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18 July, 02:17

Suppose that there are two types of tickets to a show: advance and same-day. The combined cost of one advance ticket and one same-day ticket is $65. For

one performance, 40 advance tickets and 20 same-day tickets were sold. The total amount paid for the tickets was $1900. What was the price of each kind of

ticket?

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Answers (1)
  1. 18 July, 04:21
    0
    advance tickets $30.00

    same day tickets $35.00

    Step-by-step explanation:

    1. In this equation, you are trying to find two values so you must use system of equations. Your two equations would be:

    40x + 20y = 1900

    x + y = 65

    x represents the price of advance tickets and y represents the price of same day tickets.

    2. Solve the equation by performing elimination using multiplication. Multiple one equation by a constant to get two equations that contain opposite terms.

    40x + 20y = 1900

    -40 (x + y = 65) → - 40x + - 40y = - 2600

    3. Add the equations, eliminating one variable. (add - 40x + - 40y = - 2600 to 40x + 20y = 1900)

    40x + 20y = 1900

    + - 40x + - 40y = - 2600

    Results in: - 20y = - 700

    Solve for y by dviding both sides by - 20.

    y = 35

    4. Substitute the solved value into one of the equations and solve for the remaining variable.

    x + 35 = 65

    Subtract 35 from both sides to solve for x.

    x = 30

    The advance tickets were $30.00 and the same day tickets were $35.00.
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