Determine `f(0)` so that the function `f(x)` defined by `f(x)=((4^x-1)^3)/(sinx/4log(1+(x^2)/3))` becomes continuous at `x=0`

Determine f(0) so that the function f(x) defined by f(x)=((4^(x)-1)^(3))/(sin(x)/(4)log(1+(x^(2))/(3))) becomes continuous at x=0

Determine f(0) so that the function f(x) defined by f(x)=((4^(x)-1)^(3))/("sin "(x)/(4)"log"(1+(x^(2))/(3))) becomes continuous at x=0 .

If the function f(x) defined by f(x)=(log(1+3x)-log(1-2x))/(x),x!=0 and k

Find the value of f(0) so that the function f(x)=1/24 (4^x-1)^3/(sin (x/4) log (1+x^2/3)(log 2)^3), x ne 0 is continuous in R is .

The value of f(0) so that f(x)=((4^(x)-1)^(3))/(sin(x//4)log(1+x^(2)//3)) is continuous everywhere is

The value of a for which the function f(x)=f(x)={((4^x-1)hat3)/(sin(x a)log{(1+x^2 3)}),x!=0 12(log4)^3,x=0 may be continuous at x=0 is 1 (b) 2 (c) 3 (d) none of these

The value of a for which the function f(x)=f(x)={((4^x-1)hat3)/(sin(x a)log{(1+x^2 3)}),x!=0 12(log4)^3,x=0 may be continuous at x=0 is 1 (b) 2 (c) 3 (d) none of these

The value of f(0) so that the function : f(x) = (sqrt(1 + x) - (1+x)^(1//3))/(x) becomes continuous, is equal to :