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I've got this far but don't understand where the $2$ on the numerator comes from: $\dfrac{\sin a \cos b + \cos a \sin b}{\sin b \cos b}\overset{?}{=}\dfrac{\sin(a+b)}{\sin 2b}$

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    so do you times everything by 2? I don't really get it2012-01-15

2 Answers 2

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$\dfrac {\sin a}{\sin b}+\dfrac{\cos a}{\cos b}=\dfrac{\sin a\cdot\cos b+\cos a\cdot\sin b}{\sin b\cdot \cos b}$

After getting this far, you need to observe that, $\boxed{\sin 2b=2 \cdot\sin b \cdot \sin b}$, you'll have to multiply the numerator and denominator by $2$, you'll have the following, $\dfrac{2(\sin a\cdot\cos b+\cos a\cdot\sin b)}{2\cdot\sin b\cdot \cos b}=\dfrac{2\sin (a+b)}{\sin 2b}$

Hope this helps.

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    Will the downvoter explain?2012-03-21
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So far, you said you've got $\frac{\sin a\cos b+\cos a\sin b}{\sin b\cos b}.$ Since $2\sin b\cos b=\sin 2b$, Multiply by $\frac{2}{2}$ to get $\frac{2(\sin a\cos b+\cos a\sin b)}{2\sin b\cos b}=\frac{2\sin(a+b)}{\sin2b}.$