I want to know if $\sup_{x\in X} f(x) = f(\sup_{x\in X}x)$ where $X$ is a compact space, and $f$ is a strictly increasing function: $\frac{df}{dx} >0$ for all $x$.
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I suppose that $X \subseteq \mathbb R$ (otherwise $\sup_{x\in X}x$ makes no sense !)
Let $x_0:= \sup_{x\in X}x$. Since $X$ is compact, we have $x_0 =\max X$. $f$ is increasing, then we have
$f(t) \le f(x_0)$ for all $t \in X$. Therefore
$\max f(X)=f(x_0)$.
Fred
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