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30 Dec 2017, 22:21
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C
Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
Difficulty:
25%
(medium)
Question Stats:
71% (01:07) correct
29%
(01:25)
wrong
based on 195
sessions
History
Date
Time
Result
Not Attempted Yet
If \(-2 < {x} \le {\frac{1}{2}}\) and \(7 < {y} \le 10\), what is the least value of \(x^2*y\) possible?
A. \(2\)
B. \(\frac{7}{4}\)
C. \(0\)
D. \(-8\)
E. \(-14\)
A. \(2\)
B. \(\frac{7}{4}\)
C. \(0\)
D. \(-8\)
E. \(-14\)
30 Dec 2017, 22:28
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chetan2u
\(x^2\) can be \(0\) or positive only & \(y\) is positive, so negative options are not possible
as we have to minimize \(x^2*y\) (which is either \(0\) or a positive function) so any value closer or equal to \(0\) will be minimum.
as \(-2 < {x} \le {\frac{1}{2}}\), so \(x=0\) will yield the minimum value of \(x^2*y\).
Answer: \(0\)
option C
31 Dec 2017, 01:32
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chetan2u
The complementary approach to the one provided above is to just use the answers (they are right there in front of us!)
This is an Alternative approach.
Let's start with the smallest possible value in the answers: -14.
Trying out different numbers for x and y we'll just SEE that all of our results are positive.
Therefore we can never get to -14 so (E) is elimianted.
Similarly, we can never get to -8 so (D) is elimianted.
The next smallest answer is 0 and we'll get to it if we choose x=0.
Therefore (C) is possible so it must be our answer.
