[math]B\left(t\right)[/math] es la población de of Baltimore en años  [math]t[/math]. [math]C\left(t\right)[/math] es la población de Cleveland en años [math]t[/math].[br][br][img]data:image/png;base64,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[/img][br][br]Estima [math]B\left(1930\right)[/math] y explica que significa en esta situación[br]

[size=150]Se tienen algunos enunciados posteriormente.[br][/size][br]En cada par, ¿cuál es verdadero? Prepárate para explicar por qué

En este par, ¿cuál es verdadero? Explica por qué.

Alguna vez la población de las dos ciudades fue la misma? ¿Cuándo?[br]

[math]C\left(t\right)[/math] [i]es el porcentaje de hogares que SOLO tienen celular[/i]. A continuación se ven las gráficas de  [math]H[/math] y  [math]C[/math].[br][img]data:image/png;base64,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[/img][br]Estima los valores  [math]H\left(2006\right)[/math] y  [math]C\left(2006\right)[/math]. Explica lo que esto valores significan a cerca de los teléfonos.[br]

¿Cuál es la solución aproximada de  [math]C\left(t\right)=20[/math]? Explica lo que significa esto en la situación.[br]

Determina si la siguiente ecuación es verdadera. Explica por qué[br][math]C\left(2011\right)=H\left(2011\right)[/math]

[math]C\left(2015\right)=H\left(2015\right)[/math]

Entre 2004 y 2015, ¿disminuyó el porcentaje de hogares con teléfonos fijos al mismo ritmo que aumentó el porcentaje de hogares con sólo teléfonos móviles? Explica o muestra tu razonamiento.

¿Cuál es el valor de [math]C\left(t\right)+H\left(t\right)[/math] que aparentemente toma en 2004 y 2017? ¿Cuánto cambia este valor en este intervalo?[br]