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Here's another interesting quesiton. (1 Viewer)

roadrage75

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here's an interesting question. - if you know how to approach it , it is very easy, but if not, it is very difficult.

i'm interested to see how you guys go about it? and also to see whether the way i did it is popular or unusual.

anyway, here's the question.

how many positive integers n are there such that n+3 divides n^2 +7 without a remainder.
 

pinknails500

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see this is why i did gneral maths pppppppppppehh its probably reallyy easy but i have no clue what your asking
 

Mark576

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(n^2 + 7)/(n + 3) = n – 3 + 16/(n + 3); for the expression for the remainder to be integral, n = 1, 5 or 13.
 
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tommykins

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Fucking awesome, I have no idea what he did to obtain the answer..

I understand that (n^2 + 7)/(n+3) bit but have no idea what he did to proceed.
 

undalay

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(n^2 + 7)/(n + 3) = n – 3 + 16/(n + 3);

For it to divide perfectly i.e. no remainder;
(n^2 + 7)/(n + 3) must be an integer.

but (n^2 + 7)/(n + 3) = n – 3 + 16/(n + 3);

thus n – 3 + 16/(n + 3); must be an integer.

thus 16/(n + 3); must be an integer

Then you find n which will make that fraction an integer.
 

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