The function f(x)=log(1+ax)−log(1−bx)x is not defined at x-0

Question

The function

f (x) = \frac{l o g (1 + a x) - l o g (1 - b x)}{x}

is not defined at x-0 . The value which should be assigned to f at x = 0 so that it is continuos at x=0 , is

Options:

A . a-b

B . a+b

C . log a+log b

D . log a-log b

Answer: Option B
:
B
Since limit of a function is a + b as x

\to

0, therefore to be continuous at a function, its value must be
a + b at x = 0

\Rightarrow

f(0) = a + b.

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