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I recently came across the following statement when I was trying to solve a problem in TopCoder -

Every divisor of r^2 is the product of two divisors of r

Here, I was able to prove that

Any product of two divisors of r will always be a divisor for r^2.

But then, I was not able to prove it the other way, ie.

Any divisor of r^2 will always be a product of two divisors of r.

I tried googling it, but to no avail. So any light on this proof is much appreciated


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closed as off-topic by Peter Olson, GregS, ypercube, Adam Wright, Dogbert Jun 4 '14 at 16:47

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Is one a divisor? Can you give the problem page? I'm also fever in TopCoder. –  fish_ball Jun 4 '14 at 15:59
One is always a divisor, trivially so –  Ben Jun 4 '14 at 16:00
This question appears to be off-topic because it is about number theory. –  Peter Olson Jun 4 '14 at 16:01
It seems to be wrong, let r=2 and r^2=4 then 2 is a factor of r^2, but is it a product of two divisor of r=2? –  fish_ball Jun 4 '14 at 16:06
@fish_ball Well, 2 can be written as 1 * 2 and 1 is a divisor of 2 and 4. –  Balasubramanian Jun 4 '14 at 16:08

1 Answer 1

up vote 2 down vote accepted

Let p1, p2, ..., pn be the prime factorization of r. (Note that the same prime number can appear multiple times in the prime factorization, e.g. it's possible that p1=2 and p2=2.)

Then the prime factorization of r2 is p12 p22 ... pn2.

Let d be a divisor of r2. Then d = p1i1 p2i2 ... pnin where each ik is either 0, 1, or 2.

Let a = the product of all pk where ik is 1 or 2, and let b = the product of all pk where ik is 2. Then a is a divisor of r, b is a divisor of r, and ab = d, as desired.

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I think this needs a slight edit: if b had a factor d_k^2, it would not divide r. From the prime factorization of D, if i_k is 2, split them among a and b –  Ben Jun 4 '14 at 16:24
@Ben b does not have the factor d_k^2, it has the factor d_k if i_k is 2. This is how I split the i_k among a and b. –  Peter Olson Jun 4 '14 at 16:27
I think you should edit and write the prime factorization of r as d1^k1, d2^k2, ..., dn^kn –  ypercube Jun 4 '14 at 16:28
@ypercube Good point, I'm assuming that the same prime factor can appear multiple times in the list. –  Peter Olson Jun 4 '14 at 16:46
@PeterOlson You answer yourself, but at the same time prevent others from answering as well? This seems odd. Is this procedure documented somewhere, maybe in Meta? –  pentadecagon Jun 4 '14 at 16:55

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