4º ESO Carrera de caballos (suma) Es un juego para un número mínimo de 2 jugadores, aunque es preferible que en el juego participen 3 o 4 jugadores. Se trata de simular una carrera de caballos. En la carrera participan un total de 12 caballos que, al inicio de la partida, están situados en la posición de salida.

 

                     carrera

 

Se lanzan sucesivamente los dados y, tras cada lanzamiento, se suman las puntuaciones obtenidas en cada uno de ellos. El caballo que ocupa la posición de la suma obtenida avanza un lugar. Los demás se mantienen en su lugar. El juego finaliza cuando uno de los caballos alcanza la línea de meta. Gana el juego el jugador o jugadores que hayan apostado por el caballo que gana la carrera.

En el siguiente gráfico se representa los resultados de una carrera (cada vez que comiences de nuevo la pregunta aparecerá el resultado de  otra partida, estando la meta a 20 lugares de la salida).

                #d

Simula unas cuantas carreras, es decir comienza de nuevo unas cuantas veces, y fíjate quien es el caballo ganador.

 A la vista de los resultados, ¿crees que todos los caballos tienen las mismas posibilidades de ganar? ¿Qué caballos ganan más a menudo? ¿Qué caballos suelen quedar más retrasados? ¿Hay alguno que no se mueva de la salida? Justifica tus respuestas haciendo un análisis de todos los resultados posibles al sumar dos dados y calcula la probabilidad de cada uno de ellos.

 

 

 

 

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xmlns="http://www.w3.org/1998/Math/MathML"><mi>En</mi><mo>&nbsp;</mo><mi>la</mi><mo>&nbsp;</mo><mi>lista</mi><mo>&nbsp;</mo><mi>C</mi><mo>,</mo><mo>&nbsp;</mo><msub><mi>C</mi><mi>i</mi></msub><mo>&nbsp;</mo><mi>indica</mi><mo>&nbsp;</mo><mi>el</mi><mo>&nbsp;</mo><mi>número</mi><mo>&nbsp;</mo><mi>de</mi><mo>&nbsp;</mo><mi>veces</mi><mo>&nbsp;</mo><mi>que</mi><mo>&nbsp;</mo><mi>ha</mi><mo>&nbsp;</mo><mi>salido</mi><mo>&nbsp;</mo><mi>el</mi><mo>&nbsp;</mo><mi>resultado</mi><mo>&nbsp;</mo><msub><mi>R</mi><mi>i</mi></msub></math></comment></maction><maction actiontype="comment"><comment><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>R</mi><mo>&nbsp;</mo><mi>es</mi><mo>&nbsp;</mo><mi>la</mi><mo>&nbsp;</mo><mi>lista</mi><mo>&nbsp;</mo><mi>de</mi><mo>&nbsp;</mo><mi>resultados</mi><mo>&nbsp;</mo><mi>posibles</mi><mo>&nbsp;</mo><mi>al</mi><mo>&nbsp;</mo><mi>sumar</mi><mo>&nbsp;</mo><mi>dos</mi><mo>&nbsp;</mo><mi>dados</mi><mo>&nbsp;</mo></math></comment></maction><maction actiontype="comment"><comment><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>Para</mi><mo>&nbsp;</mo><mi>simular</mi><mo>&nbsp;</mo><mi>el</mi><mo>&nbsp;</mo><mi>lanzamiento</mi><mo>&nbsp;</mo><mi>de</mi><mo>&nbsp;</mo><mi>un</mi><mo>&nbsp;</mo><mi>dado</mi><mo>&nbsp;</mo><mi>utilizamos</mi><mo>&nbsp;</mo><mi>d</mi><mo>(</mo><mo>)</mo></math></comment></maction><maction actiontype="comment"><comment><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>Para</mi><mo>&nbsp;</mo><mi>la</mi><mo>&nbsp;</mo><mi>suma</mi><mo>&nbsp;</mo><mi>de</mi><mo>&nbsp;</mo><mi>los</mi><mo>&nbsp;</mo><mi>resultados</mi><mo>&nbsp;</mo><mi>de</mi><mo>&nbsp;</mo><mi>dos</mi><mo>&nbsp;</mo><mi>dados</mi><mo>&nbsp;</mo><mi>utilizamos</mi><mo>&nbsp;</mo><mi>s</mi></math></comment></maction><command><input><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>n</mi><mo>=</mo><mn>20</mn></math></input></command><command><input><math 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