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6 April, 19:28

The school that molly goes to is selling tickets to a choral performance. On the first day of ticket sales the school sold 6 senior citizen tickets and 7 student tickets for a total of 174$. The school took in $318 on the second school day by selling 10 senior citizen tickets and 14 students tickets. Find the price of a senior citizen ticket and the price for a student ticket

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  1. 6 April, 19:48
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    The cost of a senior citizen ticket is $15 and the cost of a student ticket is $12.

    How did I get this?

    We know that 6 citizen tickets and 7 student stickers sold for $174 the first day. And 10 citizen tickets and 14 student tickets sold for $318 the second day.

    1. create two equations out of this: C = citizen cost per ticket and S = student cost per ticket.

    6C + 7S = $174

    10C + 14S = $318

    2. Use process of elimination. Multiply the first equation by 2 because we want two variables to cancel out.

    -12C - 14S = - $348

    10C + 14S = $318

    Combine like terms.

    -2C = $30

    Divide by - 2 on both sides. The left side cancels out.

    C = $30/-2

    C = - $15 (In this case the negative doesn't matter)

    C = $15 (cost of senior citizen ticket)

    Plug the value of C into any of the two equations so we can get the value of S.

    6 ($15) + 7S = $174

    Distribute the 6 into the parenthesis.

    $90 + 7S = $174

    Subtract both sides by $90 and the left side will cancel out.

    7S = $84

    Divide both sides by 7.

    S = $12

    Student ticket: $12

    Senior citizen ticket: $15
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