Answer:
10 ounces
Explanation:
Let's define some variables:
g = ounces of gold per piece
s = ounces of silver per piece
x = ounces of other alloy per piece
There's twice as much gold as there is silver, so:
g = 2s
The total weight of the piece is 3 ounces, so:
g + s + x = 3
The total cost is $438, so:
160g + 140s + 124x = 438
Three equations, three variables. We can solve the system of equations. If we substitute the first equation into the second:
2s + s + x = 3
3s + x = 3
x = 3 − 3s
If we substitute this new equation and the first equation into the third equation:
160 (2s) + 140s + 124 (3 − 3s) = 438
320s + 140s + 372 − 372s = 438
88s = 66
s = 0.75
Now solve for g and x:
g = 2s = 1.5
x = 3 − 3s = 0.75
The amount of alloy equals the amount of silver. The jeweler has 10 ounces of silver, so she needs 10 ounces of alloy.