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10 Mar 2011, 21:51
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Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
Difficulty:
75%
(hard)
Question Stats:
58% (02:41) correct
42%
(02:52)
wrong
based on 1000
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If \(|b|\geq 2\) and \(x = |a|*b\), then which of the following is always true?
A) \(a-x*b\geq 0\)
B) \(a+x*b\geq 0\)
C) \(a+x*b\leq 0\)
D) \(a-x*b\leq 0\)
E) Both B and D
A) \(a-x*b\geq 0\)
B) \(a+x*b\geq 0\)
C) \(a+x*b\leq 0\)
D) \(a-x*b\leq 0\)
E) Both B and D
My specific question is that,when you substitute the value of \(x\)in any of the given answer choice e.g. in the first answer choice
\(a- |a|b^2\geq 0\)
Should again two values of \(|a|\) be considered \(+a\) and \(-a\) when \(a>0\) and when \(a<0\) respectively? Or Should it be taken as
\(a- a*b^2\geq 0\) assuming the \(|a|\) is always going to be \(+\)?
\(a- |a|b^2\geq 0\)
Should again two values of \(|a|\) be considered \(+a\) and \(-a\) when \(a>0\) and when \(a<0\) respectively? Or Should it be taken as
\(a- a*b^2\geq 0\) assuming the \(|a|\) is always going to be \(+\)?
23 Dec 2015, 22:59
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vjsharma25
Given: \(|b|\geq 2\)
This implies that \(b^2 \geq 4\)
Given: \(x = |a|*b\)
|a| is either 0 or positive.
Assuming a is not 0, \(|a|*b^2\) is positive with greater absolute value than a because \(b^2 >= 4\)
Let's consider the two expressions:
1. \(a + xb = a + |a|*b^2\)
\(|a|*b^2\) is positive with greater absolute value than a so irrespective of whether a is positive or negative, \(a + |a|*b^2\) will be positive.
2. \(a - xb = a - |a|*b^2\)
Using the exact same analysis as above,
\(|a|*b^2\) is positive (so \(-|a|*b^2\) is negative) with greater absolute value than a so irrespective of whether a is positive or negative, \(a - |a|*b^2\) will be negative.
Hence, both (B) and (D) are correct.
General Discussion
10 Mar 2011, 22:15
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a could be zero. b could be +ve or -ve.
At a = 0, x = 0. So a-xb is zero, a+xb is zero
At b = -2. a=1 . x = -2. a+xb = 5 a -xb = -3
At b = 2. a=1. x= 2 a -xb = -3 a +xb = 5
I would have missed some test cases
At a = 0, x = 0. So a-xb is zero, a+xb is zero
At b = -2. a=1 . x = -2. a+xb = 5 a -xb = -3
At b = 2. a=1. x= 2 a -xb = -3 a +xb = 5
I would have missed some test cases
vjsharma25
