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Difficulty:
55%
(hard)
Question Stats:
55% (01:21) correct
45%
(01:23)
wrong
based on 148
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History
Date
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Not Attempted Yet
If equation ах^2 + bх + с = 0 have two distinct roots, which of the following must be true?
I. b > 0
II. ac > 0
III. ac < 0
(A) None
(B) I only
(C) II only
(D) III only
(E) I and II only
I. b > 0
II. ac > 0
III. ac < 0
(A) None
(B) I only
(C) II only
(D) III only
(E) I and II only
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23 Mar 2011, 18:46
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banksy
\(ax^2 + bx + c = 0\) will have 2 distinct roots (assumed to be real since we are dealing with GMAT here) when \(b^2 - 4ac > 0\)
(Note that when \(b^2 - 4ac = 0\), the roots are equal and when \(b^2 - 4ac < 0\), the roots are imaginary)
So \(b^2 > 4ac\) is the condition required.
Is it necessary that b should be positive? No. Even if b is negative, \(b^2\), which will be positive, can be greater than 4ac.
There is no condition at all on ac. It can be positive or negative. Just that \(b^2\) should be greater than it.
Hence we don't need any one of them to be necessarily true.
General Discussion
17 Mar 2011, 15:49
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banksy
we know that if a,b,c is +ve then both roots of x = -ve
roots of x = (-b+\sqrt{b^2 - 4ac})/2a and x = (-b-\sqrt{b^2 - 4ac})/2a
both of these roots will -ve if b>0. \sqrt{b^2 - 4ac} will have to be +ve for it to be a real number. I dont think we can say if ac needs to be +ve or -ve. I will go with B.
if we cannot assume a,b,c to be +ve. then I'll go with A.
