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13 July, 09:25

The school that Jennifer goes to is selling tickets to a play. On the first day of ticket sales the

school sold 3 adult tickets and 12 child tickets for a total of $141. The school took in $197 on the

second day by selling 13 adult tickets and 6 child tickets. What is the price each of one adult

ticket and one child ticket?

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Answers (1)
  1. 13 July, 09:32
    0
    Adult ticket = $11

    Children ticket = $9

    Step-by-step explanation:

    Let the price of adult tickets be x and let the price of children's ticket be y

    For the first day, the equation of sales can be put as

    3x + 12y = 141 ... 1

    For the second day, the equation of sales can be put as:

    13x + 6y = 197 ... 2

    We then take these two equations together and solve simultaneously.

    3x + 12y = 141 ... 1

    13x + 6y = 197 ... 2

    Solving by elimination method, we Multiply through equation 1 by 13 and multiply through equation 2 by 3.

    39x + 156y = 1833 ... 3

    39x + 18y = 591 ... 4

    Then subtract equation 4 from equation 3

    138y = 1242

    y = 9

    Substitute "y=9" into equation 1 to find x

    3x + 12 (9) = 141

    3x + 108 = 141

    3x = 141 - 108

    3x = 33

    x = 11

    Hence,

    Price of adult ticket = $11

    Price of children ticket = $9
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