Continuity via sequences

In metric spaces, f is continuous at x iff it preserves limits of sequences converging to x

Continuity via sequences

Continuity via sequences: Let $(X,d_X)$ and $(Y,d_Y)$ be metric spaces and let $f:X\to Y$ . Then $f$ is continuous at $x\in X$ if and only if for every sequence $(x_n)$ in $X$ , $x_n\to x \quad\Longrightarrow\quad f(x_n)\to f(x).$

This is one of the most-used characterizations of continuity in analysis: it converts an $\varepsilon$ – $\delta$ condition into a limit-preservation property.