If sinα + sinβ = a and cosα − cosβ = b, Find tan((α − β)/2)

If \( \sin\alpha+\sin\beta=a \) and \( \cos\alpha-\cos\beta=b \), Find \( \tan\frac{\alpha-\beta}{2} \)

Question

\[ \sin\alpha+\sin\beta=a \]

and

\[ \cos\alpha-\cos\beta=b, \]

then find

\[ \tan\frac{\alpha-\beta}{2} \]

(a) \(-\frac{a}{b}\)
(b) \(-\frac{b}{a}\)
(c) \(\sqrt{a^2+b^2}\)
(d) none of these

Using the sum-to-product identities,

\[ \sin\alpha+\sin\beta = 2\sin\frac{\alpha+\beta}{2} \cos\frac{\alpha-\beta}{2} \]

Therefore,

\[ a = 2\sin\frac{\alpha+\beta}{2} \cos\frac{\alpha-\beta}{2} \]

Also,

\[ \cos\alpha-\cos\beta = -2\sin\frac{\alpha+\beta}{2} \sin\frac{\alpha-\beta}{2} \]

Hence,

\[ b = -2\sin\frac{\alpha+\beta}{2} \sin\frac{\alpha-\beta}{2} \]

Dividing the second equation by the first,

\[ \frac{b}{a} = \frac{-2\sin\frac{\alpha+\beta}{2}\sin\frac{\alpha-\beta}{2}} {2\sin\frac{\alpha+\beta}{2}\cos\frac{\alpha-\beta}{2}} \]

\[ = -\tan\frac{\alpha-\beta}{2} \]

Therefore,

\[ \tan\frac{\alpha-\beta}{2} = -\frac{b}{a} \]

\[ \boxed{\tan\frac{\alpha-\beta}{2}=-\frac{b}{a}} \]

Hence, the correct option is (b) \(-\frac{b}{a}\).

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