Question

Please Please Please help.

Answer 1

\[\frac{ 1 }{ 1+\sin \Theta } + \frac{ 1 }{ 1-\sin \Theta } \]

Answer 2

@msm104 what do u want to determine in this problem?

Answer 3

\[A. 2 \cos^2 \Theta
B. 2 sex^2 \Theta
C. 2 c2c^2 \Theta
D. 2 \cot^2 \Theta\]

Answer 4

b should be sec not sex lol

Answer 5

simplify the trigonometric expression.

Answer 6

\[
{1\over1+\sin\theta}+{1\over 1-\sin\theta}=\frac{(1-\cancel{\sin\theta})+(1+\cancel{\sin\theta})}{(1+\sin\theta)(1-\sin\theta)}\\
\qquad={2\over1-\sin^2\theta}\\
\qquad\Large{={2\over\cos^2\theta}=2\sec^2\theta}
\]

Answer 7

Thank you very much! that helped a lot! :)

Answer 8

@electrokid r we allowed to provide solutions directly?

Answer 9

@niksva No. we cannot provide just the answer. I provided the steps.

Answer 10

@electrokid
but i think u need the involvement of the person too who is asking the ques
we cannot directly provide the steps too.