4º ESO PROBLEMA DE TRIGONOMETRÍA 4. TIPO CLOZE CON QUIZZES Resolución de triángulos

 

Para la siguiente situación, se dan los siguientes datos aleatorios:

     DISTANCIA HORIZONTAL: AB= #d metros

     ÁNGULO: A= #A  radianes

     ÁNGULO: B= #B  radianes

     CALCULA EL VALOR DE LA ALTURA: H=

 

 

 

ELIGE UNA DE LAS RESPUESTAS SIGUIENTES:

{#1}

 

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 SI TU RESPUESTA NO ES VERDADERA, PUEDES VOLVER A INTENTARLO.

EL FACTOR DE PENALIZACIÓN ES PEQUEÑO.

]]> 1.0000000 0.1000000 0 ~\#k}]]> <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>d</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>1</mn><mo>,</mo><mn>400</mn><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>B</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>0</mn><mo>,</mo><mfrac><pi/><mn>4</mn></mfrac><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>A</mi><mo>=</mo><mi>aleatorio</mi><mo>(</mo><mn>0</mn><mo>,</mo><mfrac><pi/><mn>4</mn></mfrac><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>n</mi><mo>=</mo><mi>tan</mi><mo>(</mo><mi>B</mi><mo>)</mo><mo>-</mo><mi>tan</mi><mo>(</mo><mi>A</mi><mo>)</mo></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><apply><csymbol definitionURL="http://www.wiris.com/XML/csymbol">repeat</csymbol><mi>n</mi><mrow><mi>n</mi><mo>&gt;</mo><mn>0</mn></mrow></apply></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>p</mi><mo>=</mo><mfrac><mrow><mi>d</mi><mo>*</mo><mi>tan</mi><mo>(</mo><mi>A</mi><mo>)</mo></mrow><mi>n</mi></mfrac></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>q</mi><mo>=</mo><mi>p</mi><mo>+</mo><mn>1</mn></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>r</mi><mo>=</mo><mi>p</mi><mo>+</mo><mn>2</mn></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>s</mi><mo>=</mo><mi>p</mi><mo>+</mo><mn>3</mn></math></input></command><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>k</mi><mo>=</mo><mi>p</mi><mo>+</mo><mn>4</mn></math></input></command></group></library><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>p</mi></math></input><output><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>80.376</mn></math></output></command></group><group><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"/></input></command></group></session>]]></wirisCasSession><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</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="casSession"/></localData></question>