How do you use the angle sum or difference identity to find the exact value of $tan (\frac{7 π}{12})$ $tan((7pi)/12)$ ?

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How do you use the angle sum or difference identity to find the exact value of $tan (\frac{7 π}{12})$ $tan((7pi)/12)$ ?

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Answer 1 · 2016-08-18T05:13:58

$- (2 + \sqrt{3})$ $- (2 + sqrt3)$

Explanation:

$tan (\frac{7 π}{12}) = tan (\frac{π}{12} + π) = - tan (\frac{π}{12})$ $tan ((7pi)/12) = tan (pi/12 + pi) = - tan (pi/12)$
Call $tan (\frac{π}{12}) = tan t$ $tan (pi/12) = tan t$ --> $tan 2 t = tan (\frac{π}{6}) = \frac{1}{\sqrt{3}}$ $tan 2t = tan (pi/6) = 1/sqrt3$
Use trig identity:
$tan 2 a = \frac{2 tan a}{1 - {tan}^{2} a}$ $tan 2a = (2tan a)/(1 - tan^2 a)$
$\frac{1}{\sqrt{3}} = \frac{2 tan t}{1 - {tan}^{2} t}$ $1/sqrt3 = (2tan t)/(1 - tan^2 t)$
Cross multiply -->
$1 - {tan}^{2} t = 2 \sqrt{3} tan t$ $1 - tan^2 t = 2sqrt3tan t$
$- {tan}^{2} t - 2 \sqrt{3} tan t + 1 = 0 .$ $- tan^2 t - 2sqrt3tan t + 1 = 0.$
Solve this quadratic equation for tan t by the improved quadratic equation (Socratic Search)
$D = d^{2} = b^{2} - 4 a c = 12 + 4 = 16$ $D = d^2 = b^2 - 4ac = 12 + 4 = 16$ --> $d = \pm 4$ $d = +- 4$
There are 2 real roots:
$tan t = - \frac{b}{2 a} \pm \frac{d}{2 a} = \frac{- 2 \sqrt{3}}{- 2} \pm \frac{d}{2} = \sqrt{3} \pm 2$ $tan t = -b/(2a) +- d/(2a) = (-2sqrt3)/-2 +- d/2 = sqrt3 +- 2$ .
Since $\frac{π}{12}$ $pi/12$ is in Quadrant I, its tan is positive
$tan t = tan (\frac{π}{12}) = \sqrt{3} + 2$ $tan t = tan (pi/12) = sqrt3 + 2$
There for:
$tan (\frac{7 π}{12}) = - tan t = - (\sqrt{3} + 2)$ $tan ((7pi)/12) = - tan t = - (sqrt3 + 2)$

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How do you use the angle sum or difference identity to find the exact value of $tan (\frac{7 π}{12})$ $tan((7pi)/12)$ ?

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Explanation:

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How do you use the angle sum or difference identity to find the exact value of tan(7π12)tan((7pi)/12)?

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How do you use the angle sum or difference identity to find the exact value of $tan (\frac{7 π}{12})$ $tan((7pi)/12)$ ?