2º ESO/ENERGY/ENERGY
Cuando un cuerpo lanzado hacia arriba sube libremente...
Cuando un cuerpo lanzado hacia arriba sube libremente... (marca las opciones correctas)]]>
1.0000000
0.1000000
0
false
true
abc
La energía cinética se convierte en energía potencial
No hay cambio de tipos de energía
La energía potencial se convierte en cinética
La energía total no cambia
La energía suministrada por el impulso se convierte totalmente en calor
El calor y la luz producida en una combustión procede de:
El calor y la luz producida en una combustión procede de:]]>
1.0000000
0.1000000
0
true
true
abc
Le energía química de los compuestos que arden
El cerillo o mechero que uso para hacerlos arder
La energía potencial gravitatoria
Ninguna de las respuestas dadas es correcta
Entre dos cuerpos a diferente temperatura......
Entre dos cuerpos a diferente temperatura unidos ......]]>
1.0000000
0.1000000
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true
abc
Se transfiere calor
Se transfiere trabajo
Se transfiere calor y trabajo
No hay transferencia de energía, sólo cambia la temperatura
Para que haya tranferencia de trabajo entre dos cuerpos hace falta que-
Para que haya tranferencia de trabajo entre dos cuerpos hace falta que... (marca las opciones correctas)
1.0000000
0.1000000
0
false
true
abc
Haya una diferencia de temparatura entre ellos
Uno se mueva respecto al otro.
Se realice una fuerza entre ellos
Todas las otras condiciones
No es necesario ninguna condición
subida y bajada de un cuerpo
]]>
0.1000000
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The best definition of energy is...
The best definition of energy is...]]>
1.0000000
0.1000000
0
true
true
abc
Something you need to live
Something you can run out of
The power of a force
The ability to do work
Tipos de energía potencial
Los tipos más importantes de energía potencial estudiados son.....]]>
1.0000000
0.1000000
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abc
Cinética
Elástica
Gravitatoria
Eólica
Todas ellas son potenciales
Which of these energy changes takes place in a flashlight?
Which of these energy changes takes place in a flashlight?]]>
1.0000000
0.1000000
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true
true
abc
Chemical to electrical to light and heat
Electrical to chemical to light and heat
Light to heat
Electrical to light to heat
Which of these means "stored energy"?]]>
1.0000000
0.1000000
0
true
true
abc
Energius stordis
Potential energy
Chemical energy
Gravitational energy
2º ESO/ENERGY/ENERGY CALCULATIONS
Calcula la energía cinética (g) (copia)
Calcula la energía cinética (en Julios) de un cuerpo de masa #m g que se mueve a una velocidad de #v m/s]]>
1.0000000
0.3333333
0
0
#ec]]>
<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>m</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>10</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>v</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>5</mn><mo>,</mo><mn>12</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>ec</mi><mo>=</mo><mn>0</mn><mo>.</mo><mn>5</mn><mo>*</mo><mi>m</mi><mo>*</mo><mi>v</mi><mo>*</mo><mi>v</mi><mo>/</mo><mn>1000</mn></math></input></command></group></library><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">e</mi><mi>c</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, °, ', ", sr, E, K, mol, cd, rad, 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="unitprefixes">M, k, c, m</param><param name="groupoperators">(,[,{</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(--log(0.02))</option><option name="relative_tolerance">true</option><option name="precision">3</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">textField</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"></data></localData></question>
Recuerda la fórmula de la energía cinética]]>
Ten cuidado con las unidades. Para obtener Julios (unidad de energía del sistema internacional) todas la unidades deben estar en el sistema internacional (masa en Kg y velocidad en m/s)]]>
Calcula la energía cinética de
Calcula la energía cinética (en Julios) de un cuerpo de masa #m Kg que se mueve a una velocidad de #v m/s]]>
1.0000000
0.3333333
0
0
Energía cinética = #ec]]>
<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>m</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>10</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>v</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>5</mn><mo>,</mo><mn>12</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>ec</mi><mo>=</mo><mn>0</mn><mo>.</mo><mn>5</mn><mo>*</mo><mi>m</mi><mo>*</mo><mi>v</mi><mo>*</mo><mi>v</mi></math></input></command></group></library><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">E</mi><mi>n</mi><mi mathvariant="normal">e</mi><mi>r</mi><mi mathvariant="normal">g</mi><mi>í</mi><mi>a</mi><mo> </mo><mi>c</mi><mi mathvariant="normal">i</mi><mi>n</mi><mi>é</mi><mi>t</mi><mi mathvariant="normal">i</mi><mi>c</mi><mi>a</mi><mo> </mo><mo>=</mo><mo> </mo><mo>#</mo><mi mathvariant="normal">e</mi><mi>c</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, °, ', ", sr, E, K, mol, cd, rad, 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="unitprefixes">M, k, c, m</param><param name="groupoperators">(,[,{</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(--log(0.02))</option><option name="relative_tolerance">true</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">textField</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/><data name="inputCompound">true</data></localData></question>
Recuerda la fórmula que sirve para calcular la energía cinética]]>
Calcula la energía cinética de (copia)
Calcula la energía cinética (en Julios) de un cuerpo de masa #m Kg que se mueve a una velocidad de #v m/s]]>
1.0000000
0.3333333
0
0
Energía cinética = #ec]]>
<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>m</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>10</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>v</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>5</mn><mo>,</mo><mn>12</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>ec</mi><mo>=</mo><mn>0</mn><mo>.</mo><mn>5</mn><mo>*</mo><mi>m</mi><mo>*</mo><mi>v</mi><mo>*</mo><mi>v</mi></math></input></command></group></library><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">E</mi><mi>n</mi><mi mathvariant="normal">e</mi><mi>r</mi><mi mathvariant="normal">g</mi><mi>í</mi><mi>a</mi><mo> </mo><mi>c</mi><mi mathvariant="normal">i</mi><mi>n</mi><mi>é</mi><mi>t</mi><mi mathvariant="normal">i</mi><mi>c</mi><mi>a</mi><mo> </mo><mo>=</mo><mo> </mo><mo>#</mo><mi mathvariant="normal">e</mi><mi>c</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, °, ', ", sr, E, K, mol, cd, rad, 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="unitprefixes">M, k, c, m</param><param name="groupoperators">(,[,{</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(--log(0.02))</option><option name="relative_tolerance">true</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">textField</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/><data name="inputCompound">true</data></localData></question>
Recuerda la fórmula de la energía cinética]]>
Calcula la energía cinética de (g)
Calcula la energía cinética (en Julios) de un cuerpo de masa #m g que se mueve a una velocidad de #v m/s]]>
1.0000000
0.3333333
0
0
#ec]]>
<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>m</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>10</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>v</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>5</mn><mo>,</mo><mn>12</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>ec</mi><mo>=</mo><mn>0</mn><mo>.</mo><mn>5</mn><mo>*</mo><mi>m</mi><mo>*</mo><mi>v</mi><mo>*</mo><mi>v</mi><mo>/</mo><mn>1000</mn></math></input></command></group></library><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">e</mi><mi>c</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, °, ', ", sr, E, K, mol, cd, rad, 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="unitprefixes">M, k, c, m</param><param name="groupoperators">(,[,{</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(--log(0.02))</option><option name="relative_tolerance">true</option><option name="precision">3</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">textField</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question>
Recuerda la fórmula de la energía cinética]]>
Ten cuidado con las unidades. Para obtener Julios (unidad de energía del sistema internacional) todas la unidades deben estar en el sistema internacional (masa en Kg y velocidad en m/s)]]>
Calcula la energía cinética de (g) (copia)
Calcula la energía cinética (en Julios) de un cuerpo de masa #m g que se mueve a una velocidad de #v m/s]]>
1.0000000
0.3333333
0
0
#ec]]>
<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>m</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>10</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>v</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>5</mn><mo>,</mo><mn>12</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>ec</mi><mo>=</mo><mn>0</mn><mo>.</mo><mn>5</mn><mo>*</mo><mi>m</mi><mo>*</mo><mi>v</mi><mo>*</mo><mi>v</mi><mo>/</mo><mn>1000</mn></math></input></command></group></library><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">e</mi><mi>c</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, °, ', ", sr, E, K, mol, cd, rad, 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="unitprefixes">M, k, c, m</param><param name="groupoperators">(,[,{</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(--log(0.02))</option><option name="relative_tolerance">true</option><option name="precision">3</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">textField</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question>
Recuerda la fórmula de la energía cinética]]>
Ten cuidado con las unidades. Para obtener Julios (unidad de energía del sistema internacional) todas la unidades deben estar en el sistema internacional (masa en Kg y velocidad en m/s)]]>
Calcula la energía potencial de
Calcula la energía potencial (en Julios) de un cuerpo de masa #m Kg que está a #h metros de altura ]]>
1.0000000
0.3333333
0
0
#ep]]>
<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>m</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>18</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>h</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>5</mn><mo>,</mo><mn>9</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>ep</mi><mo>=</mo><mi>m</mi><mo>*</mo><mn>9</mn><mo>.</mo><mn>8</mn><mo>*</mo><mi>h</mi></math></input></command></group></library><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">e</mi><mi>p</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, °, ', ", sr, E, K, mol, cd, rad, 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="unitprefixes">M, k, c, m</param><param name="groupoperators">(,[,{</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(--log(0.02))</option><option name="relative_tolerance">true</option><option name="precision">3</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">textField</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question>
Recuerda la fórmula de la energía potencial]]>
Ten cuidado con las unidades. Para obtener Julios (unidad de energía del sistema internacional) todas la unidades deben estar en el sistema internacional (masa en Kg y velocidad en m/s)]]>
Calcula la energía potencial de (g)
Calcula la energía potencial (en Julios) de un cuerpo de masa #m g que está a #h metros de altura ]]>
1.0000000
0.3333333
0
0
#ep]]>
<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>m</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>18</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>h</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>5</mn><mo>,</mo><mn>9</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>ep</mi><mo>=</mo><mi>m</mi><mo>*</mo><mn>9</mn><mo>.</mo><mn>8</mn><mo>*</mo><mi>h</mi><mo>/</mo><mn>1000</mn></math></input></command></group></library><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">e</mi><mi>p</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, °, ', ", sr, E, K, mol, cd, rad, 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="unitprefixes">M, k, c, m</param><param name="groupoperators">(,[,{</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(--log(0.02))</option><option name="relative_tolerance">true</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">textField</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question>
Recuerda la fórmula de la energía potencial]]>
Ten cuidado con las unidades. Para obtener Julios (unidad de energía del sistema internacional) todas la unidades deben estar en el sistema internacional (masa en Kg y altura en m)]]>
Ec, Ep y altura máxima
Un cuerpo de #m kg está a una altura de #h metros subiendo con una velocidad de #v m/s. Calcula
- Energía cinética (J)
- Energía potencial (J)
- Energía mecánica total (J)
- Altura máxima que alcanza (m)
]]>
1.0000000
0.3333333
0
0
Energía cinética = #ecEnergía potencial = #epEnergía total = #etAltura máxima = #hm]]>
<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>m</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>6</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>h</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>1</mn><mo>,</mo><mn>8</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>v</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>5</mn><mo>,</mo><mn>30</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>ec</mi><mo>=</mo><mn>0</mn><mo>.</mo><mn>5</mn><mo>*</mo><mi>m</mi><mo>*</mo><mi>v</mi><mo>*</mo><mi>v</mi></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>ep</mi><mo>=</mo><mi>m</mi><mo>*</mo><mn>9</mn><mo>.</mo><mn>8</mn><mo>*</mo><mi>h</mi></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>et</mi><mo>=</mo><mi>ec</mi><mo>+</mo><mi>ep</mi></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>hm</mi><mo>=</mo><mi>et</mi><mo>/</mo><mo>(</mo><mi>m</mi><mo>*</mo><mn>9</mn><mo>.</mo><mn>8</mn><mo>)</mo></math></input></command></group></library><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">E</mi><mi>n</mi><mi mathvariant="normal">e</mi><mi>r</mi><mi mathvariant="normal">g</mi><mi>í</mi><mi>a</mi><mo> </mo><mi>c</mi><mi mathvariant="normal">i</mi><mi>n</mi><mi>é</mi><mi>t</mi><mi mathvariant="normal">i</mi><mi>c</mi><mi>a</mi><mo> </mo><mo>=</mo><mo> </mo><mo>#</mo><mi mathvariant="normal">e</mi><mi>c</mi><mspace linebreak="newline"/><mi mathvariant="normal">E</mi><mi>n</mi><mi mathvariant="normal">e</mi><mi>r</mi><mi mathvariant="normal">g</mi><mi>í</mi><mi>a</mi><mo> </mo><mi>p</mi><mi>o</mi><mi>t</mi><mi mathvariant="normal">e</mi><mi>n</mi><mi>c</mi><mi mathvariant="normal">i</mi><mi>a</mi><mi>l</mi><mo> </mo><mo>=</mo><mo> </mo><mo>#</mo><mi mathvariant="normal">e</mi><mi>p</mi><mspace linebreak="newline"/><mi mathvariant="normal">E</mi><mi>n</mi><mi mathvariant="normal">e</mi><mi>r</mi><mi mathvariant="normal">g</mi><mi>í</mi><mi>a</mi><mo> </mo><mi>t</mi><mi>o</mi><mi>t</mi><mi>a</mi><mi>l</mi><mo> </mo><mo>=</mo><mo> </mo><mo>#</mo><mi mathvariant="normal">e</mi><mi>t</mi><mspace linebreak="newline"/><mi>A</mi><mi>l</mi><mi>t</mi><mi>u</mi><mi>r</mi><mi>a</mi><mo> </mo><mi mathvariant="normal">m</mi><mi>á</mi><mi>x</mi><mi mathvariant="normal">i</mi><mi mathvariant="normal">m</mi><mi>a</mi><mo> </mo><mo>=</mo><mo> </mo><mo>#</mo><mi>h</mi><mi mathvariant="normal">m</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units">m, s, g, °, ', "</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^(--log(0.02))</option><option name="relative_tolerance">true</option><option name="precision">3</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option><option name="answer_parameter">true</option></options><localData><data name="inputCompound">true</data><data name="gradeCompound">distribute</data><data name="inputField">textField</data><data name="gradeCompoundDistribution"></data><data name="casSession"></data></localData></question>
Recuerda las fórmulas de le energía cinética y potencial]]>
Recuerda que la energía total es la suma de la energía cinética y potencial]]>
Cuando un cuerpo está en su punto más alto tiene velocidad cero y toda su energía está en forma de e energía potencial]]>
Ec, Ep y altura máxima
Un cuerpo de #m kg está a una altura de #h metros subiendo con una velocidad de #v m/s. Calcula
- Energía cinética (J)
- Energía potencial (J)
- Energía mecánica total (J)
- Altura máxima que alcanza (m)
]]>
1.0000000
0.3333333
0
0
Energía cinética = #ecEnergía potencial = #epEnergía total = #etAltura máxima = #hm]]>
<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>m</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>6</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>h</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>1</mn><mo>,</mo><mn>8</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>v</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>5</mn><mo>,</mo><mn>30</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>ec</mi><mo>=</mo><mn>0</mn><mo>.</mo><mn>5</mn><mo>*</mo><mi>m</mi><mo>*</mo><mi>v</mi><mo>*</mo><mi>v</mi></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>ep</mi><mo>=</mo><mi>m</mi><mo>*</mo><mn>9</mn><mo>.</mo><mn>8</mn><mo>*</mo><mi>h</mi></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>et</mi><mo>=</mo><mi>ec</mi><mo>+</mo><mi>ep</mi></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>hm</mi><mo>=</mo><mi>et</mi><mo>/</mo><mo>(</mo><mi>m</mi><mo>*</mo><mn>9</mn><mo>.</mo><mn>8</mn><mo>)</mo></math></input></command></group></library><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">E</mi><mi>n</mi><mi mathvariant="normal">e</mi><mi>r</mi><mi mathvariant="normal">g</mi><mi>í</mi><mi>a</mi><mo> </mo><mi>c</mi><mi mathvariant="normal">i</mi><mi>n</mi><mi>é</mi><mi>t</mi><mi mathvariant="normal">i</mi><mi>c</mi><mi>a</mi><mo> </mo><mo>=</mo><mo> </mo><mo>#</mo><mi mathvariant="normal">e</mi><mi>c</mi><mspace linebreak="newline"/><mi mathvariant="normal">E</mi><mi>n</mi><mi mathvariant="normal">e</mi><mi>r</mi><mi mathvariant="normal">g</mi><mi>í</mi><mi>a</mi><mo> </mo><mi>p</mi><mi>o</mi><mi>t</mi><mi mathvariant="normal">e</mi><mi>n</mi><mi>c</mi><mi mathvariant="normal">i</mi><mi>a</mi><mi>l</mi><mo> </mo><mo>=</mo><mo> </mo><mo>#</mo><mi mathvariant="normal">e</mi><mi>p</mi><mspace linebreak="newline"/><mi mathvariant="normal">E</mi><mi>n</mi><mi mathvariant="normal">e</mi><mi>r</mi><mi mathvariant="normal">g</mi><mi>í</mi><mi>a</mi><mo> </mo><mi>t</mi><mi>o</mi><mi>t</mi><mi>a</mi><mi>l</mi><mo> </mo><mo>=</mo><mo> </mo><mo>#</mo><mi mathvariant="normal">e</mi><mi>t</mi><mspace linebreak="newline"/><mi>A</mi><mi>l</mi><mi>t</mi><mi>u</mi><mi>r</mi><mi>a</mi><mo> </mo><mi mathvariant="normal">m</mi><mi>á</mi><mi>x</mi><mi mathvariant="normal">i</mi><mi mathvariant="normal">m</mi><mi>a</mi><mo> </mo><mo>=</mo><mo> </mo><mo>#</mo><mi>h</mi><mi mathvariant="normal">m</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units">m, s, g, °, ', "</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^(--log(0.02))</option><option name="relative_tolerance">true</option><option name="precision">3</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option><option name="answer_parameter">true</option></options><localData><data name="inputCompound">true</data><data name="gradeCompound">distribute</data><data name="inputField">textField</data><data name="gradeCompoundDistribution"></data><data name="casSession"></data></localData></question>
Recuerda las fórmulas de le energía cinética y potencial]]>
Recuerda que la energía total es la suma de la energía cinética y potencial]]>
Cuando un cuerpo está en su punto más alto tiene velocidad cero y toda su energía está en forma de e energía potencial]]>
Energía cinética y potencial (2)
Un cuerpo de #m kg de masa, cuando está a una altura de #h m, sube a #v m/s. Calcula su energía cinética y su energía potencial en Julios]]>
1.0000000
0.3333333
0
0
Energía cinética =#ecEnergía potencial =#ep]]>
<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>m</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>30</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>v</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>5</mn><mo>,</mo><mn>18</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>h</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>45</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>ec</mi><mo>=</mo><mn>0</mn><mo>.</mo><mn>5</mn><mo>*</mo><mi>m</mi><mo>*</mo><mi>v</mi><mo>*</mo><mi>v</mi></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>ep</mi><mo>=</mo><mi>m</mi><mo>*</mo><mn>9</mn><mo>.</mo><mn>8</mn><mo>*</mo><mi>h</mi></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mi mathvariant="normal">E</mi><mi>n</mi><mi mathvariant="normal">e</mi><mi>r</mi><mi mathvariant="normal">g</mi><mi>í</mi><mi>a</mi><mo> </mo><mi>c</mi><mi mathvariant="normal">i</mi><mi>n</mi><mi>é</mi><mi>t</mi><mi mathvariant="normal">i</mi><mi>c</mi><mi>a</mi><mo> </mo><mo>=</mo><mo>#</mo><mi mathvariant="normal">e</mi><mi>c</mi><mspace linebreak="newline"/><mi mathvariant="normal">E</mi><mi>n</mi><mi mathvariant="normal">e</mi><mi>r</mi><mi mathvariant="normal">g</mi><mi>í</mi><mi>a</mi><mo> </mo><mi>p</mi><mi>o</mi><mi>t</mi><mi mathvariant="normal">e</mi><mi>n</mi><mi>c</mi><mi mathvariant="normal">i</mi><mi>a</mi><mi>l</mi><mo> </mo><mo>=</mo><mo>#</mo><mi mathvariant="normal">e</mi><mi>p</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units">m, s, g, °, ', "</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^(--log(0.03))</option><option name="relative_tolerance">true</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">textField</data><data name="inputCompound">true</data><data name="gradeCompound">distribute</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question>
Recuerda las fórmulas de energía cinética y potencial]]>
Energía cinética y potencial (3)
Un cuerpo de #m g de masa, sube a #v m/s cuando está a una altura de #h m. Calcula su energía cinética y su energía potencial en Julios]]>
1.0000000
0.3333333
0
0
Energía cinética =#ecEnergía potencial =#ep]]>
<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>m</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>30</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>v</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>5</mn><mo>,</mo><mn>18</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>h</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>2</mn><mo>,</mo><mn>45</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>ec</mi><mo>=</mo><mn>0</mn><mo>.</mo><mn>5</mn><mo>*</mo><mi>m</mi><mo>*</mo><mi>v</mi><mo>*</mo><mi>v</mi><mo>/</mo><mn>1000</mn></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>ep</mi><mo>=</mo><mi>m</mi><mo>*</mo><mn>9</mn><mo>.</mo><mn>8</mn><mo>*</mo><mi>h</mi><mo>/</mo><mn>1000</mn></math></input></command></group></library></session>]]></wirisCasSession><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mi mathvariant="normal">E</mi><mi>n</mi><mi mathvariant="normal">e</mi><mi>r</mi><mi mathvariant="normal">g</mi><mi>í</mi><mi>a</mi><mo> </mo><mi>c</mi><mi mathvariant="normal">i</mi><mi>n</mi><mi>é</mi><mi>t</mi><mi mathvariant="normal">i</mi><mi>c</mi><mi>a</mi><mo> </mo><mo>=</mo><mo>#</mo><mi mathvariant="normal">e</mi><mi>c</mi><mspace linebreak="newline"/><mi mathvariant="normal">E</mi><mi>n</mi><mi mathvariant="normal">e</mi><mi>r</mi><mi mathvariant="normal">g</mi><mi>í</mi><mi>a</mi><mo> </mo><mi>p</mi><mi>o</mi><mi>t</mi><mi mathvariant="normal">e</mi><mi>n</mi><mi>c</mi><mi mathvariant="normal">i</mi><mi>a</mi><mi>l</mi><mo> </mo><mo>=</mo><mo>#</mo><mi mathvariant="normal">e</mi><mi>p</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units">m, s, g, °, ', "</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">0.03</option><option name="relative_tolerance">true</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option><option name="answer_parameter">true</option></options><localData><data name="inputField">textField</data><data name="inputCompound">true</data><data name="gradeCompound">distribute</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question>
Recuerda las fórmulas de energía cinética y potencial]]>
Recuerda que, para obtener la unidad internacional de energía (J), las demás magnitudes deben estar también en el sistema internacional: masa en Kg, distancia en m, y velocidad en m/s]]>
2º ESO/ENERGY/ENERGY UNITS CONVERSION
Convierte de calorías a julios
Convierte #c calorías a julios]]>
1.0000000
0.3333333
0
0
#j]]>
#ja]]>
<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>c</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>8</mn><mo>,</mo><mn>300</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>j</mi><mo>=</mo><mi>c</mi><mo>*</mo><mn>4</mn><mo>.</mo><mn>19</mn></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>ja</mi><mo>=</mo><mi>c</mi><mo>/</mo><mn>0</mn><mo>.</mo><mn>24</mn></math></input></command></group></library><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">j</mi></math>]]></correctAnswer><correctAnswer id="1" type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi mathvariant="normal">j</mi><mi>a</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="equivalent_symbolic" correctAnswer="1"/><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, °, ', ", sr, E, K, mol, cd, rad, 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="unitprefixes">M, k, c, m</param><param name="groupoperators">(,[,{</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(--log(0.03))</option><option name="relative_tolerance">true</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">textField</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question>
Reuerda que 1 cal = 4.19 J]]>
Convierte de calorías a julios
Convierte #c calorías a julios]]>
1.0000000
0.3333333
0
0
#j]]>
#ja]]>
<question><wirisCasSession><![CDATA[<session lang="es" version="2.0"><library closed="false"><mtext style="color:#ffc800">librería</mtext><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>c</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>8</mn><mo>,</mo><mn>300</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>j</mi><mo>=</mo><mi>c</mi><mo>*</mo><mn>4</mn><mo>.</mo><mn>19</mn></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>ja</mi><mo>=</mo><mi>c</mi><mo>/</mo><mn>0</mn><mo>.</mo><mn>24</mn></math></input></command></group></library><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">j</mi></math>]]></correctAnswer><correctAnswer id="1" type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi mathvariant="normal">j</mi><mi>a</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="equivalent_function" correctAnswer="1"><param name="name">fc</param><param name="notevaluate">false</param></assertion><assertion name="syntax_quantity"><param name="units">m, s, g, °, ', "</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^(--log(0.03))</option><option name="relative_tolerance">true</option><option name="precision">3</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option><option name="answer_parameter">true</option></options><localData><data name="inputField">textField</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question>
Recuerda que 1 cal = 4.19 J]]>
Convierte de julios a calorias
Convierte #j julios a calorías]]>
1.0000000
0.3333333
0
0
#c
#ca
<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>j</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>8</mn><mo>,</mo><mn>300</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>c</mi><mo>=</mo><mi>j</mi><mo>*</mo><mn>0</mn><mo>.</mo><mn>24</mn></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>ca</mi><mo>=</mo><mi>j</mi><mo>/</mo><mn>4</mn><mo>.</mo><mn>19</mn></math></input></command></group></library><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group></session>]]></wirisCasSession><correctAnswers><correctAnswer>#c</correctAnswer><correctAnswer id="1">#ca</correctAnswer></correctAnswers><assertions><assertion name="equivalent_symbolic" correctAnswer="1"/><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, °, ', ", sr, E, K, mol, cd, rad, 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="unitprefixes">M, k, c, m</param><param name="groupoperators">(,[,{</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(--log(0.03))</option><option name="relative_tolerance">true</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">textField</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question>
Recuerda qu 1 J = 0.24 cal]]>
Convierte de julios a calorias
Convierte #j julios a calorías]]>
1.0000000
0.3333333
0
0
#c
#ca
<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>j</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>8</mn><mo>,</mo><mn>300</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>c</mi><mo>=</mo><mi>j</mi><mo>*</mo><mn>0</mn><mo>.</mo><mn>24</mn></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>ca</mi><mo>=</mo><mi>j</mi><mo>/</mo><mn>4</mn><mo>.</mo><mn>19</mn></math></input></command></group></library><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group></session>]]></wirisCasSession><correctAnswers><correctAnswer>#c</correctAnswer><correctAnswer id="1">#ca</correctAnswer></correctAnswers><assertions><assertion name="equivalent_symbolic"/><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, °, ', ", sr, E, K, mol, cd, rad, 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="unitprefixes">M, k, c, m</param><param name="groupoperators">(,[,{</param></assertion><assertion name="equivalent_symbolic" correctAnswer="1"/></assertions><options><option name="tolerance">10^(--log(0.03))</option><option name="relative_tolerance">true</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">textField</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question>
Recuerda que 1 J = 0.24 cal]]>
Convierte de Kcal a J
Convierte #c Kcal a J]]>
1.0000000
0.3333333
0
0
#j]]>
#ja]]>
<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>c</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>8</mn><mo>,</mo><mn>300</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>j</mi><mo>=</mo><mi>c</mi><mo>*</mo><mn>4</mn><mo>.</mo><mn>19</mn><mo>*</mo><mn>1000</mn></math></input></command></group></library><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">j</mi></math>]]></correctAnswer><correctAnswer id="1" type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi mathvariant="normal">j</mi><mi>a</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="equivalent_symbolic" correctAnswer="1"/><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, °, ', ", sr, E, K, mol, cd, rad, 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="unitprefixes">M, k, c, m</param><param name="groupoperators">(,[,{</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(--log(0.03))</option><option name="relative_tolerance">true</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">textField</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question>
Convierte de Kcal a J
Convierte #c Kcal a J]]>
1.0000000
0.3333333
0
0
#j]]>
#ja]]>
<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>c</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>8</mn><mo>,</mo><mn>300</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>j</mi><mo>=</mo><mi>c</mi><mo>*</mo><mn>4</mn><mo>.</mo><mn>19</mn><mo>*</mo><mn>1000</mn></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>ja</mi><mo>=</mo><mi>c</mi><mo>*</mo><mn>1000</mn><mo>/</mo><mn>0</mn><mo>.</mo><mn>24</mn></math></input></command></group></library><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">j</mi></math>]]></correctAnswer><correctAnswer id="1" type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi mathvariant="normal">j</mi><mi>a</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="equivalent_symbolic" correctAnswer="1"/><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, °, ', ", sr, E, K, mol, cd, rad, 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="unitprefixes">M, k, c, m</param><param name="groupoperators">(,[,{</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(--log(0.03))</option><option name="relative_tolerance">true</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">textField</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question>
Convierte de Kcal a J (copia)
Convierte #c Kcal a J]]>
1.0000000
0.3333333
0
0
#j]]>
#ja]]>
<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>c</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>8</mn><mo>,</mo><mn>300</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>j</mi><mo>=</mo><mi>c</mi><mo>*</mo><mn>4</mn><mo>.</mo><mn>19</mn><mo>*</mo><mn>1000</mn></math></input></command></group></library><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">j</mi></math>]]></correctAnswer><correctAnswer id="1" type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mo>#</mo><mi mathvariant="normal">j</mi><mi>a</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="equivalent_symbolic" correctAnswer="1"/><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, °, ', ", sr, E, K, mol, cd, rad, 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="unitprefixes">M, k, c, m</param><param name="groupoperators">(,[,{</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(--log(0.03))</option><option name="relative_tolerance">true</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">textField</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question>
Tienes que convertir primero las Kcal a cal]]>
Recuerda que 1 cal = 4.19 J]]>
Convierte de Kwh a J
Convierte #c Kwh a J]]>
1.0000000
0.3333333
0
0
#j]]>
<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>c</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>8</mn><mo>,</mo><mn>300</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>j</mi><mo>=</mo><mi>c</mi><mo>*</mo><mn>36</mn><mo>*</mo><msup><mn>10</mn><mn>5</mn></msup></math></input></command></group></library><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">j</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, °, ', ", sr, E, K, mol, cd, rad, 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="unitprefixes">M, k, c, m</param><param name="groupoperators">(,[,{</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(--log(0.02))</option><option name="relative_tolerance">true</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">textField</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question>
Convierte de Kwh a J
Convierte #c Kwh a J]]>
1.0000000
0.3333333
0
0
#j]]>
<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>c</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>8</mn><mo>,</mo><mn>300</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>j</mi><mo>=</mo><mi>c</mi><mo>*</mo><mn>36</mn><mo>*</mo><msup><mn>10</mn><mn>5</mn></msup></math></input></command></group></library><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">j</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, °, ', ", sr, E, K, mol, cd, rad, 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="unitprefixes">M, k, c, m</param><param name="groupoperators">(,[,{</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(--log(0.03))</option><option name="relative_tolerance">true</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">textField</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question>
Convierte de Kwh a J (copia)
Convierte #c Kwh a J]]>
1.0000000
0.3333333
0
0
#j]]>
<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>c</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>8</mn><mo>,</mo><mn>300</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>j</mi><mo>=</mo><mi>c</mi><mo>*</mo><mn>36</mn><mo>*</mo><msup><mn>10</mn><mn>5</mn></msup></math></input></command></group></library><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">j</mi></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_quantity"><param name="units"><![CDATA[m, s, g, °, ', ", sr, E, K, mol, cd, rad, 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="unitprefixes">M, k, c, m</param><param name="groupoperators">(,[,{</param></assertion><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(--log(0.03))</option><option name="relative_tolerance">true</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">textField</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question>
Recuerda que 1 Kw h = 36·105 J]]>
2º ESO/ENERGY/SOURCES OF ENERGY
Cambios de energía
]]>
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
1.0000000
0.1000000
0
true
true
abc
Turn generator
Hot volcanic rocks
Rotating turbine
Making stream flow fast
energía solar
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1.0000000
0.1000000
0
true
true
abc
water stored behind a dam
electrical energy directly from the sun
air flow driven by the sun
mainly due to the movement of the moon
energy resources
]]>
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
1.0000000
0.1000000
0
true
true
abc
non-renewable energy resources will always supply most of our energy needs
the Sun is the original source for all our energy resources
non-renewable fossil fuels are still being formed slowly
renewable energy resources are not readily replaced as they are used
One advantage of wind energy is that....
One advantage of wind energy is that....
1.0000000
0.1000000
0
true
true
abc
You need many wind turbines to generate power
You may need to evacuate many birds and animals
It doesn't produce waste products
Wind turbines look ugly in the landscape
Renewable and non renewable
Choose the correct answer or answers]]>
1.0000000
0.1000000
0
false
true
abc
Wind and solar power are renewable sources of energy
Oil and coal are non-renewabla sources of energy
Fossil fuels are renewable sources of energy
Nuclear power is a renewable source of energy
renewable and non-renewable
Choose the correct type for the next sources of energy
1.0000000
0.1000000
0
true
Nuclear
Non-renewable
Coal
Non-renewable
Oil
Non-renewable
Biomass
Renewable
Solar
Renewable
Wind
Renewable
Geothermal
Renewable
Tidal
Renewable
Natural gas
Non-renewable
Renewable
The fuel used in the nuclear reactor is ______.
The fuel used in the nuclear reactor is ______.]]>
1.0000000
0.1000000
0
true
true
abc
Cadmium
Radium
Uranium
Thorium
Two disadvantadges of nuclear fuysion are....
Two disadvantadges of nuclear fission are....]]>
1.0000000
0.1000000
0
false
true
abc
The temperature required to start the fusion
It's really smelly
The radioactive waste of products
The lack of deuterium on Earth
What is coal made from?
What is coal made from?]]>
1.0000000
0.1000000
0
true
true
abc
Dead plants
Dinosaur fossils
Some chemicals mixed together by sicentists
plancton
Which are fossil fuel sources of energy?
Which are fossil fuel sources of energy?]]>
1.0000000
0.1000000
0
false
true
abc
Natural gas
Wood
Oil
Geothermal
Sunlight
Coal
Which description matches biomass?
Which description matches better with biomass?]]>
1.0000000
0.1000000
0
true
true
abc
hot rocks making steam
air flow driven by sun
sun's energy stored in plants
black surface absorbing heat radiation
Which description matches wave power?
Which description is the origin of wave power?]]>
1.0000000
0.1000000
0
true
true
abc
air flow driven by sun
the suns warms ground/water, ground/water warms air, warm air rises (convection current) causing wind, kinetic energy of wind transferred to waves]]>
black surface absorbing heat radiation
hot rocks making steam
sun's energy stored in plants
Which energy resource involves splitting big atoms in smaller atoms?
Which energy resource involves splitting big atoms in smaller atoms?]]>
1.0000000
0.1000000
0
true
true
abc
Deep sea fishing
Nuclear fusion
Science fiction
Nuclear fission
Which fuel doesn't come from dead living things?
Which fuel doesn't come from dead living things?
1.0000000
0.1000000
0
true
true
abc
Oil
Natural gas
Nuclear
Which of these is a desirable property of a fuel for burning?
Which of these is a desirable property of a fuel for burning?]]>
1.0000000
0.1000000
0
true
true
abc
will not burn too steadily to be wasteful
difficult to ignite so not too flammable
gives little smoke
gives bright yellow flame to be easily seen
Which of these is not a renewable source of energy?
Which of these is not a renewable source of energy?]]>
1.0000000
0.1000000
0
true
true
abc
The Sun
Natural Gas
Wind
Ocean tidal energy
Which one is NOT a fossil fuel?
Which one is NOT a fossil fuel?]]>
1.0000000
0.1000000
0
true
true
abc
Oil
Wood
Coal
Which words might correspond to the missing info1.gif?
Which words might correspond to the missing information2?
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1.0000000
0.1000000
0
true
true
abc
medium pollution, carbon dioxide adds to global warming, non-renewable (90 years left?)
unreliable, no good for large scale power
toxic radioactive waste, accidents potentially very serious, very costly to build and dismantle, non-renewable
very costly to build, disruption or removal of wildlife habitat or farmland, limited suitable valley locations
Which words might correspond to the missing info1.gif?
Which words might correspond to the missing information 4?
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GO98k72yAVvA2q6rr3gvTNZ1xLOO41G1iulisw2yNXjUgEsckkkt0G3cF+bbvbifCnizVfDPw20aTU7azubePwe+qWsFuzI6LawwDY8hyGMglVuEXy8Ff3n3q9N03T7XSNKtNN0+LybSzhSCCPcW2IihVGSSTgAck5qjF4V0SG1srVdPje3sdPfTIIpS0iC2cRhomDEhgRFGDuyeOvJyAc3YeMNXfTNXa88sG0S3aDUbnRbzT4naV2QxrbybpJnTapCo37xpUjGw/Mc238Ua7rmseH44b2O3Fr4jewvC2mXFr9sX+znuB+4kkDxgBiu19+WVJBwNh7KDwfo0FhdWhguJ1u9nmzXV7NPP8h3R7ZpHMi7GJZNrDYxLLhiTUVt4G8P2axC0spITFqA1MOl1KHa5EXlGVm3ZcsmQ24kPliwYsSQCXxJql9YvpVlpTW8V3qt6bSO4uYmljg2wSzFjGrKXyISuNy4LA84wcTTfFeuaprGi6fBFp6ed/aS38zq//LldxW5aJAePM3NhWY7N4O59hV+o1XR7LWrVbe/SQhHEkckMzwyxNgjckiEOhwWUlSMqzA8Egx2Xh7S9PmtJrS12S2cM0ELmRmbbK6PKWJJ3s7xqzO2WJyScscgGlRRRQAUUUUAFcf4V/wCR013/AK94/wD0tv67CvIfEkH2qPXbf7Lb3nm3ekp9mujiKbOuXA2OdrYU9D8rcE8HpQB69RXG+HfDU+lXV1NZ+D/Cfhy4e1eOK90xjM+4kEK6CCElMjJAcZ2ge4j03xrfat4V1DWgmn6ekX2eGGOSRrnbK6Rs7fu+ZfmmCxxqoM2xWRys6MoB21Fed2njjXdQitbOwjs2vn11tJkubywuLRCv2FrrzRbufMQr8o2M3z7ThkDhkvaP4r1y4v8ATDqUWn/ZL3U7rRwturiRpbcXBa5yThVY2rgQ4YgMD5p5WgDtqK8k1PxXrmr/AAsvW16LT1/t3wZe6nElkrj7PsgiBDMxO/f9oDAALs2lcyffroLzxvqaeN7nTLGzknt7LULaxlt49JuZjKJUhdpvta/uoQiz7ijKSREfmG8bQDu6K5Kw8R6tJ4yfTtSFvaQvNLFFaTWM8bFVDFHjuyTDOzqofyVCsqs2STEwa7rmpar/AG/p2iaHNZ2txd2txdtdXls1wirC0KFBGskZyxnB3buNhGDuyADoKK878J3c/ivx7H4gv4rM258Oadf2Fs8BeWxa58/fslLYBIRlZlRd6+WDjZ81Hx1rzXHiqddPh1iabw1DHNDFY6bdTpdXjPFMYPMjQrE3kRiMuSfkvnHQMrAHqVFef22meGfG/j+81K+0vT9ZtJfD+mT2cl7ZrJhJJbxsqJFyuRtyMA8DPSo9CuZ9Nlstdnmkmt5dQuvD948rl3Ecd9NFYuzHLMVY+Uf4m+0b3Y7M0AeiUV5lq2sE+EdR8QxveJeeLnj07SZLGGWWaC0IfypkWIFmKxtcXeCFcb/LJBVSKL39nqHg7UPDSJqEEVh4g03yBNbXFjJ9juNRieLywyo0ap+8gXaeBbgjaCoAB63RXm1mI/EXjDS9G8VW9vqdzYaZqVjqMdzAjx3DpNp7pKUxsHmI0U20ZCFwucqaj8PxaB4F8B6z4l0/w9Zi+g1DUraFbKzCzXJ/tCWOC2DIhbDMIkAwQPl4wKAPTaK8g0zxBL4X8KeKtLsbzVJLy10KTVrG+1DS7i18yaO3Ec5VJ0wT5ypOxydzXbZBIZj0mp6ZoXhLV7C5sPDF5aySXVtFJrun/Z97tNMsWy4d5PNmDsy7yyv94ODvUMoB3dFeSaJ4U/tKLUrv/hAPB+r+ZrWp/wCm6lPtnlxfTD5h9kfpjA+Y8AdOg29X8O2934m1W/vfDGj+MoTMgZZnhe9sf3MYFvHHMuzbnE3Msf8ArmIUnG8A9AorN8OSWsvhXSpNPvrjULR7KFoLy6YtLcIUG2RyQCWYYJyAck8CtKgAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACuP+J//Il3X/Xvef8ApFcV2Fcf8T/+RLuv+ve8/wDSK4oA51/Dn9seN/F1x/whfhfXtupxJ9p1ibZKn+g2p2AfZpflGc/eHLHjueg1bXNR8NtpGlWdjpdsL61jt7aGOTEVjMJYojx8nmRBZvlAEeWiWPO+eNRpXfgnR7zU7rUGfVILi8dZJ/sesXdskjBFQMUjlVc7UUZx/CKs3HhfSLuMJd28lwVtUtUkmuJHkjRWDAq5Ysr7lRjICHLRxksSikAGBr3jO80jxVFbRvbzWn221sntodPuJWzO8abpLpf3MDL5obymDFlCncPNXbVh8V+Krma2MUWjrFqGtXuj2issu6PyHuSLlzn5sJbMPJAG44PmoG2r0t/4O0LU9VTUb6x824SaK5X986oJomUpNsDbfMGxV8zG4oNhJX5asxeHtLh+y+Va7fsl7NfwfvGOyebzfMfrznz5eDwN3AGBgA5a28U+I9WvtL03TBpdvcXCamt1dXEMjorWV1Hb+YkQcEhyzHYXG3cDvbZh8hfGkiSXviqC08uXUfD+gOkOx7jyDdXVygO1AGl2ebnauC+3A2k5HS3/AIB0+98Q6bcCHy7G0h1Bj5VzLFOlxdTwymSORCGTO2YHDDiTbjaSK1pPCuiSRzR/2fHGk1rBaFYS0YjjgZmhCBSPLKM7FWTDKcEH5VwAc3F4s8QzeGprhLGQSwagLVtQfQ7tQYfKEnnrYkidhvYQ4VjzmTO0FR1Ph7UJNU0K3u55beWVtyu9uropKsVOUcbo24+aNslG3ISxXJrf8Ifo39lfYPIuNnnfaPtH22b7V5u3b5n2jf5u7Z8md+dnyfd4rS0/T7XSrCOzsIvKhjyQCxZmJJZmZiSWZmJZmJJYkkkkk0AeZa34w8R3nw8vLtLmztX1jwtd63YvbQSJJYLGkLGMv5v7xytwAsqiPaybtjZ2j0jRtMg0bRrbT7W3s7ZIUwY7G2FvDuPLFIwTtBYk4yevU9azY/A3h+O1vbUWUj297ayWbxSXUrpFA4w8UILEQIQANse0fKnHyrjoKACiiigAooooA4/4d/8AHlqn/Xxbf+m+0rsK4/4d/wDHlqn/AF8W3/pvtK7CgArzSbXZPDl94i1GCPzJdtnbp+6eXYZtUvIg/lp80m3zN2xcFsbQQTkel1wFnbWsuua3Hq9ldzWV3CiJJDbTON8d9etlXjGUdSyMCCGU7SCDg0ARW+tX+tal4XbU7eRHtvEcsMdw+nzWIul/sy4fzFgmy6AF2TknJjJB5wK2kfE7U7nQLzXbnTZLizXQptZRBplzZpblFR1tzcSgpOXDnEkYUfui20hht6S0tfDtktr5NjqjPaXTXcc01teSytMYmiLvI4LSHy3KDeThQoGNq4jstM8LWP2gRaXqEkU8LWxgubO7nijhb70MccissUZwoMaBVIVRjCrgAo+K28Y2fhuMNq+lpcHVtNVLy2s5o9yvdxo0bRecTjJUk+Yd6s6bV4cmqeItVfUdYjntNLl0zTdd02whWaJpJJGmksm3kEhVMfnsVIzlthwvl/vLJ0bwu2mXNjLaa5Mly8TyzTDUJLgmJxJFidsyKEcblAYAEsQPmOb0qaBN9q82w1Bvtd7Dfz/6DdDfPD5Xlv8Ad4x5EXA4O3kHJyAGg6prmsXkt9u08aSL26s/svlOs8XkTSQ+Z5u4rJuaLOzYmA/3iU+flvBmpeI9Tkmn06bS4Em8H6XdafpotpI7a2nlWfaOJDhAyEHauSnlj/lnlukt7Xw7baydUhsdUFxveVUNteNDHI+d8iQkeWjtufLqoY73yTvbMdpbaJoe260HTdQW7ttMj062ikhvViaKLJijf5GHBYjzCrOAzdckEAs+EvFf/CXPdX1jF5WlpDa+SJl2z+bLAtw27BK7fLngAxzuEnUbSekrlvDFzFo2h/ZrxLxriW6ubuURadclEaeeSYopMYLBTJtDEDdjOFzga/8Ab1p/zx1D/wAFtx/8RQBpUVm/29af88dQ/wDBbcf/ABFH9vWn/PHUP/Bbcf8AxFAGlRWb/b1p/wA8dQ/8Ftx/8RR/b1p/zx1D/wAFtx/8RQBpUVm/29af88dQ/wDBbcf/ABFH9vWn/PHUP/Bbcf8AxFAGlRWb/b1p/wA8dQ/8Ftx/8RR/b1p/zx1D/wAFtx/8RQBpUVm/29af88dQ/wDBbcf/ABFH9vWn/PHUP/Bbcf8AxFAGlRWb/b1p/wA8dQ/8Ftx/8RR/b1p/zx1D/wAFtx/8RQBpUVm/29af88dQ/wDBbcf/ABFH9vWn/PHUP/Bbcf8AxFAGlRWb/b1p/wA8dQ/8Ftx/8RR/b1p/zx1D/wAFtx/8RQBpUVm/29af88dQ/wDBbcf/ABFH9vWn/PHUP/Bbcf8AxFAGlRWb/b1p/wA8dQ/8Ftx/8RR/b1p/zx1D/wAFtx/8RQBpVwOm6PZa94h8QafqaSPbvFbyfupnhdWTUL50ZXQhlIZVIII6V1n9vWn/ADx1D/wW3H/xFc5oU7af4o1S6u7O/SG6to/KcWMzbsXd6xBwpwdsiHBwcMKANqy8JadYfaPIudYb7RC0D+frd5NhW6ld8p2Nxw64YdiKkPhXRBa3NrHp8cFvcpEjxQFokXygBE6BSAjqFQB1ww8uPB+RMS/29af88dQ/8Ftx/wDEUf29af8APHUP/Bbcf/EUAVtP8HaFpTxvYWPlPHem/DGZ2ZrgwGBpWJYlmaMkMTncSWOWJarMXh7S4fsvlWu37JezX8H7xjsnm83zH6858+Xg8DdwBgYP7etP+eOof+C24/8AiKP7etP+eOof+C24/wDiKAOf8MfDnSNI8F2+j6jZxyzSaSunXojnkMRDRhZxECR5YkYbmKBC7YZssAa27jwvpFzrI1Sa3kNxvSVkFxIsMkiY2SPCG8t3XamHZSw2JgjYuJf7etP+eOof+C24/wDiKP7etP8AnjqH/gtuP/iKAIrfwvpFtrJ1SG3kFxveVUNxI0Mcj53yJCW8tHbc+XVQx3vkne2ZdX0DT9c8k3y3CSwbhHPaXcttKobG5fMiZW2napK5wSqkjKjB/b1p/wA8dQ/8Ftx/8RR/b1p/zx1D/wAFtx/8RQBJZ6Np2nXTXFhaR2ztaw2mIhtRYYi5jRUHyqF8x8YA647DEthp9rpls8FjF5UTzSzsu4tl5ZGkc8nu7scdBnAwKrf29af88dQ/8Ftx/wDEUf29af8APHUP/Bbcf/EUAZsvgDQHvJLqKPULSaXd5jWWrXVtv3TSTHcI5FB/eTysM9N5AwMCta50bTrrQJdEltI10ya1No1rEPLQQldhRduNo28DGMdqj/t60/546h/4Lbj/AOIo/t60/wCeOof+C24/+IoAsyafay6rBqTxZu7eGSCKTcflSRkZxjODkxJyRkbeOpzW1Pw9pesXlrdaja+dNaY8lvMZdmJophwCAf3lvE3P93HQkE/t60/546h/4Lbj/wCIo/t60/546h/4Lbj/AOIoAkbRtObX49bNpH/acdq1oLoDDmFmVyh9RuUEZ6c4xuOY4vD2lw/ZfKtdv2S9mv4P3jHZPN5vmP15z58vB4G7gDAwf29af88dQ/8ABbcf/EUf29af88dQ/wDBbcf/ABFAFm60+1vbmynuYt8tjMZ7dtxGxzG8ZPB5+SRxg5HOeoFZun+D9G0u/ju7OC4DQ5+zwy3s0sFtkFf3MLuY4sKSo2KuFJUYUkVZ/t60/wCeOof+C24/+Io/t60/546h/wCC24/+IoAzT4C0Tzp5IpNYt/PmkneO21y9hj3yOXchEmCrlmY4AAyTVnUPCOlalfyXkp1C3mlwZTYapc2iykAKGZYZFDNtCruIJwqjOFAFn+3rT/njqH/gtuP/AIij+3rT/njqH/gtuP8A4igC9bW0FnaxWtnDHBbwII4ookCpGoGAqgcAADAAqSs3+3rT/njqH/gtuP8A4ij+3rT/AJ46h/4Lbj/4igDSorN/t60/546h/wCC24/+Io/t60/546h/4Lbj/wCIoA0qKzf7etP+eOof+C24/wDiKP7etP8AnjqH/gtuP/iKANKis3+3rT/njqH/AILbj/4ij+3rT/njqH/gtuP/AIigDSorN/t60/546h/4Lbj/AOIo/t60/wCeOof+C24/+IoA0qKzf7etP+eOof8AgtuP/iKP7etP+eOof+C24/8AiKANKis3+3rT/njqH/gtuP8A4ij+3rT/AJ46h/4Lbj/4igDSorN/t60/546h/wCC24/+Io/t60/546h/4Lbj/wCIoA0qKzf7etP+eOof+C24/wDiKP7etP8AnjqH/gtuP/iKANKis3+3rT/njqH/AILbj/4ij+3rT/njqH/gtuP/AIigDSorN/t60/546h/4Lbj/AOIo/t60/wCeOof+C24/+IoA0qKzf7etP+eOof8AgtuP/iKP7etP+eOof+C24/8AiKANKis3+3rT/njqH/gtuP8A4ij+3rT/AJ46h/4Lbj/4igDSorN/t60/546h/wCC24/+Io/t60/546h/4Lbj/wCIoA0qKzf7etP+eOof+C24/wDiKP7etP8AnjqH/gtuP/iKANKis3+3rT/njqH/AILbj/4ij+3rT/njqH/gtuP/AIigDSorN/t60/546h/4Lbj/AOIo/t60/wCeOof+C24/+IoA0qKzf7etP+eOof8AgtuP/iKP7etP+eOof+C24/8AiKANKuP+J/8AyJd1/wBe95/6RXFb39vWn/PHUP8AwW3H/wARXOeOp21rwvdWumWd/NN9mu8J9hmXObSdQBuUZJZlAHUk0AQ6Z4U0DXPFvjC71XR7O5vI9WiSK8aEC4hAsLQjy5R86EEkgqQQeQQea5/TJLrxPpzXGoX1uLvUPDPh2edrphFFeO1xcM0D4GAsxzEQFIxIRtb7p6m70bwvfandX1zaa4z3rq91Co1Bbe4IRY/3kAxG4KIqkMpDAYINXr1NA1Ca7mu7DUHlvIYYJnFjdK22J3eIqQo2MjyMyuuGBwQcqMAGHpK6H4R1W4ub7QbfwnNbaZc3NxHpYRrK9gjaNnl/doru0QKAb0QjzpAgcEtWb4F15rfxVAuoQ6xDN4lhkmmivtNuoEtbxXlmEHmSIFlbyJDGHBHyWKDoVVegh0bwvC26S01y7cPE6SXw1C6eMxypKuxpdxQb442IUgNsXcDgVr399pWp2yQX1pqEsSTRTqv9n3K4eKRZEPCdnRTjocYORQBwnh7RNK0D4V+Dte0TTLPT9VmTRo5ry1t1jknWeW3jmWQgfvAyyNkNn5trD5lUjWj1C68P6VP4K06XydUjmjsdFk2htlrMrtFLggqfIjhuBtdt0n2TJIMq5vaNo3hfQZLZ9OtNcIs02Wsd0NQuY7cbdo8tJdyoQpKgqAQrMM4JB15L7SpdVg1J7TUDd28MkEUn9n3PypIyM4xswcmJOSMjbx1OQDz/AMU30FhqqaX4etNYMXg6ygFlbWOn3dyk9wGilFv5qIwjb7PEIi7FvkvnzwHVr17rKDxpdeMtJu5JNMt9C0u7uACypPYSSXpkcoehRSsw+UufKMYx5jZ7KwvtK0y2eCxtNQiieaWdl/s+5bLyyNI55Tu7scdBnAwKraYmgaPeXV1p1hqEM13nzm+w3Tb8zSzHgqQP3lxK3H97HQAAA4i+8OaHqfgkX2paNp95djxa1uLi4tUkkETa+waPcRnaQ7gjoQx9TV7xwumwyWPgvR4rzSLWC1mv3fRtInnS1Z1kjt/3cCYB85nnVsjD2oPBKsOktrPwzZ6HFo9npN5Bp0F0LuK2i0+5VI5BP9oBUBOAJRuCj5e2McVetb7SrK5vZ7a01BJb6YT3Df2fcne4jSMHlOPkjQYGBxnqTQBzVrq1r4/vPDUWp2OdOvtMvbq90m7jJVLqCa3iMcquo3+W8ky4YbSwDYyqEYmuCzfw5qeg2Phi40tUvdGl/sPUTbrZMJtQVBsELShFcxMHXGONwQszluyu7Xw7erdedY6or3d0t3JNDbXkUqzCJYg6SIA0Z8tAh2EZUsDnc2Y303w0+hS6Q9nrDW00yXEshivjO8qMrJIZ8eaWUxpglsgIoHAAoAzIPC39n6VrTf8ACPeF/BXnaZPD/bWj3OZbbK/fJ8iHCrjfneMFB9QaRo2m6J4m0oXPhLT/AAxfSzOtvdaE0bQXh8mQm2lYRxyH5VeXaU2ZijO8tha07LT/AA9ZfaB5XiC8iuYWgmg1FtRvInRvvAxzFl5xjOM4JHQmjT9P8Pabfx3kUXiC4miyYjftqN2sRIKllWYsFbaWXcADhmGcMQQBnw7/AOPLVP8Ar4tv/TfaV2Fcj8P43ht9XimRo5EurZWRhgqRp9pkEdjXXUAFeXXP/CPW2uazqXijRotUht1toY1axW6kQzaleRDYhBJ+ZlyFBJA4BOBXqNeX3dtPdatqkdrDJM632kyFY0LEKmt3DM2B2CqST2AJ7UAdBHofgObVdPsbbwzotx/aNlLfW9xDYQPE8UbRAkMBznz0IxkEZ56ZrWGn+A9Vm1WDTPCGm3Vxpm7dCumQK0+Hkj+QsAv+tgmj+YrzGT90qzZdzZa/4Z8VpFpGlyXVrbaffQ6PMIzJBCbm4shHDKFIKJE/mHCgBbdF27ij4s6X4Y8R+ENR0W9fUbPVrWBF02+js9LkiuLpZZBi5kbznEjpMxkZmAws1y3VsEAp/afCUdvrNxd/CxrW30RJWv5ZLHTiIiluJ9uFmJYlGTGARlgCRg46S/8ADXgrTr3TLWfwnpLPqd01rCU02EhWEMk2WyOBtiYcZ5I+oq3Og32r6T8R9Mij8iXV5pIbSW4DLG+/TbeIPnByocMCQDypHUYqzJdyeJ/EGhG107ULP+x717u9+32rwrGTbTQiJWI2ytumzujLphGO/lN4BgaZJ4P1Cw07UZvhmthpepeR5F/c2FgY/wB+VWHKxyNINzOi/d4LDdgAka9xpXgC18UW2gS+GNJ+2XKBlI0uLYCyysik7erLbzkdh5RyQWQNheHPDOs2XhXwOurajrF7pqw2a32kTW0KfY5URHgY7IRLtjmRFKkk/MGdtiOGlPhjxjrtrc+ILbUdLsL6+uotSsra/wBLm+0WixgeRbPKJgYwU3LKqocG4uAMhjkA6Gw8NeCtRvdTtYPCekq+mXS2sxfTYQGYwxzZXA5G2VRzjkH6k1Xw14K0i1WWbwnpM0sriK3todNhMtxIQSEQEAZwCSSQqqGZiqqzDL0DxTBYapr9zqWk+ILT+072C9gjOh3crBGsLVcMYo2UMGR1Zc5BUiug8U20/n6JqkMMk8Wkagbu4ihQvK0Ztp4SUQcuVMwYqPmKq20M21SAZWlaJ4Q1C6azvfAljpF8EMqWl9p9qXljBALo0RdGAJAIDblyu4AOhY0fSvAGuajqFlY+GNJMtg+2TfpcQDjzJIiy/L082GZOcHMZONpVmqHVPETXl9qfh+51i/snheCC01fTBbpHeSzRrAVTyY5zBEC5kdifkIKl2V9sel+GPEfhDUdFvX1Gz1a1gRdNvo7PS5Iri6WWQYuZG85xI6TMZGZgMLNct1bBAGWo8GXMdneN8OoYNIvnhW21WTT7LyZBMyrC2xXMoDs6AZjBG8bgoBxr614f8G6LDbf8UZpt7c3c3kWtpbadbiSd9jSEAvtQYSN2yzAYUgZJAONplw1pNp0fh2y8QaZqLzQJe6NcW91Lp8Sb1EyJNKnlIsUZlKeQ8aMVQAONq10HizRINU8SeDrqbTI7w2OrPIZWtxJ9nX7JOQ2cHaPNWE54+YJ3AoAt/wDCCeEf+hW0X/wXRf8AxNH/AAgnhH/oVtF/8F0X/wATXBaR4a0/SvCvgtfEfh64vNLXRWOoWkunS3zC/ZLURtJCFd9ypHMgYriNR5YKgqpju/Cuqz6Bqd1rGn3l1r1j4JsUtZWLTONRjW7LPGQSGuFcoQ65dd/ykbzkA9B/4QTwj/0K2i/+C6L/AOJrIvNK8AWcdyx8MaTMbXULbTp0j0uLMc07QhByoBGLiNiQTwT1IxVzw/oyaH401i3060kttMk0+ylU4YpNcmS5EsjOfvylRDvckufkLE8Vy1/4chebxjaWejXFvLfeJtJuHmtbWSBp4N9mzyJMgGdri4ZirZQlmOCckA7T/hBPCP8A0K2i/wDgui/+Jo/4QTwj/wBCtov/AILov/ia4fXNAu7a0v7Cw02ODQbXxGj/AGJ9JkvLT7IdOT7tnGVMqfan3YTgSZcj5WNdt4Gs57DwdaW9y0hIeZ4w9qbbZG0rtGiwl2MSKhVVRjuVQoIUgqAB3/CCeEf+hW0X/wAF0X/xNH/CCeEf+hW0X/wXRf8AxNeaL4Vl0/wX4Jjn0uP7Gukk6lBqOh3Gr/6a0dsEL26MJA6okqK54jUeWNoZRV7VPCl9JpWs3F7Z6hf6tYeDLOOxuZ1Z5TfxrdnzFCs6m5VihDKzMpf5Ww5LAHe/8IJ4R/6FbRf/AAXRf/E1FL4J8KRyQqng7SZRI5VnTT4MRDaTubIBxkBflBOWHGMkc9qOhHSLjxJZ6To0k2mTafp8jRFZZI55TcXAuJpAp3XLiMRtImS8yqqMTvFZvhPTdVjvNMWbTJLWztvFMktvHDpjWUEVs2kuA6QFn8pGlc5BOd7tuCuWUAHcf8IJ4R/6FbRf/BdF/wDE0f8ACCeEf+hW0X/wXRf/ABNcP4Y8Kz6XoHh+3tNP1SylvPB88epyWhMV01yFtREpkkIAlQNMsQcgINwXaoIHQfDq1W0/tFLbSreytD5RWa00ifSYpX+fcv2SViQyjYTMOHDqv/LKgDY/4QTwj/0K2i/+C6L/AOJrN0nw/wCDdZmvPsvgzTVtrWZoFu5NOtxHO6O0cgQDLjY6MpLKoJGV3DmsbVtMkk8ZXsh0u4l1uTWrCbTNQFm7eTYILb7QguQu2JTsu8xF1Lb2+U+YN3QfD3RINB8N3Vrb6ZHpofVtQk8qO3EO5TdyiNsADjyhGFP90LjjFAFv/hBPCP8A0K2i/wDgui/+Jo/4QTwj/wBCtov/AILov/ia3qKAMH/hBPCP/QraL/4Lov8A4muZ8P8AhfQL3xVqlteaHptxb2lqi28UtpGyQg3t9kICMKDgdPQV6JXlWqafJqt3rNnFFcS+Zd6UXFszrIqDWrlnYMhDLtUM24EFQCcjGaAO3/4QTwj/ANCtov8A4Lov/iaP+EE8I/8AQraL/wCC6L/4muHu/Dl3F8RWWC1jtUj1CybS5LfQpJZYbKOOAPFFeCRYraIlJ1aIjJVpMK3mqGkgstST4sWF3b6J9kVtTuV1C5j02QytCYJ/K82+aTE0bkRusaoViIjjJVkQMAdp/wAIJ4R/6FbRf/BdF/8AE0f8IJ4R/wChW0X/AMF0X/xNcFpejalBpXiGz8PabcR6jJotzCt8bGTTbr7VtAiE8zP5d5Ozbm+0IdqMrkHEwqW60O2vrbU4vDGi3mnaDcXWiKttb2M2nHzk1DdcyrFtR1IiMJMoA4QfN+7O0A7j/hBPCP8A0K2i/wDgui/+JqjL4a8FQ6/aaQ3hPSTcXVrPdIw02HYFiaJWBOM5zMuOOx6cZ57UtGNjpet6bDoMZ0aPXY/s9u+nS3NpbwGyhYutlEVM6GcuNi8LI5lPMZNZGnacqxeGT460DUJ7S3h1mCSzTSZ54oib6EwRtBD5qiMRpmNSXQCNCpO1WoA7iLw14Km1+70hfCeki4tbWC6djpsOwrK0qqAcZzmFs8dx15xe/wCEE8I/9Ctov/gui/8Aia5Cw8M6/e6ZeWmoLJHrP/CLaOsV3duXRdSge5kDNINwcpN5bt94HIyCGwep8Cf6X4b/ALcfmXX5m1MseGMUmBbhh0DLbrAjAcZQnLEliATf8IJ4R/6FbRf/AAXRf/E1R0Tw14K17QNP1ez8J6SlvqFrHdRLLpsIdVdQwDAAjODzgmqHhqxsrfxLMb7Q7z/hIv7QvZJdTFo6A2zSymEPc8LMnlNCoiDOVIT5B5RKc3pXhXVdL8F6Vb+HdPvLLVbzwTdR3MilopWvhHai3WWRiCHQtKsYYjYu4LtUEAA9B/4QTwj/ANCtov8A4Lov/iaP+EE8I/8AQraL/wCC6L/4muH0nSZbfw74hey0yOaxuEtYxYW3h640q2BWRjNJ9laTzZyI2UuoCiZI1iBYlguRDZSQ2WnW2u6JcHTB4tZoLCz017ON7U6TIxMdr5jERlvMZ4slnJkVk3s0dAHp/wDwgnhH/oVtF/8ABdF/8TWboPh/wb4h0pNStfBmmwWk+HtZJ9Otx9piZQyTKFyQrA8Bwrjuoq54R03d4KNjqdl/ok814IrO5iwos3nkMMZjYfKohZF8sgbRhSBjA82i8NSWngexs5vD1x/aDeErSHQwmnO7WOqFZmmcMqkWshke3ZpXKZKglvkJUA9P/wCEE8I/9Ctov/gui/8AiaP+EE8I/wDQraL/AOC6L/4mqnhzRkg8Z+LNWuLSRbifUI0t5pQ2DD9jtQ3lg8AF0IYr94xqCTsGOb1jwqbvU/Empf2fefbpfEenJbXUJlSWO2ZLGO4eB1IMYKecrvGQSqEMcIMAHX/8IJ4R/wChW0X/AMF0X/xNH/CCeEf+hW0X/wAF0X/xNcPrmgXdtaX9hYabHBoNr4jR/sT6TJeWn2Q6cn3bOMqZU+1PuwnAky5Hysaki0hbXTvDx8SWeoX2jww6gQsGmThraaS4je1aO3iMktvsiEqxtw0S4UmNjtoA6LQ/D/g3X9Ks9StPBmmxWl7ZQXkMk2nW4yJVLBCBkhlGM8Y+YYJ5xpf8IJ4R/wChW0X/AMF0X/xNefaXomqw+G7Ay6ZeKbXQvC7yobdt4+y3cks6BcZZ0QZKAFuQACSAbv8AZi+KNf8APn0vUH0u58W+e63VnPbb4V0byiXR1VvLMi+WQw2tkqchsEA7T/hBPCP/AEK2i/8Agui/+JqtJ4V8DxarBpr+GtFF3cQyTxR/2ZH8yRsiuc7cDBlTgnJ3cdDjndC8Oyabf6Fe2+nXENz/AMJBqNtPKUfdFp6i9EEPP3LYbbcpGMR52MBkgnc1XTLU/Fzw7qkul+bKNMvoFvlszJ5T74GQNIFPl/J9oCliB8zgctggF/8A4QTwj/0K2i/+C6L/AOJqjF4a8FTa/d6QvhPSRcWtrBdOx02HYVlaVVAOM5zC2eO4684wvh/pklpqukmPS7iyu4NFeHxFPJZvB9rvy1vtd5GUC5bK3J81S4+Zju/eDde8S2V2+u+JZk0uS9t59J0yLDRyNG4W5ujLlEIMwRHDtApzIvyfxjIBu/8ACCeEf+hW0X/wXRf/ABNH/CCeEf8AoVtF/wDBdF/8TXn2h+HbvUUsLDVdHkj0qPxS8sdtDp0ljbi0OlPgiDe3lxPKxDIxwzSOrqGZkFmCyS18f+Hzd6XeR6u3iPUGur9o2WOaFoL1rZWkJAnIhKBMb/KVWQmMnawB3H/CCeEf+hW0X/wXRf8AxNH/AAgnhH/oVtF/8F0X/wATXF/C/RdSsNVt5dRj8m7i0ww6qItEks/Pui0R3z3DyEXkgKS4ljUr88jFhvUNe+IGmmbX4LtNMk1O4Fqq2sE2mS3CGRWY4t7mJgbCViyhp3G3iJgf3TYAOm/4QTwj/wBCtov/AILov/iaP+EE8I/9Ctov/gui/wDiawvsNkvj/UJtZ0O8vNTl1CCTSb6G0djBbCCEMBdDCxIJFuC0RdSwLjY3mAPkQWWpJ8WLC7t9E+yK2p3K6hcx6bIZWhME/lebfNJiaNyI3WNUKxERxkqyIGAOm0Tw14K17QNP1ez8J6SlvqFrHdRLLpsIdVdQwDAAjODzgmr3/CCeEf8AoVtF/wDBdF/8TXlc/hzWZdA8P29xayQOPC1ha2Jk0KW+uLO9VZBIYXEiLZyjdB+8kKglUO4eU2PRficu/wAEFPJuJ92p6aPKtZfKlf8A06D5Ufcu1j0DblwcHI60AX/+EE8I/wDQraL/AOC6L/4mj/hBPCP/AEK2i/8Agui/+Jri/wCy4f7P3/2Hcf8ACIf8JB5/9l/2ZJt+x/YPLx9i2b9v2z59nl/e/e4x89Rp4Y1WWwsYLa1khsdce4029gkjZdun/bXnt0ZcZgQWbXMIA2srTxIQpUGMA7j/AIQTwj/0K2i/+C6L/wCJo/4QTwj/ANCtov8A4Lov/ia8+vtD8R3uhQan4iijurptQhtdS8/S5LyOW2traWLL2cewzI148kybRnbLE5wE2preH/DMkmseEzqdtcXFvZWWpzRtJaPbRRFru2e3Tyd7bFVBmOJzlBEp2q0eFAOr/wCEE8I/9Ctov/gui/8AiarR+FfA8uqz6anhrRTd28Mc8sf9mR/KkjOqHO3ByYn4ByNvPUZofEXTobz+zpbu2+1QxeapjudDk1e13NswWtomDiTCnZJyqqZVOC65zLHSpLbxJrF8PC9xHq134SswqLM4kkmXzxJbnUB/y0/491Ll9xCo3IXIAOiv/CvgfTLZJ77w1osUTzRQK39mRtl5ZFjQcL3d1Gegzk4FSReCfCkkkyv4O0mIRuFV30+DEo2g7lwCcZJX5gDlTxjBPmB0Az2GsR3nhqObRYrrRbq3t7TwxLaQybb1xdSJaMZHL+V8rkqrMgA2lCrN1Or6ZI2rarLqul3F5ojeJknvbf7G9wtzb/2VHGp8lVYzKLjy+FVsMm7jYSADq/8AhBPCP/QraL/4Lov/AImj/hBPCP8A0K2i/wDgui/+JrkNJ8KJqmqeH4td0eSfSobXWWitrmFhCkL3sDWkUkR4AEIUrE4+Tyx8qtGNubd6bfzaB4Yu9U0y81PVxoVoog1DTJrhzcquWEVyjBrC4ZmAeeQY4iYHMTYAPQf+EE8I/wDQraL/AOC6L/4mj/hBPCP/AEK2i/8Agui/+JrVj1C1l1WfTUlzd28Mc8se0/KkjOqHOMHJifgHI289RnzLxbZJH4luZ9Q0u8lvpPEekvY36RtsisvNs1KNNkLs88S/uMk72EmzH7wAHcf8IJ4R/wChW0X/AMF0X/xNRW3gnwpPaxSy+DtJtnkQM0MunwF4yRkqxUFcjocEj0JrmbBLiHXdB0iWw1Bbm08TanfzyfYZjAkEy3zRv5+3yjkTxcBsgtggEEDN0fSIbfStATxX4d1C/wBnhnTbfToo7GSSW1vEWTzgjgf6JJ81uPMZouVU7h5ZKgHX2HhrwVqN7qdrB4T0lX0y6W1mL6bCAzGGObK4HI2yqOccg/U3v+EE8I/9Ctov/gui/wDia5lNM1VPiFqd7e28lzoMmuxH7ILZuJPsVsI7ssCfNRJYwgULtRmMrN+6BTb+IFil9oEAmhknhiuleSI6c2oQONrAefaoweZMsCAmSriNyNqMQAOk8K+B4tVg01/DWii7uIZJ4o/7Mj+ZI2RXOduBgypwTk7uOhxZ/wCEE8I/9Ctov/gui/8Aia5TQ9Ihj8YeEdQuvDv2aVNM1K2inSxkKw/vojCcsGa2VovOKROw8sSNEOeDyz6VrMlr4hjtfD0lkl54W1OO4htdLljeS9Ii2xSzs7NeyrukCz7QH3SFC25woB6XH4V8Dy6rPpqeGtFN3bwxzyx/2ZH8qSM6oc7cHJifgHI289Rmz/wgnhH/AKFbRf8AwXRf/E1j6D4c0vQfinqj6fo32fz9Ftdl6LVm81xPcedvuCDukbMBbcxd8BjnbkZnxCS4tv8AhMMWGoXP9teGUsLH7FYzXPmTp9r3I3lK2z/XxYL7QdxwTtbAB1f/AAgnhH/oVtF/8F0X/wATR/wgnhH/AKFbRf8AwXRf/E1w89kl14/8QG00u8k1dfEenta36xs0cMKwWTXKrICRATCHD52earKgMhG1fTbXULW9ub2C2l3y2MwguF2kbHMaSAcjn5JEORkc46g0AZX/AAgnhH/oVtF/8F0X/wATR/wgnhH/AKFbRf8AwXRf/E1vUUAYP/CCeEf+hW0X/wAF0X/xNcz4/wDC+gaT4VurnStD02yuPst4vm21pHG+DZXGRlQDivRK4/4n/wDIl3X/AF73n/pFcUAUbl/hBZ3UtreN4JguIHMcsUptFeNgcFWB5BBGCDUf2z4Nf8/PgX/vuzr55j0r+1fin8WP3env9kstYuv9OsvtG3bP1j+ZfLk5+WTnbz8pzVbXPg5a6XrvifQrLxP9t1Tw/pjarIhsDHE8KrGzKX3krJiQkAKykbcuCSFAPo/7Z8Gv+fnwL/33Z0fbPg1/z8+Bf++7OvEPEvgPRtRtdA0nQriPTtMtPB48SahcHSYjdTKoY7w+/ezuXwYjII0CjDNgAc/p3wctdY0iDWrHxP5Ok3Oi32qRT3tgUkQ2kqxyJIkbvhTvBDKXOAfkzjIB9H/bPg1/z8+Bf++7Oj7Z8Gv+fnwL/wB92dfOFh8KfDupWcN/Y+NLi60+78QQ6DZ3EGjEebLJCkm9lkmQooZmU9T8uRnPGZq/wsksdKhurHVftUqeIG8OXkT2br5d2FBzF5ZdpY/vAHarnAwhJwAD6i+2fBr/AJ+fAv8A33Z0fbPg1/z8+Bf++7OvnnT/AIQ2tpf+GNS1h9YTSdQ8QRaTc2Wq6SbK5YsAyFVExzG3zIXDArgkBiMVdXwDp1/L8RNG8JtZ7LbVrHT4jqenfvbWSS+eEJDOJXZUHy7nKlnXjauMkA95+2fBr/n58C/992dH2z4Nf8/PgX/vuzr5wt/g/Y6nqWrWOjeI7iWXRNatdK1A3emrCo8+4NuJItsz78OM7W2ZB654rM1z4Z2unaR4sutM8Qf2hN4TvY7a/RrIwxuJJXiUxuXJZgygMpVQDu2s4ALAH1F9s+DX/Pz4F/77s6Ptnwa/5+fAv/fdnXy78O9Nsbfwn4z8X31lb6hLoVlDDaWtzErxrPcuYlnIYFW8vBOxlIJI6EA0eHdC8O6n8GPGOrSabcHW9G+w+XdyXZMY824KnZEqrj5Bg7i+TyNtAH1F9s+DX/Pz4F/77s61tK8P/DzXrVrrQ9I8M6lbo5jaWztreZFYAEqSoIzgg49xXyPpem2PiH4Ga9cyWVvBqPhW9t5o76OJRJcwXLmMwPtAztcbw7FyB8o2ivd/2VP+SWal/wBhqX/0RBQB3fw4RY9P1NI1Cos9qFVRgAf2dacCuyrj/h3/AMeWqf8AXxbf+m+0rsKACuB0zVYNG8T6zdXSSOkhs7UCMAndNqd5Cp5I4DSAn2z16V31eTa7bG6Ovx+TeTItxpkkq2KStMI01q5aRkEX7zIRWOU+YYyOlAHrNFeZWlmdPe11Sw0m8tfD9l4ja7tbWHT5UeC2bTWgYpaBPMUG5d8qEydzSY2ktR4a0Q6n4g0K9v8ATLwWsT69doLm3lhCtJqcUkBkRgOSv7xVcdVDAZQEAHpNtK89rFLLBJbPIgZoZSpeMkZKsVJXI6HBI9Caq6tqsGjWUd1dJI6SXVvagRgE7ppkhU8kcBpAT7Z69K8bn8OazLoHh+3uLWSBx4WsLWxMmhS31xZ3qrIJDC4kRbOUboP3khUEqh3Dymx0HiXTFl8VXTXel6hPqkviDS5tNu4LOeRVske0MiNMilEjDpcOYpGADDzNuSrEA9SorlviBAbnQII206O/tzdL54ms5b6KJdrYd7SMhrgbtqhP4WZZP+Wdcl4Z8Lz6vL4bg8XaJI9va2utJJaXNuUt4830PkRNFudNgjXMcZZ1AjUqTsVgAeka3qsGg6BqGr3iSPb6fayXUqxAF2VFLEKCQM4HGSKvV4lrumXl54BJ8TaXrF/qNx4MtoNOdbO4uJ4r/wAqb7QC0aloWffArl9okHytuCsB6b43tp7vwrJFBDJcJ9qtXuoY0LmW2W4ja4TYOXBhEgKAEuCVAOcEA0rDVYNRvdTtYEkV9MultZi4ADMYY5srg8jbKo5xyD9TerxubR2l0nUTo2l3EGhN4mWeS21HRbq4ja1GmxxgfYm2SyRrOECoo2oUUgBY+NKLR4bbTvDw8V6XcavocUOoZtm0WSVI5ZLiN7XFmvmtEqwiVE3DMafI2wtsoA9SoryT4k2GpTaUP7K8PXD30Gi50+W5s5NSuopgrkrHKJtttPHhGMxZmlYqF8xogD0GqaVO/wAS7bT0eMaZqjxazcwEnMklmNjNnGQd7aaQAQpEEmcZIkAO7qjLqsEOv2mkMkhuLq1nukYAbAsTRKwJznOZlxx2PTjPnfh/RdSj+I/2m8j8q7j1O+muJo9EkWWa1czCBJdQaTy5YwrwFYlDMpSNSo8tip4D0xbTxVoJOl6ha6jb+H7iHXJ5rOeKKW9L2m5zIyiOWR2SUmVCxcICWYBaAPUqK8t+LdlqV19pfStE+1X0WmO2n3Q02S9lEw3k+QwkVbORMI/mHLSEoFDtEFNm/wDDsn9u69rUWnXDaiPE2mG0uQjlkt9tik7Rf3VKeasjLjcqlWJC4AB6LbyvNGWkgkgId12SFSSAxAb5SRhgAw5zgjIByBJXmWmeFE1XxBpsXiDR5LixjfxC7xXMLeSxk1ON4vMU/K4ZcuoYEHaHAyoIi0HRdS07StFuYdK1C41G+8JXL6qHuJIJ72922pjSa4Y7lkG6ZULHMYLBcAEAA9E1bVYNGso7q6SR0kure1AjAJ3TTJCp5I4DSAn2z16VerxvSdK1JTqcNppH2fTWvdBntksdCk0yCQrqBM8gt2dmDBUXezBTtRCRsCs3d+M9GTXL/wAL21zaSXVmurO90ihtnl/YrkfvMfwFmVSG+Vt20ghsEA6mivLfD+i6lH8R/tN5H5V3Hqd9NcTR6JIss1q5mECS6g0nlyxhXgKxKGZSkalR5bFY/CfgSyW18G2upaHIbeXw4z6tFdRuUnuUFoIkuQ3EhQNMI0kyEwdgXYMAHq1RxSvJJMrwSRCNwqu5XEo2g7lwScZJX5gDlTxjBPi3iay8QXXgHSHbRLi612LwzC0F1c6bNe3QuxETJ5beYos50IVzI2XkYqFDtEFPSah4dk1XxdJFqGnXE2ny+LRPJlHEckI0QR5YjhozIPLYH5WJKHOSCAek0V5TqGin/hG7CLU7CRre01DU4YLW80GXVbSOL7W/kf6LGwdSIlURSAbFjLrxvTPpGiCcaBp4vLWSzuBax+bbS3JuHhbaMo0pJMhB4LkndjPegC9RRRQAVx/hX/kdNd/694//AEtv67CvKtXtL69HiaDTF3ylbJpUMLTK0C6rdtMGiUhpVMQcNGDlxlRktigD0PWtaj0WG2/0W4vbm7m8i1tLbYJJ32NIQC7KgwkbtlmAwpAySAYvD+vjxFa/bLbTry3sZESW0u7gxbLyNwSroquzqCMHEio3zDjOQPO9P8GWuojQBqWi29/p48QTSJDJoBs7e2tzp8isqW0rO0UZnRWO/bukO4DlWatonhy+sfCEFsmjXFvCPD/h4Xlutqy+YqXU0l9GUAy7GNn3xgFm34IJfBAPYJZXjkhVIJJRI5VnQriIbSdzZIOMgL8oJyw4xkiSuEt7Gya58Lv4a0O807TIddll8p7R7dI1On3CF1hbBhQuwXBVMuS2DvDNxGm+HNZTwXr0ctrIdTPha7tdQhtdCltXu71o1wZZ2kP22XcsoWSNWB3yHcN6hgD2m/1C10y2Se+l8qJ5ooFbaWy8sixoOB3d1Gegzk4FWa8p8V+E7K2l1O1TQJLvSIn0S8MQsnuvNlF9KLqXGGaWUwbRI3zOykbiQa9Nj1C1l1WfTUlzd28Mc8se0/KkjOqHOMHJifgHI289RkANQsIdTsJLO5e4SKTG5ra5kt5Bgg8SRsrDp2IyMjoTUttbQWdrFa2cMcFvAgjiiiQKkagYCqBwAAMACuI+w2S+P9Qm1nQ7y81OXUIJNJvobR2MFsIIQwF0MLEgkW4LRF1LAuNjeYA9HSdMkj8ZWUg0u4i1uPWr+bU9QNm6+dYOLn7OhuSu2VRvtMRB2K7F+UeWdoB6TRXkGj+CLuPwv4ds9LsJNP1C48LNLcT3CyDbqULWb2huGIJJicPsRgQqq6BduVo1fRb+7j0zWNUsI5LXVHvb28t9R0GbVAkkjQCzWS0iYFJUto/LL4KqVcEkybmAPX6oy2kGo3sMt5ZyK+mXRltJHcAMxhKF1CtyNssiYYDkE4+6x8y1TwpfSaVrNxe2eoX+rWHgyzjsbmdWeU38a3Z8xQrOpuVYoQyszKX+VsOS1nxPpGpT3Gsv9j36e/iaOe6S50yS/hnt/wCy4owTbIQ06icIMLna6Bj9w4APUqrR6hay6rPpqS5u7eGOeWPaflSRnVDnGDkxPwDkbeeoz53pHhFNQvvDNvr9hJqGnwafqrGO5smgtwJLq3aCJrcu4VAn+rikJKiNTtVkwsnw80yS28SW9/q2l3EerXfhLSxcX1xZuJJJl80TrJMV/wBZ/qNys24hV4IXgA9Aj1C1l1WfTUlzd28Mc8se0/KkjOqHOMHJifgHI289RmzXnevaJOfF3jOfQtMkh1nUfC0cdjqEFuYi84NypUXGAqv/AMe3BYHCoeiZGl4Ms7KDX9Wn8O6TJpOgyWtqkVudPewQ3KtOZnELohyUaAF9uG2gZOwgAHZVHbyvNGWkgkgId12SFSSAxAb5SRhgAw5zgjIByB5bPZJdeP8AxAbTS7yTV18R6e1rfrGzRwwrBZNcqsgJEBMIcPnZ5qsqAyEbVrSWNlF4g0eLxRod5f2e/wARyyWotHnG19TiaN3gXLSodyEAI/LI+AF3qAev0V4trPh3xHPa6VBrKyNff8I5Z2sFxJpEmqXEGoKJRM8MySqltLloT5zsFYqh3YjJHtNABRRRQAUUUUAFZFv4X0i21k6pDbyC43vKqG4kaGOR875EhLeWjtufLqoY73yTvbOvRQAUUUUAFFFFABVa/wBPtdTtkgvovNiSaKdV3FcPFIsiHg9nRTjocYORVmigAooooAKKKKACiiigAooooAKKKKAI1toFupLpYYxcSIsbyhBvZVLFVJ6kAuxA7bj6mor/AE+11O2SC+i82JJop1XcVw8UiyIeD2dFOOhxg5FWaKACiiigAooooAKKKKACiiigCta6fa2Vzez20WyW+mE9w24ne4jSMHk8fJGgwMDjPUmpYraCCSaSCGON7hxJMyIAZGChdzEdTtVRk9lA7VJRQAUUUUAFcf8AE/8A5Eu6/wCve8/9Iriuwrj/AIn/APIl3X/Xvef+kVxQB8l+IfFd94V+KfxC/s+K3k/tabUtMn89WO2KWc7iuCMN8owTkexqtefFXXL3xZ4j8Qy2uni78RaY+mXaLG/lpEyIhKDfkNiNeSSMk8V9m3PgHwdeXUt1eeE9DnuJ3Mkssumws8jE5LMSuSSTkk1H/wAK48D/APQm+H//AAVwf/E0AfG0fxV1xL+zuGtdPkit/D48OyWzRv5dzZgEYchwwY5B3Iy8qO2QZU+LWs2+mHS7DTdLs9MXSbvSYrOJJWSGO6cPNIrPIzlyVXG5ioxwvWvsT/hXHgf/AKE3w/8A+CuD/wCJo/4Vx4H/AOhN8P8A/grg/wDiaAPinRPiBqug6Bp+kWdvZvb6frseuxNKjF2nRQoViGA2YHIAB961rD4zeJtMuXnsYdPilfxBLr7N5LNmaWNo3j5b/VlHYY+8M5DA19gf8K48D/8AQm+H/wDwVwf/ABNH/CuPA/8A0Jvh/wD8FcH/AMTQB8ZSfEq/h0Cy0jQ9I0vRLex1aPWYWsxNI4uUXarEzSyAjGOMY4Hvmyfi1rMNxrdxpem6Xplxrd1bXt1LbpK5FxBcNOsqiSRwCXbkYK4AAA5z9if8K48D/wDQm+H/APwVwf8AxNH/AArjwP8A9Cb4f/8ABXB/8TQB8fj4v6tb3l5daZo2j6dNqOp2+p6g0Czv9rlhmMyBhJKwVfMO4hNp7ZxxWTN8QNVnsvF1q9vZhPFt1HdXxCNmNkmaYCP5uBuYj5t3H519rf8ACuPA/wD0Jvh//wAFcH/xNH/CuPA//Qm+H/8AwVwf/E0AfG3gHxDpdroXinwt4huvsOn+ILJNl4I2bybqBvMg37QxEZbIbajNyMY5NVtB8ftoPhPUPD0fhzR7y01Py/tz3JuvMufLcvHkpMoXaT/CFyAM5r7S/wCFceB/+hN8P/8Agrg/+Jo/4Vx4H/6E3w//AOCuD/4mgD42sfEOl6H8GtU0ayuvtOs+JL2L7bD5bbLS1tyXj+YhR5jSEnguuzrtavoD9lT/AJJZqX/Yal/9EQV6T/wrjwP/ANCb4f8A/BXB/wDE1raVomlaData6Hplnptu7mRorO3WFGYgAsQoAzgAZ9hQBzvw7/48tU/6+Lb/ANN9pXYVx/w7/wCPLVP+vi2/9N9pXYUAFedW15qVn4r1JtEsrm9meHE6Jbwssai9vdh3PcRHJJfgA42jnmvRa84FxqNtqXiSXRxJ9oEVsHaGPzJI4TqV6JpETB3OsRdlXa2WUDa2dpANf+2vF/8A0L93/wCA1r/8nUf214v/AOhfu/8AwGtf/k6sa613ULPwr4l1DRfFlxqjafot1PLFqltFDe2FwqboD5AgjKqwEjESqd22Mr8pbPXa9qF1Za14ZgtpdkV9qbwXC7Qd6CzuZAORx88aHIweMdCaAMr+2vF//Qv3f/gNa/8AydR/bXi//oX7v/wGtf8A5OrC0Lxtrd34A0yTUp411kvoksk8cSgXNteTwqX28qpObiIgc5jLgIGUDsvCWoXWp6LcT30vmypqeoQK20LhIryaNBwOyIoz1OMnJoAyv7a8X/8AQv3f/gNa/wDydR/bXi//AKF+7/8AAa1/+Tqy9D8Qal4i0DTRfa/Jowt/Dlhq+oalCkAeVp1kznzUaONF8l2b5edy4KBSHkk8a/ZbXQp4Nct9csW1p7Ge70iP7ZJcxCzmkUPHCjbZA6xlvLGCF3YRWKKAaH9teL/+hfu//Aa1/wDk6j+2vF//AEL93/4DWv8A8nVDaaxdeLvFWq2Gl6vrGj2lnZWUyH+zRby73e6V/luoCSpCR8hcZTgj5gbvw8OpXfgvStX1jW7zVLjVNPtrp1uIoESFnjDMEEUaHBLfxFug98gEH9teL/8AoX7v/wABrX/5Oo/trxf/ANC/d/8AgNa//J1Z/h7xrqNylxcXul6xdX95e3kVto8X2NRBBazmF5FYyAdWjVw8jEvkouzmug0/xlp2r6za6fpcF5dC60+DUkukg2wrbzeZsZmYggkx4243HeCAQrlADP8A7a8X/wDQv3f/AIDWv/ydVGJvEUOszaqPDl895Mgj8yVIJBGvGVjVtQKxhtqlggG4qpbJANN8Sa1dReP7rTX1zxBp1pDplrPFHoukC83PJLcK5c/ZpivESYBKg4OM8409J1W6bxDoNimo6heWlzpl/PK+pWQtp5XjntlQsnlRlcCVwAFUEEE54NADP7a8X/8AQv3f/gNa/wDydR/bXi//AKF+7/8AAa1/+Tqz/EmtXUXj+6019c8QadaQ6ZazxR6LpAvNzyS3CuXP2aYrxEmASoODjPOL0eoXt82jaHYaxqkZvrW6u5NVvLJIbzbBLEmwQvCqISZ1+Zoz8iHAJcOoA7+2vF//AEL93/4DWv8A8nUf214v/wChfu//AAGtf/k6ofF0fiPTPAOr6gniK4tbvRrK6nt57WKA/bQkW9DOkkLBWBUgiMqG5YbdwRKPiC9m8O6/o+maz8RLzTLO7tb24e+vP7Pid5Ea2VIgzQBMASStgLuOTyQAAAan9teL/wDoX7v/AMBrX/5Oo/trxf8A9C/d/wDgNa//ACdWfpHiXUJ77SoLbV/7V06XxA9lDqW2Jv7Qtxpsk5O+NQh2zhk3Rhf9VtOSGzp+HJtd1nStK8Tx6pvi1SGG5fSJo0WCCGVQ2I5FTzPMRSDuZmVyGG2MOpjAGf214v8A+hfu/wDwGtf/AJOo/trxf/0L93/4DWv/AMnVjX17r934aGrW/ifULGUeIG0zybeC1MZiOrtbA/PCzbhEwAOcZUEgnOdzVdT1DwX9kur+71DXNOeGWGbMETXH2gbpIdojSNf3nzQ4/ikNuqgFnJAGf214v/6F+7/8BrX/AOTqP7a8X/8AQv3f/gNa/wDydXRaNFqMOjWy63PHPqJTdcvCMRiQ8sqcA7FJ2rkbtoG4k5J4m++IYnuvtUC6pY6QPDmoaqJVt4i9zGhtzDcQlty52vIRG+GGV8xACuQDU/trxf8A9C/d/wDgNa//ACdR/bXi/wD6F+7/APAa1/8Ak6rlz43sba/1a1NjqEjaVNFbSyLCojknmEJhiRiwBZzOq9gpBLlFKFj/AITW3+x5/svUP7S+2/YP7J/c+f5/k+fs3eZ5X+p/eZ8zGOM7/loAp/214v8A+hfu/wDwGtf/AJOo/trxf/0L93/4DWv/AMnVPH4svZ/GmjaSmi3kNrf6fdXM8lwiI8EkMkSbSPMyQC5BKqytvjZGZdzCloPjuOPwPpl5rn2ibUH8P2mpuUjRWv3kUK0cC5AeTzCi7AAAZ4h/GBQBN/bXi/8A6F+7/wDAa1/+TqP7a8X/APQv3f8A4DWv/wAnV2FFAHH/ANteL/8AoX7v/wABrX/5OrF0vUNVg167m0rTr24vJrRPtkDWtv8AuSLu8xybtRyxkGAW4UHPOB6VXntrrtr4b1zXtSv47iSFVtISttEZZCZdSvYlwg5b5nHABOM4BOAQDS/trxf/ANC/d/8AgNa//J1H9teL/wDoX7v/AMBrX/5Oq4fGtul+tvPpeoRRJNBa3dy3kmOzuZhGY4HAkLMx86Ibo1dAZB82AxU07xvY6lqqWaWOoQRyXtxp8V3PCqxS3MDSb41+bcflhdw4XZgbSwcFAAU/7a8X/wDQv3f/AIDWv/ydR/bXi/8A6F+7/wDAa1/+TqfF8RdNa2juprDULe0uIVu7S5lWPZc2pkjRrkbXJjjQTRu/mhGCMTt+VgLp8aaUbq5tYTJPcQahFYCKLazzM5ALoN2WRCJg5/h+zT8fuzQBn/214v8A+hfu/wDwGtf/AJOqJdR8ULdSXS+GZxcSIsbyiztN7KpYqpP27JALsQO24+ppPEPjeaHwrr72tjqGkahDot5qGmy3sMY89Yk/1ipuYrtZ4iUlVG+cDbwwEmqeMnmsGWwgvNNvItQ0wGO8gVXktbm9SISBcnaHUSrtYLIuDlVOKAHf214v/wChfu//AAGtf/k6j+2vF/8A0L93/wCA1r/8nVoWvjC0utZjslsrxLee6msra/cR+TcXEW/zIlAcyAr5M3LIqnyzgnK7ugoA4/8Atrxf/wBC/d/+A1r/APJ1H9teL/8AoX7v/wABrX/5Op+l/EjR9R0oancW2oabYyaY+qwzXtvt863jVDKyqpZvk8xAcgbtwMe9fmrW0bXxqt1c2dxp15pd9apHLJaXhiZ/LkLhHDRO6YJjkGN24bDkAEEgGN/bXi//AKF+7/8AAa1/+TqP7a8X/wDQv3f/AIDWv/ydUOmeK7yfx7qNnqUWoW1umpjR7KDbbmCRvsn2ozMQTJu2q+OQu2SIbd28rpN41t5EhTTdL1DUbuaa8iSzt/JWTbaz+RNJmSRU2hygA3biHB28NtAKf9teL/8AoX7v/wABrX/5Oo/trxf/ANC/d/8AgNa//J1XND8Q/wBt+Krv7FdefpMmi6ff2f7vbnz3usvyA3zLHHwemOgJNWX8Tx/27Lp1vpmoXUVtMltdXsEaNFbSuquqMu7zD8skZLKjIofJYBX2gGV/bXi//oX7v/wGtf8A5Oo/trxf/wBC/d/+A1r/APJ1aFr4wtLrWY7JbK8S3nuprK2v3Efk3FxFv8yJQHMgK+TNyyKp8s4Jyu7J1b4gzR+B9W17SNC1Blg0yTUNOnuI4zBeRhciTKyZVQGVyknlyFc7VLKwAAy1uvEtlc3s9t4au0lvphPcN5Fsd7iNIweb/j5I0GBgcZ6k0SXXiWXVYNSfw1dm7t4ZIIpPItvlSRkZxj7fg5MSckZG3jqc7N34sFrdR2o0XVLi4W1ju72K3SJ3sY5CwUuBJmQ5jlG2HzG/dnAOV3dBQBx/9teL/wDoX7v/AMBrX/5Oo/trxf8A9C/d/wDgNa//ACdVyXxvYw67daa9jqGyyvYbG5vfJXyIpZliMI3bstuaZE+QMVPLhVKsZLXxhaXWsx2S2V4lvPdTWVtfuI/JuLiLf5kSgOZAV8mblkVT5ZwTldwBn/214v8A+hfu/wDwGtf/AJOo/trxf/0L93/4DWv/AMnVq634nj0bVbLTI9M1DUr6+hmmghso0ORE0Yfczsqp/rQQWIBwRncVVqN38QNKgtY7y0t7y/sf7Pj1S5u7dFVLS0kDFJnWRlcgiOQ7UV3Gw5UEqCAQf214v/6F+7/8BrX/AOTqP7a8X/8AQv3f/gNa/wDydUP/AAkOqf8ACafYPtX+jf8ACTfYNnlr/qP7H+07M4z/AK35s9e2ccUa98RY7PwONa0awuLi5u/D8+t2UUqoFVI1iP735x089CQpJIV8EnaCATf214v/AOhfu/8AwGtf/k6j+2vF/wD0L93/AOA1r/8AJ1XLjxXb2F5efbYtQjmisrGX7AywnElzNLFFGrKceY0ihGJfyxhCGA3NUUvjy0gt4fN0rVBfS6gdNOnJFHJNHcfZzcKrFXKYaMKdwcqu8bioDlQCD+2vF/8A0L93/wCA1r/8nUf214v/AOhfu/8AwGtf/k6ui0fVYNa0xL22SSMF5IpIpQA8UkbtHIjYJBKurKSpKnGQSME5OueIf7E8VWn2268jSY9F1C/vP3e7HkPa4fgFvlWSTgdc9CQKAKf9teL/APoX7v8A8BrX/wCTqP7a8X/9C/d/+A1r/wDJ1XB41t4ra8/tHS9Q0+9tfs/+gT+S0sv2iQxQbWjkaP55FZBucYIy21cMZJfFgg06GWfRdUjv7i6NpDpjpEJpJBGZcK5k8kjy1Z9wk2/KVzvGygDP/trxf/0L93/4DWv/AMnUf214v/6F+7/8BrX/AOTq6fT73+0LCO5NtcWrNkPBcx7JI2BIZSOQcEH5lJVhgqWUgnjY/iHBPr9rdOt5Y6CNCvdVeW4twUuYEa2MVwhXccbHlPl8OMjcgymQC3/bXi//AKF+7/8AAa1/+TqP7a8X/wDQv3f/AIDWv/ydU83jy0sbK7l1fStU0+4tHtRLZPFHPNsuZvJikUQu4YFw42gl/kPy8ruIfHlo919nudK1S0eK6itL0zRRlLKaUoIUd1cq5fzI8eUZNu9S+zNAEH9teL/+hfu//Aa1/wDk6j+2vF//AEL93/4DWv8A8nVqr4nj/t2LTrjTNQtYrmZ7a1vZ40WK5lRWdkVd3mD5Y5CGZFRgmQxDJuzdL+JGj6jpQ1O4ttQ02xk0x9Vhmvbfb51vGqGVlVSzfJ5iA5A3bgY96/NQAz+2vF//AEL93/4DWv8A8nUf214v/wChfu//AAGtf/k6p/D/AIivdX8aaxZXNpeafFZ6fZSCyvIkDxySSXIZg6FlcMscXKuyjBHDBgLN14wtLXWZLJrK8e3guobK5v0Efk29xLs8uJgXEhLedDyqMo8wZIw20Az/AO2vF/8A0L93/wCA1r/8nUf214v/AOhfu/8AwGtf/k6rmneN7HUtVSzSx1CCOS9uNPiu54VWKW5gaTfGvzbj8sLuHC7MDaWDgoLOt+J49G1Wy0yPTNQ1K+voZpoIbKNDkRNGH3M7Kqf60EFiAcEZ3FVYAyv7a8X/APQv3f8A4DWv/wAnUf214v8A+hfu/wDwGtf/AJOqe7+IGlQWsd5aW95f2P8AZ8eqXN3boqpaWkgYpM6yMrkERyHaiu42HKglQZZfG9jDrt1pr2OobLK9hsbm98lfIilmWIwjduy25pkT5AxU8uFUqxAKf9teL/8AoX7v/wABrX/5Oo/trxf/ANC/d/8AgNa//J1bOv8AiKDw8tgJrS8vJdQuvslvDZxB3aTypJADkgAERkbiQoyCxVQzCta+MLS61mOyWyvEt57qaytr9xH5NxcRb/MiUBzICvkzcsiqfLOCcruAM/8Atrxf/wBC/d/+A1r/APJ1H9teL/8AoX7v/wABrX/5Op+l/EjR9R0oancW2oabYyaY+qwzXtvt863jVDKyqpZvk8xAcgbtwMe9fmqzB41tzfxWOpaXqGl3bzRRPFdeSwiWYS+TI7xyOgV3heJRu3byo2jcpIBT/trxf/0L93/4DWv/AMnUf214v/6F+7/8BrX/AOTquW/jvR7uGCS0+0XPnTXEfl20fnSKkKM5mKISxjZfKKMoJYXEGB+8FZuu+N5rfRZ3FjqGkahZ3umme1nhjnlNtPeJEWUQtIG3qsyhQd+V6DKkgE39teL/APoX7v8A8BrX/wCTqP7a8X/9C/d/+A1r/wDJ1Pk8VzXuqaFBaxXGnyvrT2GpWVysbSJiwmuFQshZecQvlGPBAJB3LV3Q/GFprt1BFFZXlql5am90+a4Eey+twUBlQK7Mo/exHEgRv3g44baAZ/8AbXi//oX7v/wGtf8A5Oo/trxf/wBC/d/+A1r/APJ1dhRQBx/9teL/APoX7v8A8BrX/wCTqP7a8X/9C/d/+A1r/wDJ1dhRQBx/9teL/wDoX7v/AMBrX/5Oo/trxf8A9C/d/wDgNa//ACdXYUUAcf8A214v/wChfu//AAGtf/k6sXxVqGq3mg3UPiPTr2wszaXf79bW3OD9kmzwt25Py7iBgZIAJGc16VXH/E//AJEu6/697z/0iuKAD+2vF/8A0L93/wCA1r/8nUf214v/AOhfu/8AwGtf/k6uC1b9oHVLC88U/YvA32zT/DF79kvbz+11jxmZoo22GPPzMp4G7Hf1rmv+Guf+pJ/8q3/2mgD2L+2vF/8A0L93/wCA1r/8nUf214v/AOhfu/8AwGtf/k6vNNf/AGkdX8MSQRa74BjtLidA/wBmOvRtNECqsPMiWMvESHU4cKfbg1kf8Nc/9ST/AOVb/wC00Aexf214v/6F+7/8BrX/AOTqP7a8X/8AQv3f/gNa/wDydXjv/DXP/Uk/+Vb/AO00f8Nc/wDUk/8AlW/+00Aexf214v8A+hfu/wDwGtf/AJOo/trxf/0L93/4DWv/AMnV5Pp/7U99q9/HY6V8PLi+u5c+Xb22otJI+AScKsBJwAT9Aas/8NMap/wiv/CSf8K//wCJT9t+wfaP7aX/AF+zzNm3yt33ec4x75oA9P8A7a8X/wDQv3f/AIDWv/ydR/bXi/8A6F+7/wDAa1/+Tq8d/wCGuf8AqSf/ACrf/aaP+Guf+pJ/8q3/ANpoA9i/trxf/wBC/d/+A1r/APJ1H9teL/8AoX7v/wABrX/5OrzDTP2mNU1iw1G+0/4f77TS4RPeXD60sccKk4UFmiALMeFQZZjnAOKkuP2jfEdrow1e6+FWqQ6YyJIL2S5kWEq+Nrbzb7cHcMHPOR60Ael/214v/wChfu//AAGtf/k6j+2vF/8A0L93/wCA1r/8nV5hqf7TGqaPYadfah8P9lpqkJns7hNaWSOZQcMAyxEBlPDIcMpxkDNek/Cr4i/8LN8K3Os/2X/ZnkXrWnk/aPO3bUR927av9/GMdqAJ/h4UNpqpj37Dc223zFAbH9n2nUAkA/Qke5rr64/4d/8AHlqn/Xxbf+m+0rsKACuB02xn1HxD4gt7O9ksbgRW8sU6ZOGTUL5wGAILISu1lBG5SwyM5HfVwOmarBo3ifWbq6SR0kNnagRgE7ptTvIVPJHAaQE+2evSgDV/4RK71a6ml8Y39nqSPp9xpyw2NnJaIYbgxmUOTNIxJ8pACpXHzdcjbZtPD+ovqdrc+INWj1JNNdpLBY7TyHDlGjMkzBiJH2Oy/KsafO52fc2F34wtLae6tobK8u7yDUF06O1hEYe4mNstyQhd1UARMWJdl+4wGTtDVtR8ZWmmxrfX0GqW4i0m+1CWyaCMELbNEJA2TkuC+EKt5bAscsNjUAVn+HcEnh3wvp51CRLrw8lpEt0kYxcRwyQSOjIScB2tozkHcpUckblazpPh/wAR6NcSQ2uuaW+mSahcXZhk0qQzbZrh5mTzRcBcjzCA2z0ODUo8b2Itrx7ix1C2mtvs5jtZ4VSW4W4kMVuyjdhfMkUqFkKMpHzhBzV3QPEUHiFb8Q2l5Zy6fdfZLiG8iCOsnlRyEDBIIAkA3AlTglSylWIBk6f4NvtC0rS4/D+rW8GoWemW2mXE93ZNNFdRQKdh8sSIUYMzkEPjEjBg2FK2YfCOy706+mvvNvodTbU72YRbVuZWtJLbCru/dqqMgUfMcRjcWYs5rT+O9NuLTTWh/tCJ7z7NJIIY4zJaF7uK3EM4YkRsZHdGXriGfaQyVpWHiePUdVe2t9M1A2gmltk1Ly0MDyxMyyJgMZEwySLudFQlcBjuTcAWYNI8nxVfaz5+77XZW1p5OzGzyXnfduzznz8Yxxt754PDmkf8I/4V0rRvP+0f2dZQ2nnbNnmeWgTdtycZxnGTXG2PxDEF19qnXVL7SD4c0/VTK1vEHto3NwZriYrtXO1IyY0yxw3loQGxrx+K5rLVNdguorjUJU1pLDTbK2WNZHzYQ3DIGcqvGZny7DgEAk7VoAE8G31hJb3ei6tbw6hBNqDCS7smmiMV5dfaHXYsiHcrLGA27GA2V+Ybbvh3wnB4bulazuZJbePSbLS4o5VG8LbGbDswwCWE3OAMbffA0tH1WDWtMS9tkkjBeSKSKUAPFJG7RyI2CQSrqykqSpxkEjBPJeG/GwPhewvdYnvLu+fQtKupYkiiCTT3bPGgjxtw8ko2ncQi/IflG80Aa+oaDrn/AAlVzrOg6vp9p9qsoLSWG9017n/VPM4ZWWePGfPIIIPQVFeeH/EdxqOlarBrmlx6nZWtzazO+lSNDMs0kT5WMXAZCPIUcu2cnp0rNv8Ax+8lzph0+w1SJo9dbTL6we1XzpX/ALPknEa8kY3mL95uCfKW3+X85vWfjWbUvGGkabZaXcfYb2yvZbieTyw1vPbzRxPGf3n8Dl0YqGBLRlWK7iAA/wCEd8VRa3Jq1t4g0dbu5sobS5EmjStG3lSTujIBdArxPgglslc8ZwLtzoeq3EdlfnU7OPxBZpLEt4li32d45GUujQGUtg+XGciQNujBztLI3QUUAc/feGp9S8F6xot7qkkt1q9rPDPeMhKRtLGUzHFuwiKMYQHtlmZizten0jzvFVjrPn7fsllc2nk7M7/OeB927PGPIxjHO7tjnSooA5u28I/ZX0mOK+/0TSNTlvbSExcpE8E0YgzuwFQztswAFRETHG4mm+GL7TvsmnR6xt0Cw2fZLOGBo5wqY8uKScP88a4AwEVmCqHZxv8AM6SigDm/+ER/4pz+yvt3/Ma/tXzfK/6iH2zy8bv+Abs/7WO1aWvaR/benRWvn+R5d7a3e7Zuz5FxHNtxkfe8vbntnPOMVpUUAFeft8Nr6XSm0qfXbc6fB4futBsAmnsssUUyxKHlcykSMqwrnaqAkk8cAegUUActqngiDVtO8QWl1PHImsahBfhJrcSRo0Mduqo6E/vELWwLDK5ViuR96q1p4DfTtItU0y40uw1C01BtQhNnpKwWayNC0BBgRwxBjdjkylt+DnaAg7KigDn4/D+ojX9G1a51aO4msrW6t7oNabfPE7RP+7ww8sI0KgBt5K8ElvnPPv4Wht7nwPoAhuL6TQ4Yo7q7+zyRxG2ijDKd/wBzcbq2tG2Bi+F6FC+fQKKACiiigArz2z0j+2/EesWvn+R5clhd7tm7PkardzbcZH3vL257ZzzjFehV57a67a+G9c17Ur+O4khVbSErbRGWQmXUr2JcIOW+ZxwATjOATgEA0Lr4eWlx43k18JpbGe6hu5ZLjSo5rtJIkRVWG4Y4jTESZGxmBMhVlLKVvWvhH7N/Zf8Ap27+z9avNV/1WPM+0fav3f3uNv2r73OdnQZ4D41t0v1t59L1CKJJoLW7uW8kx2dzMIzHA4EhZmPnRDdGroDIPmwGK2bDxPHqOqvbW+magbQTS2yal5aGB5YmZZEwGMiYZJF3OioSuAx3JuAOf8O/CzStEtbqxmg0uWxm099MxaaYtrcTwMAG+0TqxeRyFHzJ5YJLEqTt2XtI8AWum6rpWpS3P2i7s4XN1J5ZT7XdM0jfaMbsJzc3nyAbf9I/6ZpgX4i6b/ZVzqU1hqEFommTataSOsZ+32sSqzSRBXJXiSPCyiNv3g44bbd1rxlp2g3F5FeQXkhs0snk+zweaWF1cPBHtVTuYhkJIAzjG0MeKAOWj+EMcf8AaZGp26y32i3mkNPHpqJLKJvLxcXEgbdPP8hLsSA5bIWM7t24/g2+v5Li71rVrebUJ5tPYyWlk0MQis7r7Qi7Gkc7mZpAW3YwVwvynddh8WCfU/saaLqhETxQ3k6pE6WU8iI4ikCyFyQJI8siug35LYVipa+MLS61mOyWyvEt57qaytr9xH5NxcRb/MiUBzICvkzcsiqfLOCcruAM3Sfh5aaR4uk1iFNLwbq4u1lGlRi+aSYuXV7okkoDI+AqowARSxAYP0mky6jNZSNrEEcFwLq4VEjOQYRM4hbqeWiCMeepPA6CloPiePxBskt9M1C3tLiEXNleTxp5V3EcYdSjMUyGUhZAjkNwvyvt0tS1C10jSrvUtQl8m0s4Xnnk2ltiIpZjgAk4APAGaAOWX4dwSaBpekXmoSPb2XhyfQJWijCPKsqwKZVJJCkCDgEN97rxzr6Jol9Z6re6rrV/b3uoXcMNsTaWrW8SxRNIyfI0kh3bppMndgjaABgk0U8eWitqEN7pWqWN5YJamS0uIo98j3MrxQRoyuY2LOgG4NsG8BmBVwsv/Ca2/wBjz/Zeof2l9t+wf2T+58/z/J8/Zu8zyv8AU/vM+ZjHGd/y0ARXfg+d7+61Gw1KOG+fVl1S1aa2MkUTfYltGR0DqXBQOwwy4Zl6hSGyLn4Y/bNO08X0+j6jqFpNfSs2paP9otW+13HnuVgMoKsrBVVvMOF3Ag7sjcPjexNtZvb2OoXM1z9oMlrBCry2628giuGYbsN5cjBSsZdmJ+QOOazR4r1Sy+BEHisxf2hqieH479wVVVeUwB2dhlRtBJZgpBwCFBOBQBt6N4aj0XVZLqC43xHTLPTki8lI9ot2mIb5AFGfOxtVVA28cHAiTw/qNr4iu7zTtWjtrHULqO7vIDab5mkSOOPakpbaiMsMYIMbNy+GUlSlKw8Vrp/k2GoRaxd+TNDa3upXa2o+zXM+xo4JREVy37+Fd0SMg3jLcORraF4ig8QNfGztLyKKyupbRpriIIkkkUrxuE5ywBTO4Db8wGdwdVAM2z8Hz2us20r6lHJpllqFzqdrbC2KzCefzt++XeVZB9plwoRSPkyx2ndmt8N3ltdfil1GzifV9PubFprLTFt3mMwwZ7oK+24lXqGAjA3y4A3/AC6SePLSeOU2mlapcSDUJdNt4hFGhu7iJpRIsZd1UhVgd9xIUj5QS4ZAP48tGbT4bLStUvry/S6MdpbxR743tpUinjdmcRqVdyNxbYdhCsSyBgCPxJ4MuvEv2I3t9p/mww+XJO2lhpbdz96azk37raQ8EMTIAUjIGVO7fil1E6/dxTQRrpi2sDW8wPzvMWlEqkZ6BVhI4H3jye2JafEPRLq1kvXW8ttO/s+TU7e9uLdlS6togpllRP8AWALvT76KW3AoHHNUta8f3lhpzfZvDmoR6nFe2EUthcG3LiC5uPKEgZZtnzFZEUb8hwpZQnzUAaV14R+0/wBqf6dt/tDWrPVf9Vny/s/2X9397nd9l+9xjf0OOYrPwfPa6zbSvqUcmmWWoXOp2tsLYrMJ5/O375d5VkH2mXChFI+TLHad1m68YWlrrMlk1lePbwXUNlc36CPybe4l2eXEwLiQlvOh5VGUeYMkYbbLr2oXVlrXhmC2l2RX2pvBcLtB3oLO5kA5HHzxocjB4x0JoAzfEWnaxd+P9EudFufsTW+mX6tcS2nnwEtLaYjkAKnkKzDa6nMeclQymtc/DrbpX9laVqnkafcaLDod6Lm386WS1iWRVMbqyCOTbNJlmV1ztO0YIa7afEDSp7WS8u7e8sLH+z5NUtru4RWS7tIwpeZFjZnAAkjO11RzvGFJDAXoPEcz2F1NdeH9YtLi32bbOSKOSSfedqbGjdo+WBBy42D5n2KQxAK3/CI/8VH/AGr9u/5jX9q+V5X/AFD/ALH5ed3/AAPdj/Zx3rDb4bX0ulNpU+u250+Dw/daDYBNPZZYopliUPK5lIkZVhXO1UBJJ44AvXHjq5bVtDs7PRLxZLrVm07UYZzDvsyLVpwCVl2klTHJlS42Bxw+FqzF4wiWCOKxstU1m8nur5UtoxbpKEt7kxStlnjj2K5RV+beVZSQTvIAC/8AB8+p3F3eXWpRi8uLXTlDR2xEaz2dxJcLJtLklGdxlNwO1SN+TkFp4PnS/tdRv9Sjmvk1ZtUumhtjHFK32JrRURC7FAEKMcs2WVugYBY7n4kaPD+8t7bULy0XTIdXlvILfEUNnL5n75ixU/KIiSgBkIPyq2G26T+J4/7dl0630zULqK2mS2ur2CNGitpXVXVGXd5h+WSMllRkUPksAr7QCKw03UdAjsbLTxHeW9xq15cX0rrsMMMzXE42jdyRK8SZ5yCTgdjxF4Tg8SXTNeXMkVvJpN7pcscSjeVuTDl1Y5AKiHjIOd3tg9BRQBxuleAhpmjaraxf2HaTaiiRsum6FFb2zKuTtliLO0obcyuC4+Q4XY2XJF4DeHwjNoyXGlkT3QuGtH0lW00DAHlLaFyVTKiTCyA+bl84JQ9lRQBm+HtI/sLQrfTvP87ydxyqbEXcxbZGmTsjXdtRMnaiquTjNctB8OJ2tU0zU9Yjm0i20K50K1it7MxXCwTCFdzymRldwsCjIjUEknAHFd3RQBxOn/DqOz06eANo9lLNe2Ny39j6MlnERbXCzAFQ7MzNgruLkAEYUHdv0rrwj9p/tT/Ttv8AaGtWeq/6rPl/Z/sv7v73O77L97jG/occ9JRQBxMXw4jj8d2viQ3tu0trezXSsbBPtUwlilQxy3BO5lTzAIwAoVECkOQrLIvw7gk0DS9IvNQke3svDk+gStFGEeVZVgUyqSSFIEHAIb73XjnsqKAOf0PQ9Vs9f1HV9c1Ozvri8tbe1VbOxa2SNYWmYEhpZCSTOe4+6KrXng+e61m5lTUo49MvdQttTurY2xaYzweTs2S7wqofs0WVKMT8+GG4bepooA5u18I/Zv7L/wBO3f2frV5qv+qx5n2j7V+7+9xt+1fe5zs6DPGlPpHneKrHWfP2/ZLK5tPJ2Z3+c8D7t2eMeRjGOd3bHOlRQBwn/CuJ49Ah0i21iNbefQrfQtSaSzLPPBEsihoSJAInIml5YSD7nHyndr3XhH7T/an+nbf7Q1qz1X/VZ8v7P9l/d/e53fZfvcY39DjnpKKAOfHg3SrSfSDodnZ6Tb6dqD37W9narGkzNbSwHIXABxKDuwfuAe4zdJ+HlppHi6TWIU0vBuri7WUaVGL5pJi5dXuiSSgMj4CqjABFLEBg/ZUUAcavw7gk0DS9IvNQke3svDk+gStFGEeVZVgUyqSSFIEHAIb73XjmOx+HUdpoWqWkbaPYXd55TwTaPoyWcUEsLGSCYx72aRlkw2GfYQoG0Zct21FAHJWvw70vT7m9OmTXGnwz6YNPtxaysstpmNInkSQkncY4LUDI+UwAjl2zkWnwsewg1N7C/wBLsbq/fTplSy0ZYLWGSzuWmUiJJAzB8qDuctkEhsbVX0SigDlrTwfOl/a6jf6lHNfJqzapdNDbGOKVvsTWioiF2KAIUY5ZssrdAwC1vBfw8tPBt0HtU0sJDa/ZIHtNKjt7iWPK/NcTZZpX+ReV8tSSxKn5dnZUUAFFFFABRRRQAUUUUAFcf8T/APkS7r/r3vP/AEiuK7CuP+J//Il3X/Xvef8ApFcUAeIeGNE0rVvGvxLk1TTLO9eHxhpscbXNushRZNUZZFBYHAZeGHccGsjWYNNm0X4qTRaFo9q3hXWrU6T5FhGPJJvJI3DEgmVWA5jcsg6KqqFAreNfgb8RdX8f+INS0/w951peanczwSfbbdd6PKzKcGQEZBHBGaxP+GfPif8A9Cz/AOT9t/8AHKAPTfHdmNS8e/FCew0mz1TxJp1rpSaVbnT4rqUxv5ZncQsjCUgMoLsrMqkAEDAqtq+m6B4f8Ha9rcnhbQ7nWbLQvD91e2d3ZBUgvZJXEoaJNvlEqIy0a7Q3G5SGIPnf/DPnxP8A+hZ/8n7b/wCOUf8ADPnxP/6Fn/yftv8A45QB6J4QsNG8Qx/DeG+8OaGlv4qfXW1OKHTYlLBGkaNUk2mSMJnC7WBAAGeBWJZ+E7TxX4d8Ca2ttpdrqtxp+r3NysGmxk3xtpMRJFaRmOOaUbshTgMFO/eq7Ty3/DPnxP8A+hZ/8n7b/wCOUf8ADPnxP/6Fn/yftv8A45QB6t4dsLDw349+F2pTWUem32rJqdpey3ujw6ZLJtz5IMC5SJyXChkIZ1YAkhttZHw88NabqWk6RJ8QfD2n2moSeM/s08dzp0dk2BppeGEoqoArSCM+XjDlhkHcc8B/wz58T/8AoWf/ACftv/jlH/DPnxP/AOhZ/wDJ+2/+OUAekfDvwzb6kPC7/EDwvp9rrc3iC7gjtbnR4bNrizGnu5JgVEWRVlCHeVO0kAEZrzfV4rHWPgFD4hfStPs9Qt/EzafC9lbLDstjahxGxHMmGAw8hd+uWOTk/wCGfPif/wBCz/5P23/xyj/hnz4n/wDQs/8Ak/bf/HKACD/Rv2X7qa2/cy3ni1Le5eP5WniS13pG5H3lD/MAeAeetb7aH4t8FeF9f8Saxouqah4i8W6fcpdqli/2fTrSZt8007KoVZW2kiMECMZL9kqPRfhP8XNE0LW9Gh8KW9xp+twpFdQz3tvw0bb45FZZgQytkgZKnPzK3FYn/DPnxP8A+hZ/8n7b/wCOUAE/+k/sv2s1z++ls/Fr29s8nzNBE9rveNCfuqX+YgcE89a9t/ZU/wCSWal/2Gpf/REFeW618J/i5rehaJo03hS3t9P0SF4rWGC9t+WkbfJIzNMSWZsEjIUY+VV5r239n/wdrvgjwDe6b4nsfsN3Lqck6R+ckmUMUSg5RiOqtxnPFAHRfDv/AI8tU/6+Lb/032ldhXH/AA7/AOPLVP8Ar4tv/TfaV2FABXntrpH9ua5r1ms/2eVVtLmGUpvVZYdSvZY9y5G5d8a7gCCRkAqeR6FXmy6Zbat4n1FL/UV0+G3RAji2tGLvNf3iBS80TnllUKoI5Y4GTQBrnwVqNxpGrw6nqWl3t1quoJezJNo++zcLDFEI3geVmYDyVcESKd4U9AVaO6+HX2nQhp39qbP+JLqOl5W3+SP7W0bZjTd8kcfl7UjycJtXd8uSy78GaRYbvt3iR7bbDJcN51ppqYijxvkObb7q7lyeg3DPWpJfAenwSQxz69PG9w5jhV7LTgZGCltqg23J2qxwOyk9qALHinw75smqawJbh3kh0/y4re285ontLqSdZCm4GVd0gLRrhyqMEJZgAeALe+WPXr/UJLib+0tTFzFNcWbWjSKLWCM4hYB41Dxuqh/m2qpJfO9s6LwroU+szaRB4rEmp26CSayS30wzRqcfMyC23AfMvJH8Q9as2/gPT7qMyWuvTzIrvGWjstOYBkYqy5Ft1DKQR2II7UAWD4AtVk1F7e58pr3U7S+U+WW8pIboXRi5bndM1w+7qPPxgqiipLfwc8fjc6/JdWeQ7v5kGnrDdzhkKiKe4VsSxKCNqbAcxxEsxQluYtoPA15dRWtn8RNOnuJ3EcUUTaSzyMTgKoEGSSTgAVtt4D09bqO1bXpxcSI0iRGy07eyqVDMB9myQC6gntuHqKAKi/Da+i0pdKg123Gnz+H7XQb8Pp7NLLFCsql4nEoEbMszY3K4BAPPIN7XPh7BrRv5J5bOd59WTVIYb+xFzbqws0tdkkRYeYNqswwy4YqeduGxtQsPBukX8ljqvj2ysbuLHmW9yNKjkTIBGVa3BGQQfoRW3/wru2/6DF3/AOC/T/8A5GoA3vD2jx6BoVvpsItwsW4kWtqlvECzFiEjThVBY4GScY3MzZY8jL4G/sTwyALu4u3stM0m0jNvZ72D2EzSrMY9+XUswLRKd5VGCEswrQ/4V3bf9Bi7/wDBfp//AMjUf8K7tv8AoMXf/gv0/wD+RqAM/wAKaBfahfSazqF3cHb4gOpxSXFi1s1yp01bUgQth4lV2cKHBYrGuS27edfTfB8+ma7p+oQalGyWz6oZontjmVby5W4wrB/lKMijJDbhnhc8Qf8ACu7b/oMXf/gv0/8A+RqP+Fd23/QYu/8AwX6f/wDI1AHYUVw2oeDNI0iwkvtV8SPY2kWPMuLm002ONMkAZZrYAZJA+pFWf+Fd23/QYu//AAX6f/8AI1AHYUVx/wDwru2/6DF3/wCC/T//AJGo/wCFd23/AEGLv/wX6f8A/I1AHYUVx/8Awru2/wCgxd/+C/T/AP5Go/4V3bf9Bi7/APBfp/8A8jUAdhRXH/8ACu7b/oMXf/gv0/8A+RqP+Fd23/QYu/8AwX6f/wDI1AHYUVxUXgPT55Jo4Nenke3cRzKllpxMbFQ21gLbg7WU4PZge9Fv4D0+6jMlrr08yK7xlo7LTmAZGKsuRbdQykEdiCO1AHa0Vx//AAru2/6DF3/4L9P/APkaj/hXdt/0GLv/AMF+n/8AyNQB2FFcf/wru2/6DF3/AOC/T/8A5Go/4V3bf9Bi7/8ABfp//wAjUAdhRXH/APCu7b/oMXf/AIL9P/8Akaj/AIV3bf8AQYu//Bfp/wD8jUAdhXntnpH9t+I9YtfP8jy5LC73bN2fI1W7m24yPveXtz2znnGK0v8AhXdt/wBBi7/8F+n/APyNWLpfh0avr13YT37xpp9oipJHp9jvkzd3i/NugI4Ea4ChRkscZJNAGxdfDy0uPG8mvhNLYz3UN3LJcaVHNdpJEiKqw3DHEaYiTI2MwJkKspZStm38HPH43OvyXVnkO7+ZBp6w3c4ZCoinuFbEsSgjamwHMcRLMUJaD/hXdt/0GLv/AMF+n/8AyNUTeA9PW6jtW16cXEiNIkRstO3sqlQzAfZskAuoJ7bh6igBLb4dbtK/srVdU8/T7fRZtDshbW/kyx2sqxqxkdmcSSbYY8Mqoudx2nICyN4L1W/vry91zWrOe4uH0wr9j05oERbO6a4AIaZyS5crnIxwcGnf8K7tv+gxd/8Agv0//wCRqii8B6fPJNHBr08j27iOZUstOJjYqG2sBbcHaynB7MD3oA1U8P6ja+Iru807Vo7ax1C6ju7yA2m+ZpEjjj2pKW2ojLDGCDGzcvhlJUpm6T8PLTSPF0msQppeDdXF2so0qMXzSTFy6vdEklAZHwFVGACKWIDB2W/gPT7qMyWuvTzIrvGWjstOYBkYqy5Ft1DKQR2II7VL/wAK7tv+gxd/+C/T/wD5GoAn8O+Dn0TX7rVJbqzd5kdGNlp62j3RZgxluirFZpRt4cKgHmS4X58Czc2l7r3w2ls/EdnIl9qGkmK/tLB0DrI8OJEiZ2KZySFLMV6ZOOaxtP8ABmkavYR32leJHvrSXPl3FtaabJG+CQcMtsQcEEfUGrP/AAru2/6DF3/4L9P/APkagDG0nRtS8Ualrd9fXtwfPh037PdTaTJYxpcWtxNOEW3lIlMYJhLEsdxdwrrjCbn/AAht95f27+1rf+3P7T/tP7R9ib7L5v2X7JjyPM3bfJ7ebnf82cfJVe38B6fdRmS116eZFd4y0dlpzAMjFWXItuoZSCOxBHapf+Fd23/QYu//AAX6f/8AI1AD4vBt9p6WF1o+rW8WqW32zzZrqyaaCT7XOtxNtiWRGX94i7Mu21cg7idws/8ACI/8Ws/4Q37d/wAwX+yvtnlf9MPK8zZu/Hbu9s96p/8ACu7b/oMXf/gv0/8A+RqP+Fd23/QYu/8AwX6f/wDI1AE954PnutZuZU1KOPTL3ULbU7q2NsWmM8Hk7Nku8KqH7NFlSjE/PhhuG3X0HSP7E06W18/z/Mvbq73bNuPPuJJtuMn7vmbc98Z4zisH/hXdt/0GLv8A8F+n/wDyNR/wru2/6DF3/wCC/T//AJGoAbqXw9g1Hw7Dp08tndPbatdapCL+xFxbs08k7bJISw3hVuGAwy/Mqt22m9ovg+PRrzSJ4ZrdF06yu7YwWtmlvETcTQykoicIqmIgL8xIYFmZgWbOuPAen2sYkutenhRnSMNJZacoLOwVVybbqWYADuSB3qX/AIV3bf8AQYu//Bfp/wD8jUANX4dwSaBpekXmoSPb2XhyfQJWijCPKsqwKZVJJCkCDgEN97rxyXngvVdSgvbm+1qzOr3D2Bjnh05kt41s7k3EYMRmLMSzOGPmDgrgAglnf8K7tv8AoMXf/gv0/wD+RqP+Fd23/QYu/wDwX6f/API1ADbr4eWlx43k18JpbGe6hu5ZLjSo5rtJIkRVWG4Y4jTESZGxmBMhVlLKV6DVNI/tLUdGuvP8r+y71rvbsz5ubeaHbnPH+u3Z5+7jvkYP/Cu7b/oMXf8A4L9P/wDkaj/hXdt/0GLv/wAF+n//ACNQBDbfDrdpX9larqnn6fb6LNodkLa38mWO1lWNWMjsziSTbDHhlVFzuO05AXSuvD2satoV9Y67rdvPLc+WEFtYeTbgI27a8bSO0iv9yRTIA0fygKSzGn/wru2/6DF3/wCC/T//AJGo/wCFd23/AEGLv/wX6f8A/I1AFTRvhu+hG2bT9Rs4TDrv9rtFDpixQgNZ/ZpIUjRwEGCzKxLEcbvMILNeTwbfWElvd6Lq1vDqEE2oMJLuyaaIxXl19oddiyIdyssYDbsYDZX5htZ/wru2/wCgxd/+C/T/AP5Go/4V3bf9Bi7/APBfp/8A8jUANb4dwR6BqmkWeoSJb3vhyDQImljDvEsSzqJWIIDEifkAL93rzxZ1Twc+p+LrbWHurNBA8TrL/Z6/boghz5UV0GBWJiDuRlYkSSruAYBadt4D0+8tYrqz16ee3nQSRSxWWnMkikZDKRbYIIOQRUv/AAru2/6DF3/4L9P/APkagDsKK4//AIV3bf8AQYu//Bfp/wD8jUf8K7tv+gxd/wDgv0//AORqAOworj/+Fd23/QYu/wDwX6f/API1H/Cu7b/oMXf/AIL9P/8AkagDsKK4/wD4V3bf9Bi7/wDBfp//AMjUf8K7tv8AoMXf/gv0/wD+RqAOworim8B6et1Hatr04uJEaRIjZadvZVKhmA+zZIBdQT23D1FS/wDCu7b/AKDF3/4L9P8A/kagDsKK4/8A4V3bf9Bi7/8ABfp//wAjUf8ACu7b/oMXf/gv0/8A+RqAOworhofBmkXEyw2/iR5ZX83aiWmmszeU4STAFt/A5Ct6EgHBqz/wru2/6DF3/wCC/T//AJGoA7CiuKl8B6fBJDHPr08b3DmOFXstOBkYKW2qDbcnarHA7KT2obwHp63Udq2vTi4kRpEiNlp29lUqGYD7NkgF1BPbcPUUAdrRXH/8K7tv+gxd/wDgv0//AORqP+Fd23/QYu//AAX6f/8AI1AHYUVx/wDwru2/6DF3/wCC/T//AJGo/wCFd23/AEGLv/wX6f8A/I1AHYUVxTeA9PW6jtW16cXEiNIkRstO3sqlQzAfZskAuoJ7bh6ihfAentdSWq69ObiNFkeIWWnb1ViwViPs2QCUYA99p9DQB2tFcf8A8K7tv+gxd/8Agv0//wCRqP8AhXdt/wBBi7/8F+n/APyNQB2FFcf/AMK7tv8AoMXf/gv0/wD+RqitvAen3lrFdWevTz286CSKWKy05kkUjIZSLbBBByCKAO1oriovAenzyTRwa9PI9u4jmVLLTiY2KhtrAW3B2spwezA96l/4V3bf9Bi7/wDBfp//AMjUAdhRXFW3gPT7y1iurPXp57edBJFLFZacySKRkMpFtggg5BFS/wDCu7b/AKDF3/4L9P8A/kagDsKK4/8A4V3bf9Bi7/8ABfp//wAjUf8ACu7b/oMXf/gv0/8A+RqAOwrj/if/AMiXdf8AXvef+kVxR/wru2/6DF3/AOC/T/8A5GrF8VeHR4Y0G6v7S/e5f7JdqY7jT7HYcWkzDOyBSeVHGcEZBBBIoA9Korj/APhXdt/0GLv/AMF+n/8AyNR/wru2/wCgxd/+C/T/AP5GoA7CiuP/AOFd23/QYu//AAX6f/8AI1H/AAru2/6DF3/4L9P/APkagDsKK4//AIV3bf8AQYu//Bfp/wD8jUf8K7tv+gxd/wDgv0//AORqAOworj/+Fd23/QYu/wDwX6f/API1H/Cu7b/oMXf/AIL9P/8AkagDsKK4/wD4V3bf9Bi7/wDBfp//AMjUf8K7tv8AoMXf/gv0/wD+RqAOworj/wDhXdt/0GLv/wAF+n//ACNR/wAK7tv+gxd/+C/T/wD5GoA7CiuP/wCFd23/AEGLv/wX6f8A/I1H/Cu7b/oMXf8A4L9P/wDkagA+Hf8Ax5ap/wBfFt/6b7SuwrkPh4zPaaq0jBna5tixCquT/Z9p2UAD6AAegrr6ACvJtbtoLyfWLW8hjnt577R45YpUDJIp1y4BVgeCCDgg16zXFeHbaC68X63HdQxzIsUEgWRAwDJf3zK2D3DKCD2IB7UAch4g+3T/ANo+GJvtF7q2m+EtbtI87pJr2Jvsn2eX+9IzrhWbADSpMFGFru9cuYNR17wVJp80d0j6hJeK0Dhw0H2G4XzQR1TdLEN3TMiDPzDO21zpTanGzTWZvo3azQl181WZFmaIdwSiK5XuqhsYANRxabofh/8AtHU4LLT9M8/Nxf3aRJD5m3cxklcAZxliSx7k+tAHN+FP7L/4Vx4S/tn/AI/f9H6bvP8A7RwfPzt+fzN/n+bnt53mfLvrS8B/8i5df9hrVf8A04XFa0WiaVBrM2rwaZZx6ncII5r1LdRNIox8rOBuI+VeCf4R6VS/4Qrwr/av9p/8I1o/9oed9o+1/YIvN83du8zftzu3c5znPNAHNfDi08Vf8ID4Uk/tnR/7P/syzbyP7Jl83yvKT5fM+043beN2zGedvasTUNQ1W/1258Y6b4U1i/is72BtPntWtmiurKBZo5JAhmEjs63V20e0YcfZyBgtu7u28A+DrO6iurPwnocFxA4kili02FXjYHIZSFyCCMgity2toLO1itbOGOC3gQRxRRIFSNQMBVA4AAGABQB5svifVdJufGmuaJp2l6ro0eoQ3Ut2+qNERH/Z9oWkVVhkDoqfPkNuIBCqTgN0GpQXXgj4L3cGn3m670Lw+6QXXlAZeG3IV9hyOqg4OR25rpLHTbHTITDptlb2cR25S3iWNTtRUXgDsiIo9AoHQCs3VtIsdb8H6t4Y02e3tInspNMK26Ky2e+HCr5YIxhHQheOCOgIoA5afxHq9mL60h1uPUhOmkTQajFDGBGL+8e3cwgAqUVVDx7/ADDk/M0g4qK78Va74bl1B5JLjXrfSr2bTvLeJEluXexhuoGd40ChjKTbqqooY3Ef3mA393HomlRWt7axaZZpb6g8kl5EtuoS5Zxh2kGMOWHBJznvRbaJpVnpkWm2emWcFjA4kitYrdVijYP5gZUAwCHG4ED73PWgDzu48W+J4tLnQG4a40n7Ppd06QRCS+uZ79bYTIHASKQQoJlRiUxeRFsqoL2YdX8UzjTtLe/uNOmm8QNYNPeJaT3f2f8As+S4PmLATEkm8ZTAGFEZZXBYP6BJptjLDeQy2Vu8V9n7WjRKVuMoEO8Y+bKKq854AHQVFaaJpWn2tra2GmWdrb2TtJaxQ26okDMGDMgAwpIdwSOu5vU0AYHjG1mn8U+CHiv7i2VNak3RxLGVk/0K5bnchPRWXgjiRv4trLh+HNQ8R65pXhK2v/ElxDca1osmrXF5Z2sCOpRbVViVXR12nz2ZjjJflSi/IPRZbaCeSGSeGOR7dzJCzoCY2Kldyk9DtZhkdmI71RvfDmh6jpVvpmoaNp93p9tt8i0ntUeKLau1dqEYXCkgYHAOKAPO5PF/iS/0C61+HU47NLHwfZa+1nDaoUmuXW5dkLPlhEfKAZR8/C7XTDbuy0G61SHxVqmjarqH9o+RZWt6JjAsWx5nuEeNFXpGPIUqGLONx3O3GNufTbG6+0/abK3m+1wi3uPMiVvOiG7Eb5HzL878Hj5m9TUq20C3Ul0sMYuJEWN5Qg3sqliqk9SAXYgdtx9TQBxt/wCIdUh/t7yrrb9k8TaZYQfu1OyCb7D5idOc+fLyeRu4IwMVdG1rXTqum3N9qv2m31HxBqWlLZ/Z0RIoYWvGRtwG5pB9mVc5C7DgoW+c9de+HND1HVbfU9Q0bT7vULbb5F3Pao8sW1ty7XIyuGJIweCc1ZXTbFPK2WVuvkzPcRYiUbJX3b5BxwzeY+SOTvbPU0AeU65qWsX3w88S22saveLNe+HLu9j2x2kltcLGil2s5IssLc+YFxODIySoVZWVzWt8QvFGo+FLC5mstU1C4l0bTEupgkVmkbuxdY2unlK7lkeMqEtwrgh+7xgdvF4c0O3/ALR8jRtPi/tTP2/ZaoPted2fNwPnzubO7P3j6mifw5odzDaw3OjafNFZwvb2ySWqMsETpseNAR8qlPlIHBHHSgDiGutU0vxN4m1O01DZbL4m060axEClZvPhsIXaRzlvlWQFAhTDAlt4O0UrfVdYhSz0jRk1Qi61DX7qVtIFp9oHlakVUZuj5ez98c4G7ITGBuz6J/wjmh/27/bf9jaf/a3/AD//AGVPP+7s/wBZjd935evTjpRfeHND1OwFjqWjafeWgma4FvcWqSRiVixaTaRjcS7knqSx9TQBRttcnHw2i1/Vbizs7gaSL25niU3FvC3k72ZQjEyIDkgKx3AcNzmvO9R1TV9Yi1LQbvUtYtZNM1PQpjJef2e10jz3wXY3kBogoCRSKCofd97chCn2SshfCfhxdMk01dA0sWMiLG9qLKPymVXaRVKYwQHdmAxwzE9SaAOb1HXNXj1nU72HUZI7fTNdsNJWwEUZhnjuPsm+RyVMm8fanxtdV+RMqfm3UbbU/E91NYuPEPlrqviDUdJSMWURW2t4Xu2V14y04FsFVmJjAI3RuwLN3cuiaVPrMOrz6ZZyanboY4b17dTNGpz8quRuA+ZuAf4j61Kum2KeVssrdfJme4ixEo2Svu3yDjhm8x8kcne2epoA4RtZ8RahpNjFaXd5LKl1qNvN/ZZs1v5xbXRgSXbc4i2bRmQqAQ7x7Qqkiu20S/TVNA0/UIrmO7S7tY51uIoWiSUMoYOqMSyg5yFJJGcEmo77w5oep2AsdS0bT7y0EzXAt7i1SSMSsWLSbSMbiXck9SWPqa0qACvOBc3trqXiSTTJo4bporaNGd0Vjv1K9UrGZPk80hiIw/ymQoG4Jr0euK8PW0F54p8RWt5DHPbz2aRyxSoGSRTe34KsDwQQcEGgCHTdf1IXOiWM19ePM2uyWN9Ff28C3CL/AGfNcLHI0OYmOfLcNFj5Sqn5g+eb8Wa5q+q+DNcsp9Rkjik0nxMz+XFHlha3iRRLyp48oshxyQxOd2GHpv8Awjmh/wBhf2J/Y2n/ANk/8+H2VPI+9v8A9Xjb975unXnrRD4c0O3sFsbfRtPitEhlt1t0tUWNYpSDJGFAxtcgFh0JAzmgDiPiF4o1HwpYXM1lqmoXEujaYl1MEis0jd2LrG108pXcsjxlQluFcEP3eMAa61TS/E3ibU7TUNlsvibTrRrEQKVm8+GwhdpHOW+VZAUCFMMCW3g7R28/hzQ7mG1hudG0+aKzhe3tkktUZYInTY8aAj5VKfKQOCOOlRS6J4cg8RQ6vPpmlx6zcOY4b17eMXEjCM/KrkbifLVuAfuqewoA4C31XWIUs9I0ZNUIutQ1+6lbSBafaB5WpFVGbo+Xs/fHOBuyExgbs7fiu5vdZ/Z+1S9vJo7a8ufDj3M7WLpJHuNvvdUY71KNyuQT8pyrZw1dTfeHND1OwFjqWjafeWgma4FvcWqSRiVixaTaRjcS7knqSx9TV65toLy1ltbyGOe3nQxyxSoGSRSMFWB4IIOCDQBwdzq+s2l/fXA1i4li0jWtO0f7NJDD5d2k4tA80pEYbzP9KcjYyJlE+XG4NueC7rVNQtNRvtV1D7Sp1O9traFYFjWGKG7mjXJHLMQoBPAwqcbtzPrS6JpU+sw6vPplnJqduhjhvXt1M0anPyq5G4D5m4B/iPrVq3toLWMx2sMcKM7yFY0Cgs7FmbA7lmJJ7kk96APMU1efT/Dnk2l/qFqx1PXLuVdNS0EvlRahKHkaW7IhSNPMG4Y3kspBCq+SPxp4iudEvPEK3dvFFZeDLTXDYLbAxy3Usd0xBYncI/3a5UHcSqYYDeH9El0TSp44Y59Ms5Et7o3kKvbqRHOWLeaoI4fczHcOcsTnmhdItLe1ki0yKPTXa1W1jmtIY1eGNAwjCgqVwm5iqkFRk8cmgDgNS8R65od94i0yDW5NbeyTSIYdsNut1C93dSRSA4CxmXYUZNyqgHl7lPzM/U+Cr7Vbuz1GHWxcCWzvfJi+2vbNdFDDFJ++FsxjVt0jYACnZsJGTkxeHfBUGkx3y6hHpcyXtqlk1nYaaLW0ECNK+3yS75LNcS7jnBBHyjBLdBp+m2OkWEdjpVlb2NpFny7e2iWONMkk4VQAMkk/UmgDktO1fVR4yRNSv7j7Jd3txaW4jS2lsJSgkZY42Q/aEnVYiXMuU3RzKBzGRFoeuXsfguDxLrHieNTqGhHVntbq0R0s8RpIzxJFskaJPMwysXY5jG9Tnf1sWiaVBrM2rwaZZx6ncII5r1LdRNIox8rOBuI+VeCf4R6UWOiaVpd1d3WmaZZ2dxfP5l1Lb26xvcNknc5ABY5Zjk56n1oA8yfXtRvTqeianJqEjabqegTH+1DZm5R5tQXKN9kPlhdsaMAQH+dicqVrX0TxH4ivvF0LzR3i6dcatfaewnazS08uA3CoYAG+0tKTAm4NlcGUgABSvZWnhzQ7C2W3sdG0+2hXy9sUNqiKPLkMqYAGPlkZnHozEjk5qSLRNKg1mbV4NMs49TuEEc16luomkUY+VnA3EfKvBP8ACPSgDA8S3uoP440HQrPXv7Hh1GyvZHMcUTzTPE1uVWIyBgGCvIT8rDZv4zhl5qXxjruo+FZ9divvsEum+ErTXzbW0KGK6mlSd2jk8xWbyx9nUAIyNh2+YnaV7fV/C1jrut2t5qsNveWkNlcWkljc26yxy+bJBIGO7j5TbjjB5IPGObt9omlapdWl1qemWd5cWL+Zay3Fusj27ZB3ISCVOVU5GOg9KAOJv/F+t6Tr76fcJJLb6bqD3F7dtGqI1jK0SxlvlxGkYupD5mfm/s2XJGX2ZF94r8ZrbPJHFqCXNtosetNCq2UEVu88lw62941wVYRxLEkZaPY5CyMxBK49Sn02xuvtP2myt5vtcIt7jzIlbzohuxG+R8y/O/B4+ZvU1FfaJpWqXVpdanplneXFi/mWstxbrI9u2QdyEglTlVORjoPSgDJ0G61S+8X+JvteobtP0+9S0tbNYFXbutbaVmZ+rfM52jjG587vkCZuo6vqtr4yd5b+4i0uK9t7QG1S2mtUMojUR3Kki4WdnlwpT5FV4GYEeYD2UVtBBJNJBDHG9w4kmZEAMjBQu5iOp2qoyeygdqqy6JpU+sw6vPplnJqduhjhvXt1M0anPyq5G4D5m4B/iPrQBwGiy32k+BvssGsapcXl74j1KCE28Fq11KVublmSIuqQoSInkZpARjzFUAmMLF4Q1S88UeLfC2tzalcMh0zWYREPs7LMkN7BEru0YILMuxmMbbCyDZhSwb0CTw5octheWMujae9pfTG4u7drVDHcSkgmR1xhmJVTk5OQPSpBomlC6troaZZi4tXlkt5fs674WlJMrIcZUuSSxH3snOaAPN08WeILrwWdXGrSQ3Gk+D7PXXWOCLZfTyRzs6zAoSEzbjiMxn535+7t1rzWtdg13WbxdV/0HT/EGn6bBYC3Ta6XC2ayGR8bjj7QzJtKkNncXUhV66Xw5odx/Z3n6Np8v9l4+wb7VD9kxtx5WR8mNq424+6PQVZfTbF/N32Vu3nTJcS5iU75U27JDxyy+WmCeRsXHQUAclp2r6qPGSJqV/cfZLu9uLS3EaW0thKUEjLHGyH7Qk6rES5lym6OZQOYyO2qjFomlQazNq8GmWcep3CCOa9S3UTSKMfKzgbiPlXgn+EelGk6VBo1lJa2ryOkl1cXRMhBO6aZ5mHAHAaQge2OvWgDzex8X+JNL8F2es6hqceqXV94Pudc2S2qRxRTQR25QKEw2G8878scsAU8sfLXZaDNqFp4q1TQr7VLjVYraytbyO5u44llBme4Rk/dIi7R5CkfLnLNkkYA24NNsbX7N9msreH7JCbe38uJV8mI7cxpgfKvyJwOPlX0FRaVomlaData6Hplnptu7mRorO3WFGYgAsQoAzgAZ9hQBgRXuoXnibV55Ne/s600nU4LBLR4ojBcCSG3k+csPM8xmuCi7XUZEfyt8wfIh8W3y/EXTLJL28ubPVNQvLNRLHax2oW3jmL+Sgb7SXSSJUZ3zGSXIADR47aXRNKn1mHV59Ms5NTt0McN69upmjU5+VXI3AfM3AP8R9aF0TSl1OTUl0yzF9I6yPdC3XzWZUaNWL4ySEdlBzwrEdCaAPN9BXxBr914IvL3xHJHfal4curu4u7eziV0VjYHZErBkUk7SzMr5zJtCAoI5JfGOu6j4Vn12K++wS6b4StNfNtbQoYrqaVJ3aOTzFZvLH2dQAjI2Hb5idpXu77wn4c1S1tLXU9A0u8t7FPLtYriyjkS3XAG1AQQowqjAx0HpVm+0TStUurS61PTLO8uLF/MtZbi3WR7dsg7kJBKnKqcjHQelAHG3mta7Brus3i6r/oOn+INP02CwFum10uFs1kMj43HH2hmTaVIbO4upCr0Him7vY59E06wvJLE6rqBtZLqFEaWJVtp5spvVkyTCqncrfKzYwcEa76bYv5u+yt286ZLiXMSnfKm3ZIeOWXy0wTyNi46CjUNNsdXsJLHVbK3vrSXHmW9zEskb4IIyrAg4IB+oFAHltj4k1jw14cupEmt55bay8UahKnkbYpri31AbG27iyr+8f5Q/RuSSAa6C91LV9Dj8UWT+IJJzpOkwatBqGowx5Ri1xujkEMQBixbLnanmYd8Nnbt62w0TStLjt49M0yzs0tkeOBbe3WMRK7BnVQANoZlUkDqQCelR2PhzQ9MsDY6bo2n2doZluDb29qkcZlUqVk2gY3AohB6gqPQUAc3Y+IdUuX8P3El1tGp+ILy1nthGuIIooLsCDOPvK9uhdgzAuH2sYyorlv7f1u1tdO8YXN9He3E3gnUtXht5rdVS3lIs5TGCm0tEDtChsuMNl2yNvq39m2P2n7R9it/O877R5vlLu83y/K8zOM7vL+TPXbx04qtZeHND07VbjU9P0bT7TULnd593Baoksu5tzbnAy2WAJyeSM0AYng2+1uTVdTsNaGoeVBDbzQnVnsjdZdpVbK2jbRH+7XaWUEt5nJAAXDSbUNGufG09rqlw8t34msLNGkjiP2YTx2UbOmEGWVJsLv3D90hIY79/d6VomlaData6Hplnptu7mRorO3WFGYgAsQoAzgAZ9hQ2iaU8l/I+mWbPqaCO+Y26k3ShSoWQ4+cBSRhs8HFAGb4Wu72SfW9Ov7yS+OlagLWO6mRFllVraCbL7FVMgzMo2qvyqucnJPNw+Lb5fiLplkl7eXNnqmoXlmoljtY7ULbxzF/JQN9pLpJEqM75jJLkABo8d3p+m2OkWEdjpVlb2NpFny7e2iWONMkk4VQAMkk/Umol0TSl1OTUl0yzF9I6yPdC3XzWZUaNWL4ySEdlBzwrEdCaAPLv7f1u1tdO8YXN9He3E3gnUtXht5rdVS3lIs5TGCm0tEDtChsuMNl2yNvW+HLO9sfiTr8F/qcmpkaTpxjuJoUSXaZr3h9gVGIO7BVV+XaCCQWboLLw5oenarcanp+jafaahc7vPu4LVEll3Nubc4GWywBOTyRmjSPDmh+H/O/sHRtP0zz9vm/YrVIfM25xu2gZxk4z6mgDiEm1DRrnxtPa6pcPLd+JrCzRpI4j9mE8dlGzphBllSbC79w/dISGO/f1Pha7vZJ9b06/vJL46VqAtY7qZEWWVWtoJsvsVUyDMyjaq/Kq5yck6TaJpTyX8j6ZZs+poI75jbqTdKFKhZDj5wFJGGzwcVLp+m2OkWEdjpVlb2NpFny7e2iWONMkk4VQAMkk/UmgDhLTxHq8vijQmk1uNYdV13UrF9KaGP/AFNqt0itE2N4GYo2kJLfMy7Si5VsTStc1ey+G1tLp2oyWaeHfBNhq0cMcUbJeSNDMTHMXVm2f6Mo/dlG+d/m+7t7aPwc/wDwmI1q4urN0jujdoYtPWK6lk8qSFFmnDYlREmkVRsDABMscMX15fDmh3H9nefo2ny/2Xj7BvtUP2TG3HlZHyY2rjbj7o9BQBxDXWqaX4m8Tanaahstl8TadaNYiBSs3nw2ELtI5y3yrICgQphgS28HaJYfFt8vxF0yyS9vLmz1TULyzUSx2sdqFt45i/koG+0l0kiVGd8xklyAA0eOy/4RzQ/7d/tv+xtP/tb/AJ//ALKnn/d2f6zG77vy9enHSpF0TSl1OTUl0yzF9I6yPdC3XzWZUaNWL4ySEdlBzwrEdCaAMn4cf8ks8Kf9gWz/APRCV0lR21tBZ2sVrZwxwW8CCOKKJAqRqBgKoHAAAwAKkoAKKKKACuP+J/8AyJd1/wBe95/6RXFdhXH/ABP/AORLuv8Ar3vP/SK4oA+YvGHiXxifFfjm6s/Ht5YW+katLHFp76zNFLMrXDoFgjBwwQDJAxtXFcb/AMLH8cf9Dl4g/wDBpP8A/FV7B4Y1vStJ8a/EuPVNTs7J5vGGmyRrc3Cxl1j1RmkYBiMhV5Y9hyayNZ8aR6hovxUEuvW7y22tWtz4dSO4RfLK3km6a1VSMMUO5pE5bcWYksSQDlvF+r/EPwVqaaXq3j/VJNTVFa6s7fVbpntCyK6q7HCEkOPuM44PPTPP/wDCx/HH/Q5eIP8AwaT/APxVe0+K/F1pqPi74mf8I94ns01e4tdLi0K+TU44AIUKNcRw3LOEQZOWQONxzwSDg1fx3YaR4O1660rXNLl8Tw6F4fSeUyQ3T3F9FK5lcFtyzuilCXG/bgcgrwAeLf8ACx/HH/Q5eIP/AAaT/wDxVH/Cx/HH/Q5eIP8AwaT/APxVe0+EPHtpeR/DeLxB4ksxb3z66/iK2mu444ZDK0jJ9piyEAYsSoYY54FYlnqWjeJfDvgS+17xTGPEFnp+rvJPJexC7lmWTNtC9xNuFucMzRyOPlI+TDEEAHB+HvE3xL8Va7b6NoPijxBd6hc7vKh/tiRN21S5+ZnAHyqTye1H/CXeOP8AhFf7b/4WJqH/AB+/ZPsH9tz/AGr7m/zfL3f6v+Hdn73GK9g07xjo2j+Lvhlfajr8cdwqalaavPNrcWozCNzm3S5uIsBk3sGXcAqe20mqPw88S6bpuk6RH8QfEOn3eoR+M/tM8lzqMd62DppSGYurOCqyGMeZnCFRkjacAHjf/Cx/HH/Q5eIP/BpP/wDFUf8ACx/HH/Q5eIP/AAaT/wDxVe2/DvxNb6aPC6fEDxRp91rcPiC7njurnWIbxrezOnuhBnV3WNWlKDYWG4gEA4rzfV/EUevfAKEavqNvda3b+JmFvA7p5ttaG1GVijH+rg3hQFUBAVAA4FAFXRdc+Iut6Fresw+N9Yt9P0SFJbqafVrjlpG2RxqqkkszZAOAox8zLxVqSf4tx2F5dDxPrEv2GEz3dtD4jElzbICAxkgWYyptLAMGUFed2MGiD/Sf2X7qG2/fS2fi1Li5SP5mgie12JI4H3VL/KCeCeOtaXhH7D4Z8J+KhqF14ftVufD9zbW2q6fqazXd88joUiNu0jFFccHMCOqjkowJoAw9a1z4i6JoWiazN431i40/W4XltZoNWuOGjbZJGysQQytgE4KnPys3NfQv7NWt6rr3w21C61zU7zUrhNWkjWW8uGmdVEMJCgsScZJOPc14JP8A6N+y/aw3P7mW88WvcWySfK08SWux5EB+8of5SRwDx1r239lT/klmpf8AYal/9EQUAd78O/8Ajy1T/r4tv/TfaV2Fcf8ADv8A48tU/wCvi2/9N9pXYUAFeaS6hdabqmuSWEvkzTyafZiUKGaIT6tdws6ggjcqyErkEZAyCMg+l15sNY0nRvEOrpr5sntdRtjB5Fxd2yeYq3l7vDRyyKSpEgHQg8jsaADRbrVNJ8XXNjLqH2prvxb9muZjAqNPENEWRNwHAbMcZYrtBKnAVTtFZ/FGv2PhXXLy81S4/tBvD93qVmzRWstrI8SKfOs5IiT5CtImBcAuyvGf4ZM6Gn+K/AOkQxw6VZaLYxRTG4jS2utOjVJShQyALMMMUJXPXBI6UReK/ANv/aPkWWixf2pn7fsutOH2vO7Pm4m+fO5s7s/ePqaAHXmta7Brus3i6r/oOn+INP02CwFum10uFs1kMj43HH2hmTaVIbO4upCrk6fd6xofg+zstOvNUv7jU/FOp2rS26WgukVZbyQmLzFSHJaDc28Hh5AuPkC7r+PfB7+bvGmt50yXEub+wO+VNuyQ/vuWXy0wTyNi46Cq0nivwDLYXljLZaK9pfTG4u7drrTjHcSkgmR187DMSqnJycgelADbbxBrl1BpdtfarHozra6nd3N3KLeXAs7mOKNbgqxjAKSFphGyEMpCtHgiq2g+Kdbu9Oi1TU9ejtbOz8H2Gr3TPYrIGnljud8jBMMUHlhjGmCSq7WUbg7Nb8VeH7y10yHR73QbRNMdXt7e9+wXNvEVAEboguUaN0xhWVgAGYbT8pW9ofjDwf4f0qzsbG4tG+yWUFitxJqdgZZIoVIQOwmGcZY+mWbAGaAOd1HVNX1iLUtBu9S1i1k0zU9CmMl5/Z7XSPPfBdjeQGiCgJFIoKh933tyEKek1DWtdufEsmlWGq/YkfxMNPEgt0kaO3/sgXDKuRjd5mWVjnBxkMoKGBfEXw6XTJNNXTNBFjIixvai407ymVXaRVKebggO7MBjhmJ6k1e/4T3wf9p+0Y03zvO+0eb9vsN3m+X5XmZ87O7y/kz128dOKAKkHiPV7wWNpNrcemiBNXmn1GWGMiQWF4luhmBAUIysXk2eWcj5WjHFdT4K1C61fwD4f1LUJfOu7zTLaeeTaF3u8SsxwAAMkngDFcVrnirw/fR2f9k3ug2ptLprtYr77BdQ+czF/OCi5RllDFiHD/xvkEkFdLRPHPhbQdA0/SLO/ge30+1jtYml1WxLsqKFBYiYDOBzgCgDvqK4/wD4Wf4c/wCfy0/8Gll/8fo/4Wf4c/5/LT/waWX/AMfoA7CiuP8A+Fn+HP8An8tP/BpZf/H6P+Fn+HP+fy0/8Gll/wDH6AOworj/APhZ/hz/AJ/LT/waWX/x+j/hZ/hz/n8tP/BpZf8Ax+gDsKK4/wD4Wf4c/wCfy0/8Gll/8fo/4Wf4c/5/LT/waWX/AMfoA7CiuP8A+Fn+HP8An8tP/BpZf/H6P+Fn+HP+fy0/8Gll/wDH6AOworj/APhZ/hz/AJ/LT/waWX/x+j/hZ/hz/n8tP/BpZf8Ax+gDsKK4/wD4Wf4c/wCfy0/8Gll/8fo/4Wf4c/5/LT/waWX/AMfoA7CiuP8A+Fn+HP8An8tP/BpZf/H6P+Fn+HP+fy0/8Gll/wDH6AOworj/APhZ/hz/AJ/LT/waWX/x+j/hZ/hz/n8tP/BpZf8Ax+gDsK80/tC60fxLqWpwS7ba1ktTfIVG17d7+/idmcg7Fj8wTM3pCQSASRt/8LP8Of8AP5af+DSy/wDj9YNp4h0Sz1TUJ9Xl0640/WbEKsb6jZssqfarwsrBpQGGJQDjIzuHUEUALp/jXX57dv7XEmimwtbnV76e7szKIrdrdJIYXiCq2Ea4dNwIZzp8g6s4Ssni3xFGNa0mC9vIb6xutHRZdZjs5pomu7zy3R0tWCbPLCkKdsnzsdwBQjoV+I3hZbqS6WaxFxIixvKNSsd7KpYqpPn5IBdiB23H1NUrTxX4BsLZbexstFtoV8vbFDdacijy5DKmAJsfLIzOPRmJHJzQBBean4ns7nWZbbxD5iaZrWn6VbRXNlEyy/aI7NHkn2BC+GuGdVjMeGzkspVVvWmuavbeIbXRptRku0g8Rtp0lxNFGJbiE6U12A+xVUESMMFFX5UUHPzFnP498Hv5u8aa3nTJcS5v7A75U27JD++5ZfLTBPI2LjoKP+E98H/aftGNN87zvtHm/b7Dd5vl+V5mfOzu8v5M9dvHTigDCsfF/iTS/BdnrOoanHql1feD7nXNktqkcUU0EduUChMNhvPO/LHLAFPLHy11Phq91BPHGvaFea9/bEOnWVlIhkiiSaF5WuCyymMKCxVIyPlUbNnGcs2c3jjwilrHFYz2Ng8Fq1razW19pwe1jYKMRgylQBsQ7cFfkXIOKyPCniLw54dmubiS/wBFEs0MVskOly2VnbRRRvK67YvtT/MXnkJO7ByvAIJYA9Vorj/+Fn+HP+fy0/8ABpZf/H6P+Fn+HP8An8tP/BpZf/H6AOworj/+Fn+HP+fy0/8ABpZf/H6P+Fn+HP8An8tP/BpZf/H6AOworj/+Fn+HP+fy0/8ABpZf/H6P+Fn+HP8An8tP/BpZf/H6AOworj/+Fn+HP+fy0/8ABpZf/H6P+Fn+HP8An8tP/BpZf/H6AOworj/+Fn+HP+fy0/8ABpZf/H6P+Fn+HP8An8tP/BpZf/H6AOworj/+Fn+HP+fy0/8ABpZf/H6P+Fn+HP8An8tP/BpZf/H6AOworj/+Fn+HP+fy0/8ABpZf/H6P+Fn+HP8An8tP/BpZf/H6AOworj/+Fn+HP+fy0/8ABpZf/H6P+Fn+HP8An8tP/BpZf/H6AOworj/+Fn+HP+fy0/8ABpZf/H6P+Fn+HP8An8tP/BpZf/H6AOworj/+Fn+HP+fy0/8ABpZf/H6P+Fn+HP8An8tP/BpZf/H6AOworj/+Fn+HP+fy0/8ABpZf/H6P+Fn+HP8An8tP/BpZf/H6AOworj/+Fn+HP+fy0/8ABpZf/H6P+Fn+HP8An8tP/BpZf/H6AOworj/+Fn+HP+fy0/8ABpZf/H6P+Fn+HP8An8tP/BpZf/H6AOworj/+Fn+HP+fy0/8ABpZf/H6P+Fn+HP8An8tP/BpZf/H6AOworj/+Fn+HP+fy0/8ABpZf/H6P+Fn+HP8An8tP/BpZf/H6AOworj/+Fn+HP+fy0/8ABpZf/H6P+Fn+HP8An8tP/BpZf/H6AOworj/+Fn+HP+fy0/8ABpZf/H6P+Fn+HP8An8tP/BpZf/H6AOworj/+Fn+HP+fy0/8ABpZf/H6P+Fn+HP8An8tP/BpZf/H6AOworj/+Fn+HP+fy0/8ABpZf/H6P+Fn+HP8An8tP/BpZf/H6AOworj/+Fn+HP+fy0/8ABpZf/H6P+Fn+HP8An8tP/BpZf/H6AOworj/+Fn+HP+fy0/8ABpZf/H6P+Fn+HP8An8tP/BpZf/H6AOworj/+Fn+HP+fy0/8ABpZf/H6P+Fn+HP8An8tP/BpZf/H6AOworj/+Fn+HP+fy0/8ABpZf/H6P+Fn+HP8An8tP/BpZf/H6AOworj/+Fn+HP+fy0/8ABpZf/H6P+Fn+HP8An8tP/BpZf/H6AOworj/+Fn+HP+fy0/8ABpZf/H6P+Fn+HP8An8tP/BpZf/H6AOwrj/if/wAiXdf9e95/6RXFH/Cz/Dn/AD+Wn/g0sv8A4/WL4q8VaX4q0G607S7yyNwbS7YBtTtDn/RJl/hmPdgSTwACSQBQBla3+zV4O17X9Q1e81LXEuNQupLqVYp4Qis7FiFBiJxk8ZJqj/wyp4H/AOgr4g/8CIP/AIzXe/8ACz/Dn/P5af8Ag0sv/j9H/Cz/AA5/z+Wn/g0sv/j9AHBf8MqeB/8AoK+IP/AiD/4zR/wyp4H/AOgr4g/8CIP/AIzXe/8ACz/Dn/P5af8Ag0sv/j9H/Cz/AA5/z+Wn/g0sv/j9AHBf8MqeB/8AoK+IP/AiD/4zR/wyp4H/AOgr4g/8CIP/AIzXe/8ACz/Dn/P5af8Ag0sv/j9H/Cz/AA5/z+Wn/g0sv/j9AHBf8MqeB/8AoK+IP/AiD/4zR/wyp4H/AOgr4g/8CIP/AIzXe/8ACz/Dn/P5af8Ag0sv/j9H/Cz/AA5/z+Wn/g0sv/j9AHBf8MqeB/8AoK+IP/AiD/4zR/wyp4H/AOgr4g/8CIP/AIzXe/8ACz/Dn/P5af8Ag0sv/j9H/Cz/AA5/z+Wn/g0sv/j9AHKaZ+zr4b0ew1Gx0/XvECWmqQiC8t3ktpI5lBypKtAQGU8q4wynOCM1m/8ADKngf/oK+IP/AAIg/wDjNd7/AMLP8Of8/lp/4NLL/wCP0f8ACz/Dn/P5af8Ag0sv/j9AHKan+zr4b1iw06x1DXvED2mlwmCzt0kto44VJyxCrAAWY8s5yzHGScV2Xw/+H+lfDfQJ9I0O4vJ7ee6a6Zrx1ZwxVVIBVVGMIO3rUH/Cz/Dn/P5af+DSy/8Aj9H/AAs/w5/z+Wn/AINLL/4/QAfDv/jy1T/r4tv/AE32ldhXIfDwAWmqgOjgXNtho3Dq3/EvtOQwJBHuDg119ABXntnq/wDYniPWLryPP8ySwtNu/bjz9Vu4d2cH7vmbsd8Y4zmvQq8vvNGfX7/W9OW0jvEkuNNeeCUKUeFNYunl3BuCNisSO/TBzigDudQ1me21+20iztI57i60+6u4mlmMaboWhUIxCsQGM/LAHG3oc1W03xZBrN1pkOmW0jG7tWu7pZmCvYKp2eXKo3bZTLuTYcf6qfnMe00rLwXpuh+P9P1Lw9oOn6baDTLyC6ksreOHc7S2zRhgoBbiOXBwQOemRm74d0Z9M1zxJcyWkcCXmoK9q6hfmh8iIt05A89rlsHHzSO2PnJIBm6H401W80bSNa1vRbOw0rVktzDNa6i1xJE1xtEIkQwpgFnVCVLYZlyNu5ljk8a65FpGqa62g6f/AGJpk14s0g1R/tLRWsskcjLF5G0sfKYqpkAOQCw6ijoGm65e+CPDfhfUfD95pJ0tNOa6vbqa3eMm0eKQrGIpXZizRBRuCgKWbOQEaL/hALgaLcXTR6hLe/21d3cumHVpvst9aveSsYjD5giO+F9wU7VL7RIdpcEA6m71zVbjU7qy8MaZZ3xsHWK8lvr5rVEkZFkCJtikLEI6MSQqjeoBY7gtKXxlfX15plr4a0m3upr2G8lmXUb1rX7M1tNHDLGSkcoZhJIVyPl+QkMwINSEal4b1zV7m10S81q31e6S7BsZYEe3ZYIoSjiaRAQRCrBlJzuYELtBfm77wdLBfaLLrPhSPxVbxpqs1xbRLbSpbT3d1FcKFFw6Bgo81A4AJxnau7AAOtGuarZz6Rba5plnBcapqD2iizvmnSNRbSzByWiQkkwlduO4Oe1Gua5qtnr+naRoemWd9cXlrcXTNeXzWyRrC0KkArFISSZx2H3TXPyaa9la6Fd+HfAdxpcWn609zcaZbCxhkdWs5ovNASbyz80iDlg2FPGAKj8QWU3iLX9H1PWfh3eanZ2lre272N5/Z8rpI7WzJKFacpgiOVchtwweACCQDpJdc1Ww06Eatplmmq3t0bWws7S+aWOZvLL5eVok2AKkjN8pwqfLvYhCLqviOW1khi0GzTVYHXzYp7+RbV42DYeKcQEucjBQorA5J+Uoz5MOhrHpunXugeEf7AbSdTa+/skJawteZt5IWKmF2jDbZcruIyYwpKKd46TSLrVL7zrnUrD+zYW2rb2krK864zuaRkdkGTjCqTgLktltiAHLWXjfxHe6FoGoJ4d0tX8QvELGI6xJhVe2luCZG+zfKQsQGFDZLdRjm8/jK+sJLi01rSbeHUIJtPUx2l600RivLr7Ojb2jQ7lZZCV24wFw3zHbmQeD7658GfD3SdQguIW0nyP7RFtetBJBs0+aI4kjcN/rGRfkPIJ6rmh/B99ZWmoWNrBcXpbWtNu7e+ur1p5ntY7uKVonklct+62zFV+7sZcFpGkNAG4fE99LNPd6do/2zRLWaS3uLmOdvtJeNykpitwh8xUdSD8yudj7Ef5N/QXFzBaxiS6mjhRnSMNI4UFnYKq5PcswAHckDvXLWMOu6Elzoum6X9o+0XtzdQatJIn2aETzvMfNj3iUshkYBUBD4TLx7m8s+J0H2rwQbf7Lb3nm6npqfZro4imzfQDY52thT0PytwTwelAG3/wkeh/2F/bf9s6f/ZP/AD//AGpPI+9s/wBZnb975evXjrUi63pTWsl0up2Zt47Vbx5RcLsWBgxWUnOAhCMQ3Q7Tzwa43+yNZ+3f8JH/AGPcb/8AhIP7T/svzoftXlf2b9ixnzPK3b/nx5mNnfd8lVh4H1SeLTmdPsyX97dnVrfKn/RZb43qJNhsSYUPblBuUfa5SCyht4B3d/relaXHcSanqdnZpbIkk7XFwsYiV2KozEkbQzKwBPUggdKP7b0oR2sh1Oz2XiLJbN9oXE6syKrIc/MC0sYBHUyKP4hnzseC/Edto9jey3eoXOr2Wpo7z2zwNeyW8NpJZoUa4LRnzGZrgq5G37RKOX5bX8P+Ermz13w9e3tlJILO11WZ5r2SGWaG4urmGUEmNVUOymYHyxtX5lDMMMwBr694zsdF8SafojXGnpd3MMl5N9tvlt1htYseY/RiWwWZVIVSIpSXXZzpT+I9DtprWG51nT4ZbyZ7e2SS6RWnlR9jxoCfmYP8pA5B461zfxA8Paprf2v+y7Xz/M8M6tYL+8Vczz/Z/KT5iPveW/PQY5IyKq+KfDWof8Tyw0LSPMtNb8PxaLbG2aKOKwKfaVDSKzKRGBcJjy1c4Rvl+6GAOybW9KXU49NbU7MX0jtGlqbhfNZlRZGUJnJIR1YjHCsD0IqXT9SsdXsI77Sr23vrSXPl3FtKskb4JBwykg4II+oNcRq3g2bUP+En83Sbe4/tbxBpk7eYIz9ps4fse8Pnqq+XcfI3X5sA7uel0HT7qy1rxNPcxbIr7U0nt23A70FnbRk8Hj543GDg8Z6EUAWZ/Eeh2ttc3FzrOnww2mPtEsl0irDmRohvJOF/eI6c/wASsOoIok1yxTyLj7fp/wDZ8tlJe/aWu1GYk2HzFGMNHtfLPuAXKdd2RyK+HdV0zwy507TvKvn8QX1/O9kls14Ulmn2SwtN+68wxvEpMnIiLqMNtFYh8F+J38IT2l3aedqEmi+I7Zz9pibfPd3SSQ/MAgO9QTnagHcJ92gD0231vSrqQx2up2czrdPZlY7hWInRSzRYB++FUkr1ABOOKlXUrF/K2Xtu3nTPbxYlU75U3b4xzyy+W+QORsbPQ1xuteFb1dX1G90PT44xY6fpjaVHCUi3SWs1y7W6HI8oPFIIS33QszD5huWqOn+ANY097q0kubfWIbfTJDZ/2pHutri9ngjikaSPcxHzQSSO3Jf7fMM53lwDpb/4heFbDQk1n+3dPudPa9isftFvdxOglkZRgtux8qtvbnIRWbHFa0ut6VBrMOkT6nZx6ncIZIbJ7hRNIoz8yoTuI+VuQP4T6V5udA8WSy6xqN5Y6pfmR9FktYr24svtTra3zzTIRDsiUhTuALHIYfPklE0r/wALaxN43viTqj6Zf6tZ6mFt5rRLRfIS3/1xdGuN+62yFjG1h5YLLlyoB3dtqVjezSw2d7b3EsP+sSKVWZPndOQDx88ci/VGHUGuT8O3MFr4v1uS6mjhRooIw0jhQWe/vlVcnuWYADuSB3rV8G6M+i6TfJPaR21xdatf3chQLmUSXUjRuxXqTEY+vIAAOMYHH3mjPr9/renLaR3iSXGmvPBKFKPCmsXTy7g3BGxWJHfpg5xQB30fiPQ5b+zsYtZ097u+hFxaW63SGS4iIJEiLnLKQrHIyMA+lSW+t6VdaibC11OzmvFR5DbR3CtIFSQxs20HOA6lCezAjqK4m/8AC2sTeN74k6o+mX+rWephbea0S0XyEt/9cXRrjfutshYxtYeWCy5crZ0vwre2UmjyLp8cLx+KdS1O8ZCgLRyrerFKxB+YlZYB3YDAIG04AOpg8R6HczXUNtrOnzS2cyW9ykd0jNBK77EjcA/Kxf5QDyTx1qy+pWKebvvbdfJmS3lzKo2Svt2Rnnhm8xMA8neuOorzLw/8P9Ym0aPStZuNUhm0/Qn0q1vbp7RobeU+SVmtUhUSMFe3R1aVkddqYBYsU0tH8Ia2df07UNWeQW9451XUrSSRZEhuVaZooG+bEhUXMQEgGB/Z0WAMpsAOk1XxlpVnoHiHUNMvLPVLjQLWaa6tLe6UvG0au3lvjJQkow5HY8cVLqPimxtdOe60+a31HytTt9MnWC4U+TLLcRwsrEZwyeaGKnB4xxnNed3PhLxhfWuow3NlJsHhbUdLt7cSWkdvHcyCALHbJGqstufLwhlYuAmGCYBfbm8P6lqUs95Z6BJpFvv0S2g0+Z4FeOOzvmmkYCJ2QII5PlAbd8jDaPl3AHbRa3pU+szaRBqdnJqdugkmskuFM0anHzMgO4D5l5I/iHrV6vO9E8Laxa+LoRfnVJLOy1a+1OFjNaLYjzzcbdgVDcM4W5wVcqoO8hiFQN22k6rBrNlJdWqSIkd1cWpEgAO6GZ4WPBPBaMke2OnSgA0/W9K1aSWPS9Ts714UjkkW2uFkKLIu6NiFJwGXlT3HIo0rW9K161a60PU7PUrdHMbS2dwsyKwAJUlSRnBBx7ivO4fAGqHwPouiW9lb2MqeDL7SrjLKscV5Otr97ZnOXSVmZQeQTySM9doMOoXfirVNdvtLuNKiubK1s47a7kiaUmF7h2f907rtPnqB82cq2QBgkANM8Z2Or+LNR0izuNPaLTphZyP9uUzvdbPM2LEAcqEEmW3Bt0Mo2YUtWlfeI9D0ywF9qWs6fZ2hma3FxcXSRxmVSwaPcTjcCjgjqCp9DXLXeh6vbeIbrWYdOku0g8RrqMdvDLGJbiE6UtoSm9lUESMch2X5UYjPyhshfD3iWGLS9VgtdYsZo5tY82102Sxa6Rbu+E8e7zy0O3anzbWLBioGRuwAegQav53iq+0byNv2Sytrvzt+d/nPOm3bjjHkZznnd2xzJLrelQazDpE+p2cep3CGSGye4UTSKM/MqE7iPlbkD+E+lYHhHw3deH9V8t4dlpD4f0zT4n88S5eBrneu7apbAkT5iig54A5AIrLULPxNq8Emg/2jaatqcF+l28sQgtxHDbx/OGPmeYrW5ddqMMmP5l+YoAb8Wt6VPrM2kQanZyanboJJrJLhTNGpx8zIDuA+ZeSP4h61m6p458OaXo2tak+rWdymhozX0VtcxvJEwyBGRuG12ZSqqxGW4rE07Q9Xj1nTLKbTpI7fTNdv9Wa/MsZhnjuPteyNAGMm8fakzuRV+R8Mfl3ZD+F9fl8K65o9vpdwkKeH7vTbGC+ltZPKdkVY4bSaMK5gITDG4w52wk4IfAB6BL4j0O3/ALO8/WdPi/tTH2DfdIPteduPKyfnzuXG3P3h6itKuE8U6brF/dC80jSLxLjUdPS3njeS0kt3wXKw30cmT5SmVsm3ZmYPIP4Yyeti1WCbX7vSFSQXFrawXTsQNhWVpVUA5znMLZ47jrzgAG1vSl1OPTW1OzF9I7Rpam4XzWZUWRlCZySEdWIxwrA9CKItb0qfWZtIg1Ozk1O3QSTWSXCmaNTj5mQHcB8y8kfxD1rkr3wreyXXiK6g0+P7RqHiPSrtJQUDy21ubIsSc5wpjnIU89cD5hk07Q9Xj1nTLKbTpI7fTNdv9Wa/MsZhnjuPteyNAGMm8fakzuRV+R8Mfl3AHW6lrelaNGZNY1OzsECGTddXCxDaGVS2WI4DSIM+rqO4ovtb0rS7q0tdT1Ozs7i+fy7WK4uFje4bIG1ASCxyyjAz1HrXL+KHmg+Jvhq7ttG/teW20zUnWKN41mjzJaJvi8whd3zYOWT5GfknCthy+Dtd07wrPoUVj9vl1LwlaaAbm2mQRWs0STo0knmMreWftCkFFdsI3yg7QwB13/CXf8VH/ZX2H/mNf2V5vm/9Q/7Z5mNv/ANuf9rParOt+MND0Hw3Nrd5qFu9olk99H5UyFrmJdvMWWAfJeNRzgmRBn5hWJ/wj2qf8Jp9v+y/6N/wk32/f5i/6j+x/s2/Gc/635cde+Mc1zUvhjxHc+FYtC/sK4jl0zwZf6Ity9xB5V3cOlsieViQsFbyWIMipgEZAPAAPSY9csX8+4+36f8A2fFZR3v2lbtTiJ958xhjCx7Uyr7iGw/Tbki+I9DfSotTTWdPbT5t/lXYukMT7FZnw+cHasbk4PARiehrltb0PV9V1S/1ODTpIxJa6LOlvJLH5jPa3stxLDwxXftKqCW2FmHzYyRFH4a1DU9cs9V1DSPKhm8TDVXtLponktkTTDbozhWZd3nIjLsZiAyngghQDvLa5gvLWK6s5o57edBJFLE4ZJFIyGUjggg5BFVdS1vStGjMmsanZ2CBDJuurhYhtDKpbLEcBpEGfV1HcViaDK/huytNO1SCRLjVdd1FYAhVgA811dIzEHgGJM9yCwBA5xZ1DRnu/iHoerPaRy2+n6ffIJnCkwzSvbBdoPIJRJRkdsgnnkA0r7W9K0u6tLXU9Ts7O4vn8u1iuLhY3uGyBtQEgscsowM9R61aubmCztZbq8mjgt4EMkssrhUjUDJZieAABkk15anhPxBa+CzpA0mSa41bwfZ6E7RzxbLGeOOdXaYlwSmbgcxiQ/I/H3d3d+LtPutS8PiOwi86aC9s7wRBgrSiC5jmZFJIG5ljIXJAyRkgZIAIrLxlpVxb6xe3V5Z2mmaZdRQjUJLpRDMslvBMsm84UA+eFHJzgHPOKvXPiPQ7KwivrzWdPt7SaH7RHcS3SLG8WUHmBicFcyRjPTLr6ivP5PDWtzC81XT9I1DRH/4SY6qlpatZfa3RtPFu7IGZ4NzSs7NvbJXcfvEA6/h/wlc2eu+Hr29spJBZ2uqzPNeyQyzQ3F1cwygkxqqh2UzA+WNq/MoZhhmAOyg1Kxub+6sba9t5ruz2fabeOVWkg3jKb1ByuRyM9RVax8R6Hqdgb7TdZ0+8tBMtubi3ukkjErFQse4HG4l0AHUlh6iuI0jwbqmn+G/Ddjb6Tp6S2fhK7sLi3uwrW32yX7KdkqpnervHKXK5z83OWGaR8JeItYl1htcsry9tb99FRI9Xks3leGC+eSdJEgVYwAjFtuX3Kw+YklFAPRP+Ej0P+wv7b/tnT/7J/wCf/wC1J5H3tn+szt+98vXrx1o0HV/7b06W68jyPLvbq02792fIuJId2cD73l7sds45xmuWu9D1e28Q3Wsw6dJdpB4jXUY7eGWMS3EJ0pbQlN7KoIkY5DsvyoxGflDa/gDS5tG8IJZz6b/ZX+m3s0dj+7/cRSXUskafuyyDCOvCkgdO1AGlF4j0O4/tHyNZ0+X+y8/b9l0h+yY3Z83B+TG1s7sfdPoas2WpWOo/aP7Pvbe7+zTNbz+RKr+VKv3o2wflYZGQeRmvMn8J+ILrwWNIOkyQ3Gk+D7zQkaSeLZfTyRwKjQkOSEzbnmQRn504+9t7bTNGfTvGmoXFvaR22mNpNhaWoiCqimKS6LIqD7oVZI8cAc4HQ4ANJtb0pdTj01tTsxfSO0aWpuF81mVFkZQmckhHViMcKwPQiiLW9Kn1mbSINTs5NTt0Ek1klwpmjU4+ZkB3AfMvJH8Q9a5K98K3sl14iuoNPj+0ah4j0q7SUFA8ttbmyLEnOcKY5yFPPXA+YZNO0PV49Z0yym06SO30zXb/AFZr8yxmGeO4+17I0AYybx9qTO5FX5Hwx+XcAdbp+t6Vq0ksel6nZ3rwpHJIttcLIUWRd0bEKTgMvKnuORUr6lYxX6WMl7bpdvt2W7SqJG3ByuFzk5EUhHqI3/unHCeHfBepafpng+zhEmiHT/Dk1pdz2XkF4Ll3s3YAMroxYxTZbawPJzkg1Z1vwXe6rdeJwBHNcah4Wi0i01K72B2kJuvM3bFyoJeFm2qFPGB8uAAdTY+I9D1OwN9pus6feWgmW3Nxb3SSRiVioWPcDjcS6ADqSw9RR/wkeh/2F/bf9s6f/ZP/AD//AGpPI+9s/wBZnb975evXjrXCSeEtU1qw1GTVbLVLx7260mGWHXZLFnkt7e982QeXbqI9gSRzyzM3zDaMLvs654Z1yTUr/UbBbyIx+I01GE2D2/2iWH+zEtSYxPmLPmFgRJj5VYjnbkA7Zdb0prWS6XU7M28dqt48ouF2LAwYrKTnAQhGIbodp54NF/relaXHcSanqdnZpbIkk7XFwsYiV2KozEkbQzKwBPUggdK4RPAmoNaaOifaI0u5p11lLmSJ5JYZLv7Z+/8ALCJJkrJAY1BVReSYLKG3lp4Y8R6Z4eW4la4v9XS9jR7pBBJfrbwQG3R4HuC0YaRg0xDn5Vup15c5YA6m/wDGWladqOnrdXlnFpl7p81+NTkulWFVSS3RfmPykP8AaBhs9h1zxZbxBBDr+qafeCO2t9N0+C/lu5ZQqBZGnU7s8KFFvksT/F2xzwmi6Dr+hXXh7UNW8OXGs3dj/bXmm2ntXkilubxJI5Q0jQr80Yk5VVOGIKrkqD/hBNdtvD4sIuJrTRdAgSe0kQtJLY3Mkswi8wY3bduwyKEJZc4G7AB6Tp+pWOr2Ed9pV7b31pLny7i2lWSN8Eg4ZSQcEEfUGq0/iPQ7W2ubi51nT4YbTH2iWS6RVhzI0Q3knC/vEdOf4lYdQRWb4K0u8sLPUbnUl1AXOo3v2lzqUtu85xDFENwt1ES8RDAUtxgk5JVeauPCGq22hWs2nW9xaX1v4mv9Vn/s37N9qnSVrqNGUzZiZjHNFnzCCEUgfMFFAHb3viPQ9O0q31PUNZ0+00+52+Rdz3SJFLuXcu1ycNlQSMHkDNSX2t6Vpd1aWup6nZ2dxfP5drFcXCxvcNkDagJBY5ZRgZ6j1rif+Ed1TTND0qeytNcOoRvetJPZXVi96guZ/PZXWZFtyGYKW2coyKqF1LNUWr+Gtd/srUbCLSLeSXW/DNvopOmMkdrYTItwrMVkZWEA+0Lt2K7bUb5c7QwB6A+pWKebvvbdfJmS3lzKo2Svt2Rnnhm8xMA8neuOoqtP4j0O1trm4udZ0+GG0x9olkukVYcyNEN5Jwv7xHTn+JWHUEVyOs6RrK6rqVpa6PcXkOqeINN1Nb2GaERW8ULWYkEgeRX3AWrnCqwIZec5ALbw1qGk2FjfW+kebc2nibUdVuLa2aJZrpJjdxxsGZlQtsnhPzMCEUjqApAOuvfEeh6dpVvqeoazp9pp9zt8i7nukSKXcu5drk4bKgkYPIGakvtb0rS7q0tdT1Ozs7i+fy7WK4uFje4bIG1ASCxyyjAz1HrXG65pGty3mja1pVhqGltDDfRz2eivZNcKbiaKUM/2geSc+Uxk2kkSMNpddzGtfeFNV0zStOsND064eUaLb6XKVuLa4tZhErKsV4syKzQDzGy0Ch3V5MqpVAQD0muP+J//ACJd1/173n/pFcV0UWqwTa/d6QqSC4tbWC6diBsKytKqgHOc5hbPHcdecc78T/8AkS7r/r3vP/SK4oAz9S+OXw60jVbvTdQ8Q+Td2czwTx/YrhtjoxVhkRkHBB5BxVb/AIaD+GH/AEM3/khc/wDxuvBLrwYfFvin4mC3sLOW8j8Rw2tte3N5LEbRri/eLIjRGWQNkBtxG0DIyeK5bUfhbqWm22rzS6xo8q6FexWmreRNI/2ISSNGkrER4ZSV5VCzrnDIGDAAH1J/w0H8MP8AoZv/ACQuf/jdH/DQfww/6Gb/AMkLn/43XgnxC+F9jZeKNZ0/w8+l6Xo3hi1tWv8AU7qW6eVnnVFRZlCvl2bcw8mMIFbkg8DEj+C2vyR3NwdV0OGxgtbG9W+ubwwwy292xWOUM6gqAVbcHCtxhQxIBAPpb/hoP4Yf9DN/5IXP/wAbo/4aD+GH/Qzf+SFz/wDG6+abb4Mazex6f9h1vQ7m41V71NMt4Z5WN8bVmWTY/l+WAdmVLOoIYcjnGJqfgO702PRbttV0ufStaSZ7bU0lkSECFisu5ZEWQFcdAhLZAQMxxQB9Y/8ADQfww/6Gb/yQuf8A43R/w0H8MP8AoZv/ACQuf/jdfO/gv4QQ6z4y8N2ms6zbzaHr8N1LaXumtIrTtAGDxqJYgVZWAJLqFK5wxOBUWjfDKXxJ4NtoPDsWl6lfXXiP+z4tZjvbiMFBaecyeTJEoCKAzF/vkqVCkYJAPo3/AIaD+GH/AEM3/khc/wDxuj/hoP4Yf9DN/wCSFz/8br5k0X4Qat4lfTX8O6zo+o2moXstgt5G08ccM8cBn2OJIlflFJBVWGRgkcViav4IvtJ8Kw+IUvtP1DT2vW0+Z7KZn+z3IQOY2JUB/lJw8ZdDtOG5GQD62/4aD+GH/Qzf+SFz/wDG6P8AhoP4Yf8AQzf+SFz/APG6+W9F8PaXa/CPW/F2sWv2yaW9TR9KiEjBYZynmyTSBSpOI/ucsNxO5SMGrNp8PbFPhr4s1jU7y4XXdC+xk2MQUR2/nTbCkxIJMgAJKDGw4DEtvRAD6b/4aD+GH/Qzf+SFz/8AG667wp4x0LxvpUmpeGL77daRTGB5PJePDhVYjDqD0ZecY5r4t1rw9pd18I9E8XaPa/Y5or19H1WIyMVmnCebHNGGLEZj+/yo3AbVAya+gP2VP+SWal/2Gpf/AERBQB3vw7/48tU/6+Lb/wBN9pXYVx/w7/48tU/6+Lb/ANN9pXYUAFcV4euYLPxT4iuryaOC3gs0klllcKkai9vyWYngAAZJNdrXnAsH1HUvEkENtJcypFbTxJDMscgePUr2RXQsChdSoZVf5GZQrEKSQAdPceOfDkEmhqmrWdwmu3TWtjLBcxskjKrEkHdyNyhPlz87ovetKLW9Kn1mbSINTs5NTt0Ek1klwpmjU4+ZkB3AfMvJH8Q9a4210vX/ADdDvrvTbiZ4fEBuZjN9lS88hrGW38248orEzK7gfu8nylj4LAipdO0PV49Z0yym06SO30zXb/VmvzLGYZ47j7XsjQBjJvH2pM7kVfkfDH5dwB0lx4s8OWunC/utf0uGzZ0jFzJexrGWeMSKu4nGSjBwO6kHoaj8VeKbHwtol5eXM1u13FZXN3bWMlwscl35MZkdUzknAHJAOAc1xFt4Q1vRPDfgo6Zb6hZTaVoslle22ifYvPE0v2d3J+0fuiu+FyzA7izKRkFjUev+DNStPCOoaNZ+H5NZS+8LWmjwRxXEDi2ntxPteRpjFkbpoyrqucox2r8oIB6Jr2r/ANiadFdeR5/mXtrabd+3Hn3EcO7OD93zN2O+McZzR/wkeh/2F/bf9s6f/ZP/AD//AGpPI+9s/wBZnb975evXjrWb4/0ubWfCD2cGm/2r/ptlNJY/u/38Ud1FJIn7wqhyiNwxAPTvXNah4e1+9Emt21rqGnzv4gGpraW0lq16kQ08WeB5ha33FhuwWI8snkPhaAOpv/GWladqOnrdXlnFpl7p81+NTkulWFVSS3RfmPykP9oGGz2HXPGlJqcEGozW91cWcKRpARuuQJN0sjIoZCBtDMoVDk7m3DA288l4f8JXNnrvh69vbKSQWdrqszzXskMs0NxdXMMoJMaqodlMwPljavzKGYYZsS18C6vJ4bstO1HSo5U/snw3aXMErxujG1u3e6RhkhgqNk9Q2cDPSgD0T/hI9D/sL+2/7Z0/+yf+f/7Unkfe2f6zO373y9evHWjQdX/tvTpbryPI8u9urTbv3Z8i4kh3ZwPveXux2zjnGa5a70PV7bxDdazDp0l2kHiNdRjt4ZYxLcQnSltCU3sqgiRjkOy/KjEZ+UNr+ANLm0bwglnPpv8AZX+m3s0dj+7/AHEUl1LJGn7ssgwjrwpIHTtQBZi8U2N34qg0bT5re83Q3bTzQXCv9nlt3gRoWUZw3+kAkEgjb054s2PiPQ9TsDfabrOn3loJltzcW90kkYlYqFj3A43EugA6ksPUV5/pHhfWY/7OtG8NW8dzpXhK40SS91EwyWt/L/o4iUhHaVoCY5Th1UhXPALEVGfCXiLWJdYbXLK8vbW/fRUSPV5LN5XhgvnknSRIFWMAIxbbl9ysPmJJRQD0S18R6He/YfsWs6fcf2j5n2LyrpH+1eX/AKzy8H59uDnGcd6vXFtBdRiO6hjmRXSQLIgYBkYMrYPcMoIPYgHtXEXvhW9kuvEV1Bp8f2jUPEelXaSgoHltrc2RYk5zhTHOQp564HzDPd0AFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABXmknimx8Iatruo6hNbx+YttbQC4uFhR5ZNQvlXc5+6oyWYgEqiu2DjFel15o+n3Wp61qsFjF5sqXelzsu4LhItZuZHPJ7IjHHU4wMmgDubHXLG5vzpUt/p41uGFZbvTre7WWSDIUk4wG2/MuGKrkEHAziqOqeOfDml6NrWpPq1ncpoaM19FbXMbyRMMgRkbhtdmUqqsRluK5tdD8TP4/0meW3kj0qx1a6upEia2S0CyQXKxyRIq+czkyjzS7D947FVZTuSi/hfX5fCuuaPb6XcJCnh+702xgvpbWTynZFWOG0mjCuYCEwxuMOdsJOCHwAenW1zBeWsV1ZzRz286CSKWJwySKRkMpHBBByCK5+/+IXhWw0JNZ/t3T7nT2vYrH7Rb3cToJZGUYLbsfKrb25yEVmxxWlqVr/bfhW7tbrT9326yeOSxup/LzvQgxPJHu29dpZN2OSM8VxE2l+JbrRb24n03ULyZb3S5ok1D7CmoTLb3izSJugKwmMLygZg25pc8FaAO7l1vSoNZh0ifU7OPU7hDJDZPcKJpFGfmVCdxHytyB/CfSs2/wDHPhzTtZ0zSp9Ws2vNTumtYYkuYyysPMGWBbIG+JouAf3hC9enN+KND8TX/iULp1vIuntq2n3sgt2to4JoopYC7TblMz3CmM4ClU8pI/mLAo0ln4a1DTP7Gmh0jdKni3UNRvfIaJWMU/2yOOdiWG7CTQ5GS4UYwSuKAO8luYIJIY55o43uHMcKu4BkYKW2qD1O1WOB2UntVG78R6HYWzXF9rOn20K+ZulmukRR5cgifJJx8sjKh9GYA8nFUfFNpeyT6JqNhZyXx0rUDdSWsLossqtbTw4TeypkGZWO5l+VWxk4B4myt9S0vxT4cubrw1JdXip4gvRZGaD7RbrPfwsrIS/ll9koBHmL8rP8xI2sAerVm2PiPQ9TsDfabrOn3loJltzcW90kkYlYqFj3A43EugA6ksPUVm6boN9p3wstPD3l6fd6hbaKljsugz2ssqwBMOMZaMsOeMlSeK40+EvEWsS6w2uWV5e2t++iokeryWbyvDBfPJOkiQKsYARi23L7lYfMSSigHon/AAkeh/2F/bf9s6f/AGT/AM//ANqTyPvbP9Znb975evXjrRoOr/23p0t15HkeXe3Vpt37s+RcSQ7s4H3vL3Y7ZxzjNctd6Hq9t4hutZh06S7SDxGuox28MsYluITpS2hKb2VQRIxyHZflRiM/KG1/AGlzaN4QSzn03+yv9NvZo7H93+4ikupZI0/dlkGEdeFJA6dqALsHiXSvstg19qulwXF6kBjjjvldJGmDeWI2O0yByj7DgbtpwOCBZl1vSoNZh0ifU7OPU7hDJDZPcKJpFGfmVCdxHytyB/CfSvN7bwLq6+C9St5tKj/tOTwFaaLbkvGXFwsdyJYQ+eBuaHJztPBydvHUxWWoWfibV4JNB/tG01bU4L9Lt5YhBbiOG3j+cMfM8xWty67UYZMfzL8xQA25/Eeh2ttc3FzrOnww2mPt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1.0000000
0.1000000
0
true
true
abc
medium pollution, carbon dioxide adds to global warming, non-renewable (90 years left?)
unreliable, no good for large scale power
toxic radioactive waste, accidents potentially very serious, very costly to build and dismantle, non-renewable
very costly to build, disruption or removal of wildlife habitat or farmland, limited suitable valley locations
Which words might correspond to the missing info1.gif?
Which words might correspond to the missing ?
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1.0000000
0.1000000
0
true
true
abc
medium pollution, carbon dioxide adds to global warming, non-renewable (90 years left?)
unreliable, no good for large scale power
toxic radioactive waste, accidents potentially very serious, very costly to build and dismantle, non-renewable
very costly to build, disruption or removal of wildlife habitat or farmland, limited suitable valley locations
Which words might correspond to the missing info1.gif?
Which words might correspond to the missing information 1?
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1.0000000
0.1000000
0
true
true
abc
medium pollution, carbon dioxide adds to global warming, non-renewable (90 years left?)
unreliable, no good for large scale power
toxic radioactive waste, accidents potentially very serious, very costly to build and dismantle, non-renewable
very costly to build, disruption or removal of wildlife habitat or farmland, limited suitable valley locations