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2 August, 05:20

Diane will rent a car for the weekend. She can choose one of two plans. The first plan has an initial fee of $57.96 and costs an additional $0.12 per mile driven. The second plan has an initial fee of $61.96 and costs an additional $0.08 per mile driven. How many miles would Diane need to drive for the two plans to cost the same?

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  1. 2 August, 07:35
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    Answer: the number of miles that Diane needs to drive for the two plans to cost the same is 100

    Step-by-step explanation:

    Let x represent the number of miles that Diane needs to drive for the two plans to cost the same.

    The first plan has an initial fee of $57.96 and costs an additional $0.12 per mile driven. It means that the cost of driving x miles with this plan is

    57.96 + 0.12x

    The second plan has an initial fee of $61.96 and costs an additional $0.08 per mile driven. It means that the cost of driving x miles with this plan is

    61.96 + 0.08x

    For both plans to cost the same, the number of miles would be

    57.96 + 0.12x = 61.96 + 0.08x

    0.12x - 0.08x = 61.96 - 57.96

    0.04x = 4

    x = 4/0.04

    x = 100 miles
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