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jzw
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I was able to solve it algebraically, but when I plug in the answers I can't seem to get it to match. What am I missing?
The price of X and Y was $1,500. If X had been purchased with Z, whose price was $2,000 more than that of X, then the price of Y would have been 1/8 of the total. What was the price of X?
A. $900
B. $1,000
C. $1,100
D. $1,200
E. $1,300
Ok; so...
8Y = X + X + 2000
X + Y = 1,500 or X = -Y + 2000
so...
8Y = -2Y + 5,000
10Y = 5000
Y = 500
So then if Y = $500 then X must be $1,000 because $1,500 - $500 = $1,000 and B is in fact, the correct answer.
My problem, and maybe it's late @ night so my brain is malfunctioning, is that X + Y + Z = $4,500 (had they been purchased all together like the question stem said) and Y is 1/9 of $4,500. What am I doing wrong here?
The price of X and Y was $1,500. If X had been purchased with Z, whose price was $2,000 more than that of X, then the price of Y would have been 1/8 of the total. What was the price of X?
A. $900
B. $1,000
C. $1,100
D. $1,200
E. $1,300
Ok; so...
8Y = X + X + 2000
X + Y = 1,500 or X = -Y + 2000
so...
8Y = -2Y + 5,000
10Y = 5000
Y = 500
So then if Y = $500 then X must be $1,000 because $1,500 - $500 = $1,000 and B is in fact, the correct answer.
My problem, and maybe it's late @ night so my brain is malfunctioning, is that X + Y + Z = $4,500 (had they been purchased all together like the question stem said) and Y is 1/9 of $4,500. What am I doing wrong here?
