Question #4c761

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Question #4c761

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Answer 1 · 2017-04-04T04:08:08

$LHS=2tanxcsc2x-tan^2x$

$=(2tanx)1/(sin2x)-tan^2x$

$=(2tanx)1/((2tanx)/(1+tan^2x))-tan^2x$

$=((2tanx)(1+tan^2x))/(2tanx)-tan^2x$

$=1+tan^2x-tan^2x=1=RHS$

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Answer 2 · 2017-04-04T04:08:59

Use the following identities:

$•tanx = sinx/cosx$
$•cscx = 1/sinx$
$•sin2x = 2sinxcosx$
$•cos^2x + sin^2x = 1$

Using these identities gradually, we have

$2(sinx/cosx)(1/sin(2x)) - sin^2x/cos^2x = 1$

$2(sinx/cosx)(1/(2sinxcosx)) - sin^2x/cos^2x= 1$

$1/cos^2x- sin^2x/cos^2x = 1$

$(1 - sin^2x)/cos^2x= 1$

$cos^2x/cos^2x = 1$

$1 = 1$

This is obviously true, so the identity has been proved.

Hopefully this helps!

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Question #4c761

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