Gmat_mission wrote:If x is a positive number and 1/2 the square root of x is equal to 2x, then x =
A. 1/16
B. 1/4
C. 1/2
D. 2
E. 8
[spoiler]OA=A[/spoiler].
How can I solve this PS question? Should I try number by number?
We could also back-solve.
First, we know that if we're taking the square root of a number, and then cutting that number in half, the only way we'd end up with a larger than what we started with is if we start with a fraction between 0 and 1. (Otherwise taking the square root would reduce the value of the number, and then we'd reduce it again by multiplying it by 1/2. ) So only A, B, and C make sense. We can see pretty clearly that C won't work, as once we take the square root, we'll end up with a radical, and thus we can't end up with twice the original number, which does not contain a radical.
So we only have to test A or B. If the answer we test works, we're done. If it doesn't work, the answer must be the other.
Try B. In this case x = 1/4.
√ (1/4) = 1/2.
(1/2)* (1/2) = 1/4. This equal to x, not 2x, so Be is out.
At this point, the answer has to be
A, but if you wanted to confirm
x = 1/16
√ (1/16) = 1/4
(1/2) * (1/4) =
1/8
if x = 1/16, then 2x = 1/8, and thus we have our answer.
