(B) Given $A + B + C = 270^o.$Let us assume $A = B = C = 90^o$ to satisfy the condition.Then,the expression becomes:$\cos 2A + \cos 2B + \cos 2C + 4\s

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(B) Given $A + B + C = 270^o.$Let us assume $A = B = C = 90^o$ to satisfy the condition.Then,the expression becomes:$\cos 2A + \cos 2B + \cos 2C + 4\sin A \sin B \sin C$$= \cos 180^o + \cos 180^o + \cos 180^o + 4\sin 90^o \sin 90^o \sin 90^o$$= (-1) + (-1) + (-1) + 4(1)(1)(1)$$= -3 + 4 = 1.$

Competitive Quantitative Aptitude Trigonometry Trigonometry

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If $A + B + C = 270^o,$ then $\cos 2A + \cos 2B + \cos 2C + 4\sin A \sin B \sin C = $

A
$0$
B
$1$
C
$2$
D
$3$

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If $A + B + C = 270^o,$ then $\cos 2A + \cos 2B + \cos 2C + 4\sin A \sin B \sin C = $

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