Cierto artefacto eléctrico tiene una vida promedio de 2.600 horas, con desviación típica de 200 horas; mientras que el mismo artefacto de fabricación extranjera tiene un promedio de duración de 2.400 horas, con desviación estándar de 180 horas. Si se toman dos muestras de 125 y 100 artefactos, respectivamente, ¿Cuál es la probabilidad de que la diferencia registrada entre las dos muestras sea superior en 150 horas?[br][br][b]Datos:[/b][br]Artefacto nacional:[br][i]μ[/i]1​=2600 horas[br][i]σ[/i]1​=200 horas[br][i]n[/i]1​=125[br][br]Artefacto extranjero:[br][i]μ[/i]2​=2400 horas[br][i]σ[/i]2​=180 horas[br][i]n[/i]2​=100[br][br]Queremos calcular la probabilidad de que la diferencia entre las promedios muestrales sea mayor en [b]150 horas[/b]. [br][br]Es decir, calcular  [br][img]data:image/png;base64,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[/img].[b][br][br]Paso 1: [/b][b]Distribución de las medias muestrales[br][/b]Las medias muestrales son aproximadamente normales (por el teorema del límite central):[br][img]data:image/png;base64,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[/img][br][br]La diferencia de medias: [br][img]data:image/png;base64,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[/img]tiene distribución normal con:[img]data:image/png;base64,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[/img][b][br][br][br]Paso 2:[br]Calcular [i]σD[/i]​[/b][br][br][br][img]data:image/png;base64,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[/img][br][b][br][br]Paso 3:[/b][b]Estandarizar y calcular la probabilidad[br][br][/b]Queremos:[br][img]data:image/png;base64,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[/img][br][br]Por la simetría de la distribución normal:[br][img]data:image/png;base64,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[/img][br][br]Desde tablas de Z o una calculadora, [br][img]data:image/png;base64,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[/img][br][br]Por lo tanto:[br][img]data:image/png;base64,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[/img][br][br][b]Respuesta.- [/b]La probabilidad de que la diferencia sea mayor a 150 horas es aproximadamente 97,56%[br][br]