I know well that:
$$ \max(x,y)=\frac{x+y+\lvert y-x\rvert}{2}$$
but I do not see how that it would be useful.
2026-04-07 11:17:28.1775560648
Prove that $\lim \limits_{n \to \infty}{\sqrt[n]{a^n+b^n}}=\max(a,b)$ if $(a_n,b_n)\to(a,b)$
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Without loss of generality, let $a \geq b$. Then
$$ a \leq \sqrt[n]{a^n + b^n} \leq \sqrt[n]{a^n + a^n} = 2^{1/n} a$$
Now apply the sandwich theorem.