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32^232 + 17^232 24 Jun 2011, 01:49
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D
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54% (01:24) correct 46% (01:35) wrong based on 24 sessions

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32^232 + 17^232 is definetly divisible by:

a. 49
b. 15
c. 49 & 15
d. none of these

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D
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subhashghosh
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32^232 + 17^232 24 Jun 2011, 02:21
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The answer is D, none of these.

This is because 32^232 is even with only even factors, while 49 and 15 have only odd factors.

Also, This is because 17^232 is co-prime with 49 and 15 (although this step is unnecessary).
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32^232 + 17^232 24 Jun 2011, 02:30
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Can u pls explain what is Coprime.
Also 32^232 is even and 17^232 is odd evn+odd is odd
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32^232 + 17^232 24 Jun 2011, 02:32
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Co-Prime means numbers that do not have a common factor apart from 1, like 2 and 3, 11 and 12 etc.

I did not get what you mean by this :

Also 32^232 is even and 17^232 is odd evn+odd is odd
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32^232 + 17^232 24 Jun 2011, 02:43
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dimri10
32^232 + 17^232 is definetly divisible by:

a. 49
b. 15
c. 49 & 15
d. none of these
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has to be D
as subhash said.

other approach is CRT

32^232+ 17^232 mod 15 = 16^58+ 16^58 mod 15 = 1^58 + 1^58 mod 15 = 2 mod 15 = 2
similar approach for 49.

other good to know rules
a^n - b^n is always divisible by a-b
a^n - b^n is always divisible by a+b if n is even
a^n + b^n is always divisible by a+b if n is odd
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32^232 + 17^232 24 Jun 2011, 11:16
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dimri10
32^232 + 17^232 is definetly divisible by:

a. 49
b. 15
c. 49 & 15
d. none of these
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Last digit of 32^232 is same as last digit of 2^4 which is 6.
Last digit of 17^232 is same as last digit of 7^4 which is 1.
Adding last digit of 32^232 + 17 ^232 = 6+1=7
Now the resulting number will be of the form xyz7 which can never be divisible by 15. SO b and c is out.

Now i am not very sure how to eliminate 49. Since 49*3= 147, 32^232 + 17^232 could end in 7 and could be divisible by 7.
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32^232 + 17^232 24 Jun 2011, 14:53
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This question is clearly not a GMAT question. While you can use units digits to show that 32^232 + 17^232 is not divisible by 5 (and thus by 15), to determine that 32^232 + 17^232 is not divisible by 49 you'd need an advanced understanding of modular arithmetic, and that just isn't tested on the GMAT (you can use the fact that 17^2 and 32^2 give the same remainder when divided by 49 to see that 32^232 + 17^232 won't be divisible by 49). I'm sure this is an IIM question, particularly because it has only four answer choices.

subhashghosh
The answer is D, none of these.

This is because 32^232 is even with only even factors, while 49 and 15 have only odd factors.

Also, This is because 17^232 is co-prime with 49 and 15 (although this step is unnecessary).
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I think there are some misunderstandings in the above. Let's take a much simpler example (don't use this question as a practice question - it's not a good GMAT question). If I ask

2^6 + 3^6 is divisible by:
I) 3
II) 13
III) 61


you'll notice that 2^6 has only even factors, 3^6 has only odd factors, and 3^6, 13 and 61 are relatively prime (share no prime divisors). In these respects, this question is just like the one in the original post. Those facts are all irrelevant; they don't help us to answer the question. 2^6 + 3^6 *is* divisible by 13 and by 61 - you can confirm with a calculator.

In the above question the one answer you *could* rule out immediately is 3. When we add 2^6 and 3^6, we are adding a multiple of 3 to a number which is *not* a multiple of 3. When we do this, we can *never* get a multiple of 3. So it is in that case that common divisors can be relevant. For example 32^232 + 17^232 could not possibly be divisible by 17, since we are adding a multiple of 17 to a non-multiple of 17. But you can't rule out any other odd primes on that basis. I don't know what divisors 32^232 + 17^232 has, but they are absolutely certain to be relatively prime with 32 and 17.


jamifahad

Now i am not very sure how to eliminate 49. Since 49*3= 147, 32^232 + 17^232 could end in 7 and could be divisible by 7.
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Units digits won't tell you anything about whether a number is divisible by 7. Multiples of 7 can end in anything at all (just list the first ten positive multiples of 7 and you will see you get all ten possible units digits: 7, 14, 21, 28, 35, 42, 49, 56, 63, 70). Units digits will tell you when you can divide by 2, 5 or 10, but otherwise don't tell you much about divisibility.

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