIi8U+IG8MLCd7hXLgZ7/aXkHAggggAACCCCAAAIIIIAAAggggAACCCCAQL8LlFkpzwrOaZravSs4WxHaEjg8q0x7rgBtBWoiOHrtW9K+Xq8ZjnTsntvzdNnnrpPNW09vnTu+oHe96wua6ulRMjgEEEAAAQQQQAABBBBAAAEEEEAAAQQQeLgEMqs250Wqar1u8RsWAF36CoJweiHCbg50QAH64cJ++M6Tdou4F3/4Gl17/U90+buO0TtesVafumHy4fuIhThTc7P+4R2baalfCFvOiQACCCCAAAIIIIAAAggggAACCCCAQC8K2MKD1cawvG4Y9PQAC2ulzbLEYjh864bOKUD34rxN2KDWPO40HbXmFD3vkvfoD+35RJZ2h5ptu05/+5sPdEhftuG26UuY/Jk+8trn7emcfs3fXqWOvXLr596s33njX+ptu9/zm+/Rz9vTb7n1n/9Eb/vnn00/ccfa8zfuer7fz9FObbzslXs+55zf+3vdZZ/917/7OjvD6/SKc5+ol772nzTV/pnede4D4zzn996jn43u7uNu6+tvf4le+vYvdMe4ZwA8QAABBBBAAAEEEEAAAQQQQAABBBBAAIElI9CwzmdrfVZzakpZmlsCR67AC+X7vqpxTXmZUYDuxdkctEElrZb9bOvn3/yU/sEeHT1Us593670nrNXoS6/T7WOpbvnhF/RvLzlFX7qjrW+/7wz9hV6jG8da+snPrtMzhpJubEe240Z97R9v0ZP/+Ge6zvb/yeY36pf+9ho7l519+1W6/O6x7uPdz3/Qfb7/z9n+zffqFZfW9I27Wrrlrp/rjc8a1IRO0YVvv9RO8Va97UNf0PsuPUeNcJWe/2ebdO3Pd9pxt+l39EY9/y++sitKJFPaukOjO6bHuGcAPEAAAQQQQAABBBBAAAEEEEAAAQQQQACBpSNgWc95mqgoPeXWQOu7BQgtiaNWqSmKbAHCICIxoRdns2GDesdzLXpj1+D+4sq79eLjq+rc/K1uMfr53/0nvfe7VqC2mvSNdswt21t67pHrpPe+RX9/ynY95Uln6YUXWRHYXss64zr1XW/TC590QvdsF773rXrvC76rsUufYc9X6VTF3f3TP1bZXfygn/P0kaPtmNfp7953vM552pN11nm/paMGpM4j3H7r3H7EMd3PtU/WYPIlXfbKN+g/Nm/XjTfYi7+0tRsvMqwBvfCdP9ALu+/gBwIIIIAAAggggAACCCCAAAIIIIAAAggsRYGJ8TErMocWuWHBG1aADq3z2XVAqyjsViqOLA96KV7Ych+zW8jvTVfep0tOuUtvfOQT9Kkv/ade/qRzrY3dhXOcofP/+0V6fD1VK430sov+RCNHrNDwk76sq590pa759tX6f8/9Hb1Cr9bV2987TdWZju9wT7LE5W9Up/e7n5UHHlbdY8vteNDPqb5KP/nhk3XVxqt19UeeoUteIl32wwk9y6VrnPbAye7d8Bd6zku+pA9c+Um99vRTpJv+Xmc8s8MX7gFuHiGAAAIIIIAAAggggAACCCCAAAIIILCkBeK4qkmL3xioNyzLwVOlUlVpSRxBaIXn0BpdMyI4enKCXZk5juzHwOl6521XaeS9v6oXveurqpz8HL1cP9G/Xn2nRiwf+rEnPVLp7d/V9Vu36duf+IQmHv0svfw1f6nLrv+Uvfkq7bBas/sbhhvvuUtjNtmd0Z/pn9/4Lp369l/SsO13241f+LbubWfafsc1+syHNmrEasiN/X6ORYJs+L/aNL5GL77of+idH/uZLrZz3Gkd2ArtjTd8RTdva6szOamJe11v9vl66pmnqNq+TVd97iPWAb27QG2RIZdZ3vSunGo3DjYEEEAAAQQQQAABBBBAAAEEEEAAAQQQWFoCUeSKmBb1m1jUbp4rdevY+db+WmtoYnxUhUoyoHtvSiO5DOhKOD15Wv0MfeyH/2aZHOfqTz4+rjdb7nPj0ufr1FVugb9BPedFH1TTyszpbf9PLzxhsLs44GNOf6ku/vDleoJFY6hyjPSPv6ozVtV04nFn6N/WfliffM1Tupd9yi//Dz3/6tfpyUfV9IQz36a7V6r72QpP2M/nWJ053aKLn3nc9CKEq07Rf7zy4/r1J62wovU5etMv/bvOszGc+Pz1OuKX32zF8rfpyTbOE487RVftsHiPod1xH5nu/tYH9Imv37orE7r3ZoERIYAAAggggAACCCCAAAIIIIAAAggggMCDC2TW9Bq5TtrAV1Sp2BqEpXKL32g2J1WxBQpLK0F7pW0PfhpeXSiBLeMut+LgtinrMg7DqirVGSkqNuFTbeufrlpBeNfun132PFua8N366iVn2GvW3TzzePfRWVtjky1VR1bMTOPYM6g5P8fKxp3Jtv2sqjEw4/PtXa77WdUBK6B3T66x0Ql7aufe+7A95+cBAggggAACCCCAAAIIIIAAAggggAACCCw9gTVDoUZW2XpwjUEFlgPdaneUWid0mqcKrDM6sAZbz/qfKQsuvbntjrgx4Nqb99ksW6Vhxd6ZW9bZqBvbie2y12ZEP+85xorYwyNzvTB9xJyfY+eq2OfvDtTYcy574PY/sIV27r3H88BrPEIAAQQQQAABBBBAAAEEEEAAAQQQQACBpSxQqdSs49n6mwO7eXYlvqciK7tP7QV5lYAC9FKe4AMZ+4m/dbeumw7WOJDDOQYBBBBAAAEEEEAAAQQQQAABBBBAAAEEEDgggU7SUq06aJ3Plv0cBEpbTcXW8Fq4LOhqrLKYXqPugE7GQUtToDJyxJydygt9NfduvlkT2+9Tnh98zMhCj5HzH7qA++cVg6uO1FGPPunQT8YZEEAAAQQQQAABBBBAAAEEEEAAAQSWlMDkZFNZ4VkOdKyslcr3g24ndO5ZO7QlP3tWGySCY0lN6dIYrCs++5YtfdZZT9TQ0NDSGDSjPCiB8fFx3XrrrXJzThH6oAh5EwIIIIAAAggggAACCCCAAAIIILBkBQJbfLCTtOVZwTmqVpV2Ouqk9tyaFr0yVyVuWAo0GwIPs4DrfD711FMpPj/Mrr14OvcXDG6u3ZyzIYAAAggggAACCCCAAAIIIIAAAgj0l0AlihV4gRIXwZHniiqR5GI3rDAdRKE67SYF6P76Shyeq3WxG7Va7fB8GJ+y6AJurolaWfRpYAAIIIAAAggggAACCCCAAAIIIIDAYRcYWjGiWr1m0RtSK+lYJ7QvzwrPthqh8jTrdkUTwXHYp4UPRKDHBLb+mv3NlPvHEC6bx/5I8NwfC3Yr3L3l9uze5+7d/mPfYfdsCCCAAAIIIIAAAggggAACCCCAAAL9LlAbHFG1Pqh2u62x0Z1K2onVljxltvpgkebWCV2hA7rfvyRcf58L3H+B/YWU/dMIqzPLL+1m/1zCcwtH2s139/ZvJtx+d2/1aatGS1ve7B6wIYAAAggggAACCCCAAAIIIIAAAgj0uUBrbFSFFZuTTmLZz5lSS0aQLUToWylJpWcF6TYF6D7/jnD5/Syw80+l6BHW1Lza/mAYtgJzw24VE9nVDb3XHw+uO3oXluuW3vy2fpbj2hFAAAEEEEAAAQQQQAABBBBAAAEETCDLco1u26ExK0S77sXADxXbAoRRrd5dmDC3gpL7N/VsCCDQjwLh0XbVrsu5Y38+NK3JecrC4ttWaHah8YW8p35rTpXy6pfOuZ+dCCCAAAIIIIAAAggggAACCCCAAAL9JZAXpZqtqem+xbJUkiYKw8hugaLY8qBdN3R/kSy9q33skQM6fmVVTz3tBD3j8Sfpt1/2q7rvnq37vZDL//ED+31t9wt3br5D73jLn+oFTz9LJx091D33e/7yrd2clt3HcL/8BcpwlcU7r7Iu6COsC3rXLXCd0HX9+BbL63mwbWr8wV7lNQQQQAABBBBAAAEEEEAAAQQQQACBPhBop02L4CgV+XH3amNbgDAMQ5VFZv3QVnq2f0lPAbqHvwibb79Njz3xZN2xo63v3HCbrvnRzXrc6b+gd739z+cc9ef/9dP6KyssZ5nrap17+98feJ/e8obX6uwXnKsvXX2tbr5nXJ/52katWLlKb3/T6+d+E3uXp4A3aMVmKzj7Q9O3YIUVoldaHvSArrpusnvNr3vZsSr/4/kqv/1CldecZ7fzpdF7pDuuX54mXBUCCCCAAAIIIIAAAggggAACCCCAwAELFJktNlgUyvK8+x7f87sd0N197jXLhyaC44A5D/+BN/30ep106ml7ffBpjz9TroN5382tMvl373mnfvHpz9SVX/mizjn3vH0P0Qff/7+0+fZbtf7Tn9vrtWMeuUYXv/LVe+3jSR8IWKezW1xw810TGm4EWtEYsOKzBT3b31BtvG6sC/DiZ1hn9O7N9mvrz6X77rbCdW33Xu4RQAABBBBAAAEEEEAAAQQQQAABBPpUwBWcS4vh8ANPhS0h5tYW67RbaiUthX5k+wMK0L383fjp9T/WqaefsdcQv/bFz+v8l718r33uyTvf+ib94R9fqjRJdM3GK2cVoG+/9RZ94qMf0sbv/3TWe9nRpwJe1L3w45/9ju79jk1vsiK0FaX9VJ/dOB3z8swnWle028bul+7ZIk25aA77eyu/+ydK9yV+IIAAAggggAACCCCAAAIIIIAAAgj0p0BoBeZKHCvNU3lB3O2Ejiz/2RWlS5e9YfEcRHD08Hfj5ht/qsc89qRuG/sNP/mRXv+q39Xpv3Cm1p19zl6j/v6m7+qerXfrvF97Wfe1q77+lb1ed08+uf5Duuj3X9XNYJn14oPsOHY40kPdHuTtvNTDArYuqXUyR3rtRWd3R3nRn1lnvOfyeqYze5591morPG+Tbvu+tPnHkgXKsyGAAAIIIIAAAggggAACCCCAAAIIILBbwOU/B5b57CI3CovhKMpcAwND1vls+6x/0T0ngmO3Vg/e//QnP9QXP/sv3ZHV6w1d9vFPzSo+u7znt7z+NfrQJ6ePW33kURocGtZtN9+kE046ec9VfeNrX9ZH/umze54f6IM7x9IDPZTjlqjAW/7oXL3/oxv0ua/foM9tOE3nPc0yoW17zvE29/9lWc/dSHErVrMhgAACCCCAAAIIIIAAAggggAACCCAwQ6D0CovcSOR57l/L5/L9QHleyLeUV/ufrVVnj2ccz8MeEnB/a3Dv1q1yBeDb7p/Sh6/4jN7/1/9TLkpj5uZyn1/0kpfK5Tjv3p79vBfo29+6avfT7t9AuNzoRz/mhD37eICA8ra8dEIrqh199m9+owvy4ld/Wue/9vPdx+efSdGZbwkCCCCAAAIIIIAAAggggAACCCCAwIMIWJXZlZ5dsbm0bmjXBT05ZWuLhZ5lQFvp2V6gAP0gfov50o9+8D094Ulru0OILEflGeueq9/6vVfqnz52+Z5huS7nr33x3/X7r/7jPfvcg2c+53nauOGre/bl1iUdR9OxCnt2HuCDh4rfcK+zLVGB1qiU7LRojZ067+mP0LPPekT3Qv7tmns1PBDocY+i+32JzizDRgABBBBAAAEEEEAAAQQQQAABBA6LgOt2rlRqCqLAojim64RhpWqdz5nSNLNcaJ8IjsMyEwfxIXduvl2POu64vd5ZWlf02KgVDHdtb3j17+uGH/+wm9G8e9/u+zCKuhMdWgaLK2C7jupWq6lazRaZm8dGBMc8sJbaofZPJFR07G+i3K2p/3vpWTrj4q9qbCLVc0+r2mtuwUGXv0FSz1KbWsaLAAIIIIAAAggggAACCCCAAAIIHA6BLE00tGql8qlxNa32WK815FscR2QLErocaJfMQQf04ZiJg/iMH9jCgk/+xWfs9c7vXPNNPe2Zz+7u++T6D+uMM5/YjehwReJ9by980fn61je+vuf9v/KSX9fHPnTZnuc8QEBZy6J5bGHBfNzqzONaszrV6KefoOHBlya0bAAAQABJREFUSJ/5I/ujobAO6NIVoK1QzYYAAggggAACCCCAAAIIIIAAAggggMA+Ai56o9NpKQorCtzCg0WpyeaE8iKfzoV2edD7vIenPSKw9e67dOTRR3dHs33b/d3FCH9y3Q/kCsv33bNV6//PP+j1f/72/Y7WRXbMLEC/9tI36+/f+9f6h/e9a08Xdafd1pVf+aJe/6rf1TUbr9zvuXhhmQoccZGUbrUYjnuktt067na/Rj88YPutMK2mFaBd8dluLszHc6E9u4J7zn0g4mWZ6nBZCCCAAAIIIIAAAggggAACCCCAAAIPIeBZznOWpbbwYKooqljtyLqfLZEhzTO1k7by0hYmfIhz8PIiCXzn6m/qFS85txuv8ZTHHa8v//tntf6f/70bp/HWS/9Yl77lL9VoWKFwP9u6s5+vq7725T2vPnLNcfr8Vd/RrZYb/dTTTuie94knPkr//ImP6b9ZUdsVrNn6UOCYv5KmtkiTd1m9+T4rRltIfGdX4bm03HDPoji8msG4e3se2P2vXN2HUFwyAggggAACCCCAAAIIIIAAAggggMAsAc+3rmfrYbQFCN3Nbe0kU+RHCvxAqa1C6NkL06/Mejc7Flpgy7iLN1h+202bNurss89efhfGFe1XYMOGDTp57br9vs4LCCCAAAIIIIAAAggggAACCCCAAALLS2DNUKjK4GrVKnW1bdHB3OI3wkqsSlyzZNfUFiCMlKQdOqCX17T3xtW4vJdWy/KF2fpCwM21m3M2BBBAAAEEEEAAAQQQQAABBBBAAIH+EvAstzWILfs5t8znKLQYDleArioeGFBpcRyyOA4iOPrrO3FYrnZw1ZG68cYbNT5ui9uxLWsBN8durt2csyGAAAIIIIAAAggggAACCCCAAAII9JeAHwRqdxLLfrbkVsvZyK0Q3XHdzxbNUavXVLVuaCI4FvE7sVwjOBzpvZtv1sT2++xLtzxjRhbxa9NTH+06n13x+ahHn9RT42IwCCCAAAIIIIAAAggggAACCCCAAAILK+AiOGKL4PBc3rMVojPrho7CyIrRvnzrhPYskqMxMEgH9MJOA2dHAAEEEEAAAQQQQAABBBBAAAEEEEAAAQSWp4BvRWfPOp+DyArPbrPO58zzukVnC+DQ+NhOEdzaleHHwyngup/9rK2zznqihoaGHs5Tc64eE3ARHLfeemu3450u6B6bHIaDAAIIIIAAAggggAACCCCAAAIILLBAZosP+hXLgLbPCcJAoVsnrCwtgsO6oS0TetWRj6QDeoHnoC9P76I3Tj31VIrPfTD77i8Y3Fy7OWdDAAEEEEAAAQQQQAABBBBAAAEEEOgvgcJiNqzerDRJXC+0sjJTHFcU1+ryKjVNTdIB3V/fiMN0tS73uVarHaZP42MWW8DNNVnfiz0LfD4CCCCAAAIIIIAAAggggAACCCBw+AW80EI4XNaGVaHLvJBnGdDt5rjyrGaLE3Zke4ngOPzTwici0GMCW39NKmypUvtbKpX2zyQ8l8xjt8LdBw/sc6+5/ce+w+7ZEEAAAQQQQAABBBBAAAEEEEAAAQT6XSC2xQYLy332bRFCL/CVp4ktSBhZ2dmqSrviOFzViQ0BBPpV4P4LbGVSC4m3OrN8+6PBT60AndkTu/nu3hJ83H537/42y/3xseXN7gEbAggggAACCCCAAAIIIIAAAggggECfC+RFId8K0G7LMuuA9gOlacdKTb4qFsVRrVTIgO7z7wiX388CO/9Uih5hTc2rrcg8bAXmht0qJrKrG3qvPx5cd/QuLNctvflt/SzHtSOAAAIIIIAAAggggAACCCCAAAIImEBp0Ru+lY1c36LvWye0U7GexnanpaD73COCw5mwIdCXAuHRdtmuy7ljf0o0rcl5Ssrb9ieHdUG7zJ6nfmtOlvLql865n50IIIAAAggggAACCCCAAAIIIIAAAv0l0F140OpILoKjKAvrXywUWC504IeWA512Yzi6Ren+Yll6V3vn5jv0jrf8qV7w9LN00tFDeuppJ+g9f/lWjY3u3OtiHnvkgI5fWe2+/ozHn6Tfftmv6r57tu51zMwnl//jB2Y+5XGfCZThKot8XmVd0EdYF/SuW+A6oev68S3Jg2tMjT/467yKAAIIIIAAAggggAACCCCAAAIIILDsBbzAU+Syn/Nchd3K3BYdrMQKrQjth6GyMt/r39gve5CleIH/+wPv01ve8Fqd/YJz9aWrr9XN94zrM1/bqBUrV+ntb3r9nkvafPtteuyJJ+uOHW1954bbdM2PbtbjTv8Fvevtf77nmJkPPv+vn9ZfWVE7y1wHLFtfCniDVmy2grM/NH0LVlgheqXlQQ/oqusmuySve9mxKv/j+Sq//UKV15xnt/Ol0XukO67vSzIuGgEEEEAAAQQQQAABBBBAAAEEEEDgAQHPIltTy352vc+BdUEHVoxOLRe6sAJ0ah3QeZ4RwfEAV+89+uD7/5c2336r1n/6c3sN7phHrtHFr3z1Xvtu+un1OunU0/bad9rjz5Trnt53c53Tf/eed+oXn/5MXfmVL+qcc8/b9xCe94OAdTq7xQU33zWh4UagFY0BKz7bnxpFpo3XjXUFXvwM64zevdl+bf25dN/dVriu7d7LPQIIIIAAAggggAACCCCAAAIIIIBAnwq4DGjPn144zNsVBu0VrryUy7PFCfMipwDdq9+N22+9RZ/46Ie08fs/PaAh/vT6H+vU08/Y69ivffHzOv9lL99rn3vyzre+SX/4x5cqTRJds/FKCtCzhPpkhxd1L/T4Z7+je79j05usCG1FaT/VZzdOR7c884nWFe22sfule7ZIUy6aI7RjXLQ8GwIIIIAAAggggAACCCCAAAIIIIBAfwv43e5n35Yh9Cx+QxbJYfHP8qwwHUaRMuuAJgO6R78hn1z/IV30+6+yvBSbsQPYbr7xp3rMY09SYS3uN/zkR3r9q35Xp//CmVp39jl7vfv7m76re7berfN+7WXd1676+lf2en3fJ8cOR3qo277v4fnSEPAU2J8GkV570dndAV/0Z9Zp78X22N2kZ5+12grP26Tbvi9t/rHUmuru5wcCCCCAAAIIIIAAAggggAACCCCAAAJOwNUuY6s4B0Fodcnc6s9WbrabW4wwzTqqRFU6oHv1q/KNr31ZH/mnzx7w8H76kx/qi5/9l+7x9XpDl338U7OKzy7v+S2vf40+9Mnp41YfeZQGh4Z128036YSTTp7zs+4cS+fcz87lI/CWPzpX7//oBn3u6zfocxtO03lPs0xo255zvM39f1nWczcm3IrVbAgggAACCCCAAAIIIIAAAggggAACCMwQyCyyNQwiW4CwtH8wHyi3RQctBNqO8BXEkdK0Qwf0DK+eeei6mF1286Mfc8IBjckdf+/WrXLF4tvun9KHr/iM3v/X/1MuxmPm5nKfX/SSl8plSO/env28F+jb37pq91Pu+0kgb8tLJ7Si2tFn/+Y3ulf+4ld/Wue/9vPdx+efSdG5n74OXCsCCCCAAAIIIIAAAggggAACCCAwXwFL3HDhG/ItrjWIAytEWy9jkskSOJSn/5+9ewGMqrzTx//MNfdAwlXuFLCgEFqwK1qlgmwLrWuoxdVVaKXdEutahLaahd9iXejqwtoV6NYKXkAr/NtCW6G6UEuBBW2hlbQEhVSIgpoIwSSQgcxkrv/nPTOT+4QEueTyHJzMzLm+7+c9c5DvfPM9jD3Z7QpAtxX1UqwfYqay2xUtg9Ca4+0veAOfvubvrFVdbjduuOlmfG3OffjZC8/Wbm6ynF99ZTPy5n6ndp55MXHy32Pntt82mFf/zbnKb5jlmjqogPcU4K9kaY1K5H72CpbcuMLqyK9fO4Fu6Q5cNUDZ7x10ZNVsCUhAAhKQgAQkIAEJSEACEpCABCRwSQRMoNmU33CaQDTfuN1OmOoMNhbhcFjlX1kL+pK0RAdpk4AJIpusZq+3GikpvCncOab3jr6DAYMHN1grwu1Pn2JwMTY9NDcPbxX+1arnHJ8Xf7YKgjPo3Vy9aZXgiCt1wmfrlqQ1QMQ8qvF8/niM+cZvcdoTwM1XJ/N2peaGg6b+hi4TnXD01SUJSEACEpCABCQgAQlIQAISkIAEJPDxBVhtIxjwIxxhHjTLcdhY/znMaLSDtaGDwTCcobAyoD++8sXZwz985Xa88PRTrdp5AW8s+JkJNzRY94+v/R+unzjJmrd+7TMY86lxVokOE1Bu/Pjirbdh1/bfNdheb7qAQNDL34XgjQVDVbxSVGFgzwBO/eLT6Jbhwi+/zYLxYWZAR0wA2tTt0SQBCUhAAhKQgAQkIAEJSEACEpCABCQggYYCJok2zOxnk9gaYfA5xCzoYIhJjSHW4kCIZTiCCkA3JGs/7+bl/xv+54f/iR//99LaTOYanw+/3/oKHrz/m3ht5+9rG/thaQl69+1rvS//6KR1M8IDfymACSyXHf8Qa1f/GA8uWly7fuMXpmSHAtCNVbrA+16zWRT+Q5bhOA74+Kgxj5M49Uw65zMwjWoGoE3wmQ9eSPh7FKwfbx58fUvisi1cqkkCEpCABCQgAQlIQAISkIAEJCABCUigKwgwZhRhpnMoxOxn9jfCuJGp+hwIBKxQEiNJCkC31/Og/8DB+M2OP+IIazdfd/Uwq3TGuBEDsGHdC5jGwLIJGsenP+7+P3z1K7dY61x71VBs2fwS1m7YDFPK4/v530H+wz9AWhqDigmmm6Z8Hjte3ZJgqWZ3aoF+/wGcfR84U8J4cxmD0acZhI4FniOsQ25jKQ5bCgnMM987+PwPuzs1iTonAQlIQAISkIAEJCABCUhAAhKQgAQk0DqBCGs9m5sQ2sxNCB0OuG1OOOys/uxiXWinmzWh3aY2tCkVrelyCLxfZcobdL7pb3/aiSlTpnS+jqlHCQW2bduGT/7dTQmXa4EEJCABCUhAAhKQgAQkIAEJSEACEpBA5xIYmOlEUkZvq3ir05HEZNgkON3J/IX6IO9vF0GAZTgi/O1688v0miRwQQXMnS+9XtYX1tQlBMxYmzHXJAEJSEACEpCABCQgAQlIQAISkIAEJNC1BExms8l+tvNRU+NjTNDDnGiW3WA2tIPzQgxEKwDdtc6JS9LbjB69cejQIVRV8eZ2mjq1gBljM9ZmzDVJQAISkIAEJCABCUhAAhKQgAQkIAEJdDEBBpgdNpd1I0ITdA6xHrQJRPtqvAj6/VzGALVKcFy+k6KzluAwoieOvg1PeZlVgPzyCevIF1vAZD6b4HOfIVde7ENp/xKQgAQkIAEJSEACEpCABCQgAQlIQALtSMCU4HBn9GSQOYk3H2Q1aN6B0AShTcVnKzPaZmcdaAf0e/PtaNDUFAlIQAISkIAEJCABCUhAAhKQgAQkIAEJSEACHUUgHA4DDj5YaCMUDpl0ZwacHbA7nQhZf8IKQHeUwexI7TTZz/agD+PHj0NmZmZHarra2kYBU4LjyJEjVsa7sqDbiKfVJSABCUhAAhKQgAQkIAEJSEACEpBAJxCIREKw8Y/DxaBzMMSbEgZhtzlhD5ka0CHVgO4EY9zuumBKb4waNUrB53Y3Mhe+QeYLBjPWZsw1SUACEpCABCQgAQlIQAISkIAEJCABCXQtAYfTBVOiNWwC0FbJDRezn91AxGRFMzna4VYAumudEpemt6FQECkpKZfmYDrKZRcwY23GXJMEJCABCUhAAhKQgAQkIAEJSEACEpBA1xKwsp9tLLkRsSEcCiPCh52BaF9NDcKsBe1wu1SCo2udEuqtBJoR+HAGELZzAW9LGmFZeP6KBMylIWyeHXXzzDIzf9CjfNYkAQlIQAISkIAEJCABCUhAAhKQgAQk0NUF7HZ3NDGRdx2M8IaDoRArP/sDvBmhKccRQNDnUwZ0Vz9J1P8uLnDyn1gj3mXFmflVFV8HGIA22cx82M0zf13CzDfPjE/zUgK8/2/mhSYJSEACEpCABCQgAQlIQAISkIAEJCCBLi7g4s0GYWMFaFP/mcFnM5niGw4TR3I4rKxok/aoSQIS6IoClf8KuK5gUnNPBpm78WKRxkcSJWLZ0A2+nzLZ0TEkky199N+7opj6LAEJSEACEpCABCQgAQlIQAISkIAEJFBPwB8IIsIAtCn57ORv1Tscdrhcpga0HaY+dCgcVAmOel56KYGuJeDsy/6aLOcaBp6r+fXUWSDk4wWCWdCs12O7blezHpHddzQ7XzMlIAEJSEACEpCABCQgAQlIQAISkIAEupZAJBxgxrODvzgfgYsBZ7+p+8yHnXWhI2EuYYa0MqA70Dnx7JMrz9na946+i0cf/ldM/ex4XNk3E9ddPQyP/+D7OH2qssG2w3unY2h2srX8hrFX4ut3fhllxz9ssI7edG6BiLMHa/P0YBZ0L35FFXs4TCZ0KgoP+1vu/NmqlpdrqQQkIAEJSEACEpCABCQgAQlIQAISkECnF0hKTkOE6c8R3kaMidBIcrphC0eY2xiCP+BjcJrB6E6v0Ek6+Jtf/QL/wcByMGgyVpufVq38bzz80DxMmXoL/nf3n/H28Sr88tWdyMrugcULH6zd6Og7xRg+4pN4t8KHP75VjNf2v42rRudg6eJFtevoRRcQsGXwysCAsz0z+nBkMRCdzfo86djxlzMWwPw7ByHyh88j8voXEXktl4/bgFPHgXff7AJA6qIEJCABCUhAAhKQgAQkIAEJSEACEpBASwKpaWlwJ7HkRijCUHMEtghLbrjdcLocLMWRhEgwrBIcLQG2l2Ume/lHjz+GCZ+diN9vfQVfuCW3SdN+svy/cPSdI1j7i00NlvXrPxDfuG9ug3l/O/gmrhx1dYN5V4/9FEz2tKYuJMBMZ1MW/miJB93SHMhKS2fwmYWeWZtn519OWxDTb2BmdHzifHx4DCgrZeA6JT5XzxKQgAQkIAEJSEACEpCABCQgAQlIQAJdVYBpz2kZ3VBVXmEFmyNOO4Isy+GIMB2ahTkcvBshb1Ooqb0LPPb9hfiX7+Qj4PfjtZ2/bxKAfufIYaxb8zR27jvYqq4cfLMQo0aPabDuq6/8BrfdeXeDeXrTyQVsLquDQyc9aj1X/Gkhg9AMStsDeGlntBzLxHHMijbT6ZPA8feBs6Y0By8bdnMR0SQBCUhAAhKQgAQkIAEJSEACEpCABCTQlQW+d//X8exPN6KmyoOQuacYaz/bmcToD/IeYyy+YWMAWiU42vkZsu9Pe3D8w1LkzrgTN035Anb8bmuTFq9f+zRm590PJ4t6t2Z6+9BBfGL4lQizEPhbB/bjwfu/idE5n7L233j7Qd1cONej8TZ63zEE+B0Uv4hyYd7sKVaDZ/8/Zs/b+CsTMA9g0vieDDx/BBTvA44WAt6z1nz9kIAEJCABCUhAAhKQgAQkIAEJSEACEpCAEeh/RV985dYvwM+sZ/5ePcsHM/DMmxAy+dl6OJgh3bqIpdmbpksuYOo9P/zgA3h6/Ubr2D1790FGZjcUv/03DLvyk7Xt2f7qFjz3s5dq35/rxcEDf8UrL0X3mZqahqd++vNmg89mP++dNt9WaOrMAg9/+xYsX7MNm373FjZtuxq517MmNKfJQzn2H7DWs1V2nMFqTRKQgAQkIAEJSEACEpCABCQgAQlIQAISaCRw1SdHWHNM3Jl3IETEzvrP/BNmENpkRSsDuhFYe3pr6j7f+pU7YOo4x6dJfz8Vr+/aEX9rZTGb2s1DPjGsdl5LL0zW84kPP7QCy8Unz+KZ/++XWP6fS2DKeGjqYgIhH2wBD7KSa/DSE/9odX763F/gtnm/sV7f9ikFnbvYGaHuSkACEpCABCQgAQlIQAISkIAEJCCBNgmYWKPdYYfb6YIp+xwMheB0uODmjQhtwRCD0REFoNskeglXNlnOr76yGXlzv9PgqBMn/z12bvtt7bwQs6TdrmjJhNqZLbzYX/AGPn3N31lruHgi3HDTzfjanPvwsxeebXarc5XfMMs1dVAB7ynAX8nSGpXI/ewVLLlxhdWRX792At3SHbhqgLLfO+jIqtkSkIAEJCABCUhAAhKQgAQkIAEJSOCSCZggdCgQYqA5YlXeCPI+dsFQEMlpabwJoUMlOC7ZSLTxQA/NzcNbhX+16i833tTpcrGeStCq+WyCyGaQvd5qpKTwBnLnmN47+g4GDB7cYK0Itz99ioHIZiaV4GgGpbPM4q9EIFzDujzmUY3n88djzDd+i9OeAG6+OpnLzA0HTf0NVerpLEOufkhAAhKQgAQkIAEJSEACEpCABCQggQstYGPY2eFyIszs5wjrbkT4JxgJIRSsgZ01oFWC40KLX4D9rV/7DMZ8apxVJsMEgBs/vnjrbdi1/Xe1R/qHr9yOF55+qvZ9Sy8KeFPDz0y4ocEqf3zt/3D9xEkN5ulNFxAIelmIhzcWDFUxzlyFgT0DOPWLT6Nbhgu//DYvDSwej4gJQDNQrUkCEpCABCQgAQlIQAISkIAEJCABCUhAAs0IWAHnQIBpjBE4TbIs1wmHTTCa9aBZA1qpjc2gXc5ZZcc/xNrVP8avf7c7YTNM2QwTgJ78+WnWOvPy/w1Tb/iMdZfJmV+fg27ds1Dj8+G1nb/H1pdfQu6MO61SG2blD0tLMCm2XflHJ7GHwecDfynAo//944TH04JOKtBrNlD6/4AAA9H+M3ywJEdNFU49kw5Un2anqxmANt9R8bLBGj58A7BujzXdUlcGJjpDPyUgAQlIQAISkIAEJCABCUhAAhKQgAS6msDsf/4XRo4izIBOYdzIZVVsYPQZId6RMMRn81oZ0O3srPh+/neQ//APkJbGIGCC6aYpn8eOV7fULu0/cDB+s+OPOMK60dddPcwq2zFuxABsWPcCpjFb2gSs49Mfd/8fvvqVW6x1rr1qKLZsfglrN2yGKeWhqQsK9PsP4Oz7wJkSxpvLGIRm4LnGBJ55gYjwnLCxFIeNFxCYZ7538PkfEn850gUF1WUJSEACEpCABCQgAQlIQAISkIAEJNBlBWwOJ2wOE0Ni0iKznv3VXjD2zMxn/mY9Hy7eu84W4dRlhS5zx9+vMuUNOt/0tz/txJQpUzpfx9SjhALbtm3DJ//upoTLtUACEpCABCQgAQlIQAISkIAEJCABCUigcwkMzHQiKa0Xwg7Gn1n72eFKYvKijbWfWYwjxHg0f5Pe/DK9MqA717i3i944+M2H18uyDpq6hIAZazPmmiQgAQlIQAISkIAEJCABCUhAAhKQgAS6loCDAWebKfpsZ+A5zGRbBpwdLhcj0pwXYVCa2dEKQHetc+KS9DajR28cOnQIVVW8uZ2mTi1gxtiMtRlzTRKQgAQkIAEJSEACEpCABCQgAQlIQAJdSyBis8HuZBkOhplNANrv91k3ILTmMSgd5h+V4LiM50RnLcFhSE8cfRue8jKEQp2zzMhlPG3a1aFN5rMJPvcZcmW7apcaIwEJSEACEpCABCQgAQlIQAISkIAEJHBxBUwJjuR0JiU6HbDZHYwDBqwbEsLG35QPRXjPOReToJkhrRrQF3cgWtp7Zw5At9RvLZOABCQgAQlIQAISkIAEJCABCUhAAhKQgAQ6toAJQKdk9kEoWm+jtuyG1SsGpO0MRNvsYahwa8ceZ7VeAhKQgAQkIAEJSEACEpCABCQgAQlIQAISkMBlEbCZEhw2O8Ks/YxIhMHoCJwMPPM2hLwRYdAqzaEa0JdlaHRQCUhAAhKQgAQkIAEJSEACEpCABCQgAQlIQAIdW8DO8hvhcMgKPls94Y0H+R+znh1wMPIcjigDumOPsFovAQlIQAISkIAEJCABCUhAAhKQgAQkIAEJSOAyCTgdbh7ZwZsP1lglOMLmHdOhw4xC25yMQPNZJTgu0+DosBKQgAQkIAEJSEACEpCABCQgAQlIQAISkIAEOrJAjd/HyhssvRFiFrTDBrfdDYfThSDLb/A+hAgH/FAJjo48wmq7BCQgAQlIQAISkIAEJCABCUhAAhKQgAQkIIHLJWBjzjNrPjtcLoQZhA6HGXjmHzv/uFgbGk6nAtCXa2x0XAlIQAISkIAEJCABCUhAAhKQgAQkIAEJSEACHVogzBIbLjvrPTthM8WfGW6OhMIwf8xrBIMKQHfoAVbjJSABCUhAAhKQgAQkIAEJSEACEpCABCQgAQlcJoEAM56jgWeGm1kPmlU3mAVtswLSwWAANtaDVgmOyzQ4OqwEJCABCUhAAhKQgAQkIAEJSEACEpCABCQggY4s4LA5rFrPbreLAWhHtAQH6z/bmQydnp4Gm8MU49AkAQlIQAISkIAEJCABCUhAAhKQgAQkIAEJSEACEmijQIQ5z2GW2XAnpSCjWzeWg3YxBZp1oMNhuJ1J6Nu3P5xt3KdWl4AEJCABCUhAAhKQgAQkIAEJSEACEpCABCQgAQmAFTZY7TkIz5kqpKZnwsF857DNhppANcrLA3CnJisDWueJBCQgAQlIQAISkIAEJCABCUhAAhKQgAQkIAEJtF3AYWfAmVHoGn8QZ06fBhzmpoRJrP1sQ9gegs9fowB021m1hQQkIAEJSEACEpCABCQgAQlIQAISkIAEJCABCfDWg7DuPBgJwdyQMBQMwcagtFWKg9nRNlMPWkwSkIAEJCABCUhAAhKQgAQkIAEJSEACEpCABCQggbYKMMbMrGeGmK0oM+88yP+sN3YHg89h2HiTQgWgjYkmCUhAAhKQgAQkIAEJSEACEpCABCQgAQlIQAISaJOAjfWeo4WgrcizVY4jxExoh5nPwHQ4HNJNCNskqpUlIAEJSEACEpCABCQgAQlIQAISkIAEJCABCUjAEgiFA7DbXbA7HQgx4zkS9POmhEyEttnhSkpFMBhQAFrnigQkIAEJSEACEpCABCQgAQlIQAISkIAEJCABCbRdwOFwI+x0WjcddDjtCHEXdpuTZaGDVhAaDECrBEfbXbWFBCQgAQlIQAISkIAEJCABCUhAAhKQgAQkIIEuL2B3OJHCTOeIqcDBshvJKalwuZ3oltHdKgdt5ju7vJIAJCABCUhAAhKQgAQkIAEJSEACEpCABCQgAQlIoM0CpsZziA/W2kAgxNrPvPmgnUHnMMtxJCenIhRRDeg2o2oDCUhAAhKQgAQkIAEJSEACEpCABCQgAQlIQAISYKA5HEaIZTZC5p6DNgcQCiDMEhy+QDXvTRi0AtHKgG5nZ0okEkHA78fZs2dQXX0W/ho/IhFTurtrT6ZwuTvJjdTUNKSlpTOV382sfpPbr0kCEpCABCQgAQlIQAISkIAEJCABCUhAAhK4HALhUDT72Wl3IhiqYdDZARtjmRnduuGM5xQD0EGV4LgcA9PSMU3wufzkCbgjAVzZry+ys7q1tHqXWlZReRrvlR5HOQPzPXr1YUA6qUv1X52VgAQkIAEJSEACEpCABCQgAQlIQAISkEB7EnAxPmeyoCMMNJsa0KFQBGkpbmZCR2DjLLc7VQHo9jRgpi0m8zmJd4kce/Un21vTLnt7TDDePPYffNtyUgD6sg+JGiABCUhAAhKQgAQkIAEJSEACEpCABCTQhQXssAN282AFh5AdNr42AemKslI4HHZkZPQya2hqTwLVDED379urPTWp3bXF+BgnTRKQgAQkIAEJSEACEpCABCQgAQlIQAISkMDlEwgEWXYjHGTZjWiYOeSvgZ81oZ3mBoSMSXvOehSAvnzD0/yRvdVe9MzOan5ho7meykpUVnqYL93+Jk9pMY55Lk7LjI9x0iQBCUhAAhKQgAQkIAEJSEACEpCABCQgAQlcRgFTfgM2mJ/hcIjJ0A7ewy0Vmdk9kJqRCTvLcigD+jKOT3OHDpnC3eeaPEVYNt3GgcxGdnYmXLbp2FzsOddWl3T5wf+5Dav+evHa1CqnS9pjHUwCEpCABCQgAQlIQAISkIAEJCABCUhAAl1LIBIBwsEgzLOJNCelpbIWtB1BznOlpaNbZrYC0O3tlIhYo9VSqyqxKncU8quW4lCFFwFvGbYsrULu8PtwwNfSdpd2mav7UHRPc160g57b6aIdWjuWgAQkIAEJSEACEpCABCQgAQlIQAISkIAEKOBwOpHEGxHCZD/DAb8/AH+gBj7vWb72IhgJKwDd0c4UX9Em3LsjB7t++RBGZiWznkovTH3o51gxEzhw1GQce7B9ZR5vOmmzHrOWbeUcM/mwcf505C1ZiLHWsunYuHc3lkyOrjc2by1OmrWK12Py9CVYtWR6bB/Mri6K7qF443xMzluIWWb7sSut/RZvXxnbH+fNWobieBA8OQMf/nk98mLtmLxwIyqtdgBFm5fVbjO2dptY+xbOt447eWVBbG09SUACEpCABCQgAQlIQAISkIAEJCABCUhAAu1RwM4bDTLhGe7UFLiT3EAkhGBNgM+8J2EgiEDQpwB0exy4ltoUqK7i4m/gUw3KRPfC3J/+FHeNzMCxzd/DzQ+kYk9JFapK9qFn/jTMWlvEbQIo378Jq3f0xeaqKuxbNxS3T5iI3o+VwFu2DxNWz8aagkoEqj3YselhFAxcgCpvBfas6YPcUd9DEcs5V5e/ix2r9yC38Cgqds5ByrGNGH7zA8jfx314S7ChZz6G37meoW7AleTB8ntfwx1Hyqx2THjsdsw27QgW4YXnDmBRYQVT8yuwCPm4bfWBuvbtyca+o2XYNCeH8zRJQAISkIAEJCABCUhAAhKQgAQkIAEJSEAC7VXAwfrPNlNROBSBg5FoN7Oh7U67VZLDyXrQDocLF69GQntV6QztShib9WHHc6sxZ8NRXNsvgz0dhwc3zUH/V95G8J7+QDmwePUsDM7IQJ8xQ7l8Be66th+SkY1x3Odpy6aGP+fh+/dcC7OHa2fOR+7sO1DK9OVeNQx+L34MM8YMttYs2vQiMHMT7hrXz3o/48ENQP/XURK8CwGuO+mp/8TkYb24rBfu3zQP/Te8Cd89M7B4zQ+wa/cWrN3nwdslQI/P8FsRM1ntux/jBjeIrkeX6acEJCABCUhAAhKQgAQkIAEJSEACEpCABCTQrgQCgQBsThcD0EFWNWDA2eZC2M4bEtoiqKmpYTkOZUC3qwFrTWNcqZlA4XYcjZe6sDYKonjvXhRXBpFuosZuDnpscrlZ+HvPh/DyvQktJ8UWxUK+sbUC1rLYGz6l1L20XhXCD6bM83VOfAd87UrvA6QytT4+udL5aj9Om4M1mlzp3KfHD5zcjvHZQ/BzlvXoO2gEBjMuHp/qty8+T88SkIAEJCABCUhAAhKQgAQkIAEJSEACEpBAOxYIh2FjDeiIjfHHYIDB5zBLcIThsDsZlHapBEc7Hrpmm5Y88ktYik3IeWAtSq0gtI81lR/G8AkTcCyYjtE352L1ohdR7Aki6CnGmvzlyJ3/OSubucEOG0ag6y1i0XA8hme3FjHkHETR/77Ao83BkKymyfL9R18HrF6GrcVMjw6y9vSaZUDuP+MqBsFdSZnYce8LOMCgOAtLY838xzBp+jgE3n8Dhcywfug7eZg6cRhOF9Y7tF5KQAISkIAEJCABCUhAAhKQgAQkIAEJSEACHUbAYWcBaPPgfeBCAdbiCAX4lpnQzIq2ORiRjgRVgqPDjGZtQ3vhoYpCnPpKDvqnzI7NzcFTu45isql2cc/TWLd/CoZn5lvLcuatw7Z7RvK1B5k9zK0Io5PLxUBzjsk5jk5JtcvMvJmoeGoUXNPMshys2bcNIxl/PsCgcu0OuCR55EzWkt6P8cOzzYpcdR72bftHlvRgxemaDMxcwD1luxhw5jTzKZTMHIkMZyaemtkfw13LzQaYxNIf3Ks11W9fbJaeJCABCUhAAhKQgAQkIAEJSEACEpCABCQggXYqEGTpDZPpHAqFTAwaTocDYX8Qdj5HmBVtY11oW4RTO21/p2/W+1XMDm40/e3gW5gyYWyjuc2/9VRWMkcZyMjKavJNQjDI/GUuTE5umrnc/N6icz0FK5E5Owne/Xlw+nwIOpNxzl3wQD4+kpNN6LnxxGWMejduR9DM5L6dbWte7c637dmPT151de17vZCABCQgAQlIQAISkIAEJCABCUhAAhKQgAQuncDATCdcGb0B3mjQzj9OpwN2txuREEtwsCwHC3MwCK0M6Es3Iq08UhKDuGUflaN3T6Ykn2MygedEk5OR3fMJ7lo1pnvUWPWeTUC5VfFhHig54cG4rJm4tLO5mYk602i+8TFOmiQgAQlIQAISkIAEJCABCUhAAhKQgAQkIIHLJ8BSz7zxIIPNzHEOO+wIB2rgcLiRmtENQZbjiDAzulXxxcvXha535LS0NLz73getCkBfDJ3kkfcgsv1i7PnC7dP4pGWcO0B/4Y6oPUlAAhKQgAQkIAEJSEACEpCABCQgAQlIQAKNBexg4Jn1NSKs9xxh1nMkGIHdGYDf54U7OQX21DTdhLAx2uV+n9mtO874w3j9T/tw4uRHl7s57er4xsO4GB/jpEkCEpCABCQgAQlIQAISkIAEJCABCUhAAhK4jAJ2G0tthGFnBjRrPTP47GA0Ogx/dbUVhA56vaoBfRmHB83VgDYluc+ePYOy48dRWVEOn7eaRbyZy97FJwdT+JNTUpGV3QO9+/ZFWlo6i5izsrkmCUhAAhKQgAQkIAEJSEACEpCABCQgAQlI4JILmBrQ7oxeCIRtcLE8b4o7CXyBsLkhIeeBwWmby6EA9CUfmXoHbC4AHV9sAtEh3tgvbAp283VXn+wMNtvtdjh4Mivw3NXPBvVfAhKQgAQkIAEJSEACEpCABCQgAQlI4HILmAB0Em9CGLExyMzkUVOCw2l3wZ2SgqC/Bja7uT9hkmpAX+6BSnR8E2R1ulyJFmu+BCQgAQlIQAISkIAEJCABCUhAAhKQgAQkIIHLK8AsZ/4HVoAGmDgaCodQU8OyG6ZwAbOgI3zNOLQmCUhAAhKQgAQkIAEJSEACEpCABCQgAQlIQAISkEDbBJyMNAcCfm7Echus4uCwO6wgtKnnYMpy2JxuZUC3jVRrS0ACEpCABCQgAQlIQAISkIAEJCABCUhAAhKQgBGw21n7OckJP8tvOJgK7eLDwT8RBp/9DEyHGYlWBrTOFQlIQAISkIAEJCABCUhAAhKQgAQkIAEJSEACEmizgIM3HbSz/rMJMjuZ/Ww3D6cdYX/AuhGhm4FoZ5v3qg0kIAEJSEACEpCABCQgAQlIQAISkIAEJCABCUigywsEg0EEQyGEQ3xm3eeIiTY7nHC47XA5HHA7k0xpDhbn0CQBCUhAAhKQgAQkIAEJSEACEpCABCQgAQlIQAISaIOAK6Mn6zy7EGIg2mZjNjRLcISZD53scvHmhAxCu1UDug2cWlUCEpCABCQgAQlIQAISkIAEJCABCUhAAhKQgATiAqYGtNPltm4+yNsQIoQIGHq2np0MQgd8PpXgiGPpWQISkIAEJCABCUhAAhKQgAQkIAEJSEACEpCABFovwIRnOGz8weCznQFnG1/bgyEEWJbD5z3L2TYFoFvPqTUlIAEJSEACEpCABCQgAQlIQAISkIAEJCABCUggLmCFnvkjEPID/hrWfk5GMBJmOJqlOMJhZkIrAB230rMEJCABCUhAAhKQgAQkIAEJSEACEpCABCQgAQm0QSAcDsHPMhsI8TaDrPkcCvqtjOiIwwWHw27tydyXUJMEJCABCUhAAhKQgAQkIAEJSEACEpCABCQgAQlIoE0CkUiEFZ9NAQ4gEgkhbALRTgeS3awE7XCgxh+wlrdpp1pZAhKQgAQkIAEJSEACEpCABCQgAQlIQAISkIAEJBBivWeGnOFwOhEJRxBhJNpht7P8RohZ0QxIB2pUA1qniQQkIAEJSEACEpCABCQgAQlIQAISkIAEJCABCbRdwOl2MuHZAac7CU5mPrP8M4LhIIKsB+0PhVmGg8vavlttIQEJSEACEpCABCQgAQlIQAISkIAEJCABCUhAAl1dwGFzIBAMIMxSHKYch9vpYi0OJ/ymFrTLjaSkJNi4wGRJa5KABCQgAQlIQAISkIAEJCABCUhAAhKQgAQkIAEJtFrAnZYFm3WzQdbesDtZ79kGu93G+xEyM5oZ0c7kFNWAbrWmVpSABCQgAQlIQAISkIAEJCABCUhAAhKQgAQkIIFaAZP5HGSpDSvDmXWfTTDaujGhqQWdlAxvtVcZ0LVaeiEBCUhAAhKQgAQkIAEJSEACEpCABCQgAQlIQAKtFnClZ7HkBqPNNmY923jzQRN4Zs5zhDci5J0IEWI2tGpAt5pTK0pAAhKQgAQkIAEJSEACEpCABCQgAQlIQAISkEBcwJTbcNicjDVHwErQsIdsiDiAEOtCm7RohzNZAeg4lp4lIAEJSEACEpCABCQgAQlIQAISkIAEJCABCUig9QJ2U/XZyQdTnx2hIGs/MwDNzR3mZoTMiHbYWQe69bvTmhKQgAQkIAEJSEACEpCABCQgAQlIQAISkIAEJCCBqIDT7YbTlcTyGzYEavzwMwhtJiffh5gRHY6EFYCOUumnBCQgAQlIQAISkIAEJCABCUhAAhKQgAQkIAEJtEXAwVrPEd58MGJzwOFyws2Nw2DwORKE05nETGhTEVqTBCQgAQlIQAISkIAEJCABCUhAAhKQgAQkIAEJSKCNAm53Msz9BiNhBpxdbpbjcFglOJzuJNj52qYSHG0U1eoSkIAEJCABCUhAAhKQgAQkIAEJSEACEpCABCRgCYTDYbiTUhFh4ecwf1i1n+2mCnSE70N8tqkEh84VCUhAAhKQgAQkIAEJSEACEpCABCQgAQlIQAISaLtAKBSAPcTbDDL4bALQJhPa4XDxbQR2m5MBaWc0AG1mhEIh+P1+BAIBBIPRYtFtP6S2aA8CTg6sy+WCm0XAHQ6H1SQztmfOnMHZs2dRU1NjnQTtoa0fpw2muHlSUhLS0tKQnp5u9dfsrzP29eM4aVsJtEZAn6fWKF3edTRGl9f/4x69ufEz8zRJQAISkIAEJCABCUhAAhLoyALhcAQBBqFdvBGhm+U2IuEkwGFjTWgby284+eAzg88RE3D2eDwwKdMmmJecnNyR+93l2+7z+axAs50FWDIyMqwvF44fP24Fnvv06YNu3bp1GqPTp0/jxIkTViC6b9++Vr86a187zaCpI+1WQJ+ndjs0tQ3TGNVSdMgXjcfPfImqSQISkIAEJCABCUhAAhKQQEcW6NZ7AGs9u+Bg8NnGILSLtxw0CbGRpGht6KSUtGgAurq6Gl6vFz169OjI/VXbGwmUl5cjJSXFGtuKigqMGDGi0Rqd5+3hw4eRnZ1tdaiz97XzjJp60l4F9HlqryNT1y6NUZ1FR3wVHz/9f1dHHD21WQISkIAEJCABCUhAAhKoL9C970A43ClWNQZGolmKw86AcwiO5BTYGYh2skoD50ZLFqSmptbfVq87gYAZU1Nuw5Te6NmzZyfoUeIumP5VVVVZK3T2viZW0BIJXBgBfZ4ujOPF3IvG6GLqXvx9x8dPAeiLb60jSEACEpCABCQgAQlIQAIXV8Bmc8DBmxCaYLO54WCYDxscrMgQhJtB6BBrQttNE0zdZ5Mp25rJy1IdHo8X5h6GnXnylpfihLdj99KMqRlbk+GelZXVquEK+jw4WVkJ30UvAx5EaVExKi/QcUz/TD/b0tdWgVgreVBcVArT1KCnFMXHPK3ftJ2v6SktxjHPBRqEdt5XNa/1Ahf385SgHZ5ibN26Fx3+03WJ+tHmMQp6UHmyEp6Lf3FPMMDnmH2J3M7RijYu9mDv5q0oPo+TNj5+bTygVpeABCQgAQlIQAISkIAEJNDuBGy84aCddZ7DgSB4C0LwzoOAufFgUgrCTjtjyLwZoWm1uQnhOSfve/j1ikew9Ic/xA9/uBRLHlmBPaXec27WUVc49tu1+H1xdUdtfm274zeYrJ2R8IUPu1flwZWSid4sZZHismHWyu3wJVz/4y7w4NlRt+Ev5/EP90RHNjfSNI+WpgOrZsHc9Kn2MXk+dpeeo5eev+K2Uc9agTHvwWcxfNVfWzpEh1p28H9uw6q/XsBBaNe996Fg82YUnOxcAfeTBVux9cDJCy7fms8T+KlYO6ve58n6bE3G3vM4pTyHf4lp0+bg8Dk+jh+7o8FSbN24HRfrNLhk/SBE68YIKN66jHW4MpHdOxuZKS5MX7a13QX6W+V2kceuzeeW7zAm5E7DLw+fxwkfG782H1MbSEACEpCABCQgAQlIQAISaGcCdpfJfA7D7nJa/041wWgTdLZuPsjQs8mQbmUA2oOtP34O+wNj8fXvLsSihfNwy9gAtq5ei3f97azXF6g5pkA23Tr8ZALQrfmCoWjtNzHx3j3YUFiCQCSAksINKHzgZnxzY/FFMkhBt0lDL6hxq/paUwLM24SSijKUlRzCmrHLMXHa8+cIxrgxNCd240YWU5+U4r5IJpd+t67uQ9GJunNOwNdyc/HK+53ri7Pj26Zh2kvvnLPvbV2hVZ8n7rSm0HykClFWVoKjR4/y8SLGZrT1aEDGuIcQ8O7DuIt+D9zjmHb7zXjnIn0Pcen6Ef3y+FzXd0/BKgyflo/FWw7By2t72aEtQP40zFp7oO2DdBG3aJ3bxR27NncveZz1W0YPjTuPE54HO9fYtbk92kACEpCABCQgAQlIQAISkMBlEWD2M/NBQ34/XG7+o94kQTMDGg4nk6FtMDdftwLQ52qb/7292HPGjRl5X8agDDcLS3fHNV/+Z1zTBzh23ARzvPjry8/gkUcesR4/+fUbnGMmP157fgWe2bAej1rLVuC1ojex4fHoeo8+sw2nrPWA0jdert3+8ed3Ruf738Pzj/8EGzbE9/04thWVW1u8u+0n0fUffRSPP/44Xz+Dw1ZTmKn9k0dj+3oUv36j1FrfX7qT6z2D539ijv04iqINjB2dT953sYEZ3o+Ydv5kA95iOWFSWZO/9A38JNa3Rx5fj8OnmmbZlu58Hiue34BnHo3u49Hnt6HcrOZ/F8888pNo28zbUrZjxbaYj3GL9YP7X7/zsFXa5PDLK7Bi62Hr2OZH9P27fJXIuXbV83sRLMJ/zH4Ri3+/DTPG9GO/neg3Zga2/H4pUt85xtITHqyfNRmrDsSyvHxFyBs7CwXWWw82L6vLKp4Vz6zjOvMnT8fChdOtbOOVBfzV76LNmB7LPp615Hm8iwzEQ7lFm5dhbGzZ2FnLUGyyIJvZx/l1sG6rAF/mXDEA/bJ6oVe/kbhn3jqg8Oc4GOvL9pV1fVm4vsAqu1G3deNXHjS3vq94PSZPn48leWOjmdZj52NvLMvaGMwaG88YnYWt1u9u+7Bx/nTkLZxvrT95ZUHjA+HY9pUNfIpiWaK+4q2YFXOz2eL7Y8bj+vmYPn8Jxyl6rLHz16L0HAG3ZseALak0bY4fw/SlSepoM+33FWPlrFj/bZOxviCWoVt5AMum181fuzf6+Swy7V24Ekumx2ymL0NRbEwSn3sms3Nl1Jjtmzx/PeJ5wKYv8Sz3yXmm7zyH867FA+zPw+MzMWvVAcs4UZ+bbt9kSOA7tr3W18bPw+b47+E36PtYLNtabG1snReT8zDfyhg2WcJtcOPvImxfmVfbp/jnrGh9HnLyTacmwDZrrfVFysfpU9NenntODVcZeuUo9OrVD4MHD+ajH0wMOdE5WLByOqavqjvHo+85Hr4C/Ms3o79pYDKrm7uuNDWs1z7PXl5fZtVlX3sKrPfR61RsPd8B5LnGW28mpNii17QG41V3rjY51sn4NS12jZi8DHv3bsTk2Gcjb+3e6PWiXj8SGZgGNDtOF/ya58NvFt+LnMW7sGjqSI6LE71GTsXTu1YA+/+GM6Yhbe5/w2t60+sZx37jfEzOWxi9boxd2eALvlaNf3PXiebGzlOEZbXXmbrPmulWfIpej5dg1ZJou2226dgcvbg0087mr+kJ28yevTj7wdg51/w5G2+HniUgAQlIQAISkIAEJCABCXRWAfPbuWHWefZWn8aZihOo8ZxChCWBI7wRYZiRaVOao1UB6FCNiXblYFiDJJ/uuOVb38JNg1JwYs86vPSGC3d+Ox/5374bqftfxupt73GbEM6w5uQHxzLxjfx83H1Td2z72UZk3PJtLJx3N3p/8Bp28FdXQydew+qXC3HLnO/ikYXfxuhTO/Hkywy4hmpw6swJHHN+Ct9dtBB335CG1362y/rH7KDPzsS8ed/Fwvl5GG3+GT30UxjMMtal+1/De90m4rsM6OZ//Xrsf5kBY2Zpmz6cOfMBUj99N+Z9918wokHJ6xD2rH0eb6XdhG+xnXNuzMAb71bCyiDHCbyw+mX0vGUOFj2yEHeOPol1T/4uFkCuO3VqfKdQ+W4pPnUP28S+Zb37GrZbv5YbZDD9rBVYNmuHzp7Bmcpo9DDq1hNz8hdxmztxcuc6bHnXiwFXD0Plnj8jGmo/gT+8UYlPXtW3Bee6dpzXK281SjAJn/9Mr+jmQR/rfHuQPfE7WPXQZIYsgI8Kd+A0T5joVI3DJlOab3zFv8Vzf7gShRXMtK4qRCoz69aYQHWgGu/u2IQ9KV/H0bIKzMmpwPdG5aLPuj2oqOL73gVYvsMDl9khA+AvPHcAiworeHJWYBHycdtqBqSa7KN1dayjbWz+pzleYc1ZBoqC8LHe9d4dWzhnKj7Bc/vY5u/h5geuxJGqALxle3Dw7vF4Mh50b2Z3idYPVHuwY9NyJH35V/B6y7AuZzkmvLife/BhxwvPYeCiQivz7dC6VEy7bT3P5wDK92/C6j3Z2He0DJvm5DQ4WvDYRgy5+QHM33OUGaIluK8kH6P+azfXKcYDw6chlaZVgSrsW9cT04bfhyIOU7XnXWxavg9f/lUF+7IPOctn49l9lQ322+BNojFg635xRy6w4RDbHMCub3yE51451GBTDlSj9l+FzQ8Mx7NXLkUVM/BL9tyBu8ffgQKe9gd+OhP5GYuYicn5u6Zz3Hdan+eAae9jD2DggqPwVh3Fmj7s430brRIwic494zJ82rPYcoTnDV3uePduTFkZDWTel5uPdUe8bHMJpp94Ca+yyXet2IylbPmCLUfw9DdGJT7vGEBsuj3P6QbTMSwYcjM4KLT3Ys99HuQOX84AeNDq+wOp+Sip8qJkH6+J04ZjLb8xsM6LHauRffs+lFVswviM1rsd2/wAz01gT0kVvCW8BvJztnz3SYy863H8fjHPlwVbUPH0TGQkGsdW9alBB1v9JqkH8NILT2L9+rVYu3YV1m7ca41bonNwxKTJ2HTvRkS/ejiGnz6wCdM+N4SnUQAnCk9bQdxE15WmhvWamXEVpuW8iOdeP2bNLH39p9g06QaMqP/3VvIYPH709/zbLMc6b74xKiXhudrkWMnRa9rBvrNRZT7XI/IxYcImPFZWhbLCdVg9ewH2mdOkXj8SGVy6a14AH/Gv0ru/9Kl6UECvG+fipSdmID12vjb3WU3U/7prekqC6xmvP+XvYsfqPcgtPIqKnXP4VWPd1Jrxb/Y60WTsMlC84wX8YeAiVPB6UnXIfNa+aV1n6o7G4bCuxw+jYOACjlsF9qzpg9xR34teJxu1syLB3wEJ20y/qpJ3+VV7C38X1m+MXktAAhKQgAQkIAEJSEACEuiEAjaHKbPBtGeWfg4EfAgyrmhjUDrZzRrQjMcGarxWbLF1XY+nqjZZ248Dez/AgCnfwsgeJqo7ArdMHYAfvVnKoCsDmvyX2dW3fQ59eEO8rMGMVKAHPjeyBzNfMzCA+/RyTsmhA/yZhY8O7sU2vvKmcbPCv8H7+WEMbbkxZco1yGA5kYxrr0P6nz7gGsziTslAdx7uvZ0/wR7/WMz72jVWNm2/CXfgzh4HsG/bNgYYS7imi/VHzBYmeDoWUyeMaPCPYbMEzLTeewKY8q0b2U4eaPTf46ate2DCdf73DsAcsdtHB7GDjQtajXsTH/inYkR9kyDDsVdOxTX9zD+1M3DjleloHKbjgrq0asIc+gv33KcbDr6+gwuCYLdR+C6jlYcAAEAASURBVNYHuOWW63AlfoS/MEIzJfgXZgpfjdxBDrzx60TOg3hvyY8xWVFgSsWeD7z4TeQwI9qaclagYv/shDtPHjYDa1YUYPeWtQy+lDFcz/E2gWruq4pBnn+fdysGk8RXxAAr5uDoXddypIEb8+Yj9977rCA2nCOxeM0PsGv3FqxlBOdtDluPz9Cz0T4SNqItC5L6M1t0IlwPxzeaxEDUkzxTfVi/YTUwczF2/9L0vQZ9+PPZHYcxt9nu+/B6gvVnTzI5oYvxzanDrEzQaXMWY9JOzuK7WxevwYBduxmo24eqtw+zo+OsM9N827B49f0YN7hpkP3IDrZn5ibcc+1gsxPkbffiLp+Tpi/Wmpqzbtxd8zDv7iF4s+RpfLKGKfwL/h1Th5n9ZWHOgknYyVcJp0RjwEG4YgLw4u3/ijFrZmJK7kqsaqaNDdrPLE5Dk7P4GH65di0PeZqPHXiNaeZf6jfZ7AyLx6zh5zoXr64aHL0ImfbO2VLbx5nzn8LsUYfg+ekXEjb5yOubuCwHx3Zvwlq+Os0BK3z2D/DcN4WfdAbdvrsY/plTkLtmIwZnOTmHn2MT2+/dG8lO8z7BeefslnB7sw8z+Yp2YLk5n++51rqeXJv3Eqru8iHDdwjPse8bjv4j+mXwGOPu4hcKd+OVN0vwlU+a82Ip7r91nPUZMFm+rXM7iUzudM6Go7jWur7ciJe8VfA5zagzmNitB3KSeiMr+eP1ydrZef4oLz/NL634qbG+rPRH95LgHMzgb1csQH+8Wvwo7glspeNilI1kX7i9+YxYPxNeVxobWqvHfmTgtifm4d4f7MCPp87Eq8uWY96/lTS53mf06c6/hXogq3cWnAzYJzpXR7gaHYtfoFjXtNmTkcFmjrl6EnKWzse1vdj2jJH8Cq/+FO0HEhhc0mte/WY1fu070vb+x67pZlcJr2em34sf42/URK9Z9Q/bmvFPTXSdqD92PN2H3boYKwbswhZeZzxV+3mYTBP/j59GscOacZyH78c/qzP5d8/sO1DKv+B7NWinD1sSXNPnzk1wzlr/lxA9TMK/C2Ot0JMEJCABCUhAAhKQgAQkIIHOKmBnfrM/yPuyhXmzwYgNQV8NzoZOMsGwAimpaUhhDLdVGdCOJP5j2l+M47G4QhQshNKiIpR6TESbc6yATnSJw8nIYdkpKyvIhH2dseioFQeOrsKfoWjgzSw367u7oXvPnujevTuGTpiBO2/PiZVncDNYFNuI7XBFQ5bWDE/Ry3hupx93z/8yusdW+euGpfjJhjcQTO6Ovj17cK7512h8cjUfcXckWcFfZ7yhZnU2yaQtO5wmkJCOrFjbeg6dgBl35qJvo4iv6ac7JYk/o1MSb/RkTYx+GzZHbP36m0W7nYWePbuz3z0xYcYM3D6uL9fugRsmZOFPBW/izX0FyLrhWqt/LTlHD3aeP52pDAftwJ9jN1Iac89PrQzdki3zGNGL7ZPPyfGi2Kbhsenk9iXIHjIbRf50DBox0graxpeZfsRj9E6XeZVat4jA0fAZZ53cjvHZQ/Bz/lp030EjMJgx4rqpbh918z7GK9aAzlm8x+rfkU3sHyYgJ5ba72bzcgYOxKBBfdG372DM3LULa740NOHBWlyfNaPjp60zLX5elGKJKxuzf16E9L6DMMR0tLzGWs+ESJLqWBsc05XOyGp9OgbpMvihcFrFm1OtUzW6gQvmK6DS8oB11ud0N19pRKe07pnxl80/JxwDBs1XRXB031x0KyvA7CHZmLxyb5N9NGg/z4+eXKPnwCswqK+xvAa7du3Bl4amYNiMJ1B1lHV+u5VhzewhcE1eWVs2A6nxs4Ubs9a2+XrK+vQmOPdc0QHAFYMG8Rh9cc3MXcxunIIU5zA8EWFG+NxxKCtYgyHZLqzcGy3OYdpZOyXqcwvbx7d1pqTzZYNBQYaJSvKzZL64cMc/K3ydztUOl5ogvJlMEYS6qbVu6ebDUo8HyRm118X6V7iEn6VW9KmuVW17VVMOfOP+B5GXNxdz5z6EuffcaIWRTbuaPwf74atP5eKJV3Zj9+Yn+QXB7earygZTy9eVhob1N+x1/deRy6zYXUW78MKOXHz9+n71Fzd93cK5Gl258bHqrkcN3Jvu2ZqT0CDRuWdtVXeMBLttw2wXMnkJ2/rnow23qSzG7r3FCH6M/vNKk/B6ZvU70QUN5x7/Fq8T9Xqyfcl4DJn9c/jT+2LEEHOtZuC72clcGetPhfx7ORi9TtZrZ+Jr+rnb3PI5W//Yei0BCUhAAhKQgAQkIAEJSKCzCTD7mb+ZaiZWqbSCzSYI7a9mNYrTlUxWO9u6ALR70DXMCKzE8y+wrrEVhPbjvT0/x+qf/QxloRQGHrPwwfZdKPUy2u0txY5X30XW311lBcMakJoobTNTz0FDGOA+ifSBY3DNNZ9G8vFCFJwINs3qrRfBDpW/gR/97A3c8LWvs5wGg7xWmrMHH7zlx4DJX8SUG67BFcnREIEV9E1wbKs5jp4YwnjS9u3R2tWe9/6IPzA7ysUNHX36M1vxDHzJA9m2azA8+Tj2FJyoDao3052Gs1KyGNw9gzffZpSG/+R9+63iWCDJjUFDslgT2oeBY67hvofi+L49OBGMhqcGTfgc3G9sxMb9btx87SBuy/Vb69ywBed+x+zX+1dMwr0592H3MSsNEZXHduPfpy1ncGgS+5+CIXP4a/Zb/mr9an3pH3cwXB2d3mcbMWcJvnPPDFw/LB2HExzNOXgMcpnr+IJVDzfI+qfP4kWua2KunvffYJx7Hh76Th6mThyG0/Ggd4J9fZzZ1hkRCzgMu3Uhcy8fw0yrHm0yRl+Xi8I9VRg5cSqmTs1B8a9exDuBeLiQ6Y8NphbWNwdprg+e90EtLFn4HcyYej3ST5fwXTw43WDnDd70H30dsHoR65aanHzWGZ3POskLt8PZP2r6LE1NSZHi7S+a3uDzObWh/Qb7aelN4jE4iVV5eXjd9WnkPfQo1jw1CTteOmSdBwn35+yPsZNYYrYqCxOnTsWU8WnYsvpVVKc4sXfVfDz2uov15B/Cky8+xcTo7ThuaJMYIF/+A9ZRZh+DlfjfZ59g1vc49G7h3LNcCg8ia+REjtcUpBVvwaZ3AnCe3Ms6y8vh+swMPPTok2CT8dIh8/njRYDjcoolYcyUsM8Jt7c2s344+4+2zudVm4us98WbTf3uJShl36/j8RY9uxWVPJyneCt+sBz46uevavhdWN2u6l4ldEvH6JtzsTr3hWhdbB9rEfOKvnB7aXRbXzkKT5VZY/Jx+lTXkLa9Mmfw8ZMn4GMKdGVlJR8eI93iNPK2uejxwERMzO+B7+aOrLdu9HOW8LoSvaTXW7/RS5ZpYOI7bh51M8oXfxdjzPeHjSemyJbzClZZwWMlNOfn/lzHarzfBu+j/Wgwq96bhONUb50L8zIZud9dih335iBeb9138gCWZA/HxE3H+OVv4s/qOft/ntcz069zjX/C60T9seP/k7z5cCH/+nkI98yYimHpUfOm3+OZM/QxPLu1yLpOFv3vC9jE314YEvutiDrnFq7pLbY5uoeE52zdAfRKAhKQgAQkIAEJSEACEpBApxQwdZ7toQBsfLaZDFwbS3LY7VbqcQ0D0RXlJxsk47WA0B1f/u7X4F31PH706Gux9dzM2P0WPmVSj6d8DTeVPInVS82vwDJUOvQm3DfFBE29VnZ0/N/xDpMl7a4LTTiZ0WeWuQdNYn3nEqz70RIrQAf3AAao+nJJSb3sTr41kzv6z8t3/vi6lVn82vM/RLRFfXB3/rdww50TsPxnq/HIVq6azqhybA+Nj23tq/aHG5Nmz8DRH23E0rde5oYDcPUAbmsC3o6h+NrdN+DJdT+CibVyIfud1yS4bmVxxzsa2y97y6kPrr9pKNZt/BH2c/s+Vw5FeprTCtAMirn9aMkb1pruAROQ1z+WqdX9KkwY8BJLktyAUbF4Ynz9ps7W5h/rx7VzN2HT6VmYOKQuU3bm0i346T1jrP3emLcOi8ZPREo+385cgDmT+lvzc2azNEDvCXCt5tsc/kq6Ndf0nJl31uvYD+cYPLnnKfSfMBym+kUOy1KYfRiyjHEz8dTM/hjuYqSOe5jEnUS3bbSP2K4+zpM5e3rUBqV6Yd6+p3hTuu9h7z9ux7X3PI11+6egv+sB6xA5c57CluHE9zbYqLZfIxOs7zrEgEdOg1zb6DYZ47H6qTmYMCR6Dk/KNfu9wzpWJpP1E4Wskkfeg8J1+5EzKttaFznzsGfbRPOrA3h63zoGeKOmxm7Nvm0YSf4DJqDbaIeJQt1mfuIx6IXrP5eKnJxs3G0dPZfloL8SK5QQbY752bD9ybjnl/uwP3s8YpSY89QujKK79/rPsB54Dh6L7gyLWVvaBAkPGK7csXhueDYDu2aah30V03mBcrJcS/PnXvLImdi3Zj/G94968qTCri1D+Hv1Xny25wLkZJozjdOkxSj8ysjoy3XzkDNtCPas2IftcxOcd72uTLi9tRPzg1/arGHd35tyRjG0ZSba79nC3M5Y328aj+zY4eet2Yd7RibDd6CZ86LBuCd2c96zhufmTRgV61POvDXYMjGa3TtiWj7HZxpS+Pmq2v4x+mT1o+0/koYyvHfzkJiD2X4S9lRtR2pL52Cv63Efv9TawXG+LqveMWMfzkTXFZfJjG/02aq3tfXyuq/exzI7O5B/+2caL4q+z7gS+fNyMG1IClbsq8LcBOdqsMmxGl6PXI361+B6F+tH43VMA1r+vDU8RvMdaNvcrBsfQuGGU8iZ0B+zY5uaa9vRh1kOh1Oiz+q5+o8WrmfN9Tt26OjTOcb/qgTXCSQ3HLt/4jnfm3+nRP/64Tc/tVfn+kczF5eZqHhqFFzTzPzE18lE13Rrb4nabC3kXhP+XRhbQU8SkIAEJCABCUhAAhKQgAQ6qUCA95Zzud1w2J2IhMOxXvJecSYp2gSiWarXFuFUVlbGsqi9W8XgZZabCSGnZmQ0yVA2dz00ichut5Vz3Kr9NVgp5Gcms9mekemPNTEjmpna59MOPzd0GLQmx+c+meHtYNmDpsuarNx0BvfrDTlY96Tp1iEu455b3d62OJuxNY/Ro0c3bVMzc4K8MZ/H44MzI8sq89BwFXNzwgBLDcQi4vUWBn2MdiY3/nX1eivUvjQ3/wtyVUYdG03WPljypF41l0ZrtPz2zTfftFZobV8T7c20I8jAZ3Jt7ZdEa0bnt3V9VmO3YsPROsQt77vBUnNzSH74MprYMf+Zpq3zb7DHJm8SjgHb7PEGo2UmmmyVeIbPnBcc04aU7L+HBeh5HkW/pAEKVo5lcOxF7J87hsvM+df4XEp87rHziHa/4Tll+mLK3JtyJS1Nifrcuu1NX3i2NGkv863ZLp7pjfreUkvqljXvxn228tz8eH2KtuNCfZ7qetX2V1Y/WnVdqdv3sa0LMWRaCsoii5qU9qhbq+mrROZN17xwcxKNU2uP0KYx4rW9kp9hnqzIMvXJG03n3f/zvZ41On7Tt02vE03XMXO4nvXXT9M+maWegpXInJ0E7/48OM3np8n1yKzVcGrt56zhVtF3bTlnzfh93L+vmmuD5klAAhKQgAQkIAEJSEACEriUAt169YPNKqUKhAM1iAQjCJs/jECzLDRjxSbKxsnJiF91dTVSUxvWNG2usSnNBB/j6zmYZh2vdRyf16ZnhxvnG7tueBwTzG04p7XvEge/uc9mgset3a9pUOMqlPFtmw94x5c2fW6tsxlTM7Ym2FteXo4ePZhueY7JydqyWXw0P7H2MANtzU3OJkHR5tYy8xIHdlu/j6b7Nv2LB7Vb29eme4nOMe1oPpTR/BZtXd9E2JtXbH7/tXMZOGkmbsTFzBM+R5C1dh/neJFwDNjmjOYP3uIe42PScCX2v9F1JDUzB0OrTD484+jNnmOJz72mAe7o0UxfEp3J0TXq1qv/Pv66ddubvjR/tjjNlynxnbXxuXk3jnQrz81E49i6PrE0+QX8PLWx6w1WT9SPBivVe3Ng1XTk3LuJvwlQ0abgs9lFIvN6u7/gL9vav/oNaPMYWdf2+nto+Pq8+3++17OGh2/mXdPrRDMrcRbXa+GC6kplbnqPGuu3bUwfW/OZNOPSmvWaa09rx7T++DW3H82TgAQkIAEJSEACEpCABCTQUQTsLLkRiTDz2Up5trHZYdhZOjTEbGi7yYrmeysD+syZMzh79iz69DG3z9LUWQROnDiBtLQ0mPE1WdA5LH3QWafCwsLaLP7O3tfOOobqV/sR6LCfJ5MNf55Z5+1Hv3Ut6bBj1Lrudfq14uNnbqCqSQISkIAEJCABCUhAAhKQQEcWyOo7kM1nyQ3YEA6FGYc2ac9hBCOmtjEnhyt6E0KTFWQWfvjhh1YgOrpUPzuqgPkywYylGVMztt27m0LdLHNQUICPPvqoo3ar2Xab/ph+mcn0szP3tVkAzZTABRTo8J+nVpRXuIBcl2VXHX6MLota+zlo4/FrPy1TSyQgAQlIQAISkIAEJCABCZyfQIQ3HzTZziwAzR2w9AaDz2G+t1k3I+TvlzIb2sqANoFKU/vYZMqasg0B3mneilaf33G11WUUsHFQXS6XVU4lnTdhjJcUMWNrgtLm137NGJsToaNPdhYyN2VjTGmRK664Aqa/ZuqMfe3oY6X2t38BfZ40Ru1foGO3sLnPmPk7W5MEJCABCUhAAhKQgAQkIIGOLJCW3YtJzknMcjaBZ/aEP8z9B0MMRMPugCslORqAjnfSBJ1NYFLB57hIx3w2/6A1/9Bt/A9bM65B3jCqs4xxvJ+mznVn72vHPBPV6o4koM9T+x8tjVH7H6OWWtjS+LW0nZZJQAISkIAEJCABCUhAAhJozwIZDEAnJSVZpTYYdUaEccmIiUQ77HA43byfVWrDAHR77ozaJgEJSEACEpCABCQgAQlIQAISkIAEJCABCUhAAu1H4IqBI1hZwwuny21lPjvMTQn5y54mEO1MSrGSRs/3Ru/tp5dqiQQkIAEJSEACEpCABCQgAQlIQAISkIAEJCABCVxyAYfTAUeY2c423oiQJTdM7Wczmd8CrfFVw2myoC95q3RACUhAAhKQgAQkIAEJSEACEpCABCQgAQlIQAIS6PACQVPOmfWeAyz87GQAOhw2FaD5YCD67FkPbKGIAtAdfpTVAQlIQAISkIAEJCABCUhAAhKQgAQkIAEJSEACl0HA3Frd5nQhs89AJKVmovz9v/F2hJzHe9FlZHZDSma2AtCXYVx0SAlIQAISkIAEJCABCUhAAhKQgAQkIAEJSEACHV4gEKhBavcepuYGPnr/MLzVZxFmEWhTiMOVmoIzFScVgO7wo6wOSEACEpCABCQgAQlIQAISkIAEJCABCUhAAhK4DAJZ/T6Bak8lPij6qxV4tjmdvPlgMmC3IcJyHDa7XQHoyzAuOqQEJCABCUhAAhKQgAQkIAEJSEACEpCABCQggQ4vcLbyBAI1XtZ/dsKdnsryG7wpocMBf7CGlaDDSErJtLKhO3xH1QEJSEACEpCABCQgAQlIQAISkIAEJCABCUhAAhK4tALVpz+Cg/U2uvftC6fLydrPYZi60G6nG6np3VmaI6wA9KUdEh1NAhKQgAQkIAEJSEACEpCABCQgAQlIQAISkEDnEHAnp8Ln9SLg9yEUCCEcCjID2gaXOxmsvoGAt1oB6M4x1OqFBCQgAQlIQAISkIAEJCABCUhAAhKQgAQkIIFLKxAOh1jrOcQAdA1CwQDcDDyndu/JAHQSy2+kI8KbEzovbZN0tEshUFlZiaKiInzwwQfweDy8CaUN6enpGDBgAEaOHImsrKxL0QwdQwISkIAEJCABCUhAAhKQgAQkIAEJSEACEujEAiG/H0nJKbCx7nOAMciU7t0Zi3TwRoRJqProOIJcbotw6sQGXapr4XAYe/bswVtvvYVEw2qC0VdffTUmTJjANHjmwWuSgAQkIAEJSEACEpCABCQgAQlIQAISkIAEJHAeAt169rSynsO85aDd4YLN5UJyajdUlR+H7yxvTpiarAD0ebi2y01M8HnLli0oKSmxAssm03nEiBG12c4mK/rw4cNWZrRZt3///pg2bZqC0O1yNNUoCUhAAhKQgAQkIAEJSEACEpCABCQgAQm0f4FuPXsz25mBZya6hpnmHAqaOtAMRzP+6ExO5g0KuUwZ0O1/IFvTwtdff93KfE5NTcXUqVORzAE22dCmDIeZ+vXrh2uuuQYm+Lx161ZUV1dj9OjRuP7661uze60jAQlIQAISkIAEJCABCUhAAhKQgAQkIAEJSKCBQHa/AXCYAHQYVtwxYnfAlZTKdSJW+Q1TiqNr1GAI+lgL2dcA50K8Cfp88PmCF2JXH2sfJrv54MGDVjazCT5nZ2fj5ZdfxjvvvIM+ffogFArh6NGjeOmll+B0Oq0AtSm/YUp1mG01SUACEpCABCQgAQlIQAISkIAEJCABCUhAAhJoq4ArLRVO3nDQ5nJaWdAm4JzEeS7WhXbyhoQOBqTPOwDtKy3CdmbS7i44hssfgm2J5iSWuVKQ+fDOC9vOYDH+JSUFX3y+sKWDX5Jlhw4dsmo+m7IbPVl35dSpU6iqqrKOPX78eKSlpVmvg8Egjh07Zq1j1jV1os3NClszvfLKKwy2X/ggfmuOrXUkIAEJSEACEpCABCQgAQlIQAISkIAEJCCB9idgbkIY8NdYCbCmDrSNj2pPJc5WVaKm2oManzcagPYUrOTdCW2xx3QUnCPOGDy2GSn9R+Hm/GmYuHgrPO2k756CJezDEtTP6T25+wnkYw4O/ddUONvcTh+2LluIzcVNe1j80iNYjcX4ed64Nu81vkFz7Y0va8tzvMyGqflspu682+S4ceNw4403oqampjYYbca4b9++1jrxdePbWjNb+GFqS5usagWhW0DSIglIQAISkIAEJCABCUhAAhKQgAQkIAEJdCUBmym2YcpvhOAPBVHtPcvSv2fh93pRw8C0L+CLxmQzxt2HI1tOY/g04EjVgxiW3LLSka3LgTmbEFl1a8srXuKlKSO+isJCFzLqHdfZKxf7jl6FkW2PPlt7OZb/GE5PeRiNe5o9+n4Ulo1Hr3rHauvL5trb1n2Y9c+cOWNtZkpvmMmU1zD1ns20YcMG69mU4pgwYYJVksPMyMrKsubHt7XenONHRUWFFYS+5ZZbrBrT51hdiyUgAQlIQAISkIAEJCABCUhAAhKQgAQkIIFOLBAK+BFm3nOQlRZsrLXB288hxB8Rxift5qaENYF4CQ4n+vfvRopu6J0RjT4XbVyIWfOXYeGsWGb09CU4wNRiX/FG3HHvDmDPcky2TcbaAx74Sndj/ti6DOr1BSejrL4iLJyeh/VbN3I/kzE2bz1OFm3E9OnzsWzh9GjG9dj52Lp3O5ZMj20/eSEKYinMxWxDXWb2WCzbfKB2uE4WbMSs+DHHTsfavaUIlv0Zy577A7zWWj7sXjUf2aMmYPyQTExeyGPHaoUk6lvtzmMvijcuwL18nT/7ixgb6ytwEhvZdrPfnN4uzFpWlwEePFmAZbPGxto8FgvX7kXQMpiFZSvr+rJkY7QfjdtbsHEZjxN1GDt9IfaWBtGSQeP2mpIajSc/0+AzMjLwpS99qTb43HidtryPB6GVCd0WNa0rAQlIQAISkIAEJCABCUhAAhKQgAQkIIHOJ2BijzaHAw5mQjPkDAZGmREd4asIklLSkNmjRzwADQQa9T9QfhAvLv8DRs85hLKSfZi36WEs2nQAycO+gKULcoAvzcOakheRO6ICC/pPxEf37UJVwIsjv78ed4/vja1WtLcaBzetxt3LXse4u/8NT3x9HGyBcmzatBw14xagpOwI1kxYjmkT5qP3vYU8TiEW7HgMi3kcM2WOZvbykRJUMWW7ZM99yM/NwWYGZVG6Gb3H344rlxSioqoMhUun4f3icgROl7LNpda2xzYvwMR7q7HraAW8FUcwdc/d6P3wdmtZor5ZC+v9GPaF+1lkA1iwZAW2lKxhXzOwdX5v3O6diQoGeyPeI7iSZUju21jMtY7hwd7jsfXKJSipqsDRwqVIeft9BsONwYv4w+nROFRShn0b5uHh2xfhAMuc1G9vKds7/vatWFLI/lYcxdJpKSgu9yY2qNdOE2A2U3M3FLzjjjtw++23WzcfrLdJ7brp6en1Z7fqtYLQrWLSShKQgAQkIAEJSEACEpCABCQgAQlIQAIS6NQCdpcrGnBmENrO4LNJge7WLQt9Bn8C6SwT7Eh2Jy6LHKipQs6KFbjrxpEW0tdXTMLMsmq+zkD/vj2Q4xuAwf36wVe0FssxCfu+diMyWOYiY/K3sIJVl//8jgdTxwJVZtn/PoFxsbIengOvAjlP4cEZ18LMmjAuF5g0DV+bOsZ6/0+1x2GZiD7d8Mr//Be+t3E7ygujN/s7etyDYx+8wi1XYN6tY6xyG1lT8zCGczwHmJltTR68/txytn8fbhxsSk1kYe7jS5E//g1UPjoZifsW2zz+lNEbvRlrPz1gCPr1Y5CX2cy/ZvUR5P4O/7Xwdb5IwUH+3HToI6w59j4dcrDvwVvRz3RszFQsMo3yFVgGjy+4K1oGZPosinwP1Sbi7+LDmoJ44xVuvXQfbh3Tz5ozNW9RdEll8wboFy2hYVbq37+/FVA+fPhwgyzn8vJybOWNIpOTk60MaPMcn8y6ZhowYEB8VpueTRB6y5Yt+PKXv9ym7bSyBCQgAQlIQAISkIAEJCABCUhAAhKQgAQk0DkETKZzMBi0KkI47A6kJqfCnZSEYI0PXs9pOExgusWu+uryoqOvohHTurnM4g3UcBfMPm60o6R67wONFxbW1K4fYHiWm9d7bzY0xynFw9mj8IT3M3h6y07si1RgBYPB5v6IVR8eNiu1OPm5W2vl+FpW0+sCsKyAHV8SO3ZtNLh2vnlhepdcu6gaJ/h+wcw85OXdj69+9av44ZGjKLt/LLxV7ASnur1ab2t/MDk8OsXKgNQusF540XyXEhvU337UqFHWIBcVFeGjjz6qXWSCzGfPnoUJRNe/2aBZx6xrypuMHDmydn29kIAEJCABCUhAAhKQgAQkIAEJSEACEpCABCTQWgGHw2WV3wgFA4jwJoSm/IafNyGsOXOaNaFZathZLwDtO2VCuz54mg2QJj5kxqjPYSYKsenVImulygO/wQN89Ym+KYk3as0SX7mVXfylKTdhWL8UHNu7BS8xCdqEkEdM+Wf+fAC/KTDlNoKsK72ddaZNGYz4lIEb/5mtyn8FRR4z7yR+9T/5vHHikAY3KIyv3dJzUg9g+x8OwhekDa7CzJnAYy++hmD2YAZvhyMzUIz/+8sJxB2e+1WBFff2nSzC+rXbuU1rpgxMsdr7UxSc5DjwWEXb12Pr/vcSGtTfq7mh4FVXXcUM97CV8RwPQg8ePNgqvWFKdJgsaTOZZSYr2qx79dVX196MsP7+WvPa3PBw2jTetVKTBCQgAQlIQAISkIAEJCABCUhAAhKQgAQk0CUFIrwFocuVDKfbjUCYNyIMhRFiRnQ4FAJYwtg8WxnQngOr0HsiA7QsndHfNQsFjIHWJv3G6Oq/r/8azpFYWbgOr+RGs3Czc+5mDedDmDG4XrZxY35mMscnV1Im0KMuX7p238lj8PCaOXjs5v7M1E3B8Me2WJskuZysQ30XCjcsYK1ps8yF3qNuxpv+2B5j+x5210qsm7cRozLNTf3+f/beBs6q+rz3fWZm73kBZnRQ1IAK+FYxcWiludLcJu2g91SuTYamsfYkw7khbcCm/Qj0JRZu5bZDWw7cngb49HoBTwJNgDbRk4JNOjSfAOeqtxlP7/g5jkb4KCieBmswQpwR5mXvmXV/32ftNW8MCIhWyLNgz17r//K8/J7n/7Ke9d//dYV95sUW2/cXn/A9RwZ5lKqMvs5kY7uRu/5ote28b7bV5Gvs/36m2z710AFbV7vYbqjLD/Le95ai9o7DI/biZ2ZZjVYW11wxw1a/8NZJOA7RPlneR5Y9Y7OuqLEy8Zpxx3+2vgk/fUoMRtP5uZ/7OQ8ynzhxwnbs2GFPPvmklettk//+3/97++QnP2mdnZ2eRh5lCEjPnj17NJkzuib4/Mu//Mu+tccZVYhCgUAgEAgEAoFAIBAIBAKBQCAQCAQCgUAgEAgEAoFAIHDRIVBWrj2ZB/qtKpc33jVXVpmznPZ9Zm/oAaUnCkKX6U9yXjTXqt1jXd2Wq6m32tPEns+WV7HrmFYR11j9WERZldxdsBqt8JWqYx49qt9dzGmlr/ZwPtejh9XPCkcP20O5p0spAjKntJG8i9YlHPI1tVY9MuOMuBd7uqy7kLfaYfqeFoNhVFnV3NbWZt///vfduMOyBk/ZdoOVzwSfCVCf6bFp0yYvGsHnM0UsygUCgUAgEAgEAoFAIBAIBAKBQCAQCAQCgUAgEAgEAhc3AhOvvcbKKnLahqPcCv0FvYhQ+rLvswLSrH5mD+jzF4C+uLG8oLQ7duyY7/HMvs9dBMp1sA0HLxxkz2e27DjbgwB0BJ/PFrUoHwgEAoFAIBAIBAKBQCAQCAQCgUAgEAgEAoFAIBAIXLwITLz2WgWgtQOFljj3FxVwzldqYeyAEYkuz+VsQIthIwB98dr/vGr27W9/2+64447YduO8ohrEAoFAIBAIBAKBQCAQCAQCgUAgEAgEAoFAIBAIBAKBCxeB+imT0xcNaqeFfu3/zFFerhXQVZV6CaFWRff2RAD6wjVvSB4IBAKBQCAQCAQCgUAgEAgEAoFAIBAIBAKBQCAQCAQCgcC/HQIegNYq53K9t48AdLm23GCb4HKthC7XKugBU96/nXjBORAIBAKBQCAQCAQCgUAgEAgEAoFAIBAIBAKBQCAQCAQCgUDgQkWgX8HmsrIKia8ws/aBHtDrBnkBIXs/DxSLlhQLo96fd6FqGnIHAoFAIBAIBAKBQCAQCAQCgUAgEAgEAoFAIBAIBAKBQCAQCLy3CCjg3K91zvqjQLRWPGsv6ESB5369gJBrXcYK6PfWIsEtEAgEAoFAIBAIBAKBQCAQCAQCgUAgEAgEAoFAIBAIBAKBiwOBXE21VeTyRJ/9U6a3EfYr7FymFxD6R2rmLg5VQ4tAIBAIBAKBQCAQCAQCgUAgEAgEAoFAIBAIBAKBQCAQCAQCgfcSgf6+ou/7nAwo7FxRbloQrSXQiRUGemxAe0Lncnoh4XspUPAKBAKBQCAQCAQCgUAgEAgEAoFAIBAIBAKBQCAQCAQCgUAgELhYENBqZ6miTTgUeNYiaH307kGlJfqnzTnKyyMAfbGYOvQIBAKBQCAQCAQCgUAgEAgEAoFAIBAIBAKBQCAQCAQCgUDgvUSAgPNAMmBV+Urr1yroMq2Crqyu0fYbbMuhFxHqJYWxBcd7aZHgFQgEAoFAIBAIBAKBQCAQCAQCgUAgEAgEAoFAIBAIBAKBwEWCQJnWN5cr2FxRmbNKBaIJQvcV+rQKutyqasZpG47+CEBfJLYONQKBQCAQCAQCgUAgEAgEAoFAIBAIBAKBQCAQCAQCgUAgEHhvESgf0EsItdJZ+z1X5LXqub/C+voL1t/fZ7m8gtL56ghAv7cWCW6BQCAQCAQCgUAgEAgEAoFAIBAIBAKBQCAQCAQCgUAgEAhcHAgkWgHdr1XOxWK6/QYvICwvK7Oi1COtoiJWQF8clg4tAoFAIBAIBAKBQCAQCAQCgUAgEAgEAoFAIBAIBAKBQCAQeK8RULC50FewHq16zmv1c0VFhbbhKFq5Xj6YDCRW6O2NFdDvtU2CXyAQCAQCgUAgEAgEAoFAIBAIBAKBQCAQCAQCgUAgEAgEAhcDAuzxXKYtOGoqqrQXdE5B535LrEIfHXohIauhyy8GRUOHQCAQCAQCgUAgEAgEAoFAIBAIBAKBQCAQCAQCgUAgEAgEAoH3FoH+YtFfNFhWrn2gteUGe0H3S4RiGoK2/LiaCEC/tyYJboFAIBAIBAKBQCAQCAQCgUAgEAgEAoFAIBAIBAKBQCAQCFwcCJRV5LTKmTXOA5aUmZVp641cec50qq04BuzEW8f/rbfgKNorz7bbvpd/aH1WaVd/cJbddv2kd4z+q09st79qfc4uvWmu3f/Zj1r1O6Z4vgn02BNb1lvrC732sd/4A7vr+rORsMf2bPw/7btHrrDf+INFdlZVT6PGWWOmpxs9+uRyepNl7jSEzzTrfNM7U75RLhAIBAKBQCAQCAQCgUAgEAgEAoFAIBAIBAKBQCAQCATOCYEyBZ7LFXAuFrTvM1twiEpZXkHpgtLzrIoesLJEx9lS//a3v22HDx8+o2qTJ0+2X/7lXz65bNd+W9k0w1bsHZnVsHCzfXfjZ+2dhKGfXj/TZi3uEOHVdjT5otWPZPE+uOqyjXPq7D7pvq79qN1/29lImNVttLbOPXZ77flR52wxe3bjPGu4b6c1rmu3Pfff9o6FON/03rFAQSAQCAQCgUAgEAgEAoFAIBAIBAKBQCAQCAQCgUAgEAgETovAuCuusDK9eLAin1fkuUzbbySshbb+ZMAqtTo6X1l5bltw3HHHHTZx4sTTMieTMnfeeeeY5fasuncw+NzQvMQWNqbFOjYtsN/dsn/MOj09xTHT2VVkeN5tC5+0I0eO2NHO+0cGn3t6rKurS6VPcxR7TItxxzx6VLfrFDIURfsUWSNplQpV1Y1Mzq6KPeLR1ZNdjvmd1q0zmXXEcTr5THoNx2hERV2cErNSwdF181Vp5LuuarQUqiBeb4czeA2H+bT03sZuZ4z9aKXjOhAIBAKBQCAQCAQCgUAgEAgEAoFAIBAIBAKBQCAQCATOGYFKBZgr9LLBCijwwkF9OLI1z4k24zinlxBWV1f7qubTBaHJY+UzZU86ep61zatYoWzWtHq3tX/tS7Zxz1Hb3JyW3Lrgq3ZQ0cn9j660efPm25otG23RzDKrqcnbzEVb7NW0mNmx/bZl5SKbWZb3vLI5S23PKwq0Ht5rv/v5z9tf/eOhtGTPK7Z95Xwrq6mxujoFbsvmid/BUp5WYs+fZ/OXr7ftG5dqiXiN5fMzbc2uUr5Kvf7sY7Zojvirbp1kmLNovR3sSqu/8tR2m6+8vGjX5Mtszvzl9sSrYwSQJcOW5ciQly3qbMHOtH72t/j6s7Z+0RzREY+6Giubs8h2ZUyyQqf4fhUZwKck37ylG+1gSYSeV56SfnNcL/ArmzPftjwxiOAgxdGYZdiv377dlqM72M9fb/uld8/+R+3eBVu97s6HFtu8OfNs+7PKKL5uj61Z5LxSnOfY+hKO1JmvcsvXb7GNy+c5XvmZ813HU9I7nd3E/YyxH9QyTgKBQCAQCAQCgUAgEAgEAoFAIBAIBAKBQCAQCAQCgUDgfCEwwEpe9oDWKmiFnbUdhzbl0IYbFUrLV1fqvLQFx0svvXRKntddd90p83q0MvVb3/qWHT16dESZ0wafVbJn/xarmbFAZ03aRmLH4DYSo9PHbU+3eaDcspZbrG3FKmPHjuZt++xrnzRbWjPD1uq6oXmZLb3jKtuxYLHNevyoLbn0G1bXcF9pe4hbbPv8GvuM4qUNTS22dK7Zl+5bYYS/17Vp+4uZL9u8mlnm8eDGJmu2l23rXnKX2IHCl2zq4UctP+0eVV5irZs/Z33fXWNND4jYwkfs2BfN6m9QnjXY6m0r7ebKf7VH7rnPbhXdL94+fFuNLslQ5zJIWFv3hVttz0MP2E6x8S04Go7a0vwN0qXBNrRusp/u+39sdtMDorvQ9hU22s05nQ4eXbZlHgHsJmsXdrcc2W41N3xGuQ22bMNSq3nyS7Ziqwg3brCj3/kF+8P8DNuk3IWrt9mv3Fxp//zIPbb3Vm2b8cXbBily0vXsxmGY3WbZlhjkNTU32ctbdzpmCx85YOs+/Iot/sQdtgmYGhdaS+P19uFPL7S31tTbPWK2cEOr/c5P99ma2U1GmHrbgW77+Im/dvrQa2zWk4atW92W4Ni1fKL93hj0jv5x/SnttvDy3dL7TLA3O51/I08cgUAgEAgEAoFAIBAIBAKBQCAQCAQCgUAgEAgEAoFAIHB2CBA3rrlikuXYZqNc+z0r2EwguqhAdF77QA/oJYR9Oh8MbZ4u0Hwq1tlK6OFB6LcLPkOrcKK3RLJWwgxRz9VMGLrws3Sbhw0df2uLbq22Vz9sNmXuKtva2mZrbu704LM1tNhjX3vQpqr8Z5sX2LFijdmLKRnf5aLneWslCmqN9lebH7SPKi7c0NuuPaJ32o6nXlAAOm/OpXGdde6532q7nrKuutkKSL9sP+o2O7GrtFS54xn7u699xU687MTM2l61brs8ZaTQ7K7Wb1vvrR+0ptZ2+6URwWcV6XrRvuHVGqy19Wt21+Si1bWmAWgIdO37bqqL6Dz5d39rT594pkT3RXtTMqQClpJGfb343VZPaWz5K/vzRR81+/QMa98q+fe22gtdvzBYum1Xq43rvdVmNu22zb80Mvg8WEgnQzuDpNiva+/UHtW19vSH5zlmP3z1TaueOseWLm22TVoF3XTv79iDi27VU4WnbT6Rbh0vPvl39pWnT3jwmesfAOQ4zhTM1p7RO7RndNfSD1vdrMUq/IYVpn5qbHqnsdvCu/tSgm+HvUqdi2+XiMdXIBAIBAKBQCAQCAQCgUAgEAgEAoFAIBAIBAKBQCAQCIxCIFvwmSvX6ufEd9/Q3s+KP+vDJhwD/QNW7Nde0ErNjap71pdZELq1NQ2Ezp07d+xtN4ZRrr3xp7Wm2RTk3Wrf/q9/arfdRfjYrCML9tqVdokC0wVPHeNPVxbAJq9qKGiaq/VYLTHbwaNQsHS3jDqrLGmbr8pyh0W/60qJioinoVfzPZYLvaW9Nhpn290fv9Mq+37JFtzfZ0ffutLqr59p+3Zvs0f+vtX27tmklccp3ZbdR+zBOZMyJsO+p1v9xGGX2Wkh06fR7rj743ZV5S9pi4s/0sryPrtqmIhZ8eHfg/JVVabJIyL6N9uf7tttH/zq39uetj22tiRgQ8vj9syDClaf0aFl9DqyPZqzKoMiDyZkOJvNvuNuu/OqSvule7XKXavj66/RQ4E3soKl7yEjuBOemt7Ydqu+/pNnif0o/nEZCAQCgUAgEAgEAoFAIBAIBAKBQCAQCAQCgUAgEAgEAu8MAd/zmZcOKgqt/7x8MJersHK9gHAgKdi48vy57QE9WiqC0L/yK7/inzH3fB5dofZ2+73VjZ66Yu40W7Ryja1ZqhW296UR3IWPfNFuHrZ19JM7/tYee3S9fUGrnzkWNt9pH5h+uwexreMBW7B8o+3a9ajvVfyX7ce8zOCf2utsjrPaactWUG6LPXhfuqq58WeuGSx2qpPpPz8nzdrbZvtf67Px4yvttef22kNf+e/2+tOb7N4/fc5mfPx37C82PaLtO9Kju29U6Lz2KvtIA3k7beHnV9qWjavsS6WF1aTWZrpoU4rv7X9NPMbbW689Z1tXbrPXRpGi/PBj+u2pfHsfWGbrH9tlW1paxEVHw0fsOnvKPj9jvVXN/rit+Iu/stUlATu6jw8ncU7nWfx4Z+vf2PZHt9sTR6faXJ4q6Gj73n7rkw6Vb71mj299yJ56bcQjgbTQqL8n05t8Wrt1nSn2o/jEZSAQCAQCgUAgEAgEAoFAIBAIBAKBQCAQCAQCgUAgEAicJwSIOw8kWu3cb4n2f+ZFhFr8bEXtDT2gdKWogI6DBw/y9R4f3UnbtpZEcVmJmX0ak3Wt+wbl6NjQPCwvLdO8ujXpLJXoPNCaLGzM6qbf2/Z1Jp0dG7xe04b2tOTRjqSlqWEErWWbH0+6ye1uTxSXTaxpQ0o3u7bmpL3E6MDuDUlTw0g+jct2JscO7EwU2x5Bt7nlkeRISb7hX91jlEVv7QHtxToP7E6WjZLRGluSfS7kcEqdyeYmeA7J1/FIywgZrHFZ8vghVSwcSJaNwqehuSVpP1oYTjDlPwqzDPsNJfmy6wzTwuHdKW4l/V2P7gPJhiVNI2WxpmTnge6TbJLZKMN9THqnsdtYeJ4K+5OUjYRAIBAIBAKBQCAQCAQCgUAgEAgEAoFAIBAIBAKBQCAQOGcEsnjyhCuvTCZM/kAy7gNXJVVXT07GTb82GTdtajJ+uj7X8T0tKYMLe3b8m+2TW+yxY13d2pxaL/Srrx+xJ8izG+dbg1ZFb+jotEUz8tZVzFlt9cm7hvR0dfl2HTU1tVriLUKnOLqOvW49YlRdO0l0TlHolMlF6zrWZUUxgM+QGEWDf7fo5mrqT0+32CVdi1Y7Ss/hLHu6jokWPGq0lclplBleiXPRfv1Yj4Sotkn12SYiaaFUPhfQ6s9e8dGchl2ju1Y350fKWuzpsi4BkpMOtVodf+bH2PRObbezwP7MhYiSgUAgEAgEAoFAIBAIBAKBQCAQCAQCgUAgEAgEAoFAIHAaBLJ48virrlQ8tlJbb2i3Z+0HndPLB33PjYpy3we6TKugzyLCeRqO7yRLAdP6+rGDlIXew075zRMET7W/8ymkra5VQPgMZKitV+D5DMqNXUTBbwWOTz5yCmjXnxF/dBiTxDCiZ0xrWB0/Fe1Jk8bW7kzxGU3y7a/R/WSeuWrpeSYGOYnB2PRObbezwP4kXpEQCAQCgUAgEAgEAoFAIBAIBAKBQCAQCAQCgUAgEAgEAu8EgQEFnov9fXr7YIV239D2G+wBrX/92oJDe3DoFYRl74MA9Gk0vGXB1+3wpwpWO3GswO9pKkZWIBAIBAKBQCAQCAQCgUAgEAgEAoFAIBAIBAKBQCAQCAQCgcC7ikBeu0XwAsJ+7QGdz5WbttsQPwWhyyt8x4okqXh/B6DZKmPyyQts31XQgnggEAgEAoFAIBAIBAKBQCAQCAQCgUAgEAgEAoFAIBAIBAKBwBkgoHhzdXWNnejp1c4b5XpxnV5IqFXQFTovKyvXtza2OAMyUSQQCAQCgUAgEAgEAoFAIBAIBAKBQCAQCAQCgUAgEAgEAoFAIBAYgUC/AtAVA/1WVZW38rIK3ws6X5FX8Fnbb/QWrU/5EYAeAVlcBAKBQCAQCAQCgUAgEAgEAoFAIBAIBAKBQCAQCAQCgUAgEAicEQJllCqzcr10sNhf1JmuFJBmFXRR23GwL3QEoM8IySgUCAQCgUAgEAgEAoFAIBAIBAKBQCAQCAQCgUAgEAgEAoFAIDAcgXIizgo2JwM60WpnQtDlSiK5QsFnU3oEoIcjFueBQCAQCAQCgUAgEAgEAoFAIBAIBAKBQCAQCAQCgUAgEAgEAmeEQHl5uWLMCjprv+di0u9B6KSgb0WjCUKXxRYcZ4RjFAoEAoFA4F1B4NixY7Z//377wQ9+YF1dXf6zlAkTJtjVV19tN998s9XX178rfINoIBAIBAKBQCAQCAQCgUAgEAgEAoFAIBAIBALnA4FE22wMsALaBjyuwTYcrH/OV+ZsQBtE9ys9VkCfD6SDRiAQCAQCZ4HAwMCAtbW12fe//32jox5+EJTm89xzz9kHP/hBmz17tvE0MY5AIBAIBAKBQCAQCAQCgUAgEAgEAoFAIBAIBN5vCPQrrtGvOEelBGMVdKJPmfaDThTLSAYSy+ViC473m81CnkAgELjIESD43NraaocPH/bA8owZM+zGG28cXO1M8PnFF1/0ldEEobmeO3fueQlCE+zu6+uzt956y44fP269vb0nBcAvcvhDvUDgXUPgNx+/YRhtfmjG8//00PTLr0uXdsX4xP6na8rszuvMbpscD5gyXOI7EAgEAoFAIBAIBAKBQCAQCAQuPARYVlemf8WiVkHr1odtn0lh9XMZm0IThL7w1PpJlbjoP9EvFnNWU1tr1WG50zhC0V55tt1eO2E27qqb7Nap7+NtDIrH7Nn2F+yEjbObZt1q9Wdt1+G63iJda0+DS2S9HxD43ve+58HncePG2V133WXV1dW+GpptODgmT55sP/uzP+tbcOzatcvLslr6Ix/5yDsWn+Dza6+95oHnK6+80i655JJ3TDMIBAKBQIrA1O8P+Is2/EoTLs2x0mvNvgZKv3TIQs2FYpl971/M9r1WZr/zcwM2a0qWE2gGAoFAIBAIBAKBQCAQCAQCgUAgcGEhUKaVzh501qrn/n4FoXUvVCz2e/A5n9e66Hz6UsILS6ufOGl77KntK21OWd7q6ibaxIl1ViPDzVu0xp5+nT1VLqzj4K71tmjRIlv/2MF3UfAu+3rDbN+6oOGrL5wfPsVXbOPypbZ00XLbdbDr/NCESvcLtlhbLMye3WwvdJ8L2W7b2Zzq2vz158+FwEVd573xtzOHkNXMzz//vK9mJvg8ceJE+9a3vmUvvfSSERDu7++3Q4cO2Y4dO/QTlZwHqNl+g606qPtOD1Y+E4S+6aabIvj8TsGM+oHAKAT0sN/49PHRk/7Ba53rhw/pdX+Z55dpdjZOY/nrPWb/+KIvDxhFLS4DgUAgEAgEAoFAIBAIBAKBQCAQuDAQ6Neez+UVFb4AJ19eYRX6cJ2vyvuqnIG+/qHFOheGSj95Uj615tdt9mdW2N5M9Yb0ZOemB+y7L53HQGhG/13+LryyxzZt2mQ7Dml58rt21Nrc1kds8+bNtvPua84Tl05rXbXW1m5aZS+cUAM6X0fNOJvitKbbuVKtm54KM736XCmcL2Xef3TeG387c7337dvnW17wgsHLL7/cfvzjH1tnZ6cTmDVrlo0fP97Pi0WtbH/lFS9DWbbO4GWF7/QgAA3fOAKBQOD8I1AkuKwP33wKekacXffq3NP0ImgvVwpU5yvM2g5qeUAcgUAgEAgEAoFAIBAIBAKBQCAQCFygCLDvc5mCzrlc3l9CyIK6CgWg2YCjoPhGUh4roN/fpn11ly18YGcqY2OLdRzptuSZxDoPt9kyBaKzeOMrT2y3RXNmupFZVTV/6Ubbny2W7NlvK+fPt/nzF9majRtt6by03Pw1u+zVV5+1jUvneb2Zc5baE69oKZaOnoOP2aJ5823R8vW2feNymymaZWUzbc1jQwGw4utP2/pSXXjOnLfUHn369VRW67LHVi4Sz/m2cvse2/Poep2vtO9o9fMX7kv12fvlB20R+Y/ut55XdonfHJszM5Vt5sw5tmjlFssWGg/Js9Ee3cJqcMkzc55tfOKgvfL0o4O6z1/5qKWLwot2+IWn7ZlnnrFDwiw9urSSfI14oEuqz/KNeyQpx5C8y9dv10rn+WmZmfPtMQeyxx5bsdhKlrAvP/h5x/PR/dQ+ZnuEkcvkcs2Rzk+U6Drxk/4c3LXR5rmuM23+ggdt60klTifrSYVPSnhl1xqbN2fOoN1mzplva7Y/Zal1FfyQ7dAxs+sc2Xr5lidsrPX0Q9ifwheG+deWXXts+5qlNn/5o6n+x/YPYQk2kmP7U68Oytu1f5f8cY771hz5Jyvj8Yk1vjp+yCbr97zidZBlvmSdr9X/B1FmGO/hvj1n0UbDlV/ZM7a/mVazr1803+ZkbUa2mDd/uT32bOa/qqs2lcqGr81R/qIRsg8qcZYn2TYb7PnMcemll9ptt91mH/3oR31bjCwYjY9eddVVXiYrm9X1xHP8c+LEicG9ps+RxHtUrcsO7n/VfbLr4BO266nUB94j5ufE5uATu+ypV0Y9FDz2lC2SLdc/NeRbZ0J8TFpnUvEdlCl2vWoHS/L/W/B/B6K/b6oWCDqXPr3Dvi+pNvvVD5Zbnb57BsqMvD5twcE3P0r71x/H9hvvGyOGIIFAIBAIBAKBQCAQCAQCgUAgcPYIsP2ggtAD2odQX/rVN3E306+808U2FTpnZV1y8OBBvuJ4nyFwtH0dltKnIdl5eGzhDu9uKZWxpKGxKVFcunS9JNnXrTrd7UnTYFqWd4rvhTuTgqp0dmwYpJnyHyq/eV+nCrQnzYM0G5OmxqH8De1HoZBsaBpKy3TYtrb5JLpNG9pFbrWnNzWEPy3jAABAAElEQVQvTJYsbB7SoXlbggqnk2e0fKvbRvJvXNcuCoWkdVlDyrtxYbJuXUvS1JDKl+aPJW8m/7LkkPTZfJI+lmzoOJI8siQrZ0ljU+Ogfg0tux1LMR9xHHk81TXDZMheTUm7oH17WUeQ08WQbE2ua5K0r0aOhqR54ZJk4TCZVrcdEfkDyZKS7RqaFibLliws4b06AbnRx+mwd18Yy78a1iVHuzuShSU+TUtWJ+taMj6WbDsgqx59PGkc9CF8t2QfpY22SXo93A+akjawGot3xnNDR9KxYWx/SzrbUp3VXhZK/6ZB3s1Jh0QbrnPzkiXJkuam1K4tbaPhOevrL3/5y8nGjRsTbYNxUt1vfOMbnqftNxLt0zyYrxcFevpXvvKVwbRzPXn22WdPW7WzY/OgD6c+2phsePzQaeuQeaS9NWlVezhvR+fjslGL+2T7OtrYOnn6u3l0J+07dybtR+gBz+XoTNbhe6U2mFI4kqwmbclO78fOnOpYtM689rmW7GzTWLLscVU/M/6FI+3JI60dY/Zz5yrDhV7vl/46SUZ8vpokC3aou1O/8mZPkhzTN9deRnlZ2Z/5c+0QHUcgEAgEAoFAIBAIBAKBQCAQCAQCFxgCWTy56orLk7rrpiUT9Lnkhuv1PTWpnnpNUnXtlCR/zZSk9vrpSSy7UZTl/Xq8/OSekmgNdvXEsaTssr//0xVpxsJH7Kk9O+yZw62mwJ6OtfbYM+ky6Oy1dC2thyzpPmAtpW08GpbstM6k23a3pDXsxX8duXK3cbUdLiQj6uz4zou2/+83llbtNltb5x7bseeobVZEmuO+L7X6Stuq9NIamlts5+7d1tr6JfvF3/6aKSjoOQqW+rYCOxbdZrUNv6UXrR2y//jFRfbJ5ntsTkk+O9xl2fplr9SwzDo6C3akbUNG3bZ1HJF8+3xFOIn/9NTLnpfxr+Oqq93WrOrw9JYln7O7m+6x5rsVltexd8eTWsNslpVvXAYmBdv3yDLPN3veXuuqtc9+rd3SGgqFtR912RdNe8keWpsWa2k9bHt27FE9hXd1dKxYb+2jFkOy0vqb/+mBtMLCzXYkecae6R6i6xlnIGtK4NR/G37r69pH+Jv2xUW/bvd+7t5BuXc9pTdedf/IUoTMLpv+c9b0uaX22KED1t5xr2V+MiblU/gCZbN6zS2bbTe2/lKj/eu3/so2OaEmu+9zv2p333OvZWb9z99+3p7duam0rUyT7T5csGf2PGl6aOGH20xnmU2y6zQ3/ZttNpLxbmk9YEnhsJXcy17e/7LduGhsf7Pa2+2/Hjlshx5eaZ/79Wb7tbtml0h32YmC2aF/ai1dN9it//PHbdEfr7NDBzqs4z/cMlyEd3SuMeWk+uzNXKsXjN59992+H/RJBc5Dwlh8R5JlO5Bltu/IETsijB7fPNPu+9gCe/okXx5Z67XvzrW5O14amfiOriptesMlTuG2+wvWXbh/0M/eEdnTVH6yqcm+/S8jepzTlB6dVWv3FwpWuP+2YRk5u7Otwzq/9AnTwtezOMaidRbVz7Foftwl1lijl0MI6ZN1OZlo8bXv2j1zW0f20ScX+4lK0bZm2nJj6FNXldia/0W/qHjT7NOPqG/RN9esiO7TT06ysgNaDR1HIBAIBAKBQCAQCAQCgUAgEAgEAhcqApW5St9JQBtxaBUWG2+UG6ue+3kxjuIfvO8qAtDvY+tOv/0jJekO249PEQCqKkXnmm77qTTIMfkX7T+UAnkHD/5whHZXXKEodvUUu2Z6mjz95ukKNVTbpCvSXYhJzQ2vUXeJ1ZJQPXEwGEh2oatEt+kOm+kRwHqbfUcpAt3VZYrhDR7Tf36efULbQdx11xybPJx4Fl1UyYP/sNamTJlmMxpm2cc+1mRr01ix0xhexaZPtWkSaNLMj1jKbbrdfOMk1+mmkk6DjIeddL341OAe2iuaZtsN02bYPauyDTWqRuhcN/VqYZKzaT910yAFD3bqTxbszDKG6Dbb3b842ZOnfWhmlj3mns6Z2k23zTJJ7sdwukM0zd5O1kFGI066bMeKe23atBusYdZsu6PpvsGtQ9xVaq+xOY1phb1rF9jshhletmXHM6cPJJ3CF4az/vl5v65tLWTrObdazxuZ7+20uQ032A0z7hi51UhvqWbTPPtIyTEybIbTPNPzK664Qs472X6h5Icdz/zrSH2GES++/pT9oXx+2g0Nevnjx+wzD6Shcnhh6xkfv68ULO+wB+65w2bcMM3L7v0fp2iEZyqkyhFg5hjrhYL33nuv3XPPPf7yQS9U+pOVnTBhwvDkd++84SqbMmmSTZo02T762d9RW9trT754TPy6bM/60vY0+i3N8u1P+xYZ+7cvsgaeq6yYbWXzt1iXtkZZOmeeLV+ebu+z/ulj2tZnl81XnXT7m/lDL/Ls2m9r5mfbB2mbn10HT9Kr69kv2+KHnlZ6jz2qbX8Wrcy2BZpnjz71hK2ck9KduWiLZRtdjOA3Z3npha1p/aVrStv4SJ6lW56SDl22fdHtthgVZtXZ/I3P6kxbwKwZ0pUtizLr92gf+0XZVj5s01PaK+jZL/+2PSRdOVL+E23W7AarKxvS9+D2pTZv6crB+jOXbrFXFYgcfQzSciy1VdHKRSXs5tiW0jY2Bx8VLb0UdX5JlpWPPaGtj1LMy2YutadKL6kdGws4HhsqLxn/eu/3ra7UTgb5q9T+x9aUtuvRVkvz0+1vevZvtxo3+gOuHw8ouvZri5wMl2E6j9btYr7ukS359GoQ5NMsPP6Hnuks1TOto3q28bv/YH79GQ0Tw8sN9F3MqIRugUAgEAgEAoFAIBAIBAKBQCBw0SOgYPPAQNHjGSx8K+ilhEUtzslXsie0tubQGrwIQL+PvaD28utK0u21O353o73ak14Wu16xLYu0B/LTP7Ze3dxyvHykFHrpedG+V4qtXn3NZWlm6W8a8ytYFvvzO+QRJUZfVJWCqJ2DdUrs0oI7X7DDpSovPJNFjYdF+sjjLnyMo/PI8VLqMfv22nQVd2OLVtPJUTvbN4xRQ0mDzIfRHHY6diUF/a75UGlVuNnq3VoFrhXOBa1W7O48bG1/8gsjA8UlcIahlJIVnywAlYXph+hutSefSXO7Xj8yKMbJohUH7dX55o9LdAvD6J6lrIOchk56Dv693bN2rydsaNPq8KTTNpQCzp5YrLGmzYdsX/vj9sjmDbakOc3cuWKtPT+k4BDBwbO38QWV6y0MrR7ND4brtUqevctZHarP0UMdtu5TNw5S1fJ4+yccu+eI/Uu2NLuUm/lpZ0/qK8UTWcpQ9eyst7SDdWFYkeEPL4b8TavT/2ZVujrbV9Szwn/kKvRum+Grwtt277TN61pM27X4sfj/+PsRtsp4n833lClTvPiLL744otobb7xhX//6123nzp3W01Nq6KUSWdmrr756RJ137aKjx7r0koCi5Hj16Sf04KDBfmZ6vb3y2O/bHYtvsgP6FUL3kTZ7/jOz7KFnu+zmT/+FfkUhkJa12tGHm622cMJe3rvT2mo+pz3Yj9rChqO2+Ia5Nm5bm3UWOq192+U294Yv2H4F6g7u/ar90zUPmrZ/sc59D9gDcz9vT49UX0+83rQX36Q1FeyNZ3bapr1X2WN6cWP7tul2jx4gXLHqsORpt9mbFthmDwC/4vxu0qr4gn7h0Xbv8zbrzi/Ldmn9tbuq7GFFA4+0b7a1Cxbqlwq19ul1j5m2y5AKB+zh35ihAPI/2lf+6SbrOCr/6OywcQ/Mtc3SVWtZbdm0OxRRRBfR/kKXNd2w1gPfhTd/aC6mHTylvie6Xrada9vtV7551GVu0EOgL7enQevh9hyk5Vhutb1Vv2JHxa998xRbMHur/2rjxBuitel5W/BYpx3p2KYHVh+zR65ZZt3dR2xbw1pbuJk++VRYKOfRP7SmFdOt7fBRtcuF9vTiTdZZerHAIP/ifvvqV561Bzv41cdRe9AesE9uetaqb/60HdrdIvotduDow9ZQ22N7v/oVu+bBDpVLbN+2cTb3k9vfcXsZjsmFcM6LBvmwurlHk60/UVe86JsautQ16gcO9qZ8e+HfpemU84C1ymlIiiMQCAQCgUAgEAgEAoFAIBAIBAKBCxaBsopyK0/0hvVEK54HBnRfmKpSmVN6KTgdAej3sXlz188z7V2cSrj1PptSU+YrTPN102zBpp0KdkywX/hN7bSro2PFHVoZuMaWakuBdD1nk/3ih7I1timJs/6786u2eDkr7KbZilJ8+QtNtwxbIbrKPqmXt63RC+2aSsuWl9337zz0OCwOOIJtoTeNcu5d8Tu2dPlSvbDvhcHV1W+0/6P99caV1jTrvhF1zuRiNL8R15N+xu5tSqk8cMcnhNNf2kMPrbLP//wUm/2xx3yl7Ijyoxh6bKD2KptVMsXi3/99W750qW1/40abVwruLp6tVYprltu9H3sgrd38a3bL8KXNnlpvP12qsPeBjxkv3ptTN3twhbIXOQNZR4k3+HCA9FzN0CrZJ7/zN7Z+5RfsvjQe7dW6Or6mFc/T7M8e/Z71TfyA3XzNlBK5KTaO5b+nOk7hC6cqfusnF5RWEW+12Xd+3lY+9JD95YrftonTGqz1X4ryoc+Uqm61O6bUWFnNDYM+lmbk7QNXpmdgNVMvDJw4e/EguzOJ1yi+Yyf727M2rq5kmI4227F9oy3/9QUjbPDi1k8Io8/bzueOSt7r7ZbpJbY3XjbyYcWgNGd+MmPGDF/Jun//fvvRj340WJEg8/Hjx41A9PCXDVKGsqwcvvnmmwfLv3snPEB6wKbk85avqbEpsxbY6tZv2kfre+z/fUQ9S7PZE/9lq/3tt/+7YZ4v731Rf2tt0iWXWcOlV1h9tcL+8qNOWf9PlnzCpk6qNzvwhPqkhbb807frFxW1dtunl9gShbWfO9xj13+iRQ8kJlrrli22/Tv/LFp1elChr1MdbyjkuWq+TdVK8ltuxTDr7NO3T7bqSbfYbaX22bN/b9oHvqLg+Za/tf/+piTt+Lq9SGBb9Zf9yQK7vl6//Ljtbm1HNN0UF/RfeVyi+pdqJX213tZbff2n9PDhbnu5dYtt2d5qvp6/UNR7L/dqcyPp8ll0qbbbF+2wzs4/GPw1A6R69p9aX38Ctez37K7r6yXzbbZwWakDoeJYRwnLP/r8XVYvfrc1LbDGhtKGHjx9bFlmc6YK/xtv1UO2RvX/t1t19SS79cMp3VNjoYDxVllFWwbdPrne6qd+1L6oje7f6BkFfu5ma9n8pzbx5VbbsuUb9vRhbd1T+o3LlZMukcSX2BXCUojZJ7QFz6cmvqxyW+w7z8kvLtMLT8fS6SJOy1Y+d0txzvFlD0rrm4A0aX1Z+rC8WAF9ETtFqBYIBAKBQCAQCAQCgUAgEAj8BCCQDPRr4w0dZfqvFc8V+ujW2hSKtlxVzvL5ylgB/f72g5zd9edPah/WZaVgnvYs3ptGE5sWrrM7b6rV6sN1tntDuu/wphUP2NqdihQ3NNvOfZsVNBqpXZ2CGRxVpfhbbVWakK8al2bUpV9DfxXIWbXKtnrwucHW7T5kn5qqYMPku+y7bdt8b+GOravsgVVbvcoyrXBsuWuyn5d2GhjayLdEtOFTv6fwDUeHrV211vb+KG8f/6N1acrOtXafoqUzlynKxTFantHXg6tsh+lUUjLjX+sLsutt0d8esm1Ot8PAafHiFa5X8+oGqxGrrHwWDc/ns5XctaWg42T79EpW/OnYu8lWrV1rPzpxqd2/c5+tblbkSiHMFQ+s8q0+GhdusAMPf3qYdF7L/9z+hc22rhQMJwBUt3BhybYlo9jbyzpELT3LZEfX3ORG29mSMti6YrEt3ts16Du1wiZ/2U2GuFtXPWCf0Z6392E7+cu29r+0W0txrdH00+uxfWF42bq8epfsmDTHntzXaksaxaxjq61YvFh+ogCmvObmy2vchzoP7LaWhc3W1NRsy1a3KHyWHldejj9W279bnu1nLhJ7L7PmbCmykFV8dMQxgjc5U9KtVU72t4Ld3LTUlmAyWWvFfffZ87V+oevUBpc1fMrzVi1eINk+Y+zW0qj2tu8vPpVuc0PVczzq6+vtlltu0QPBAdu1a9dgEHrq1Kn+UxW26MhWSRN8pgxlP/jBDxp13/2DRzGrfUVy9wFtWqujoeF6/66UWRquucauvfYqu+qqqdb8+OO2+e7pnqdY2qjjMmM3YY6c7ys8bljwPu9t7tU3CrZn5SybtuDr1jfhKrtxGrQUVD3NgXSlbmvEVj+sjs4eIuXyPIRptGumXis5r7KpP9tsj7f9hU2Xe1Lm0vGZo1eb4uaDR1afhNf3rNTDhwW2v2+CXXvjzR5sJz19wFPqL0nQUVub0UuvT6cvODVcOj4tqL/jL60bPD/1yWU2PmtaNePVLaZLxJ1WBkYJjSx4n9njdFhMwN31c6jBozLrgwZTAMJmTZxmX9/fZVdde6NNnTKU5zyypmOv2sr8RFvw9f024aprbRoF3+gdsb3RUM2L9ywLQGffD84xe/hX05+asdpZz5H8mnTKdOvD96DzXrzQhGaBQCAQCAQCgUAgEAgEAoFAIHARI1BertXPZQPa63nAyrX5MzGbinyFJUovU2S6XHn2w9d/mGRvLdRPZ+N43yJQSDo7O5OjR48m3YUxhOw+mhw5fDg5cuRoMlb2GDVOmdTZsYEHF4n2akg6VapbfLU1xhhHd3L0yJHk8OEjSefYBcaoQ5J+GC+and3dQ7IWTqPbKaicU3K3+Aijo+JfOBegCt1uh+5RRug8eiTF/+iZAQFuR98OtHcga3endDyK9cY+PB8ZTlOGmmfuC2PzITWV5ahwG45NZ7JzdUuy4ZHWpK29Pdm5YVnqc/K7DR3D5JZfHJGcI6qemtUpcsbwN3kebalzlB2HCKi9KR/eRzvPxVGGKI0+0+b7ybe+9a1k48aNycMPP5w88cQTyWuvvZacOHEi0fYbfk4aeZShLHXOx9HR0XFaMp0d62SHdd7uKfh4i/qBxg1+vW9zk87XJXoxqY7DyeYlC5NH9qW2al/dkGj/irSf6G5PtBo3acvMWOhI9Egk0YsihXohObB7tXg0J/sKRxM9ekoW7jwAweSQpzcm7dTrbEuaGlYn2poj6WxfnTS2tHGWrGuwZHU7qaQPl3VYXonfuscPe7kjbZuThcseUe1hZTxH/BubksddzlSWZa2HPMf1WbjT+6fuQ7uljyV6+ai6rn2uy7Kd+7zcgZ1LpEuL0EiS9tVNSUsbZU6lr8qsa0waVrd7Xf4M1hlMSU8G00djOQyXEbRGlRvMOyUWSbJvg+wpjLWlSlI42pEsk46N61LZMv5gb7YkOYDNC4cSPa8bLJPmtSSHaNaSS7HoZOchCnYnu1c3inbqN6lGPxl/r12VJNf8x6HPh/+vJHmtK0l2H0ySn/pLfb+UXpNO2az8Lb/5k4FPaBkIBAKBQCAQCAQCgUAgEAgEAhcXAsSTX1Pc5NJrpyQTpl+T1N9wfXL5h25KLptxgz7XJ5fedH0y7rprklrl5Z76//6bffCmWy7iOPzFolpu8AVmY2pUXW+T9FPq83JkG+m+3Ok/oc5enHYy7Wqrn6TPyRlvk6IfbGul54h1g/pp/nuywLNafEYwfhtRR2frZ/CjVzxSpLZ+kj6jC5/6ul4veXvb4x3IWi1hTqem54+x4PEkmc7YF06qOZhwKlkObVthi311/WBRa1iyzX7t1mGCyS8mTRp2PVT0LM7G8DetzTz9imK1NznkO+U8lpDl5eU2d+5ca2trs+9///v2/PPP+2d0Wbbd+NCHPqQXJc426rxnx+CqVrOPLtH+2Ctm2eanfs3u/+zDtu2ZO7U9x2IXpUEr/VtvSBG6ce4DWik912raNljnP3xk5I8Xcrfaw+3b7M5Z2mYlrWmb279rN+fq7TKVv2L2Db5lRkOjwrzDa1425MHZOuE6rVjOtoj2Xyk0DK1brsrynN9m8ZviLxbUmmPb8Hir23J4/ZF41lvjtiXWMHeata1rt+8s0PYUV8y2PIv2GxpLvyLQMmRtSbFZ+y3/ol7euSrTpa3V+N3Ha/r47yZOqa/Zs7w1NlPA65/0I5FSapaeH45ImlfCJT+KVoYRhfwHHPA5DRY3/8ZDtuHJKXZDHdsGNVhLS7Np3fLggS61tzXbhmaVya/VVYO2/xiyUO2Nc/VLggabVtNu7Z2P2qYNC232tHRFdSM/wrjs3kFaPyknbLdBS9WzfT9+cNTsnr8x26Ef9XzvtxShVzh/3ja9iFDpI46+EVdxEQgEAoFAIBAIBAKBQCAQCAQCgcAFg8D3/vm/+cpnboQKxR6teM5ZTltuaBmdFfp6bEC/BE2SMitbtPi3ki/e//t23XXXXTDKhaDvLgLFYwet/blX9fvwyTbrtut/4n5G/e6ie2FRfzd94dgr++2F116348eOW1/leJt2/Yfs5qlnEcW/sKAcU9pjx475Hs/s+9zV1eVleODDCwfZ8/n0QfIxSZ428bnnnvOg9mkLvU0mLyfUu22113C2L8TbVBjM5sWGitBVs2fw8EN7KytYevb0htMY61x0uySptsgYyW+ssmOnoevJ8lL2TGifSt+xeb27qaeW1+2pB2unM6fjoDLs4XXaQy+vJO7NPto/icflf5JqXa6J14Ai0bx/Qz9Es0l6OPK/3Wb210/rV2fHlECEupSvrdHsyv1m31egOo5AIBAIBAKBQCAQCAQCgUAgEAgELiQEXnrpJfuzv/xP9vVv/hcthKqxilyZ5SoqrKjFN/39RW072KeAdGJ53SOWXX7DVclvfuZztuqP/+xC0jFkDQQCgUAgEDhLBA4cOOBB7csuU0QsjkAgEDivCNT/kbY900SL4DNBaD3kH3z7M/s/c3h+euqrpfN6OeGtb5h99+FSYnwFAoFAIBAIBAKBQCAQCAQCgUAgcIEg8Af/+3Lb9NWv+o2OXl+lX29LcK2yKdPez4kS+vRywgoFpHOVeikhryn8z1s324/eeMP+1383137u9tl21RVXXiCqhpiBQCAQCAQCZ4rAhAkT7PDhwxYB6DNFLMoFAmeBgF4oSPDZFFTmZ2bMrwhCE3Tm24/S6mfOVczqfmz2kVtVgNdFxxEIBAKBQCAQCAQCgUAgEAgEAoHA+xyBf/3hD63tn//Z/uEfd9k3dnzTtwwtcp+jVTfl3NYoCl2mIHRBdzxFbooUhB43rtbKrrjxA0k/UWm9ir2vp6CItPbl0PJo9h8tU8GiqEAgX6m9HVWvsiZv/QWl5Sosr9/sFvr0M+NCv/b3qLDqqpz16po7r2I/t1bmNKFVqbID4lNkk0TRqagUJ6X3nOi1AfHL9jgtFvs9nULkV4uvtujWm+Lho7qSijcqVlbl/Y2K1dV58SgaOpQjsz7cyk0YV+n3c8ePF1S/3HkXRLtcyhCFT7wUuJRriXiqG0uVevt6Pd+FdARURvojA3uWDAzo2+unJbjXzFUIXH3gn5YTBPrtLbjzBkh/CyRPACRYoj96o5hV19QIhArrPtGtenoSkCu3SunaffyEakn0fE7piVXq1ZE142qEeb/4Jq5Hv2hXeH6qLwKSPyC6ZTqv0JOGcslT1M+hXU9WYkl+sBk/vkZL3yusT1j0yVYnurtt3IRxkmnAenvRHfQQANm9tusFBqlHlHzD8wcsJztIqNR+sosUd8ByWl7f193rciFLhfQDO5Uo4VHyEcmUc+fUWzKrKh03l0Dyggs+09utPWP07SYTAfQDX4iBD75YoU8inaDheogPy/7RO+f55SkWIo6PceAL/OO7W7LyVAa/RUZkRv9etYmUl3SQrPgqeA8Irwwr7I4f6ct9AzrI456osv1qQ/iM88zL1morRbW3zCbQTfTp6hL+4okA+FNOP13Av2gr4KcKQO04FPsKkhEepUP5zr9Pfic7VI+rst7jPd4ec6pfqbYJjwHac8k/wBS7Q1eb83jARFSsIAxoT2DDgd+k3y6a9EfPIfzcNl6iVFbl8fm0DsrwBtRyfXLuk9gD7Apqz+BMPrYjGoNt+pVHG8euYIQd4AGOSJBXHdITYVshH+G7TPgjV7lUwV60SXShPaBj0fVRf+RtBAXwY9lU+X7oOu2H0jrwAytaQKX6hwrR14sA3QX71Xnim9gYedCBvgXDgJn7BfLxSYnjMs4PX3FfVV6hoGiVyqdF6ANTrNJ+hGZF/cRlhI7TVhF8D1lzFTw/VF8gWdhbCX28vHiohAqqjuQeSFJ5YeVl0A3M8TXVGyjpgxxK9r5+QHn0H7p0e6CbW1R1SQQPaPGTGje1ZEduxgbs4HTkn9BHdnSrlN+BIHahD6OtwQd/pby3dxGrkp/gI2WqX1Cf5Jmi0SOfhxg60ca8bxXuZfQt4oNM9CV8c52IBz6DL1eoP8LWyCzNvS30YzOVoV2kvuKXqovvp1jSV8PfbQMWysuV6emt2x71Ur/BNuCcc1uAVKKdO9THcyb+lBMhYar+xBO5xFfAkz5b/lqSW/BBGBKSTW1C9nG7QV82xyaDB2Qpq7qur87xV/w+/ShdPE5096ldy56SzxEo+RBlYATWHDnsJPzBDD8mH9mwFfUYY2CJreGL79NX8XEdkVkquT2URl+NfvgJB5iDJWWxCX2AtzXlSTTxV5vXP3ycI2uf4As/lUrzlV0UTcaZrD0hS5X2GSvXmICXfWDK1drapceO/PCI+0vvibecl+sh/Xw8kh3pj8vQV//8EO3auktV94QVetQnk67/YEQ7G3CfY4xNP/ic3mgr3QqO1/j6iTa+7hL70etvSFe1UQECfv293db31luaN+m9CR+YYpdNutKOd3VaV+cxr9ev9uZjmzyk762uVCb6QuFFHuqDP9gjLQilfRDi6SdtGvtAB730R+Ngn/r9SsfI9RKBvHQF266u424X8IR+UWnoVg4TGQL6eAZ9tvcvSqE/zKmtQpN5H3MQ7JPTdxGjI4PGGmxPG6XfTfS7uz75Hu2mSvUYx8o1FtDWe09obzi1pUJfX9rniERFXnMd4YsY+A3tsH+ghIsSK2RjKWCJvqs1L1KD0mWf+2q/bECNguSsrB7nPgcUEkuy43/MBZizqg1KuQq1pVyl9qVTTrfwhi7l3KfFm3aY+WHVeO1HDyDYUX0WfsvoW+7jbuqbdKd98gGHQkkTtPWPwHDbe7uTzE5b9Xxuhg+CkchC2j8qgw2RDdxJBAvszjm4Mg+mr/BxTelZWyOtsqbK9Ut1UD1h4YRFhDkituLa50BKczr6zsbidMxRPcmQiD/jKX0C6djO59cqjz4y4rD2LAVcXPodIcM8V0mJ85dGTH6lK74Gz0xp6Pm8HuXhJfn8gY2EpF9wfen3ddAX5dS2Ga/AlfKOns7TOTbIperijeDCXLeob/obeHPAn/Ji7Ufav7EyRzoqhfmF94vQRVd9wAxMOeUDX+8DVR7a8CUDeTnoE6iTzZ18rFW6j0XQEW3koy4+67pmAsGrVJ9y3leqr+Enq96XyEehC3+++QeG5NE+3Db0Z6V8+g5sxR6MPkbIZ7x9ogdtSXJJDP/wRyxTfXSSr9RcVrIgA20emfF5ZEnvx2hHytc/xn7K4yveB4kumOnC53K0a8Z7Cch/x0d/XQepoP5OH/wDHcjQ4eMvAiqN8QL5aOcq6LIUuO9RNv0aB2MdbRw5aWNQop+mUfq8TIRTjDSuqY15v6Cyjpny/B6K8hIwtWsJDF2T5+1DOlQwP5Ws2RiZ6iXa8jfaNPL7+KBvfIh7LRKZt2Az7F3yGlilfTS2Jl3lKyur5KOpnZiPeHtVwYJogwH9MvXhQ/nsoB8HP58DKHNAYyT9EbKCCb5Co+5Xv0xrcUx0Bn6DdKCn/943OP1UH9ddGW4d0fP5lOo61vRJJdyQBZmlivso/Qb+j1zMw7M+FT0clBIPrpi3gxH+Cl3vH8nQuZcGc52X4aQ6d/B0jj+DY5XGVrAtykeo6+MNeIsE8mN7nzfqnH7N7xGVh/0H+lO/YmwCJub50OiTbpTzOanyaE/el4hoQf09NmfcFmnvRxkfMh9DJoUfpDttF31kU+IISvc2Llkz3Pr103Ts4bS9ogRDa+TRt6q7PoyZPgfAF9Sv0qfwoYsVaO5L+BjjZlpd2JCnP9ifU/6ALxiSx70W/gZvfIhxw/sWxxj58Wvh4e1IODOWe1n1H84/5V0m30JXxPc+QLSRzTUo6aYkx1topLZUArJUuA+m7RMR3f+Vh8ySyOsgJynVVVWWF3/qYU/6pj7N1ThqFM/Iy+eQ74TmGABXVa32xLxC+ZWaoziYErLHYwvpGC2y/Pcs7pHdXu7Hmk9oTs3YKoY+j8afuX/z+1SvJbnVJquYT0hfb9/IjlNAU/X8fsrT1AcoGXncPmLK/AjeSICM8PExSKfg63luU2Gp76zfpy92Pxfmfl+qdpD6N311io/bXhh4C6KuaGJnvIE0t1MpDbrQ974R/5ccyOb3JyqPHxTk/9TDf6EGzugLX/zD4zlKA0jKuP2lMD0eNbxdS0nwTe/f0RFpsv7R3VI+KTu5bXtdXtoYZYiTCX7nS/8Pjz7F7eCD4/UxX9B3pernZDfiCcwpfKyjnmyCDtzngG1eZRgXJY7u2apUr1z3S+o/pD/3LeALX7Ch/0Ju7ORjFXr5NTxSu0hN6ZqWd3xVnyPro/LeF6T8yAcDiejty3UQPXCGD5wYzzjhfgdbIgsxD9giE22DuaD7hK7TWmke9bjGTvg0x4DPp2UJ6ZkvYxzRIf3RIx0PSEj9GUf1+1rqgpGwRhv6AtwX90bmRHYok10UsvJ5hpgggKqnc8E87UIVGAsL4KpP/cRLWQEtB0JBBYa9k/A/4tWnyaqCVrm8OjJNLPqkPI6ZT/JWPaFaDUuDIcE5eYJ3QEUpXk1wTXUkVU93GnzG0T3YrI6jDL8QsKnG8K2wqppqb5g4Ojfa5dlAqOvsJh9gcRbKMxBDE6cbpwl+pSY84ydUKZDbpzx1FJSTbAwCdKR5BUhR/vhbPT5wVKnjwoA9dFa6oWcgyNExY3A6XQGGwfxGEAtjHWHCbT8ORicyIF1pXwxuAxrIAVUZ3mB88qoq+BwG7+/vHXQ8nIyBDn3Qk2uwp0EhU1VVtRuGCxp81bhqBei7vX5llQL81ZWSm5s5GnbakBkY6aj7dLNJR1FZrsak+sdPKJAtPlXeWNOOlxvk8h45Xd0ECaeOTNiNK6vxG1VUIOiN/NBjgjLADbV0BOvMFo6/6yBoRJ9G5Z2w5KAD9ht2ly/RQFCjAJLkEq4VunGoULp3lpIJHGlB2ImZZ7VsBM55yU+jp6tiwlKhBsLARKdC0JY0dM8pHZ+hcdIJK1E3paIv3ZHJO0Q1Ap+Milo6sQFlBmbZm4blHYxakQ7aS76KibV8XB0SAQN8n4crgtUbnTf61IiOh9uwIJ74iz6ui2RLBw75t+T2zlfyJf20gxJWyKvyDJqVeoAiwzn9qgmyb6f8UvkERcirruFBinzZA+HyG2oKN9qCdz4SHH2xD/T1mMb5+4AmGmCel99UyH/61aapV64bEccF/bmpkK4VCgpkAUH81tsDoJQO91l0g79/0g6P9k4eNyPk+gRF3942KKjS/MurY+dhEZ0cwXMvLz5uO5XrV7dAXeyDjf1OEP/SBzth35x08P5GNLg5pjMG+0Q2YOKTk548BAN/9Oe2iEFRCZbzGZ/aQ78ejIieDyJKp2V4QFuKlcu24EuAxNTG6QM4mJBS3ieKukafSvmryzbIA/nRX6JLfm5auXmXOiohGTgHH534/kfCDSxoa5TBsrQzDvxbWUpUvvTw/kVlkIcbPCaw1EtvRvB74UgF1cOR1XR9UMMf4MvNIt/Y1wcqyUef4/236nEzg5Mje54bK+Xz85ikR5pCC1xE2/toBkEE1jXyJnq5QCJFsRz5YizfUX36JeHMZLlMfbb7ndJUUweTN4JyKbbYi4AFONN/V2tMoN9wv8QX5QMV3o9pmFJ7JKggFF1ub2Niiy/ov/OBlzTyyYKVSwbJxU1Dv+iXS08PjAkaZFSKy043lEcf9UWpSSSPS6o/8FefABiUrtG+VgRzsR8eUil9Yd4/QJ8uv5N9HCPqyx74C/8oRLsjj1THW+ORT1aVi9+gMwdtmgIM1vkKPWSTDOXlCiDgz1AQzuR7P+dyib9oej1KiB19nDzR28p4HmJKNr9hz3wERsIemukNkbAWW9pkZYX8W3nwSvt8YSA5uKGVKPpGjrSsMlIb0d+pH+BhNpMqnzAqj76pvB80hXle/Ya+6QPw4bzaqwczpS/8wIBxHMs4qNKJB7+ghw8yqTyhoDJpNfIT5hZSUJmyn3ynKEyKCmhWauz80Rs/pJbmGHnrfUsPekUE29CewK1Gvwagn+vrPeF+o8J+4D+dCgrzkssK8fCbEcnqk2thwI3HgD6Mf7QBfLZcduztOe5ts0/8y6VfTW2dHfnBDxSwFR2Vy1fq4W99XjdD2hdNHtD949eteOK4lRe1J5polDEmi3dRN0WUpz352Kcx39uA7OIBZOwueUCIh4tMinv0sBHPqdGDR8Yw+sk69bn4W7ceMjMOgXlvb7nV1Y0XXd2wiAbf+EoeO+m7l3EZvTCy/KVPdvYgkJiBH/1gWYVsKDm54YP3OGENZtWXjMNdfBLKRJaxBb6Vkgkf8uCXbNvfp/5TfXWlxrai5GQS7MFz9RVF9eW0dR7Me6BJ/C7RL/I82KUbdB54V+RTfsxnCppfcdPX2/WWz4FqL7lU7ZgHV1pMoSBOt+ZBeY133IBKfH+glVP7ZRKOsNyIgAt5HAQ4CYB4e5Xs+DkYJzR0Hq7ha7ibeHg/KZvQd0g5zZekI34MIWFHC2EOVyEatIke4UGAnjlZmaIS8Cmof0qDtKIp36eujx86wxcoA7a9ekDeK7wZO5CnTHalT6soqs/CH5XOAcbgSrCZenJX9yM6NQ8qaGzzvkEy+bjimqbtjj6V/oOxGx9gMckAbVJtlPEF2bjxxva4RwqE+kS1+9QvaLVqq6ruOrl/Kc8xUbsz2U9yy7kRSoWY+si/8Df4UA4MwBJ1dA3TtI2rrPBlPiqtpAvz8PTmU5fqv8RXdRw7VfMHgeJPu0lkN5+rqq77tdK8baGv2orPp9FJvgm/vNp8on4XfnSz+L33rerTmEdSnvEFEHhYD1+dur19LqFrbKkvBNMfxngJpYN+kT4DW9AHwY8vynu+/Mrbvu5NuBfhgSU5+AH+oGTHyPGWr+JnzMHK5RMDBMpozxKmn/5VeT5G0/eKvvMQf1wYfBGJYJHPUcWFbw+kSnLGqHKwgbfkZR/HhLmBzuFN+4ZGOldk3BIv5huyIzJ5gFZ+ga8NCIMCkxIxxn5gBR3aAg+D0ItytEXuJThIA6Ny7guYR+gffgnWGeDpXEZllYT98SH3TdEuly55jWH9uq+lHyI9p7mTyKSyS3jm92CRtrvUJ0TE2xd+T2F0pX/gGHDshI3IICfjFRiJosphRJ0jR0kf9BQQMj/9OvcpJFBatBAEA0gOf8inOonGVrkTOZJLJcQDumBGUIc2XqlyXlXE3Q5Kozz3NBCmDr6N7bmP4YGuB16UqZpOg3lBRV5lqOOdATggj2SHmB86R3bR537Mxx+lw5M2hD9yMMYrSXyFkb69H1K+7tqcPnamgD+Akg+mwSolpULrpNT+oamyHitwUUqCKJ1DpNUeVVbflMHWLA5CfGyGPZDJ+XONDaQneCAvZOid8PEcfaC+00Cp8JIM2KdCQ4IHCUv9mUp7G6wUnXSsVHvD5qrfr/6cps2DSbBhLknHN5Bwv49QqY8w96bv8PFW8tO/0q6rVN79HcH4YAuVhZbrIHcCM8Z/2pjfAymNvp/y2AH/c9sKzHI5JeigG5jzITZBf4g0+AR9F+2IfqePtoYuKgct7pPgJeLyMd2Dl9N/qJ6nCHuVlUYyV/qwgvbkD7bc++CnwvCCmfuG+gfxccupj0FOxiNX1wthL+4HhQm6UA8eqsJ9FAkED6HBx+8jlEydKgWC0WVA/TpBdvAcr1hQlea42Jo2421WWOXVR7JYkQVCOY27wOx9qfyim3sMyV/Qgwe0gwcSe9sRaj426dsfHkg2F1sl6S/AmkAi/s/8Dr/K5tG0yHT+jtypjchn3GCehXzgCBjl6q+loJiKvv5h06yte6xEtEpTZ/eLdHxObc1YTLut0DyH2hJF8yjmG8zBsZbqYld9M8PhPij1m9QnpKrLRywI/cHf24wwoj2U6ad8OeSXvPgki1+Yyyd6YTaYZwd0wR0qmj05Nj6Xd3rEBtBVZZTnZhb2ou4rYT3gqS6C8YU2xlwRoAua83qgVvOj6lyNzxuY8/JhNKirlc7i+WaXFidKX+aMzLPAGXv4IbbM5yqFOb7aK4zzWhDisRWVLcru+Ad0WLSA7Rk/sfP4WuJixCnUTgFTPH2eIL0ph6287dCXyvcZ36CjYu7yjpMIeVtWEgeY0R69rWog534XnQs4Jf/BkP5BF7iHKuh/+oEwCCObNw+hyQM0j2UpzScqqo99uYQ2/XfWvvCBLKaTI0aociyOYR6pon5fRH8EW+YRyI1Nq9R2BnSP7+2CfOZQeBZtXTr7kIbvixd1wd7nby4LUuvhK/7YoxgfcSfJXJDu9Icu9oTLJvwxTkAwg4o4NYdPuHAggcaEMr2hlLMzgZATAr4PADBXuXEyWJUCRNw88rSXiQwGBCxfzaE67kAqn3YSEkyKIoWDLaXocGl0dEYunJSigReZjAmlKjkLwWQ3ipy4SgGtNNClgVm81ZylcVm6+lmMu+XEfkMhWVnBzY3jOHVeZeqkKUdHhAPkacBqZFW6KUK2Aptk6xsdIcmBj7ijA7R0ogOcoIkqQTVuKDCoT36VSYCkWk8Ix+vmo2Y8T950k6aVxxPqanwFMqtT0YeVugTIK7k5ko4eNJbm1XqKq4T05kX5GNZv6IQdF0zMejUpIujMwNItOjzxJZhPAe/4JUdd7QRvuPBihTVY4mR0kAw+3KQxmNNZoyvy+4op4Yw87srip6JuFx8IxMEfWCgX5+bmFBloHv5EDwlUAXrgWSMMoEnHgGzwoJ6qu07cmKIfeWmDYuKfDjrQg2cFDUU0Oe+VTQWND5bpRJ3BM5UBG1An8x0aCs5EQ6QjJkBc0IS0j0mpaMGnR09I+cam6JB1InzDj07H9da1B1LQTXgyCOEr1MNFwARfV2nnh550KO7rOI/oVPMEVQerjeg4yOMGHN0ILNCokYVJBoHnavkOk1YPyOCLKOYf6Ul92VNEXGaCRhRxgVQmxVA+KbkIPvsNobIZ8CDBYAIx2ocH54QhCGAlaGQ4OColPZQtHiojAtCgHH4pOFxnUtGFvoQyXpZifGRzaPqDH2igN3yksx+6hiY2BGdPV0UmkJXCplc2c4CxpxRN5aN7Ew3Ro553sBCDoQTgyR0+70lK44GUr8CQj0BjQAMH/RrtI72RFG0mfPB1YypgJzp+U6Q0ieg2k9e7KNgU+vBBeOSHG5MM8tIbQHzAJRAf0QUz5WF75OyTvZmUk46fUpd6unK+0PRJB3w0iaMOtvN2rHN8EZul4qaYcvMnFtRMB1TpnfEkGAAff6quc6dDO1Z5kXNc6L/8BkNyef8on3F/1zX9KEEVCeODLkr5jUwqqGiojau8RHCatFEsS7v0lWg6hzY6gKNLKRred4q+T1KV6A+sVC4NPA9YrXhi5x61HfwKW6arkBgjJIP7V9ovQ/84DxixneMmPCVHCpT0RDgdjjnyS47Un1Rf7cXtq/y0T5TuEjOVVE/INf7Ql/QqMMDBQM2D07T1kIJPQo92rpsU/fO+VmW8vwB/ZfoYpz8eyFatVE5oOZBOww2iP2lQjPaNvdRnSz+CavRLbjXx8sC28r2fFX3sxTjm9lEwCr9ndTDUCSzhA46Cs9OZ6qaBffU/wsz7L+nGfAAf8IkZ3/INb3+qjV4gQ7AmvYFN9ejRuFSpG4V+tQsPyokOdvWAgergi36IJ3wIKoIJPszh44nOaZduA9UBT27muJlAVybxtXW1rqNasPepPCykX8nxayvJxbjYp2Au/S3+jgxgVqWxOJ2M0Y+qjwALMcjmJ1z7TYV4cPOR03iM77FatnLceE2Oe1wu5g1VCmb26mk7GPBQirpYpSBlqsfX+lyoTP5CgJkVTrVaHe06SA8aSE+hJ9VHcjH+9Ulmn5ji5/RNwsgfeos+rkHby2c3veqr5Gn+4I22gP3ACCypy3jDilz8Fb359RMPcnsVIKed4jvMwZi/MWfzibBSUxvLBzQ20L+lE2+VVznGE1Yf4Q88VCSIJCt5wLj3uFaLS8YK3cideFOBX+nIOMYY77+UUibjEDgjByses3ESP6uWbjXSbUA3PuWay7Bik5urPgXQKVejl7MWe1k1nfbJfd0K+EvXMmHDjQRlkM/bunjhOzyQ9PFUujPE4Vv8k2Hlb7ohlM2q5UfqoDTWat4jWq6EijDPYn5Uya/pdBDIkks4T9oXutLefEwRTXDmJnf8peO1An6cy0KAzSfrKoy/8HAN3+NAFmyKvZyYvgkw+ZiFeZTn+ukcf4Sntw1hn4679LXp3IaxgSA7PoqvYl7kwc7M673/lo/QZkXWbekjr2hmY4gqqpzmiAgFNsLUaYGZkpyn5HM/UFl/OCH90Y85vpfV/JLCzDN48I0tmNN7sJxzsab9ZnM79EsfPri6KVbIV6KB/I6RZKf9chBcIr+IPXQNDf1RUtqewQhf8HECuaUL43mKS4oNdNGDg4fZjE1c8y9dvQxO0kN0oUcboN2KqPOhb0IX+ix0pB0wz2VloN+8qy5+rxIU8DaGnLRXxlyPP5T4qYD7EXKQp0upk86LfDWiGEEf+ZGFm2X01X+K6g8Yp/Pm9GGR6pLvrMGF8RR/lzS6wF7+KY2N+AZjuM+FkEn6uKw6xzfKWYSkfNoobRo5oOm0XD/ZkDfYKhH5CPTSD2InxgU+HsCGNxVVH/nQCZ/l8PbEt/NP+2Owgwd4oqiPWarnF66L2hC25V/pmm/o4l/0BRJHH8qIGrKpT+HI5nfe/5CPXT1DtIQH7Rje1KF9M8a4virk2PjYIDmZVmTBJPko8xry0wACvssYLz9QQcEnXVQBmVTG6Tlf6ejmLs31wU4fn9OUfD7zB3RKDSta8JErgLn7NvSRXXVdBsno9/RiiC9CE33xC+RK1XVkvB4Ba8cKEPWBPnTpRyWspzG3cwVQQvk+xwEfpTPG4GMesAJ4HdizoLrM0cDAV1YiF/n6j4/4+CtfzOYBgCF0vM2AP1iChVJER3ZSfwJvxjzKul87N9lefRZ4IC8YuC8rj7oq7bzSM2zFohuC/hqf0BH6YMdHJDwgrjI+poueBz1VFlrgzoIOf1gHO7excsBJpOANEcdZSfgUMtMXqqqPu+Dl8zblc7g90dMdBd1S+RmTkIVfdomIeHDPkM5lYMd9LfzAmnEZH+Bg/Eae9P42pUc9ZPF+SnoiE4f3LZJNpN1+9LVeVrpCz/sBfaf+nc5JmCdgU8dDNLAV4yHqZL6GLZgX8Utlt4H4Dfqm5EVnyoPFOC0IoH9xe+Dn0hX8PDBOWaUhCw9XqUSAGt+El5DG5G5j5sg1zE3QT+WJk7BggX6BORL3c7RpxiT6TXyTh9VZ2/XYAD6mdOJf7v8On8pJPqcnjtjE7Sy+xHBoC/gN8iC336/JGbAxdvfAs7SiDWMXFXWbpTagYto20dGtQgGdwMPn9ZRXnttCuHPOggGJKZuiW2pvHtZTtZL5kwjQ/+LnDhp4qzzBXe5OoJ3O+5Wrczj3SwlkZe4LcW/TwgvL+jjh8qd4Ix9laZ9pe8EPaVe6P9QH+/oD9xJffJ86igWn5dFZXCnnv2aXTszj/Z5YtkrndQSBU2yZj6V4pbj44hRhyT0dv+rHto6fgyLd5Hf0fdxnwcljT+JNH0lfxMMHfJh+Al/wurp2MSUTv85L5x3YgAdSqb8jA4FkXcqXsGX6j3TvowWaxxTECzxS38Qq2BB/pc3SJ5CvGKdo4y+6TI9SHwb+xCRU3H3K7Y9B9F/WkzzYB3lFMasMv9I52OJr2A6MB4vgR8KXvoB5rvuxaOG33iaVjj9A33s8aMh44IzctAvaLPoyN8KHaOfgyr1WQR+4oZPH0CSh9w0SFVsQHxUnLfCpr/tjnEJ01SDprNIOFklR1p+g0isBLEKLAUoU9FN/hM0rAOtPmLS6EjoowipdtvNgZZObRWDyc1DAwMgoRiDDnzYKLJyaBsLNI4MLwNB50HCdtmTiiR3G4OmcW1O8vCPRUzB/0qeBHTwIevdJtrdY8SxayMogwU2I31jLmN756prOkZtCKeKg4QTgQJCBQYdJqd9Ao5iIoy8OSEMjYOiNRFnjtPKHmz108q0G9M3qcfDjSQ1PU+Bfw6of1atRWQKhYMLTbzCjcWAgOg86YCXwYMp59uqGl4kpN4s9ahAFPfXjplpie1lshiOha4229kB2XJ2nF9DGBjQKAhnYjwbFjaqvKhIRnKT2kgk2cWIdXu2BfoLHCJHeQMnmENcfvzkSDmDA9NonxmKWOqZqCGs4EiDB8Wn8mU7eWKQj6Tg5crMS0luxfIzVbcjrOAgD/IIj7chT2tTh8FUD0pknmwx8dDQ0AiYPfsMj2zMaELwFDG9U4osr0wB8oiFJUUuMvJHzZIynqmDJ4Iq/M+BUYTtu+jUTQjawgDzSIWOKsRKU55PlEl1v8PLZvG7C8VXHQ3oRdKYyDZOeggbL5IFJKbTwERyRbgX5fOW3TsijcwZrfkYEnmmjUxnhUObtR51rjWwt/wMXv/GAvnBBLyYryI0s3lnoyv1AiU4fjGCqdJ+8yc7i5HLSoaYyk6t8leLplpDytoA61PHgIPq4fkpDHXX2vioLOdATF5evpB1+WpYVYpRhYuf6i5Zjow6Ptgo5H/TF12mAs4RgQObaV2qU+Lo/ejm0ddN4fSYerPauZrItv6dP8XYtffB5dMI33B7OU74qOfCU1LNlZ+/wU94Mvjyx984aYfRJ7Z7KlMmX+hu+IjyxWwk/X+UgbLw9oDck9A/bpPjRVoSDavhAVpIJfSWJ0lN/TCcltDzV1x+sAxeUxibUBUNWSKTdOd4FLiWZ8H2VTYPX4ilfITAFLWxBHR9wdFlQYl4y4XP0sKyOQ38cljrpKh2l6xx7skJ00G+cB5NA9aNeB91SGQhYchPMJBq8xuuXNmlQR/XV4Ngmhyrul64c5tPkRHlM0qWK+xl9lK94kNwUc6xUkVUvYqz6wpdv5bkGosHkkzbdw1Nx+hGV935KSjkWKp1O1FJdoY+MAAREfkh2LFBCXn4vPUWHclVa/Yovw9MnpKoEXWyIvKCQ5mEHUlO/BBPaMeMivs8B/X7JyaSPsvIaT2UiAz6sWkAm7x/0je0pe0Jjh8sKb6WhI1gyOeHBBAJUCgd8BrwpCwZeRvrS1uUEStSX5KJFuNTCM72xFgH998m2yvnNlWhw4EcEpHz8x+dUB2HBBj8qzTqont6cUkl1UhnASPKqDjdnrIBhUsZYwJiLbmBJ0ICgFDfJfrMmPgS3sJDfSGiMyGksHnfpJe4rPHiFH/0AcqXgyRbor/GVsYMV80VWQEgf+vbjx7skS3qz7SijR0lQ6tAHXaKtNao0Dv/gpZfUp9TYpZMmqY/VL4F0g+K//BHifdqOg7bhPoH9pR9lwMO3nJJu9NlMypkbMX7kWdkhl/N2onQwSzHR2OlzjzQwL2LpClDJntODgHTehn2xt7bh0k9U+SUYvsnWGeMUYMf3vb/BvFKJfhLsOfAFfCK9kL/Rb+pgck6/QyCawmzzpMmJ+70U0y/l0hXRPHAvsE2a8PabC42pzEHqLq/1cZYHwvg0Y7o/RK+U7wtLAs61Ey/zrTqYv3zg6qu9DReKCkgryFXUsXfk9QAABU1JREFUHK/3LW2TorLgyNick72Zs7E9x4RLxkts9EjbSY9WSXv/S38ke7MNWq8C2viRYyrfh0+6XYfaiMbYnFbP0wZ8XiBcsI/3g+DBtfDE9/wnhnJyHrgzFyGPhx/8YgOd8R1wY27s7UO4dbOCT9I5fXjo3McBlfP+WrgjJ/7tNpXcYJ3eCImB7Ox9h2RA50oWLoiGzx9pY7IvViuKJ7oQ4GflOXMDn2vDU6TxCdoyUyX6UnAc0Cr1ftVPLS1WYqeCfuL9onDwGzP5JWOV92VOLO1TKuREBI7ca5TufbBLpxT9zwIl2Q0mOiIHPko/Rj2fr1BXemYHusGLNq6i7rMe/E4vVI9/4EKfxM1qOkelLfsqWdX1sRK55YPowj/BVZr30M+rTwRz+jfVZ86EPfAxT9V4gbws6hCj0ljNTT7zWfWL8gPHUES5h/C+yaETDQdScou6yyMe6Acf5EJe90HVo19EPlSDN1hRjsUhDqLKZ/04fYnrim+rDbJoqKh7skz+zLcYy32BgO4nsJ/P18UAn4QPf8TSsQcDTwJL9FSbo5zfO2Tl9U0bw4Moy5jP4UEj0fL2QvvShxLME/glZ0bbb65VBTlpV4x1bl/5FAfn+E523wkN2ogIu09ymmHE+Xj96pIMv7fDd0qYkuZtSX0F92KM5dCBP/RdeLCGn/i6X1BffDyfNC+mPzKeSnp7ZcU7tqQ8fTDjCFhzYBvk9v6TMuLDOOjYOJeUJr6KfG5L1aUd4kNOQ3KiA02AFNdVPLmAHnXdVyUcvOlDayQHPuUrKaUD9yi0UWyf09iF7/qcV/WdC/pLfvDABgTpxSG1JfiV+Pr9hHhzb6ca7isVOR64CDPsIf9EX6JLtP20zdO6vKj7MDQcL6UyJjOGKVfjunxEvEtQKA8OokM5VVC1NKCoa7AHgDSGgF8pTzhl99J0asyrvX1TOsNW377VllYUwBV7uqISFnw5+KUbcpPlcxz0h54EoM9xv/Byqd0J8DOXZG5DHrYGVfze52sILswIXoOxAHKcmUvBw31L6aya5px27DorzwOiouV9j775NQSygAfyYzYwwwf8Pk8U8XF6Ke9T9I2S4A1t6iATq+u57+7TfIN+mLEAGVXJ6SEmnyoFZeHJ3N31VheDr+Fn9FGgiLw+F1ZdePh9OOO7ZOrTfAcfRH5+lUZ5/omRKwBdn2tzH8giM/knD+CxF/x93AM/ZNc38Qv8GOvgL2k5MFcsREqy4EJopb6gvgr6+Dk+ydwKGrQZ+j/alI/D0gcnYA5B/McxVh5buRBzSdseY4LmAqLDmILduN9w/owNws5/yYF/qS59tbdl8XKHFl/s5JqDs87wEvhRjgMxaH9exvUv+a3S+DWPP1jWOXQoBG98jTGDOvgbshNzg2d1zXh3bWzAHA+ZBIj0Fz/lc0DDddF55rfefiUv8rk8wo9xjbIczD1SvxTfEr7/fw13ssMwCENRdNVNqvz/57b3PESkqhAGz9jgJOTjZ++m2/QgfFx3HPokIfFH8o/t0YXppTH1xUeyjCnVs6Fskb6KmX0a4/t8ip+KC9MvPpqvMT9cjw7wyeK1Q88KVfgenzRa8rR1wv2NEd8Hkx3cJKN4+22PIGnjzJEd0U28FUvPNrt38R//ox0di3cQMn4Ag76BGyqI1MzmyMPaRz+5c7w4++3+ayOZn3MgvGhi7XDl1/CYzHcNVjW8qA0EMpy91o8Mh8Qg05Ozv1vP1qJ7PmYuh/lmnl1ap8DOV3prlF9g+5MM/ags9lwSh3ArR8pwn50FL3PuyWj6XSGcxNhQfHoIY2+Xxtc/V4YM/8T4cl0AAAAASUVORK5CYII= * Al parecer comestiste un error, si tienes dudas consulta a tu profesor

]]> - Santiago Sur 24/6

Sin retroalimentación:

]]> <question><wirisCasSession><![CDATA[<session lang="es" version="2.0"><library closed="false"><mtext style="color:#ffc800" xml:lang="es">variables</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><apply><csymbol definitionURL="http://www.wiris.com/XML/csymbol">repeat</csymbol><mtable><mtr><mtd><mi>b</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>1</mn><mo>,</mo><mn>2</mn><mo>)</mo></mtd></mtr><mtr><mtd><mi>c</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>1</mn><mo>,</mo><mn>8</mn><mo>)</mo></mtd></mtr><mtr><mtd><mi>d</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>5</mn><mo>,</mo><mn>8</mn><mo>)</mo></mtd></mtr><mtr><mtd><mi>e</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>1</mn><mo>,</mo><mn>8</mn><mo>)</mo></mtd></mtr><mtr><mtd/></mtr></mtable><mrow><mi>c</mi><mo>≠</mo><mi>e</mi><mo> </mo><mo>∧</mo><mo> </mo><mfenced><mrow><mfrac><mi>c</mi><mi>b</mi></mfrac><mo>≠</mo><mfrac><mi>e</mi><mi>d</mi></mfrac></mrow></mfenced></mrow></apply></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>tablero</mi><mo>(</mo><mo> </mo><mi>punto</mi><mo>(</mo><mn>0</mn><mo>,</mo><mn>0</mn><mo>)</mo><mo>,</mo><mo> </mo><mn>20</mn><mo>,</mo><mn>20</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>t</mi><mo>=</mo><mi>triángulo</mi><mfenced><mrow><mi>punto</mi><mo>(</mo><mn>0</mn><mo>,</mo><mn>0</mn><mo>)</mo><mo>,</mo><mi>punto</mi><mo>(</mo><mi>b</mi><mo>,</mo><mi>c</mi><mo>)</mo><mo>,</mo><mi>punto</mi><mo>(</mo><mi>d</mi><mo>,</mo><mi>e</mi><mo>)</mo></mrow></mfenced></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>escribir</mi><mo>(</mo><mo>"</mo><mi>A</mi><mo>"</mo><mo>,</mo><mo> </mo><mi>punto</mi><mo>(</mo><mo>-</mo><mn>0</mn><mo>.</mo><mn>5</mn><mo>,</mo><mo>-</mo><mn>0</mn><mo>.</mo><mn>5</mn><mo>)</mo><mo>,</mo><mo> </mo><mfenced close="}" open="{"><mtable align="center"><mtr><mtd><mi>color</mi><mo>=</mo><mi>azul</mi></mtd></mtr></mtable></mfenced><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>escribir</mi><mo>(</mo><mo>"</mo><mi>B</mi><mo>"</mo><mo>,</mo><mo> </mo><mi>punto</mi><mo>(</mo><mi>b</mi><mo>,</mo><mi>c</mi><mo>+</mo><mn>0</mn><mo>.</mo><mn>5</mn><mo>)</mo><mo>,</mo><mo> </mo><mfenced close="}" open="{"><mtable align="center"><mtr><mtd><mi>color</mi><mo>=</mo><mi>azul</mi></mtd></mtr></mtable></mfenced><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>escribir</mi><mo>(</mo><mo>"</mo><mi>C</mi><mo>"</mo><mo>,</mo><mo> </mo><mi>punto</mi><mo>(</mo><mi>d</mi><mo>+</mo><mn>0</mn><mo>.</mo><mn>3</mn><mo>,</mo><mo> </mo><mi>e</mi><mo>+</mo><mn>0</mn><mo>.</mo><mn>3</mn><mo>)</mo><mo>,</mo><mfenced close="}" open="{"><mtable align="center"><mtr><mtd><mi>color</mi><mo>=</mo><mi>azul</mi></mtd></mtr></mtable></mfenced><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>AB</mi><mo>=</mo><msqrt><mrow><msup><mi>b</mi><mn>2</mn></msup><mo>+</mo><msup><mi>c</mi><mn>2</mn></msup></mrow></msqrt></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>BA</mi><mo>=</mo><mi>AB</mi><mo>*</mo><mn>1</mn><mo>.</mo><mn>0</mn></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>CB</mi><mo>=</mo><msqrt><mrow><msup><mi>d</mi><mn>2</mn></msup><mo>+</mo><msup><mfenced><mrow><mi>e</mi><mo>-</mo><mi>c</mi></mrow></mfenced><mn>2</mn></msup></mrow></msqrt></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>BC</mi><mo>=</mo><mi>CB</mi><mo>*</mo><mn>1</mn><mo>.</mo><mn>0</mn></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>AC</mi><mo>=</mo><msqrt><mrow><msup><mi>d</mi><mn>2</mn></msup><mo>+</mo><msup><mi>e</mi><mn>2</mn></msup></mrow></msqrt></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>CA</mi><mo>=</mo><mi>AC</mi><mo>*</mo><mn>1</mn><mo>.</mo><mn>0</mn></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>dibujar</mi><mfenced><mrow><mi>t</mi><mo>,</mo><mo> </mo><mfenced close="}" open="{"><mtable align="center"><mtr><mtd><mi>color</mi><mo>=</mo><mi>rojo</mi></mtd></mtr></mtable></mfenced></mrow></mfenced></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>altura_ventana</mi><mo>(</mo><mn>450</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>anchura_ventana</mi><mo>(</mo><mn>450</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>tablero2</mi><mo>=</mo><mi>tablero</mi><mo>(</mo><mi>punto</mi><mo>(</mo><mn>0</mn><mo>,</mo><mn>0</mn><mo>)</mo><mo>,</mo><mo> </mo><mn>20</mn><mo>,</mo><mn>20</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>t</mi><mo>=</mo><mi>triángulo</mi><mfenced><mrow><mi>punto</mi><mo>(</mo><mn>0</mn><mo>,</mo><mn>0</mn><mo>)</mo><mo>,</mo><mi>punto</mi><mo>(</mo><mi>b</mi><mo>,</mo><mi>c</mi><mo>)</mo><mo>,</mo><mi>punto</mi><mo>(</mo><mi>d</mi><mo>,</mo><mi>e</mi><mo>)</mo></mrow></mfenced></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>escribir</mi><mo>(</mo><mo>"</mo><mi>A</mi><mo>"</mo><mo>,</mo><mo> </mo><mi>punto</mi><mo>(</mo><mo>-</mo><mn>0</mn><mo>.</mo><mn>5</mn><mo>,</mo><mo>-</mo><mn>0</mn><mo>.</mo><mn>5</mn><mo>)</mo><mo>,</mo><mo> </mo><mfenced close="}" open="{"><mtable align="center"><mtr><mtd><mi>color</mi><mo>=</mo><mi>azul</mi></mtd></mtr></mtable></mfenced><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>escribir</mi><mo>(</mo><mo>"</mo><mi>B</mi><mo>"</mo><mo>,</mo><mo> </mo><mi>punto</mi><mo>(</mo><mi>b</mi><mo>,</mo><mi>c</mi><mo>+</mo><mn>0</mn><mo>.</mo><mn>5</mn><mo>)</mo><mo>,</mo><mo> </mo><mfenced close="}" open="{"><mtable align="center"><mtr><mtd><mi>color</mi><mo>=</mo><mi>azul</mi></mtd></mtr></mtable></mfenced><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>escribir</mi><mo>(</mo><mo>"</mo><mi>C</mi><mo>"</mo><mo>,</mo><mo> </mo><mi>punto</mi><mo>(</mo><mi>d</mi><mo>+</mo><mn>0</mn><mo>.</mo><mn>3</mn><mo>,</mo><mo> </mo><mi>e</mi><mo>+</mo><mn>0</mn><mo>.</mo><mn>3</mn><mo>)</mo><mo>,</mo><mfenced close="}" open="{"><mtable align="center"><mtr><mtd><mi>color</mi><mo>=</mo><mi>azul</mi></mtd></mtr></mtable></mfenced><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>escribir</mi><mo>(</mo><mi>BC</mi><mo>,</mo><mo> </mo><mi>punto</mi><mo>(</mo><mo>(</mo><mi>d</mi><mo>+</mo><mi>c</mi><mo>)</mo><mo>/</mo><mn>2</mn><mo>-</mo><mn>2</mn><mo>,</mo><mo> </mo><mfenced><mrow><mi>e</mi><mo>+</mo><mi>c</mi></mrow></mfenced><mo>/</mo><mn>2</mn><mo>)</mo><mo>,</mo><mfenced close="}" open="{"><mtable align="center"><mtr><mtd><mi>color</mi><mo>=</mo><mi>azul</mi></mtd></mtr></mtable></mfenced><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>escribir</mi><mo>(</mo><mi>BA</mi><mo>,</mo><mo> </mo><mi>punto</mi><mo>(</mo><mo>-</mo><mn>1</mn><mo>,</mo><mo> </mo><mi>c</mi><mo>/</mo><mn>2</mn><mo>)</mo><mo>,</mo><mfenced close="}" open="{"><mtable align="center"><mtr><mtd><mi>color</mi><mo>=</mo><mi>azul</mi></mtd></mtr></mtable></mfenced><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>escribir</mi><mo>(</mo><mi>CA</mi><mo>,</mo><mo> </mo><mi>punto</mi><mo>(</mo><mi>d</mi><mo>/</mo><mn>2</mn><mo>-</mo><mn>1</mn><mo>,</mo><mo> </mo><mi>e</mi><mo>/</mo><mn>2</mn><mo>-</mo><mn>1</mn><mo>)</mo><mo>,</mo><mfenced close="}" open="{"><mtable align="center"><mtr><mtd><mi>color</mi><mo>=</mo><mi>azul</mi></mtd></mtr></mtable></mfenced><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>dibujar</mi><mfenced><mrow><mi>t</mi><mo>,</mo><mo> </mo><mfenced close="}" open="{"><mtable align="center"><mtr><mtd><mi>color</mi><mo>=</mo><mi>rojo</mi></mtd></mtr></mtable></mfenced></mrow></mfenced></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>altura_ventana</mi><mo>(</mo><mn>450</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>anchura_ventana</mi><mo>(</mo><mn>450</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>angBAC</mi><mo>=</mo><mi>acos</mi><mfenced><mfrac><mrow><msup><mfenced><mi>BC</mi></mfenced><mn>2</mn></msup><mo>-</mo><mfenced><msup><mi>AB</mi><mn>2</mn></msup></mfenced><mo>-</mo><msup><mfenced><mi>CA</mi></mfenced><mn>2</mn></msup></mrow><mrow><mo>-</mo><mn>2</mn><mo>*</mo><mi>AB</mi><mo>*</mo><mi>CA</mi></mrow></mfrac></mfenced></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol4</mi><mo>=</mo><msup><mfenced><mi>BC</mi></mfenced><mn>2</mn></msup><mo>-</mo><mfenced><msup><mi>AB</mi><mn>2</mn></msup></mfenced><mo>-</mo><msup><mfenced><mi>CA</mi></mfenced><mn>2</mn></msup></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol5</mi><mo>=</mo><mo>-</mo><mn>2</mn><mo>*</mo><mi>AB</mi><mo>*</mo><mi>CA</mi></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol6</mi><mo>=</mo><mi>sol4</mi><mo>/</mo><mi>sol5</mi><mo>*</mo><mn>1</mn><mo>.</mo><mn>0</mn></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>angCBA</mi><mo>=</mo><mi>acos</mi><mfenced><mfrac><mrow><msup><mfenced><mi>CA</mi></mfenced><mn>2</mn></msup><mo>-</mo><mfenced><msup><mi>AB</mi><mn>2</mn></msup></mfenced><mo>-</mo><msup><mfenced><mi>BC</mi></mfenced><mn>2</mn></msup></mrow><mrow><mo>-</mo><mn>2</mn><mo>*</mo><mi>AB</mi><mo>*</mo><mi>BC</mi></mrow></mfrac></mfenced></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol7</mi><mo>=</mo><msup><mfenced><mi>CA</mi></mfenced><mn>2</mn></msup><mo>-</mo><mfenced><msup><mi>AB</mi><mn>2</mn></msup></mfenced><mo>-</mo><msup><mfenced><mi>BC</mi></mfenced><mn>2</mn></msup></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol8</mi><mo>=</mo><mo>-</mo><mn>2</mn><mo>*</mo><mi>AB</mi><mo>*</mo><mi>BC</mi></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol9</mi><mo>=</mo><mi>sol7</mi><mo>/</mo><mi>sol8</mi><mo>*</mo><mn>1</mn><mo>.</mo><mn>0</mn></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>angACB</mi><mo>=</mo><mi>acos</mi><mfenced><mfrac><mrow><msup><mfenced><mi>AB</mi></mfenced><mn>2</mn></msup><mo>-</mo><mfenced><msup><mi>CA</mi><mn>2</mn></msup></mfenced><mo>-</mo><msup><mfenced><mi>BC</mi></mfenced><mn>2</mn></msup></mrow><mrow><mo>-</mo><mn>2</mn><mo>*</mo><mi>CA</mi><mo>*</mo><mi>BC</mi></mrow></mfrac></mfenced></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol10</mi><mo>=</mo><msup><mfenced><mi>AB</mi></mfenced><mn>2</mn></msup><mo>-</mo><mfenced><msup><mi>CA</mi><mn>2</mn></msup></mfenced><mo>-</mo><msup><mfenced><mi>BC</mi></mfenced><mn>2</mn></msup></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol11</mi><mo>=</mo><mo>-</mo><mn>2</mn><mo>*</mo><mi>CA</mi><mo>*</mo><mi>BC</mi></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol12</mi><mo>=</mo><mi>sol10</mi><mo>/</mo><mi>sol11</mi><mo>*</mo><mn>1</mn><mo>.</mo><mn>0</mn></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol1</mi><mo>=</mo><mn>180</mn><mo>*</mo><mi>angBAC</mi><mo>/</mo><mn>3</mn><mo>.</mo><mn>141592654</mn></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol2</mi><mo>=</mo><mn>180</mn><mo>*</mo><mi>angCBA</mi><mo>/</mo><mn>3</mn><mo>.</mo><mn>141592654</mn></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>sol3</mi><mo>=</mo><mn>180</mn><mo>*</mo><mi>angACB</mi><mo>/</mo><mn>3</mn><mo>.</mo><mn>141592654</mn></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>re</mi><mo>=</mo><mi>sol1</mi><mo>+</mo><mi>sol2</mi><mo>+</mo><mi>sol3</mi></math></input></command></group></library><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>t</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mfenced><mrow><mn>0</mn><mo>,</mo><mn>0</mn></mrow></mfenced><mo>-</mo><mfenced><mrow><mn>1</mn><mo>,</mo><mn>8</mn></mrow></mfenced><mo>-</mo><mfenced><mrow><mn>7</mn><mo>,</mo><mn>1</mn></mrow></mfenced></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>b</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>1</mn></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>c</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>8</mn></math></output></command><command><input><math 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xmlns="http://www.w3.org/1998/Math/MathML"><mi>CA</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>7.0711</mn></math></output></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>re</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>180.</mn></math></output></command></group><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>CA</mi></math></input></command></group><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mi>B</mi><mi>A</mi><mi>C</mi><mo>=</mo><mo>#</mo><mi>s</mi><mi>o</mi><mi>l</mi><mn>1</mn><mspace linebreak="newline"/><mi>C</mi><mi>B</mi><mi>A</mi><mo>=</mo><mo>#</mo><mi>s</mi><mi>o</mi><mi>l</mi><mn>2</mn><mspace linebreak="newline"/><mi>A</mi><mi>C</mi><mi>B</mi><mo>=</mo><mo>#</mo><mi>s</mi><mi>o</mi><mi>l</mi><mn>3</mn></math>]]></correctAnswer><correctAnswer id="1">*</correctAnswer><correctAnswer id="2">-</correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_equations"/></assertions><options><option name="tolerance">10^(-3)</option><option name="relative_tolerance">true</option><option name="precision">4</option><option name="times_operator">·</option><option name="implicit_times_operator">false</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">popupEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/><data name="inputCompound">true</data></localData></question> Tri C4S21 Àngulo de cercha (Lenguaje algebraico) Una cercha con forma de triángulo isósceles está formada por un pendolón cuya altura equivale «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»L«/mi»«mn»1«/mn»«/math» metros. Si la cuchilla tiene una dimensión igual a «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»L«/mi»«mn»2«/mn»«/math» metros, determine el ángulo formado entre las cuchillas y la base.

Observaciones:

-Ingresa las cifras sin unidad de medida

-Utiliza punto para separar las cifras decimales

-Utiliza hasta tres cifras después del punto en el resultado

-Expresa el resultado utilizando el sìmbolo de grado (º)

Si consideramos que:

-Altura pendolón: «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»a«/mi»«mo»§#160;«/mo»«mo»=«/mo»«mo»§#160;«/mo»«mo»#«/mo»«mi»L«/mi»«mn»1«/mn»«mo»§#160;«/mo»«mi»m«/mi»«/math»

-Longitud cuchilla: «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»b«/mi»«mo»§#160;«/mo»«mo»=«/mo»«mo»§#160;«/mo»«mo»#«/mo»«mi»L«/mi»«mn»2«/mn»«mo»§#160;«/mo»«mi»m«/mi»«/math»

Por teorema del seno se tiene que:

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mfrac»«mrow»«mi»s«/mi»«mi»e«/mi»«mi»n«/mi»«mo»(«/mo»«mi»§#945;«/mi»«mo»)«/mo»«/mrow»«mi»a«/mi»«/mfrac»«mo»=«/mo»«mfrac»«mrow»«mi»s«/mi»«mi»e«/mi»«mi»n«/mi»«mo»(«/mo»«mn»90«/mn»«mo»§#176;«/mo»«mo»)«/mo»«/mrow»«mi»b«/mi»«/mfrac»«/math»

Es decir:

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mfrac»«mrow»«mi»s«/mi»«mi»e«/mi»«mi»n«/mi»«mo»(«/mo»«mi»§#945;«/mi»«mo»)«/mo»«/mrow»«mrow»«mo»#«/mo»«mi»L«/mi»«mn»1«/mn»«/mrow»«/mfrac»«mo»=«/mo»«mfrac»«mrow»«mi»s«/mi»«mi»e«/mi»«mi»n«/mi»«mo»(«/mo»«mn»90«/mn»«mo»§#176;«/mo»«mo»)«/mo»«/mrow»«mrow»«mo»#«/mo»«mi»L«/mi»«mn»2«/mn»«/mrow»«/mfrac»«/math»

Despejando «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»§#945;«/mi»«/math» se tiene que:

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»§#945;«/mi»«mo»=«/mo»«mi»a«/mi»«mi»r«/mi»«mi»c«/mi»«mi»s«/mi»«mi»e«/mi»«mi»n«/mi»«mfenced»«mfrac»«mrow»«mo»#«/mo»«mi»L«/mi»«mn»1«/mn»«mo»§#183;«/mo»«mi»s«/mi»«mi»e«/mi»«mi»n«/mi»«mo»(«/mo»«mn»90«/mn»«mo»§#176;«/mo»«mo»)«/mo»«/mrow»«mrow»«mo»#«/mo»«mi»L«/mi»«mn»2«/mn»«/mrow»«/mfrac»«/mfenced»«/math»

«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»§#945;«/mi»«mo»=«/mo»«mo»#«/mo»«mi»s«/mi»«mi»o«/mi»«mi»l«/mi»«/math»

En tu calculadora «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»a«/mi»«mi»r«/mi»«mi»c«/mi»«mi»s«/mi»«mi»e«/mi»«mi»n«/mi»«mo»(«/mo»«mi»c«/mi»«mi»a«/mi»«mi»n«/mi»«mi»t«/mi»«mi»i«/mi»«mi»d«/mi»«mi»a«/mi»«mi»d«/mi»«mo»)«/mo»«mo»§#160;«/mo»«/math» es equivalente a «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»s«/mi»«mi»e«/mi»«msup»«mi»n«/mi»«mrow»«mo»-«/mo»«mn»1«/mn»«/mrow»«/msup»«mo»(«/mo»«mi»c«/mi»«mi»a«/mi»«mi»n«/mi»«mi»t«/mi»«mi»i«/mi»«mi»d«/mi»«mi»a«/mi»«mi»d«/mi»«mo»)«/mo»«/math»

Reporta y/o califica esta pregunta:

1. Copia este código: Tri. C2. S21.

2. Presiona este enlace, pega el código y completa el formulario

]]> 1 .3333333 0 0 Ángulo=#sol]]> Muy bien!!!

]]> *]]> Al parecer, cometiste un error.

]]> - Santiago Sur 24/6

En la pregunta sugiero espaciar un poco el dibujo de los textos. Corregido

En la observación:

Solo el título con negrita Corregido
No debe decir hasta 3 cifras decimales, porque no acepta 1 o 2 decimales y además debe decir si se aproxima o no. Corregido

En la retroalimentación:

¿Por qué asume que el ángulo es recto? Porque la altura en un triángulo isósceles con esa forma genera un ángulo recto
También se puede hacer sin utilizar el teorema del seno.

02/06/2016 Fatima Toro Lagos

Realizado-Pendiente: Sugiero que tal vez en el encabezado podría decir: "En una cercha con forma de un triángulo isósceles....."

Realizado-Pendiente: En las observaciones dice utiliza coma para separar los decimales, y el consenso es utilizar punto.

Realizado-Pendiente: Donde se ingresa la respuesta, sugiero dejar fijo "Ángulo = ".

Realizado-Pendiente: Dice "Observación" en vez de "Observaciones"

Pendiente: Las imágenes no siempre se cargan, por lo que la figura debe hacerse en wiris, allí se pueden etiquetar todos los segmentos y

ángulos. (acuerdo)

Además si la dibujas en wiris, puedes agregar el pendolón para que quede más claro, pues son término que los estudiantes no conocen.

Marco Antonio:

Sugiero colocar en vez de sen