SOLUTION: Prove the identity:
[cos^4(x)-sin^4(x)]/[cos(x)+sin(x)] = cos(x)-sin(x)
Algebra.Com
Question 889588: Prove the identity:
[cos^4(x)-sin^4(x)]/[cos(x)+sin(x)] = cos(x)-sin(x)
Answer by Edwin McCravy(20056) (Show Source): You can put this solution on YOUR website!
Edwin
RELATED QUESTIONS
prove the identity
sin x/tan x + cos x/cot x = sin x cos... (answered by edjones)
Prove the identity:
[Sin^3(x)-cos^3(x)] / [sin(x)-cos(x)] =... (answered by dkppathak)
Prove the following identities:
sin^4 x - sin^2 x = cos^4 x - cos^2... (answered by Alan3354)
Verify the identity.
(cos(x) - cos(y))/(sin(x) + sin(y)) + (sin(x) - sin(y))/(cos(x) + (answered by solver91311)
Prove the identity.... (answered by Alan3354)
prove identity
sin x tan x + cos x = sec... (answered by Edwin McCravy)
Prove the following identity:... (answered by Edwin McCravy)
Prove the following identity.
(sin x * tan x + cos x)/ (cos x) = sec^2... (answered by robertb)
prove this identity
1+ sin x/ cos x +cos x/ 1 + sin x =... (answered by ikleyn)