What is $\frac{cot 2 θ}{3}$ $(cot2theta)/3$ in terms of $tan θ$ $tantheta$ ?

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What is $\frac{cot 2 θ}{3}$ $(cot2theta)/3$ in terms of $tan θ$ $tantheta$ ?

1 Answer

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Answer 1 · 2018-05-12T01:56:35

$\frac{1 - {tan}^{2} t}{6 tan t}$ $(1 - tan^2 t)/(6tan t)$

Explanation:

Trig identity:
$tan 2 t = \frac{2 tan t}{1 - {tan}^{2} t}$ $tan 2t = (2tan t)/(1 - tan^2 t)$
Take the inverse -->
$cot 2 t = \frac{1}{tan 2 t} = \frac{1 - {tan}^{2} t}{2 tan t}$ $cot 2t = 1/(tan 2t) = (1 - tan^2 t)/(2tan t)$
$\frac{cot 2 t}{3} = \frac{1 - {tan}^{2} t}{6 tan t}$ $(cot 2t)/3 = (1 - tan^2 t)/(6tan t)$

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What is $\frac{cot 2 θ}{3}$ $(cot2theta)/3$ in terms of $tan θ$ $tantheta$ ?

1 Answer

Explanation:

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