How do you find the integral of $int 1/(1 + csc(x))$ ?

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How do you find the integral of $int 1/(1 + csc(x))$ ?

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Answer 1 · 2015-09-18T18:40:27

$x+secx-tanx+c$

Explanation:

$int1/(1+cscx)dx=intsinx/(1+sinx)dx=int(sinx-sin^2x)/(cos^2x)dx$
= $inttanxsecxdx-inttan^2xdx$
= $inttanxsecxdx-int (sec^2x-1)dx$
= $secx-(tanx-x)+c$
= $x+secx-tanx+c$

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How do you find the integral of $int 1/(1 + csc(x))$ ?

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How do you find the integral of $int 1/(1 + csc(x))$ ?