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Help help Prove the following: \sf( \tan( \theta) )/(1 - \cot( \theta) ) + ( \cot( \theta) )/( 1 - \tan( \theta) ) = \sec( \theta) \cdot \: \csc( \theta) + 1 \text{note: explanation is obvious}​
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Prove the following:

\sf( \tan( \theta) )/(1 - \cot( \theta) ) + ( \cot( \theta) )/( 1 - \tan( \theta) ) = \sec( \theta) \cdot \: \csc( \theta) + 1

\text{note: explanation is obvious}

User Ben Kelly
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2 Answers

6 votes

Answer:

the pictures are attached

please see the explanation in the attached picture

Help help Prove the following: \sf( \tan( \theta) )/(1 - \cot( \theta) ) + ( \cot-example-1
Help help Prove the following: \sf( \tan( \theta) )/(1 - \cot( \theta) ) + ( \cot-example-2
User Nicoolasens
by
4.4k points
2 votes

Answer:

note:
\theta =y

Your answer is in the attachment.

we have

siny(cosy-siny)

taking - common from this

-siny(-cosy+siny)

-sin y(siny-cosy)

Help help Prove the following: \sf( \tan( \theta) )/(1 - \cot( \theta) ) + ( \cot-example-1
Help help Prove the following: \sf( \tan( \theta) )/(1 - \cot( \theta) ) + ( \cot-example-2
User ScottGuymer
by
4.2k points
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