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Question

If x,y,z are positive numbers, then the minimum value of (x+y)(y+z)(z+x)(1x+1y)(1y+1z)(1z+1x) is

A
32
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B
64
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C
128
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D
356
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Solution

The correct option is B 64
Using the relation, A.M.H.M., we get
x+y221x+1y(x+y)(1x+1y)4(1)
Similarly,
(y+z)(1y+1z)4(2)
(z+x)(1z+1x)4(3)

From equation (1),(2) and (3),
(x+y)(y+z)(z+x)(1x+1y)(1y+1z)(1z+1x)64

Hence, the minimum value of the given expression is 64.

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