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Get access to the detailed solutions to the previous years questions asked in IIFT exam

Explanation: It has been given that the terms a, b and c are in harmonic progression.

Therefore, 1/b – 1/a = 1/c – 1/b

2 1 1

b = a + c

2 a + c

b = ac

2ac

b = (a + c) . . . . . (1)

The given expression is log (a + c) + log (a – 2b + c)

log (a + c) + log (a-2b+c) = log ((a + c) (a – ab + c))

Substituting (1), we get,

Log (a + c) + log (a-2b+c) = log ((a + c) (a- (a + c) 4ac + c))

= log (a² + ac – 4ac + c² + ac)

= log (a² + c² – 2ac)

= log (c – a)² [since c is greater than a]

= 2 log (c – a)

Therefore, option C is the right answer.

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