lheiannie07 wrote:x percent of what number is equal to y?
1) x=10y
2) xy=40
What's the best way to determine whether statement 1 is sufficient?
OA A
Target question: x percent of what number is equal to y?
This is a good candidate for
rephrasing the target question
x percent of what number is equal to y?
Let k = the number we're trying to determine
We get:
"If x percent of k is equal to y, what is the value of k?
In other words,
x/100 of k = y
Or....
(x/100)(k) = y
To solve for k, multiply both sides by 100/x.
We get:
k = 100y/x
Let's REPHRASE the target question.....
Target question: What is the value of 100y/x?
So, all we need to do now is find the value of x/y
Statement 1: x = 10y
Divide both sides by x to get: 1 = 10y/x
Divide both sides by 10 to get: 1/10 = y/x
PERFECT!
If y/x = 1/10, then
100y/x = 100(1/10) = 10
Since we can answer the
REPHRASED target question with certainty, statement 1 is SUFFICIENT
Statement 2: xy = 40
This is NOT enough information to find the value of
100y/x
Consider these two conflicting cases:
Case a: x = 2 and y = 20, in which case
100y/x = 100(20)/(2) = 1000
Case b: x = 20 and y = 2, in which case
100y/x = 100(2)/(20) = 10
Since we cannot answer the
REPHRASED target question with certainty, statement 2 is NOT SUFFICIENT
Answer = A
Cheers,
Brent
