How do you factor and simplify tan^2x-cot^2x?

1 Answer
Nghi N
Nov 29, 2016

-(4(sin x - cos x)(sin x + cos x))/(sin^2 2x) or
-4cot 2x.csc 2x

Explanation:

tan^2 x - cot^2 x = sin^2 x/(cos^2 x) - cos^2 x/(sin^2 x) =
= (sin^4 x - cos^4 x)/(sin^2 x.cos ^2 x)=
Since:
(a) = (sin^4 x - cos^4 x) = (sin ^2 x - cos^2 x)(sin^2 x + cos^2 x) =
= (sin x - cos x)(sin x + cos x) , and
(b) = sin^2 x.cos^2 x = (1/4)sin^2 2x,
There for:
tan^2 x - cot^2 x = ((a))/((b)) = (4(sin x - cos x)(sin x + cos x))/(sin^2 2x)

There is another answer for simplification:
Since (sin^2 x - cos^2 x) = - cos 2x, then,
((a))/((b)) = - (4cos 2x)/(sin^2 2x) = - (4 cot 2x)(1/(sin 2x)) =
- 4cot 2x.csc 2x #

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