1 Answer

Sheana · Answer 1 · 2019-12-24T12:57:27+0000

Recall the angle sum identities:

$\sin(x+y)=\sin x\cos y+\cos x\sin y$

$\cos(x+y)=\cos x\cos y-\sin x\sin y$

Now,

$\tan(x+y)=(\sin(x+y))/(\cos(x+y))=(\sin x\cos y+\cos x\sin y)/(\cos x\cos y-\sin x\sin y)$

Divide through numerator and denominator by
$\cos x\cos y$ to get

$\tan(x+y)=(\tan x+\tan y)/(1-\tan x\tan y)$

Next, we use the fact that
x,y lie in the first quadrant to determine that

$\sin x=\frac12\implies\cos x=√(1-\sin^2x)=\frac{\sqrt3}2$

$\cos y=\frac{\sqrt2}2\implies\sin x=√(1-\cos^2x)=\frac1{\sqrt2}$

So we then have

$\tan x=(\sin x)/(\cos x)=\frac{\frac12}{\frac{\sqrt3}2}=\frac1{\sqrt3}$

$\tan y=(\sin y)/(\cos y)=\frac{\frac1{\sqrt2}}{\frac{\sqrt2}2}=1$

Finally,

$\tan(x+y)=\frac{\frac1{\sqrt3}+1}{1-\frac1{\sqrt3}}=(1+\sqrt3)/(\sqrt3-1)=2+\sqrt3\approx3.73$

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