How do you find the derivative of $arcsin x + arccos x$ ?

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How do you find the derivative of $arcsin x + arccos x$ ?

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Answer 1 · 2016-05-02T07:01:16

This is single valued and equals the constant $pi/2$ , if and only if its range is specified as #[alpha, alpha+pi/2], and in this case, the derivative is 0. Otherwise, it is not differentiable.

Explanation:

If u = arc sin x and v = arc cos x, u + v is many valued and is of the

form of an odd multiple of $pi/2$ .

u + v is single valued and equals the constant $pi/2$ , if and only if its

range is specified as #[alpha, alpha+pi/2], and in this case, the

derivative is 0. Here, $alpha$ is arbitrary.

Otherwise, it is not differentiable.

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How do you find the derivative of $arcsin x + arccos x$ ?

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