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4 November, 08:11

Tickets to the circus cost $3 for children and $5 for adults. There was 3 times as many children tickets sold as an adult. All together the circus made $700. How many children and how many adults bought tickets to the circus?

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Answers (2)
  1. 4 November, 08:34
    0
    50 adults 150 children. that is an easy one you can do in your head.

    Step-by-step explanation:

    Let 5x = number of adults who bought tickets

    Let 3 * 3x = number of children who bought tickets.

    5X + 3 (3X) = 700

    14X = 700

    X = 50 adults

    3 * 50 = 150 children

    50 * $5 + 150 * $3 = $ 700
  2. 4 November, 08:38
    0
    150 children and 50 adults

    Step-by-step explanation:

    Let's call the amount of children tickets C, and the amount of adults tickets T. Then, we formulate the following equations:

    3*C + 5*A = 700 (Total earned by the circus)

    C = 3*A (3 times more children tickets)

    Using the value of C from the second equation in the first equation, we have:

    3 * (3*A) + 5*A = 700

    14*A = 700

    A = 50

    Now, we find the value of C using the second equation:

    C = 3*A = 3*50 = 150

    So, the number of children tickets is 150 and the number of adults tickets is 50.
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