In a triangle $A B C, a^{3} c o s (B - C) + b^{3} c o s (C - A) + c^{3} c o s (A - B) =$

abc

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3abc

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a+b+c

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None of these

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Solution

The correct option is B
3abc

$a^{3} c o s (B - C) + b^{3} c o s (C - A) + c^{3} c o s (A - B) = k^{3} s i n^{3} A c o s (B - C) + k^{3} s i n^{3} B c o s (C - A) + k^{3} s i n^{3} C c o s (A - B) = \frac{1}{2} k^{3} [s i n^{2} A (s i n 2 B + s i n 2 C) + s i n^{2} B (s i n 2 C + s i n 2 A)] + s i n^{2} C (s i n 2 A + s i n 2 B) = k^{3} [s i n^{2} A (s i n B c o s B + s i n C c o s C) + s i n^{2} B (s i n C c o s C + s i n A c o s A) + s i n^{2} C (s i n A c o s A + s i n B c o s B)] = k^{3} [s i n A s i n B (s i n A c o s B + c o s A s i n B) + s i n B s i n C (s i n B c o s C + c o s B s i n C) + s i n C s i n A (s i n C c o s A + c o s C s i n A) = k^{3} [s i n A s i n B s i n C + s i n A s i n B s i n C + s i n A s i n B s i n C] = 3 k^{3} s i n A s i n B s i n C = 3 a b c$ .

Suggest Corrections

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