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22 April, 18:56

I only need the equations, I can solve it.

A pile of 22 coins consists of nickels and dimes. The total value of the coins is 1.20. Find the number of each type of coin.

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Answers (2)
  1. 22 April, 19:46
    0
    How can you solve it if you don't know the equations? : P Just kidding ...

    n+d=22, so we can say that d=22-n

    5n+10d=120, and using d found above in this equation gives you:

    5n+10 (22-n) = 120

    5n+220-10n=120

    -5n=-100

    n=20, and since d=22-n, d=2

    So there are two dimes and twenty nickels ...

    check ...

    20 (5) + 2 (10) = 100+20=120 cents which is $1.20

    n+d=22, 20+2=22, 22=22
  2. 22 April, 21:37
    0
    You have a pile of 22 coins that includes nickels and dimes

    Let n = nickels and d = dimes

    total coins = nickels and dimes

    n+d=22

    The total value of the coins is $1.20

    d=1.20-n

    You would solve by system of equations.

    n+d=22

    d=1.20-n

    I suggest using process of substitution
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