SOLUTION: a change purse contains only quarters and dimes. There are 15 coins in the purse. the value of the coins is $2.70. determine the number of quarters and dimes in the purse.
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Question 1009623: a change purse contains only quarters and dimes. There are 15 coins in the purse. the value of the coins is $2.70. determine the number of quarters and dimes in the purse. Answer by Edwin McCravy(20056) (Show Source):
Let the number of quarters be x
Let the number of dimes be y
Value Value
Type Number of of
of of EACH ALL
coin coins coin coins
-------------------------------------------
quarters x $0.25 $0.25x
dimes y $0.10 $0.10y
-------------------------------------------
TOTALS 15 ----- $2.70
The first equation comes from the second column.
x + y = 15
The second equation comes from the last column.
0.25x + 0.10y = 2.70
Get rid of decimals by multiplying every term by 100:
25x + 10y = 270
So we have the system of equations:
.
We solve by substitution. Solve the first equation for y:
x + y = 15
y = 15 - x
Substitute (15 - x) for y in 25x + 10y = 270
25x + 10(15 - x) = 270
25x + 150 - 10x = 270
15x + 150 = 270
15x = 120
x = 8 = the number of quarters.
Substitute in y = 15 - x
y = 15 - (8)
y = 7 dimes.
Checking: 8 quarters is $2.00 and 7 dimes is $0.70
That's 15 coins.
And indeed $2.00 + $0.70 = $2.70
Edwin
