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19 April, 09:11

Example 1 The total cost of 5 textbooks and 4 pens is $ 32.00; the total cost of 6 other books of the same text and 3 pens is $ 33.00. Find the cost of each item. Solution: Let x = the cost of a book in dollars, y = the cost of a pen in dollars. Depending on the problem we obtain the two equations: 5x+4y = 32 6x+3y=33 Example 2 I have $ 120.00 in 33 tickets at $ 5 and $ 2. How many tickets are $ 5 and how many $ 2? Solution: Let x = the number of tickets of $ 2 and y = the number of tickets $ 5. Under the terms: x + y = 33. Depending on the problem we obtain the two equations: x+y=33 2x+5y=133

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  1. 19 April, 09:27
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    For example 1, each text book costs $4 and each pen costs $3.

    For example 2, 18 $5 tickets were sold and 15 $2 tickets were sold.

    Explanation:

    Example 1:

    let T = number of text books

    let P = number of pens

    5T + 4P = 32

    6T + 3P = 33 (we can start by dividing this equation by 11)

    5T + 4P = 32

    2T + 1P = 11 (now lets multiply be - 4)

    5T + 4P = 32

    -8T - 4P = - 44 (now we add)

    -3T = - 12

    T = - 12 / 3 = 4

    P = (2 X 4) + P = 11

    P = 11 - 8 = 3

    Example 2:

    let C = cheap tickets

    let E = expensive tickets

    C + E = 33 ⇒ C = 33 - E (and now we can replace)

    2C + 5E = 120

    2 (33 - E) + 5E = 120

    66 - 2E + 5E = 120

    66 + 3E = 120

    3E = 120 - 66 = 54

    E = 54 / 3 = 18

    C = 33 - 18 = 15
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