Definition:Continuously Differentiable/Vector-Valued Function/Open Set
< Definition:Continuously Differentiable | Vector-Valued Function(Redirected from Definition:Continuously Differentiable Vector-Valued Function on Open Set)
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Definition
Let $U \subset \R^n$ be an open set.
Let $f: U \to \R^m$ be a vector-valued function.
Then $f$ is continuously differentiable in $U$ if and only if $f$ is differentiable in $U$ and its partial derivatives are continuous in $U$.