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MathematicsMathematics
29 September, 11:12

A golfer has two options for membership in a golf club. A social membership costs $1775 in annual dues. In addition, he would pay a $65 greens fee and a $25 golf cart fee every time he played. A golf membership costs $2425 in annual dues. With this membership, the golfer would only pay a $25 golf cart fee when he played. How many times per year would the golfer need to play golf for the two options to cost the same?

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  1. 29 September, 12:07
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    Answer: the golfer would need to play golf 10 times per year.

    Step-by-step explanation:

    Let x represent the number of times per year that the golfer need to play golf for the two options to cost the same.

    A social membership costs $1775 in annual dues. In addition, he would pay a $65 greens fee and a $25 golf cart fee every time he played. This means that the total cost of playing golf for x times with the social membership option is

    1775 + (65 + 25) x

    A golf membership costs $2425 in annual dues. With this membership, the golfer would only pay a $25 golf cart fee when he played. This means that the total cost of playing golf for x times with the golf membership option is

    2425 + 25x

    For the costs to be the same,

    1775 + 65x + 25x = 2425 + 25x

    65x + 25x - 25x = 2425 - 1775

    65x = 650

    x = 10
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Home » Mathematics » A golfer has two options for membership in a golf club. A social membership costs $1775 in annual dues. In addition, he would pay a $65 greens fee and a $25 golf cart fee every time he played. A golf membership costs $2425 in annual dues.
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