What is the Value of $2\tan\frac{1}{2}A\tan\frac{1}{2}B$ in Triangle ABC?

Monoxdifly · Mar 4, 2021

Suppose the angles in triangle ABC is A, B, and C. If sin A + sin B = 2 sin C, the value of $\displaystyle 2tan\frac12Atan\frac12B$ is ...
A. $\displaystyle \frac83$
B. $\displaystyle \sqrt6$
C. $\displaystyle \frac73$
D. $\displaystyle \frac23$
E. $\displaystyle \frac13\sqrt3$

Since A, B, and C are the angles of triangle ABC, then C = 180° – (A + B)
sin A + sin B = 2 sin C
sin A + sin B = 2 sin(180° – (A + B))
sin A + sin B = 2 sin(A + B)
2 = $\displaystyle \frac{sinA+sinB}{sin(A+B)}$

$\displaystyle 2tan\frac12Atan\frac12B$
$\displaystyle \frac{sinA+sinB}{sin(A+B)}×tan\frac12Atan\frac12B$
What am I supposed to do after this?

skeeter · Mar 5, 2021

$\sin{A} + \sin{B} = 2\sin(A+B)$

$\sin{A} + \sin{B} = 2(\sin{A}\cos{B} + \cos{A}\sin{B}) \implies \cos{B} = \cos{A} = \dfrac{1}{2} \implies A = B = \dfrac{\pi}{3}$

$2\tan^2\left(\dfrac{\pi}{6}\right) = \dfrac{2}{3}$

Monoxdifly · Mar 5, 2021

Thank you.

What is the Value of \(2\tan\frac{1}{2}A\tan\frac{1}{2}B\) in Triangle ABC?

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