Let
be the number of integral solutions of the equation
satisfying the condition
, and let
be the number of integral solutions of the equation
satisfying the condition
. Prove that
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Let $N$ be the number of integral solutions of the equation
$$x^2 - y^2 = z^3 - t^3$$
satisfying the condition $0 \leq x, y, z, t \leq 10^6$, and let $M$ be the number of integral solutions of the equation
$$x^2 - y^2 = z^3 - t^3 + 1$$
satisfying the condition $0 \leq x, y, z, t \leq 10^6$. Prove that $N >M.$
Školjka