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arvysri
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- Joined: Sat Sep 14, 2013 12:50 am
- Location: India
- GMAT Score:610
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Global Stats
Hello All,
I would like to listen to some comments and find alternate way(s) to approach the following question. If this question has been explained already in the forum, I apologize for the re-post.
OG Quant Review 2ED - PS - Question 103
If a, b, and c are constants, a > b > c, and (x^3 - x) = (x-a)(x-b)(x-c) for all numbers x, what is the value of b ?
I tried to expand x^3-x trying to find a way to solve but ended up nowhere. Hence I switched to this route.
The question stem states the Left Hand Side(LHS) = Right Hand Side(RHS) and also mentions "for all numbers x".
So I set x=2 (some random number) and arrived here:
8-2 = (2-a) (2-b) (2-c)
6 = (2-a) (2-b) (2-c)
From here - three numbers when multiplied together gives 6 (3x2x1) and a>b>c.
I needed a 3, 2 and 1 and picked numbers for a,b and c.
6 = (2-1) (2-0) (2-(-1))
I believe my approach does not follow a set rule, might take extra time and break in a few scenarios(that I couldn't think of now). Please explain how to solve this question in a systematic manner.
Thank you!
Best Regards,
Arvind.
I would like to listen to some comments and find alternate way(s) to approach the following question. If this question has been explained already in the forum, I apologize for the re-post.
OG Quant Review 2ED - PS - Question 103
If a, b, and c are constants, a > b > c, and (x^3 - x) = (x-a)(x-b)(x-c) for all numbers x, what is the value of b ?
I tried to expand x^3-x trying to find a way to solve but ended up nowhere. Hence I switched to this route.
The question stem states the Left Hand Side(LHS) = Right Hand Side(RHS) and also mentions "for all numbers x".
So I set x=2 (some random number) and arrived here:
8-2 = (2-a) (2-b) (2-c)
6 = (2-a) (2-b) (2-c)
From here - three numbers when multiplied together gives 6 (3x2x1) and a>b>c.
I needed a 3, 2 and 1 and picked numbers for a,b and c.
6 = (2-1) (2-0) (2-(-1))
I believe my approach does not follow a set rule, might take extra time and break in a few scenarios(that I couldn't think of now). Please explain how to solve this question in a systematic manner.
Thank you!
Best Regards,
Arvind.
