If tan-1-tan-1- k - then k -

LHS = tan θ/sec θ 1 tan θ/sec θ + 1 = tan θ (sec θ + 1) tan θ (sec θ 1) /sec^2 θ 1 = tan θ sec θ + tan θ tan θ sec θ tan θ/sec^2 θ 1 = 2 tan ...

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Trigonometric Identity- 2

If tanθ/θ-1-t...

Question

If $\frac{t a n θ}{s e c θ - 1}$ - $\frac{t a n θ}{s e c θ + 1}$ = k cot $θ$ , then k =

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\frac{sec θ + 1 - tan θ}{sec θ + 1 + tan θ} + \frac{tan θ + sec θ - 1}{tan θ - sec θ + 1} = 2 sec θ

\frac{tan θ}{1 - cot θ} + \frac{cot θ}{1 - tan θ} = 1 + tan θ + cot θ

\frac{tan θ}{sec θ - 1} = \frac{tan θ + sec θ + 1}{tan θ + sec θ - 1}

If ( $s e c θ$ - $t a n θ$ ) = $\frac{1}{3}$ , then value of ( $s e c θ$ + $t a n θ$ ) is:

\frac{tan θ}{1 - cot θ} + \frac{cot θ}{1 - tan θ} = 1 + tan θ + cot θ

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