vinni.k wrote:Do people have any idea in solving the following question ?
S = x^3 + 3^x
Is S > 0?
(1) x < 0
(2) | x | > 1
Answer C
[spoiler]I only face problem when i combine the two statements and don't know which way to go from there. Please explain with the help of examples.[/spoiler]
Thanks & Regards
Vinni
Statement 1: x<0
If x=-2, then S = (-2)^3 + 3^(-2) = -8 + (1/9), a sum less than 0.
If x=-1/2, then S = (-1/2)^3 + 3^(-1/2) = -1/8 + 1/√3 ≈ -1/8 + 1/1.7 ≈ -2/16 + 10/16 = 1/2, which is greater than 0.
INSUFFICIENT.
Statement 2: |x| > 1
If x=-2, then S = (-2)^3 + 3^(-2) = -8 + (1/9), a sum less than 0.
If x=2, then S = 2³ + 3² = 17, which is greater than 0.
INSUFFICIENT.
Combined:
Only values less than -1 satisfy both x<0 and |x|>1.
x³:
Cubing a value less than -1 yields a value LESS than the original value:
(-2)³ = -8.
(-3)³ = -27.
And so on.
3^x:
Raising 3 to a power less than -1 yields a POSITIVE FRACTION between 0 and 1:
3^(-2) = 1/9.
3^(-3) = 1/27.
And so on.
Thus, S = (value less than -1) + (positive fraction between 0 and 1), a sum less than 0.
SUFFICIENT.
The correct answer is
C.
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