Math, asked by sumanth2201, 6 months ago

tan(π/4+theta)*tan(3π/4+theta)

Answers

Answered by Anonymous
2

\tan = ( \frac{ \pi}{4} + a) \times \tan( \frac{3 \pi + A}{4} )

using \: tangent \: sum \: of \: angle \: formula \ratio -

tan(A+B) = \frac{ \tan A+ \tan B}{1 - \tan A \times \tan B }

in \: conjuction \: with \ratio

\tan( \frac{ \tan \pi }{4} ) = 1 \: and \: \tan( \frac{ \tan 3\pi }{4} ) = - 1

now

\tan( \frac{\pi}{4} + A) \times \tan( \frac{3 \pi }{4} + A)

= \frac{ \tan (\frac{ \pi }{4} ) + \tan A}{1 - \tan( \frac{ \pi }{4}) \times \tan A }

= > \frac{ \tan (\frac{3 \pi }{4} ) + \tan A}{1 - \tan( \frac{ 3\pi }{4}) \times \tan A }

= \frac{1 + \tan A }{1 - \tan A} \times \frac{ - 1 + \tan A }{1 + \tan A}

= \frac{ - 1 + \tan A }{1 - \tan A} \times \frac{ 1 - \tan A }{1 + \tan A}

\boxed{= - 1}

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