Continuous function in compact sets - Real analysis

Letting $x$ range through a compact set $L$, we obtain that $f$ is continuous on a compact set $L\times K$. Continuity on a compact set implies uniform continuity. Thus, for every epsilon you can choose a delta such that etc. In particular the estimate holds when $|x-x_0|<\delta$.

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Functions

Continuity

Real Analysis

Compactness

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