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Updated on: 30 Jan 2019, 05:12
Originally posted by gregspirited on 26 Nov 2007, 14:15.
Last edited by Bunuel on 30 Jan 2019, 05:12, edited 2 times in total.
Last edited by Bunuel on 30 Jan 2019, 05:12, edited 2 times in total.
Renamed the topic and edited the question.
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A
Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
Difficulty:
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Question Stats:
76% (01:41) correct
24%
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If n is an integer greater than 6, which of the following must be divisible by 3?
A. \(n (n+1) (n-4)\)
B. \(n (n+2) (n-1)\)
C. \(n (n+3) (n-5)\)
D. \(n (n+4) (n-2)\)
E. \(n (n+5) (n-6)\)
A. \(n (n+1) (n-4)\)
B. \(n (n+2) (n-1)\)
C. \(n (n+3) (n-5)\)
D. \(n (n+4) (n-2)\)
E. \(n (n+5) (n-6)\)
24 Mar 2012, 01:40
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gregspirited
Since 3 is a prime number, then in order for the product to be divisible by 3, one of the multiples must be divisible by 3. Now, to guarantee that at least one multiple is divisible by 3, these numbers must have different remainders upon division by 3, meaning that one of them should have the remainder of 1, another the remainder of 2, and the third one the remainder of 0, so it is divisible by 3.
For option A: n and n + 1 have different remainders upon division by 3. As for n - 4, it will have the same remainder as (n - 4) + 3 = n - 1, so it is also different from the remainders of the previous two numbers.
Answer: A.
Similar question to practice: https://gmatclub.com/forum/if-x-is-an-i ... 26853.html
Hope it helps.
03 Jul 2013, 21:51
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pavan2185
In my opinion, using logic is almost always better than plugging in. Plugging in is full of possibilities of making mistakes - incorrect calculation, not considering all possibilities, getting lost in the options etc.
Logic is far cleaner.
I know that talking about positive integers, in any set of 3 consecutive positive integers, one integer will be divisible by 3 and the other 2 will not be.
So I am looking for 3 consecutive positive integers e.g. (n-1)n(n+1)
Note that (n-4) is equivalent to (n-1) since if (n-4) is divisible by 3, so is (n-1). If (n-4) is not divisible by 3, neither is (n-1) (because the difference between these two integers is 3)
Hence (A) is equivalent to 3 consecutive integers.
Answer (A)
On same lines, note that n is equivalent to (n-3), (n + 3), (n + 6) etc.
