For a suitably chosen real constant a, let a function, f: R − {−a} → R be defined by f(x) = (a-x)/(a+x). Further suppose that for any real number x ≠ −a and f(x) ≠ −a, (f ? f)(x) = x. Then f(-1/3) is equal to:

Option 1 - 1/3

Option 2 - -1/3

Option 3 - -3

Option 4 - 3

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Raj Pandey | Contributor-Level 9

5 months ago

Correct Option - 4

Detailed Solution:

f (f (x) = (a-f (x)/ (a+f (x) = x
Let f (x) = y. (a-y)/ (a+y) = x ⇒ a-y = ax + xy ⇒ a (1-x) = y (1+x) ⇒ y = a (1-x)/ (1+x)
⇒ f (x) = a (1-x)/ (1+x)
From the given options, we infer that comparing the derived f (x) leads to a=1.
⇒ a = 1
So f (x) = (1-x)/ (1+x)
f (-1/2) = (1 - (-1/2)/ (1 + (-1/2) = (3/2)/ (

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