No Integral Solutions to Larsen Problem

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[SOLVED] larsen problem

Homework Statement


Determine all integral solutions of [itex]a^2+b^2+c^2=a^2 b^2[/tex]. (Hint: Analyze modulo 4.)<h2>Homework Equations</h2><br /> <h2>The Attempt at a Solution</h2><br /> a^2,b^2,c^2 are congruent to 0 or 1 mod 4 implies that a^2,b^2,c^2 are all congruent to 0 mod 4. This implies that a,b,c are even.<br /> <br /> [tex]a=2a_1, b=2b_1, c=2c_1[/tex]<br /> <br /> Then we have [itex]a_1^2+b_1^2+c_1^2 = 4a_1^2 b_1^2[/itex]. Now it is very clear that a_1^2,b_1^2,c_1^2 are all congruent to 0 mod 4.<br /> <br /> Let [itex]a_1=2a_2,b_1=2b_2,c_1=2c_2[/itex].<br /> <br /> If we keep doing this, we get 3 decreasing sequences of positive integers that never reach zero, which is impossible.<br /> <br /> Therefore there are no solutions.<br /> <br /> Is that right?[/itex]
 
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No. I'm just not confident in my proofs in general and the word "all" in the problem statements made me think there would be at least one.
 
Of course :rolleyes:

The reason my proof does not apply to that case is because then, for example, a,a_1,a_2,... is constant sequence, nondecreasing sequence of 0s. However, if any of a,b,c are nonzero then everything in my proof applies.