In any triangle ABC, prove that a sin (B – C) + b sin (C – A) + c sin (A – B) = 0.
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Answered by
5
Answer:
In any triangle ABC,
a/sin A = b/sin B = c/sin C = k
a = k sin A, b = k sin B, c = k sin C
LHS
= a sin (B – C) + b sin (C – A) + c sin (A – B)
= k sin A [sin B cos C – cos B sin C] + k sin B [sin C cos A – cos C sin A] + k sin C [sin A cos B – cos A sin B]
= k sin A sin B cos C – k sin A cos B sin C + k sin B sin C cos A – k sin B cos C sin A + k sin C sin A cos B – k sin C cos A sin B
= 0
= RHS
Hence proved that a sin (B – C) + b sin (C – A) + c sin (A – B) = 0.
Hope it would help you
Answered by
1
Answer:
= RHS
Hence proved that a sin (B – C) + b sin (C – A) + c sin (A – B) = 0.
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