Answer:
17
Explanation:
First of all let us assume the following:
Let the number of nickels = n
Let the number of dimes = d
Let the number of quarters = q
Note also the following conversion factors:
1 nickel = $0.05
1 dime = $0.1
1 quarter = $0.25
we are given the following information:
n + d + q = 38. . . . (1) (38 coins consisting only of nickels, dimes, and quarters)
0.05n + 0.1d + 0.25q = 4.75 ( we can remove decimals by multiplying through by 100 to give)
5n + 10d + 25q = 475 . . . . (2) note that equation 2 can also be simplified by dividing through by 5, to give the following)
n + 2d + 5q = 95 . . . . . (2)
8n + 6d + 22q = 410 . . . . (3)
Next we will look for a way to eliminate two of the unknowns in each equation to have just one unknown that we can use to solve.
we have three equations
n + d + q = 38. . . . . . . . (1)
n + 2d + 5q = 95 . . . . . (2)
8n + 6d + 22q = 410 . . .(3)
Next we will look for a way to eliminate two of the unknowns in each equation to have just one unknown that we can use to solve.
we can eliminate n by subtracting equation (1) from (2) {eq (2) - eq (1)}
(n - n) + (2d - d) + (5q - q ) = (95 - 38)
= d + 4q = 57 . . . . . . (3)
Next we can multiply eqn (1) through by 8, to make it look like eqn (3), the we can subtract eqn (1) from eqn (3) as follows:
eqn (1) × 8 = 8 × (n + d + q = 38)
8n + 8d + 8q = 304 . . . . (1b) ; subtracting this from eqn (3) we have:
(8n - 8n) + (6d - 8d) + (22q - 8q) = (410 - 304)
= -2d + 14q = 106 . . . . (4)
Now, we have two simplified equations that we can work with:
d + 4q = 57 . . . . . . (3)
-2d + 14q = 106 . . . . (4)
from eqn (3), making 'd' the subject of the formular:
d = 57 - 4q ; replacing the value of d in eqn 4 with this value, we have:
-2(57 - 4q) + 14q = 106
-114 + 8q + 14q = 106
-114 + 22q = 106
22q = 106 + 114 = 220
22q = 220
∴ q = 220 ÷ 22 = 10
∴ q = 10
Next let us solve for 'd' by replacing the value of q with 10 in eqn (3)
d + 4q = 57 . . . . . . (3) (but q = 10)
d + 4(10) = 57
d + 40 = 57
d = 57 - 40 = 17
d = 17
finally to solve for n, let us input the values of q and d into eqn (1)
n + d + q = 38. . . . (1) (q = 10 ; d = 17)
n + 17 + 10 = 38
n + 27 = 38
∴ n = 38 - 27 = 11
Therefore the number of each coin are as follows:
nickel = 11
dime = 17
quarters = 10
the solution is quite lengthy, but if you don't understand it at first look, please go through it again.