Question Banks -Number Properties #11
Below is the question and explanation. My question is about the explanation for choice D. It says if we rewrite the expresssion, we get ac-bc>0. I don't follow how this is done? Why is the inequality signed flipped? Thanks
If (a - b)c < 0, which of the following cannot be true?
a < b
c < 0
|c| < 1
ac > bc
a2 - b2 > 0
If (a - b)c < 0, the expression (a - b) and the variable c must have opposite signs.
Let's check each answer choice:
(A) UNCERTAIN: If a < b, a - b would be negative. It is possible for a - b to be negative according to the question.
(B) UNCERTAIN: It is possible for c to be negative according to the question.
(C) UNCERTAIN: This means that -1 < c < 1, which is possible according to the question.
(D) FALSE: If we rewrite this expression, we get ac - bc > 0. Then, if we factor this, we get: (a - b)c > 0. This directly contradicts the information given in the question, which states that (a - b)c < 0.
(E) UNCERTAIN: If we factor this expression, we get (a + b)(a - b) < 0. This tells us that the expressions a + b and a - b have opposite signs, which is possible according to the question.
The correct answer is D.
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- Kevin
Additional Question
Can you explain choice E? I don't see why when we factor choice E the inequality sign flips as it does in the explanation.
Why does a+b and a-b have opposite signs, I don't see this?
Why does a+b and a-b have opposite signs, I don't see this?
- StaceyKoprince
- ManhattanGMAT Staff
- Posts: 9360
- Joined: Wed Oct 19, 2005 9:05 am
- Location: Montreal
This is problem #10, not 11, from the Number Properties Question Bank. :)
First question (about choice D)
ac > bc
subtract bc from both sides
ac - bc > bc - bc
simplify
ac - bc > 0
You ask why the sign flips... but it doesn't. (Even in what you typed above, it doesn't flip - it's always >.)
Second question (about choice E)
For future, please note the proper formatting to use to indicate exponents: a^2 - b^2
On this one - you're right, that's a rather major typo. The sign shouldn't flip.
Do you understand why (a+b) and (a-b) would have opposite signs IF that statement were typed correctly? Or was your confusion there just because you didn't know why the sign flipped? Let me know.
So explanation for E should say (a+b)(a-b) > 0, therefore the two expressions (a+b) and (a-b) have the same sign. This is possible according to the original inequality, so it is not the one that must be false.
First question (about choice D)
ac > bc
subtract bc from both sides
ac - bc > bc - bc
simplify
ac - bc > 0
You ask why the sign flips... but it doesn't. (Even in what you typed above, it doesn't flip - it's always >.)
Second question (about choice E)
For future, please note the proper formatting to use to indicate exponents: a^2 - b^2
On this one - you're right, that's a rather major typo. The sign shouldn't flip.
Do you understand why (a+b) and (a-b) would have opposite signs IF that statement were typed correctly? Or was your confusion there just because you didn't know why the sign flipped? Let me know.
So explanation for E should say (a+b)(a-b) > 0, therefore the two expressions (a+b) and (a-b) have the same sign. This is possible according to the original inequality, so it is not the one that must be false.
Stacey Koprince
Instructor
Director, Content & Curriculum
ManhattanPrep
Instructor
Director, Content & Curriculum
ManhattanPrep
3 posts Page 1 of 1