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The least integral value of f(x)=((x-1...

The least integral value of
`f(x)=((x-1)^(7)+3(x-1)^(6)+(x-1)^(5)+1)/(x-1)^(5)`, `AAx gt 1` is

A

`8`

B

`6`

C

`12`

D

`18`

Text Solution

Verified by Experts

The correct Answer is:
B
`(b)` `f(x)=(x-1)^(2)+3(x-1)+1+(x-1)^(-5)`
Consider `x-1=a gt 0` (as `x gt 1`)
`:.` We have `a^(2)+3a+1+a^(-5)`
Consider quantities `a^(2),a,a,a,1,a^(-5)`
Using `A.M. ge G.M.` , we have
`(a^(2)+a+a+a+1+a^(-5))/(6) ge 1`
`impliesa^(2)+3a+1+a^(-5) ge 6`
`impliesf(x) ge 6 AA x gt 1`
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