Given, f(x)`=(log(1+x^(2) tanx))/(sin x^(3))`, when `x ne 0`. Find the assigned value of f(0), if f(x) is to be continuous at x=0.

Define the continuity of a function at a point within its domain of definition. The definition of a function is given below: f(x)={{:((1-cos5x)/(x^(2))," when "(xne0)),(k," when x = 0"):} Find the value of k for which f(x) is continuous at x = 0.

The function f(x)=(1)/(x)[log(1+5x)-log(1+3x)] is undefined at x = 0 . What value must be assigned to f (0) if f (x) is to be continuous at x = 0 .

The funtion f(x)=(log(1+ax)-log(1-bx))/x is not define at x=0. Find the value of f(0),so that f(x)is continuous at x=0.

Let f(x)={(log(1+x)^(1+x)-x)/(x^2)}dot Then find the value of f(0) so that the function f is continuous at x=0.

Find the value of f (0) for which f(x)=(64(sqrt(x+4)-2))/(sin2x) continuous .

If f(x) = (sin 5x)/(2x) (when x!=0 ) = (5k)/4 (when x= 0), and f(x) is continuous at x=0, find k.

f(x)=(1)/(x)["log"(1+bx)-"log"(1-ax)] is not defined at x=0 . What value is to be assigned to f (0) so that f (x) will be continuous at x=0?

Find the value of f(0) so that the function. f(x)=(sqrt(1+x)-1+x3)/x becomes continuous at x=0

Let f (x+(1)/(x))= x^(2) +(1)/(x^(2)) , x ne 0, then the value of f (x) is-

If f(x)=x sqrt(x^(2)+a^(2))+a^(2) log(x+sqrt(x^(2)+a^(2))) , then find the value of f'(0) .