Integral of csc(x) csc (x) Ask Question Asked 12 years, 10 months ago Modified 5 years, 11 months ago

May 23, 2015 · How do I go about solving the integral of csc x? Ask Question Asked 10 years, 7 months ago Modified 10 years, 7 months ago

Jun 8, 2020 · I found these step which explain how to integrate $\csc^3 {x} \ dx$. I understand everything, except the step I highlighted below. How did we go from: $$\int\frac {\csc^2 x - \csc …

Dec 25, 2017 · According to the standard integral results, it is known that ∫csc2 xdx = − cot x ∫ csc 2 x d x = cot x since d dxcot x = −csc2 x d d x cot x = csc 2 x. However, supposing that this is …

Nov 18, 2012 · 4 According to my sheet of standard integrals, $\int \csc^2x \, dx = -\cot x + C$. I am interested in a proof for the integral of $\operatorname {cosec}^2x$ that does not require …

Apr 26, 2018 · I remember a while back someone showed me how to derive the $\\int \\csc xdx$ by differentiating another term. The derivative would contain a $\\csc x$ which could be made …

This implies the integral is $$ \int\cot x\csc^2x\,dx=\int-u\,du=-\frac {1} {2}u^2+c=-\frac {1} {2}\cot^2x+c $$ On the other hand, rewriting the integral as $$ \int\frac {\cos x} …

Apr 9, 2024 · 2 As the title may suggest, I come today with a question regarding a (seemingly) simple trigonometric integral, that being ∫csc2(x)cot(x)dx ∫ csc 2 (x) cot (x) d x I encountered …

Nov 3, 2020 · What I have now is simply to convert $\csc^ {5}x$ to $\sin^ {-5}x$ and substitute $n = -5$ in the reduction formula. However, I found that the last integral will simply go into loops …

Sep 8, 2014 · Still, when looking at the results, − ln| csc x + cot x| + C ln | csc x + cot x | + C and ln| csc x − cot x| + C ln | csc x cot x | + C , I don't see how these are algebraically equivalent. …