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23 December, 21:24

A pile of 37 coins consists of nickels and dimes. The total value

of the coins is $3.10. Find the number of each type of coin.

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Answers (2)
  1. 23 December, 21:45
    0
    25 dimes & 12 nickels

    Step-by-step explanation:

    Let there be "n" nickels and "d" dimes

    Total, there are 37 of them, so we can write:

    n + d = 37

    Also, valueof nickel is 0.05 and value of dime is 0.10 (in dollars) and total value of these 37 coins is 3.10, so we can write:

    0.05n + 0.10d = 3.10

    Now we can write first equation as:

    n + d = 37

    n = 37 - d

    Replace this into equation 2 and solve for d:

    0.05n + 0.10d = 3.10

    0.05 (37 - d) + 0.10d = 3.10

    1.85 - 0.05d + 0.10d = 3.10

    0.05d = 3.10 - 1.85

    0.05d = 1.25

    d = 1.25/0.05

    d = 25

    Now, n = 37 - d, n = 37 - 25 = 12

    So,

    There are 25 dimes & 12 nickels
  2. 23 December, 21:46
    0
    12 nickel 25 dimes

    Step-by-step explanation:

    n=nickels

    d=dimes

    I'll multiply by 100 the value of the coins to avoid decimals

    n + d = 37

    5n + 10d = 310

    Now Multiply the first row by 10 (to cancel dime)

    10n + 10 d = 370

    5n + 10d = 310

    Subtract the second from the first:

    5n = 60

    n=12

    12 nickels 25 dimes

    0.05*12 = 0.60

    0.10 * 25 = 2.5

    0.60 + 2.5 = 3.10
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