The Journal of the Indian Mathematical Society

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Cauchy's Criterion for the Solvability of Xp + YpZp in Integers Prime to P


     

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Cauchy stated, and it is not yet prqred, that if the equation Xp + Yp = Zp has any solutions in integers all prime to p, then

θn=1 np-4=O(mod p) … (1.1)

where θ= [1/2p]; [x] denotes the greatest integer contained in.


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  • Cauchy's Criterion for the Solvability of Xp + YpZp in Integers Prime to P

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Abstract


Cauchy stated, and it is not yet prqred, that if the equation Xp + Yp = Zp has any solutions in integers all prime to p, then

θn=1 np-4=O(mod p) … (1.1)

where θ= [1/2p]; [x] denotes the greatest integer contained in.