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| A quotient and square problem (Posted on 2006-09-23) |
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Determine all primes m for which the quotient (2m-1 - 1)/m is a perfect square.
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Submitted by K Sengupta
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Rating: 3.3333 (3 votes)
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Solution:
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( We denote < sign, > sign, < = sign and > = sign respectively by lt, gt, lteq and gteq))
If m is a prime which is not equal to 2, then
(2^m -1 ) = (2^(m-1)/2 - 1 )(2^(m-1)/2 + 1 ) is divisible by m in terms of the Fermat's theorem.
So, either (2^(m-1)/2 - 1 )or (2^(m-1)/2 + 1 ) is divisible by m. They are relatively prime, since these are successive odd integers. Suppose that m is a odd prime such that and (2^(m-1)/2 - 1 )/m is a square.
First, let us suppose that (2^(m-1)/2 - 1 ) is divisible by m. We know that, if x and y are relatively prime positive integers such that their product xy is a perfect square, then x and y separately must be perfect squares.
Since, (2^m -1 )/m = ((2^(m-1)/2 - 1 )/p)(2^(m-1)/2 + 1 ); we observe that 2^(m-1)/2 + 1 = a^2, for some integer a gt 2.
Thus; 2^(m-1)/2 = a^2 - 1 = (a-1)(a+1)
If a-1 = 2^r, a+1 = 2^s for 0 lt r lt s, then:
2^s - 2^r = 2, giving 2^(s-1) - 2^(r-1) = 1
Since, 0 lteq (r-1) lt (s-1), this is possible only if r-1=0, s-1 = 1.
Hence, a-1 =2, so that a=3;
2^(m-1)/2 = a^2-1 = 8; (m-1)/2 =3, giving m = 7
Next, let us suppose that 2^(m-1)/2 + 1 is divisible by m.
Since, (2^m -1 )/m = (2^(m-1)/2 - 1 )(2^(m-1)/2 + 1 ); we observe, exactly as before that 2^(m-1)/2 - 1 =b^2, for some integer b gt 0.
If, (m-1)/2 gteq 2, then this implies that b^2 = -1 (Mod 4), which is not feasible.
Hence, (m-1)/2 lteq 1, so that m = 3, since m must be odd.
Finally, if m =7, then :
(2^(m -1)/2 - 1 )/m = 9 ,
And if m =3, then : (2^(m -1)/2 - 1 )/m = 1.
THUS, THE DESIRED PRIMES ARE 3 and 7.
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