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<p><span style="font-family: arial,helvetica,sans-serif; font-size: medium;">El sistema de transmisión , es el sistema encargado de transmitir la fuerza desarrollada por el motor del vehículo a las ruedas motrices. La fuerza de empuje generada por el motor debe ser dosificada y aplicada de acuerdo a necesidades, ya sea para entregar fuerza o velocidad al vehículo. </span></p> <p><span style="font-family: arial,helvetica,sans-serif; font-size: medium;">La transmisión por correas sencilla (o simple) es un arrastre de fuerzas en el que la presión o esfuerzo de aprieto es tan grande que una polea arrastra a la otra.</span></p> <p> </p> <p><span style="color: #ff0000;"><img 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" alt="" /></span><span style="font-family: arial,helvetica,sans-serif; font-size: medium;"><br /></span></p> <p><span style="font-family: arial,helvetica,sans-serif; font-size: medium;">Por relación de transmisión, se entiende, la que existe entre los números de revoluciones de las poleas y </span><span style="font-family: arial,helvetica,sans-serif; font-size: medium;">está dada por:</span></p> <table><caption><span style="font-family: arial,helvetica,sans-serif; font-size: medium;"> </span></caption> <thead> <tr><th scope="col"><span style="font-family: arial,helvetica,sans-serif; font-size: medium;">«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msub»«mi»d«/mi»«mn»1«/mn»«/msub»«mo»§#215;«/mo»«msub»«mi»n«/mi»«mn»1«/mn»«/msub»«mo»=«/mo»«msub»«mi»d«/mi»«mn»2«/mn»«/msub»«mo»§#215;«/mo»«msub»«mi»n«/mi»«mn»2«/mn»«/msub»«/math»</span></th></tr> </thead> </table> <p> </p> <p><span style="font-family: arial,helvetica,sans-serif; font-size: medium;">Donde :</span></p> <p><span style="font-family: arial,helvetica,sans-serif; font-size: medium;">«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msub»«mi»d«/mi»«mn»1«/mn»«/msub»«mo»§#160;«/mo»«/math»= diametro de la polea motriz ( en cms )<br /></span></p> <p><span style="font-family: arial,helvetica,sans-serif; font-size: medium;">«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msub»«mi»n«/mi»«mn»1«/mn»«/msub»«/math»= número de revoluciones de la polea motríz <span style="font-family: arial,helvetica,sans-serif; font-size: medium;">( en rpm )</span><br /></span></p> <p><span style="font-family: arial,helvetica,sans-serif; font-size: medium;">«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msub»«mi»d«/mi»«mn»2«/mn»«/msub»«/math» = diámetro de la polea conducida <span style="font-family: arial,helvetica,sans-serif; font-size: medium;">( en cms )</span><br /></span></p> <p><span style="font-family: arial,helvetica,sans-serif; font-size: medium;">«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msub»«mi»n«/mi»«mn»2«/mn»«/msub»«/math» = número de revoluciones de la polea conducida <span style="font-family: arial,helvetica,sans-serif; font-size: medium;"> <span style="font-family: arial,helvetica,sans-serif; font-size: medium;">( en rpm )</span></span><br /></span></p> <p> </p> <p><span style="font-family: arial,helvetica,sans-serif; font-size: medium;">Determine el diámetro «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msub»«mi»d«/mi»«mn»2«/mn»«/msub»«/math» y el radio «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msub»«mi»r«/mi»«mn»2«/mn»«/msub»«/math» ( ambas en cms ) de la polea conducida de un torno que emplea un motor eléctrico de «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»d«/mi»«mn»1«/mn»«/math» cm de diámetro de polea de motríz y «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»n«/mi»«mn»1«/mn»«/math» rpm , si se conecta con otra polea conducida de «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»n«/mi»«mn»2«/mn»«/math» rpm, a través de una correa, para generar movimiento en una herramienta de desgaste.</span></p> <p> </p> <p> </p> <p> </p> <p><span style="color: #ff0000; font-family: arial,helvetica,sans-serif; font-size: medium;">Observaciones: </span></p> <p><span style="color: #ff0000; font-family: arial,helvetica,sans-serif; font-size: medium;">- U<span style="color: #ff0000; font-family: arial,helvetica,sans-serif; font-size: medium;">tiliza el punto decimal en lugar de la coma.</span></span></p> <p><span style="color: #ff0000; font-family: arial,helvetica,sans-serif; font-size: medium;"><span style="color: #ff0000; font-family: arial,helvetica,sans-serif; font-size: medium;">- I</span><span style="font-family: arial,helvetica,sans-serif; font-size: medium;"><span style="color: #ff0000;">ngresa tu respuesta sin unidades</span>.</span></span></p>
Default mark
General feedback
<p> </p> <p><span style="font-family: arial,helvetica,sans-serif; font-size: medium;">Si la relación entre los diámetros y las rpm ( frecuencias de giro ) de dos poleas conectadas por una correa, está dada por la expresión : </span></p> <p> </p> <p> </p> <p><span style="font-family: arial,helvetica,sans-serif; font-size: medium;"> «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msub»«mi»d«/mi»«mn»1«/mn»«/msub»«mo»§#215;«/mo»«msub»«mi»n«/mi»«mn»1«/mn»«/msub»«mo»=«/mo»«msub»«mi»d«/mi»«mn»2«/mn»«/msub»«mo»§#215;«/mo»«msub»«mi»n«/mi»«mn»2«/mn»«/msub»«/math»</span></p> <p> </p> <p> </p> <p> </p> <p><span style="font-family: arial,helvetica,sans-serif; font-size: medium;">al despejar «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msub»«mi»d«/mi»«mn»2«/mn»«/msub»«/math» ; queda «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mfrac»«mrow»«msub»«mi»d«/mi»«mn»1«/mn»«/msub»«mo»§#215;«/mo»«msub»«mi»n«/mi»«mn»1«/mn»«/msub»«/mrow»«msub»«mi»n«/mi»«mn»2«/mn»«/msub»«/mfrac»«mo»=«/mo»«msub»«mi»d«/mi»«mn»2«/mn»«/msub»«/math»</span></p> <p> </p> <p> </p> <p> </p> <p><span style="font-family: arial,helvetica,sans-serif; font-size: medium;">que es igual a : «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msub»«mi»d«/mi»«mn»2«/mn»«/msub»«mo»=«/mo»«mfrac»«mrow»«msub»«mi»d«/mi»«mn»1«/mn»«/msub»«mo»§#215;«/mo»«msub»«mi»n«/mi»«mn»1«/mn»«/msub»«/mrow»«msub»«mi»n«/mi»«mn»2«/mn»«/msub»«/mfrac»«/math»</span></p> <p> </p> <p> </p> <p> </p> <p><span style="font-family: arial,helvetica,sans-serif; font-size: medium;">Reemplazando por los valores entregados en el enunciado : <br /></span></p> <p> </p> <p> </p> <p style="text-align: center;"><span style="font-family: arial,helvetica,sans-serif; font-size: medium;"> «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msub»«mi»d«/mi»«mn»2«/mn»«/msub»«mo»=«/mo»«mfrac»«mrow»«mo»#«/mo»«mi»d«/mi»«mn»1«/mn»«mo»§#160;«/mo»«mi»c«/mi»«mi»m«/mi»«mi»s«/mi»«mo»§#160;«/mo»«mo»§#215;«/mo»«mo»#«/mo»«mi»n«/mi»«mn»1«/mn»«mo»§#160;«/mo»«mi»r«/mi»«mi»p«/mi»«mi»m«/mi»«/mrow»«mrow»«mo»#«/mo»«mi»n«/mi»«mn»2«/mn»«msub»«mo»§#160;«/mo»«mo»§#160;«/mo»«/msub»«mi»r«/mi»«mi»p«/mi»«mi»m«/mi»«/mrow»«/mfrac»«/math»</span></p> <p style="text-align: center;"> </p> <p style="text-align: center;"> </p> <p><span style="font-family: arial,helvetica,sans-serif; font-size: medium;">Simplificando factores : «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msub»«mi»d«/mi»«mn»2«/mn»«/msub»«mo»=«/mo»«mfrac»«mrow»«mo»#«/mo»«mi»d«/mi»«mn»1«/mn»«mo»§#160;«/mo»«mi»c«/mi»«mi»m«/mi»«mi»s«/mi»«mo»§#160;«/mo»«mo»§#215;«/mo»«mo»#«/mo»«mi»n«/mi»«mn»1«/mn»«mo»§#160;«/mo»«menclose notation=¨updiagonalstrike¨»«mi»r«/mi»«mi»p«/mi»«mi»m«/mi»«/menclose»«/mrow»«mrow»«mo»#«/mo»«mi»n«/mi»«mn»2«/mn»«mo»§#160;«/mo»«menclose notation=¨updiagonalstrike¨»«mi»r«/mi»«mi»p«/mi»«mi»m«/mi»«/menclose»«/mrow»«/mfrac»«/math»</span></p> <p> </p> <p> </p> <p><span style="font-family: arial,helvetica,sans-serif; font-size: medium;">Quedando : «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msub»«mi»d«/mi»«mrow»«mn»2«/mn»«mo»§#160;«/mo»«/mrow»«/msub»«mo»=«/mo»«mo»#«/mo»«mi»d«/mi»«mn»2«/mn»«/math» cms</span></p> <p> </p> <p> </p> <p><span style="font-family: arial,helvetica,sans-serif; font-size: medium;">para obtener el radio «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msub»«mi»r«/mi»«mn»2«/mn»«/msub»«/math» , se divide el diámetro «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msub»«mi»d«/mi»«mn»2«/mn»«/msub»«/math» por «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mn»2«/mn»«/math»</span></p> <p> </p> <p> </p> <p><span style="font-family: arial,helvetica,sans-serif;"><span style="font-size: medium;">Quedando </span> «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msub»«mi»r«/mi»«mrow»«mn»2«/mn»«mo»§#160;«/mo»«mo»§#160;«/mo»«/mrow»«/msub»«mo»=«/mo»«mo»§#160;«/mo»«mo»§#160;«/mo»«mfrac»«mrow»«mo»#«/mo»«mi»d«/mi»«mn»2«/mn»«/mrow»«mn»2«/mn»«/mfrac»«/math» cms o «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msub»«mi»r«/mi»«msub»«mrow/»«mrow»«mn»2«/mn»«mo»§#160;«/mo»«mo»§#160;«/mo»«/mrow»«/msub»«/msub»«mo»=«/mo»«mo»§#160;«/mo»«mo»#«/mo»«mi»r«/mi»«mn»2«/mn»«/math» cms</span></p> <p> </p> <p> </p> <p><span style="font-family: arial,helvetica,sans-serif; font-size: medium;">Como se deben anotar los resultados sin unidades, entonces: </span></p> <p> </p> <p> </p> <p style="text-align: center;"><span style="font-family: arial,helvetica,sans-serif; font-size: medium;"> «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msub»«mi»d«/mi»«mrow»«mn»2«/mn»«mo»§#160;«/mo»«/mrow»«/msub»«mo»=«/mo»«mo»#«/mo»«mi»d«/mi»«mn»2«/mn»«/math»</span><span style="font-family: arial,helvetica,sans-serif; font-size: medium;"> </span><span style="font-family: arial,helvetica,sans-serif; font-size: medium;"> y «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msub»«mi»r«/mi»«msub»«mrow/»«mrow»«mn»2«/mn»«mo»§#160;«/mo»«mo»§#160;«/mo»«/mrow»«/msub»«/msub»«mo»=«/mo»«mo»§#160;«/mo»«mo»#«/mo»«mi»r«/mi»«mn»2«/mn»«/math» </span></p> <p><span style="font-family: arial,helvetica,sans-serif; font-size: medium;"> </span></p> <p> </p> <p> </p>
No, case is unimportant
Yes, case must match
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<p><span style="font-family: arial, helvetica, sans-serif; font-size: medium;">¡¡ Muy bién !! ... Ahora analicemos la propuesta:</span></p>
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<p><span style="font-family: arial,helvetica,sans-serif; font-size: medium;">Al parecer cometiste un error . Ahora lo analizaremos. Si aún te quedan dudas, consulta con tu profesor de asignatura.</span></p>
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14.28571%
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11.11111%
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5%
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