You have 17 coins in pennies, nickels, and dimes in your pocket. The value of the coins is $0.47. There are four times the number of pennies as nickels. How many of each type of coin do you have? Set up the system and solve.

Question

Mathematics

Orion

26 March, 16:18

You have 17 coins in pennies, nickels, and dimes in your pocket. The value of the coins is $0.47. There are four times the number of pennies as nickels. How many of each type of coin do you have? Set up the system and solve.

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Answers (1)

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Kelsey Manning · Answer 1

12 pennies, 3 nickles, and 2 dimes

p = number of pennies

n = number of nickles

d = number of dimes

p (1) + n (5) + d (10) = 47

that is, the number of pennies x 1 cent + number nickles x 5 cents

+ number of dimes x ten cents equals 47 cents

p = 4n

p + n + d = 17

Substituting 4n for p in the above

4n + n + d = 17

5n + d = 17

Subtract 5n from each side

d = 17 - 5n

We will now substitute 4n for p and (17-5n) for d in

the equation

p (1) + n (5) + d (10) = 47

4n (1) + n (5) + (17-5n) (10) = 47

9n + 170 - 50n = 47

-41n + 170 = 47

Subtract 170 from each side

-41n = 47 - 170

-41n = - 123

Divide each side by - 41

n = 3

Since p = 4n

p = 4 (3)

p = 12

Since p + n + d = 17

12 + 3 + d = 17

15 + d = 17

d = 2

So we have 12 pennies, 3 nickles and 2 dimes

12 + 3 (5) + 2 (10) ? = 47

12 + 15 + 20? = 47