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21 June, 09:49

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 $ 45. For one performance, 30 advance tickets and 20 same-day tickets were sold. The total amount paid for the tickets was $ 1150. What was the price of each kind of ticket?

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  1. 21 June, 12:12
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    The price of an advance ticket = 25$

    The price of a same day ticket = 20 $

    Step-by-step explanation:

    Given there are two types of tickets:

    (i) Advance, call it A and

    (ii) Same - day, call it S.

    Now it is also given that the combined cost of them is 45$.

    ⇒ A + S = 45$ ... (1)

    Also given is that 30 Advance tickets and 20 same day tickets are sold for a total of 1150 $. Mathematically representing this would be:

    30 A + 20 S = 1150 $ ... (2)

    Now we have to solve Equations (1) and (2) to get values for A and S.

    To do that multiply (1) by 30 and subtract (1) and (2).

    We will get S = 20. Substitute this in (1). We get A = 25.

    Thus, we say the cost of an Advance ticket is 25$ and

    The cost of a same day ticket is 20$.
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