Prove these two 1.) Sin x / 1-cos x + sin x / 1+ cos x = 2 csc x 2.) - tan2x + sec2x = 1

asked Sep 21, 2019 169k views

3 votes

Prove these two

1.) Sin x / 1-cos x + sin x / 1+ cos x = 2 csc x

2.) - tan2x + sec2x = 1

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6 votes

For the first one, we have

$\frac1{1-\cos x}+\frac1{1+\cos x}=(1+\cos x)/((1-\cos x)(1+\cos x))+(1-\cos x)/((1-\cos x)(1+\cos x))$

$=(1+\cos x+1-\cos x)/(1-\cos^2x)$

$=\frac2{\sin^2x}$

Multiply this by
$\sin x$ and you end up with

$=(2\sin x)/(\sin^2x)=\frac2{\sin x}=2\csc x$

For the second one,

$-\tan^2x+\sec^2x=-(\sin^2x)/(\cos^2x)+\frac1{\cos^2x}=(1-\sin^2x)/(\cos^2x)=(\cos^2x)/(\cos^2x)=1$

Lloyd Dominic answered Sep 27, 2019

4.8k points

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