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Question
If `f(x) = log (1 + x) + 1/(1 + x)`, show that f(x) attains its minimum value at x = 0.
Sum
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Solution
Given, `f(x) = log (1 + x) + 1/(1 + x)` ...(i)
Differentiate w.r.t. x
f'(x) = `1/(1 + x) - 1/(1 + x)^2`
⇒ f'(x) = `(1 + x - 1)/(1 + x)^2`
⇒ f'(x) = `x/(1 + x)^2` ...(ii)
Take, f'(x) = 0
Now, `x/(1 + x)^2 = 0`
⇒ x = 0
Now, again differentiate w.r.t. x equation (ii)
f"(x) = `((1 + x)^2 d/dx x - x d/dx (1 + x)^2)/(1 + x)^4`
= `((1 + x)^2 - x xx 2(1 + x))/(1 + x)^4`
At x = 0
f"(0) = `(1 - 0)/1`
f"(0) = 1
f"(0) = 1 > 0
So, f(x) has a minimum value at x = 0.
Hence Proved.
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