6. Trigonometría Tri C3S13 Distancia entre la torre de control (lenguaje natural) Una avioneta inicia su descenso cuando pasa por sobre la torre de control al inicio de la cancha de aterrizaje , formando un ángulo constante de «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»x«/mi»«mo»§#176;«/mo»«/math» con la horizontal. Se posa sobre la pista cuando ha recorrido «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»d«/mi»«/math» metros.- Calcula la distancia P entre la torre de control y el punto de aterrizaje.

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.

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 - Santiago Sur 24/6

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: 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.

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

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