2 Answers

Ask a Question

Nick Borodulin · Answer 1 · 2023-12-11T19:26:45+0000

we have the expression

Rewrite the given expression

Remember that

sin(-x)=-sin(x)

$((1)/(cosx)(cos^2x)/(sin^2x)-cosx)/(-sinx(cos^(2)x)/(s\imaginaryI n^(2)x))$

Simplify the expression

$\begin{gathered} ((cosx)/(s\imaginaryI n^2x)-cosx)/(-(cos^2x)/(s\imaginaryI nx)) \\ \\ ((cosx-sin^2xcosx)/(sin^2x))/(-(cos^2x)/(sinx)) \\ \\ (cosx-s\imaginaryI n^(2)xcosx)/(s\imaginaryI n^(2)x)\colon-(cos^(2)x)/(s\imaginaryI nx) \\ \\ (sinx(cosx-sin^2xcosx))/(sin^2x(cos^2x)) \\ \\ ((cosx-sin^2xcosx))/(sin^x(cos^2x)) \\ \\ (cosx(1-s\imaginaryI n^2))/(s\imaginaryI nx(cos^2x)) \\ \\ ((1-s\imaginaryI n^2))/(s\imaginaryI nx(cosx)) \\ \\ (cos^2x)/(s\imaginaryI nx(cosx)) \\ \\ (cosx)/(sinx) \\ \\ cotx \end{gathered}$

therefore

The answer is

0 Comments

Please log in or register to add a comment.

Please log in or register to answer this question.

2 Answers

0 Comments

Please log in or register to add a comment.

yes, the expression is equivalent to cot(x)

0 Comments

Please log in or register to add a comment.

Other Questions