Category:Examples of Closed Sets (Complex Analysis)

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This category contains examples of Closed Set (Complex Analysis).

Let $S \subseteq \C$ be a subset of the complex plane.

$S$ is closed (in $\C$) if and only if every limit point of $S$ is also a point of $S$.

That is: if and only if $S$ contains all its limit points.

Pages in category "Examples of Closed Sets (Complex Analysis)"

The following 3 pages are in this category, out of 3 total.