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Falguni Pranay Shankar
Asked: 2022-11-10T05:07:17+05:30 In:

If `a f(x+1)+b f(1/(x+1))=x,x !=-1,a != b,`then `f(2)` is equal to
A. `(2a+b)/(2(a^(2)-b^(2)))`
B. `(a)/(a^(2)-b^(2))`
C. `(a+2b)/(a^(2)-b^(2))`
D. none of these

If `a f(x+1)+b f(1/(x+1))=x,x !=-1,a != b,`then `f(2)` is equal to
A. `(2a+b)/(2(a^(2)-b^(2)))`
B. `(a)/(a^(2)-b^(2))`
C. `(a+2b)/(a^(2)-b^(2))`
D. none of these
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  1. Correct Answer – A
    `af(x+1)+bf((1)/(x+1))=(x+1)-1 ” (1)” `
    Replacing `x+1″ by ” (1)/(x+1),` we get
    `af((1)/(x+1))+bf(x+1)=(1)/(x+1)-1 ” (2)” `
    `Eq. (1)xx a-Eq.(2) xx b`
    `implies (a^(2)-b^(2))f(x+1)=a(x+1)-a-(b)/(x+1)+b`
    Putting `x=1, (a^(2)-b^(2))f(2)=2a-a-(b)/(2)+b=a+(b)/(2)=(2a+b)/(2)`

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