If n is a positive integer, then n(n+1)(n+2) is
(A) even only when n is even
(B) even only when n is odd
(C) odd whenever n is odd
(D) divisible by 3 only when n is odd
(E) divisible by 4 whenever n is even
OA: E
Can anyone, please explain the solution to this problem. Thanks.
OG2015 PS If n is a
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- lionsshare
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There's a nice rule says: The product of k consecutive integers is divisible by k, k-1, k-2,...,2, and 1lionsshare wrote:If n is a positive integer, then n(n+1)(n+2) is
(A) even only when n is even
(B) even only when n is odd
(C) odd whenever n is odd
(D) divisible by 3 only when n is odd
(E) divisible by 4 whenever n is even
So, for example, the product of any 5 consecutive integers will be divisible by 5, 4, 3, 2 and 1
Likewise, the product of any 11 consecutive integers will be divisible by 11, 10, 9, . . . 3, 2 and 1
NOTE: the product may be divisible by other numbers as well, but these divisors are guaranteed.
Notice that n, n+1, and n+2 are three consecutive integers.
This means the product of n, n+1, and n+2 will be divisible by 3, 2 and 1
Since n(n+1)(n+2) is divisible by 2, then the product is ALWAYS EVEN.
This means we can eliminate answer choices A and B, because they put restrictions on when the product is even.
We can also eliminate C because it suggests that the product can be odd.
Likewise, since n(n+1)(n+2) is ALWAYS divisible by 3, we can eliminate answer choice D, because it puts a restriction on when the product is divisible by 3
Answer: E
Cheers,
Brent
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Hi lionsshare,
This question can be solved by TESTing VALUES (although you'll need to TEST at least 2 options to properly eliminate all of the wrong answers.
IF...
N = 1, then (N)(N+1)(N+2) = (1)(2)(3) = 6
N = 2, then (N)(N+1)(N+2) = (2)(3)(4) = 24
Answer A is eliminated by the 1st option
Answer B is eliminated by the 2nd option
Answer C is eliminated by the 1st option
Answer D is eliminated by the 2nd option
There's only one option remaining...
Final Answer: E
GMAT assassins aren't born, they're made,
Rich
This question can be solved by TESTing VALUES (although you'll need to TEST at least 2 options to properly eliminate all of the wrong answers.
IF...
N = 1, then (N)(N+1)(N+2) = (1)(2)(3) = 6
N = 2, then (N)(N+1)(N+2) = (2)(3)(4) = 24
Answer A is eliminated by the 1st option
Answer B is eliminated by the 2nd option
Answer C is eliminated by the 1st option
Answer D is eliminated by the 2nd option
There's only one option remaining...
Final Answer: E
GMAT assassins aren't born, they're made,
Rich
GMAT/MBA Expert
- ceilidh.erickson
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Building on what Brent said, it helps to recognize that (n)(n + 1)(n + 2) and similar structures are signals of consecutive integers. Here are some other variations on the same pattern:
https://www.beatthegmat.com/is-x-x-2-x- ... 76379.html
https://www.beatthegmat.com/remainders- ... tml#743763
https://www.beatthegmat.com/x-x-1-x-k-t ... tml#770020
https://www.beatthegmat.com/totaly-lost ... tml#716315
https://www.beatthegmat.com/is-x-x-2-x- ... 76379.html
https://www.beatthegmat.com/remainders- ... tml#743763
https://www.beatthegmat.com/x-x-1-x-k-t ... tml#770020
https://www.beatthegmat.com/totaly-lost ... tml#716315
Ceilidh Erickson
EdM in Mind, Brain, and Education
Harvard Graduate School of Education
EdM in Mind, Brain, and Education
Harvard Graduate School of Education
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- Jeff@TargetTestPrep
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The problem is easiest to solve by substituting numbers for n. We'll try an odd number first and then an even number.lionsshare wrote:If n is a positive integer, then n(n+1)(n+2) is
(A) even only when n is even
(B) even only when n is odd
(C) odd whenever n is odd
(D) divisible by 3 only when n is odd
(E) divisible by 4 whenever n is even
For an odd number, let's let n = 1:
1(1+1)(1+2) = 1(2)(3) = 6
We see that choices A and C can't be the correct choices. Choice A is false because, while the product is even, n is not even. Choice C is false because, while n is odd, the product is even.
For an even number, let's let n = 2:
2(2+1)(2+2) = 2(3)(4) = 24
We see than choices B and D can't be the correct choices. Choice B is false because, while the product is even, n is not odd. Choice D is false because, while the product is divisible by 3, n is even.
Therefore, the only correct answer is choice E. When n is even, the product is indeed divisible by 4.
Answer: E
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