Simplifying Trig Identity

80 Views Asked by Bumbble Comm At 15 May 2026 - 10:20

I have an equation I have been given to solve, I know how to start but I do not know what to do after I use the Trig Identities. Any help?

Here is what I was given $$ \frac{\cos(A + B) + \cos(A - B)}{\sin A \sin B} $$ I got to this step $$ \frac{\cos A\cos B-\sin A\sin B + \cos A\cos B+\sin A\sin B}{\sin A\sin B} $$ What do I do next to simplify?

Original Q&A

There are 1 best solutions below

Bumbble Comm On 16 Apr 2014 - 6:22 BEST ANSWER

\begin{align} \cos(A+B) + \cos(A-B) & = \cos(A) \cos(B) - \sin(A) \sin(B) + \cos(A) \cos(B) + \sin(A) \sin(B)\\ & = 2 \cos(A) \cos(B) \end{align} Hence, $$\dfrac{\cos(A+B) + \cos(A-B)}{\sin(A) \sin(B)} = 2 \cot(A) \cot(B)$$

Simplifying Trig Identity

There are 1 best solutions below

Related Questions in TRIGONOMETRY

Trending Questions

Popular # Hahtags

Popular Questions