Math, asked by GeniuSk101, 1 year ago

tanA/1-cotA + cotA/1-tanA = secA cosecA + 1

Answers

Answered by iHelper

Hello!

$\bf{L.H.S.}$ = $\dfrac{\sf tanA}{\sf 1 - cotA} + \dfrac{\sf cot}{\sf 1 - tanA}$

⇒ $\dfrac{\sf tanA}{\sf 1 - \dfrac{\sf 1}{\sf tanA}} + \dfrac{\sf 1}{\sf tanA(1 - tanA)}$

⇒ $\dfrac{\sf tan^{2}A}{\sf tanA - 1} + \dfrac{\sf 1}{\sf tanA(1 - tanA)}$

⇒ $\dfrac{\sf 1 - tan^{3}}{\sf tanA(1 - tanA)}$

⇒ $\dfrac{\sf (1 - tanA)(1 + tanA + tan^{2}A)}{\sf tanA(1 - tanA)}$

⇒ $\dfrac{\sf sec^{2}A + tanA}{\sf tanA}$

⇒ $\dfrac{\sf cosA}{\sf sinA.cos^{2}A} + \sf 1$

⇒ $\dfrac{\sf 1}{\sf sinA.cosA} + \sf 1$ ⇒ $\dfrac{\sf 1}{\sf sinA}.\dfrac{\sf 1}{\sf cosA} + \sf 1$

⇒ $\sf cosecA.secA + \sf 1$ = $\bf{R.H.S.}$

$\boxed{\sf HENCE\: PROVED}$

Cheers!

Answered by nosumittiwari3

Hey dear (^_-)

Ur answer in this pic...

Hope its help uh

Attachments:

GeniuSk101: The picture is somewhat not Clear.. can uhh repost it ????

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