What is the antiderivative of ${csc}^{2} x$ $csc^2x$ ?

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What is the antiderivative of ${csc}^{2} x$ $csc^2x$ ?

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Answer 1 · 2015-03-15T03:35:30

The antiderivative of ${csc}^{2} x$ $csc^2x$ is $- cot x + C$ $-cotx+C$ .

Why?
Before trying anything 'fancy' (subsitutuion, parts, trig sub, misc sub, partial fractions, et c.) try 'staightaway' antidifferentiation.

Do you know a finction whose derivative is ${csc}^{2} x$ $csc^2x$ ?

Go through the list:
$\frac{d}{d x} (sin x) = cos x$ $d/(dx)(sinx)=cosx$
$\frac{d}{d x} (cos x) = - sin x$ $d/(dx)(cosx)=-sinx$
$\frac{d}{d x} (tan x) = {sec}^{2} x$ $d/(dx)(tanx)=sec^2x$

Hang on! that's good! The derivative if a $c o$ $co$ function has a minus sign and cofunctions, so $\frac{d}{d x} (cot x) = - {csc}^{2} x$ $d/(dx)(cotx)=-csc^2x$

So, no, I don't know a function whose derivative is ${csc}^{2} x$ $csc^2x$ , but I do know one whose derivative is $- {csc}^{2} c$ $-csc^2c$ . But this reminds me that:

$\frac{d}{d x} (- cot x) = - (- {csc}^{2} x) = {csc}^{2} x$ $d/(dx)(-cotx)=-(-csc^2x)=csc^2x$

Therefore the antiderivative of ${csc}^{2} x$ $csc^2x$ is $- cot x + C$ $-cotx+C$

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What is the antiderivative of ${csc}^{2} x$ $csc^2x$ ?

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