SOLUTION: Prove that √cosec𝜃−1 cosec𝜃+1
=
cot𝜃sin𝜃 (1+sin𝜃)
.
Algebra.Com
Question 1163479: Prove that √cosec𝜃−1 cosec𝜃+1
=
cot𝜃sin𝜃 (1+sin𝜃)
.
Answer by Alan3354(69443) (Show Source): You can put this solution on YOUR website!
Prove that √cosec𝜃−1 cosec𝜃+1 = cot𝜃sin𝜃 (1+sin𝜃)
---------------
Not clear.
What terms are under the radical?
RELATED QUESTIONS
PROVE THAT:
sinx.cosx=-1
(answered by Edwin McCravy,Alan3354)
prove that... (answered by ikleyn)
Prove that... (answered by Edwin McCravy)
prove that... (answered by robertb)
Prove that (1/∞) =... (answered by HEY654321)
prove that... (answered by math_helper)
Prove... (answered by Alan3354)
prove that Cr + Cr+1=Cr+1 (answered by ikleyn)
prove that 1/logxy basex+1/logxy basey=1
(answered by robertb)
Prove that: (1 - cosq)/(1 + cosq) = 2cotq(cotq - cosecq) +... (answered by mananth)