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Question

For a triangle ABC it is given that cos A+cos B+cos C=32 Prove that the triangle is equilateral

A
True
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B
False
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Solution

The correct option is A True
Let 'a', ‘b’ and ‘c’ be the sides of the triangle ABC.
It is given that cos A+cos B+cos C=32
Hence, (b2+c2a2)2bc+(a2+c2b2)2ac+(b2+b2c2)2ab=32
Simplifying this we get.
ab2+ac2a3+ba2+bc2b3+ca2+cb2c3=3abc
Hence, a(bc)2+b(ca)2+c(ab)2=(a+b+c)2[(ab)2+(bc)2+(ca)2]
This gives
(a+bc)(ab)2+(b+ca)(bc)2+(c+ab)(ca)2=0
(since we know that (a+bc)>0,(b+ca)>0,(c+ab)>0)
On the left hand side, we have coefficient multiplied by the square of a number. Moreover, each coefficient is positive and hence for the sum to be zero, each term separately must be equal to zero. This means we must have
(a+bc)(ab)2=0=(b+ca)(bc)2=(c+ab)(ca)2
This implies a = b = c
This implies that the triangle is equilateral.

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