If f(x)=`((2^(2)-1)^(3))/(sin((x)/(n))log(1+(x^(4))/(y)))` is continuous at x=0 and f(0)=`(6log2)^(3)` (A) 1 (B) 2 (C) 3 (D) 4

If f(x)=((2^(x)-1)^(3))/(sin((x)/(p))log(1+(x^(2))/(3))) is continuous at x=0 and f(0)=6(log2)^(3) then p= (A) 1 (B) 2 (C) 3 (D) 4

If f(x)=((4^(x)-1)^(3))/(sin((x)/(p))log(1+(x^(2))/(3))) is cont. at x=0 and f(0)=(6log2)^(3) then p=

f(x)=((4^(x)-1)^(3))/(sin((x)/(p))log(1+(x^(2))/(3))) is continuous at x=0 and f(0)=12(ln4)^(3) then p=

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)=((4^(sin x)-1)^(2))/(x*log(1+2x)) , for x!=0 is continuous at x=0 , find f(0) .

f(x)=x[3-log((sin x)/(x))]-2 to be continuous at x=0 ,then f(0)= 1) 0 2) 2 3) -2 4) 3

If f(x) f(x) = (log{(1+x)^(1+x)}-x)/(x^(2)), x != 0 , is continuous at x = 0 , then : f(0) =

The function f(x)=((3^(x)-1)^(2))/(sin x*ln(1+x)),x!=0, is continuous at x=0, Then the value of f(0) is

If f(x)={{:(((5^(x)-1)^(3))/(sin((x)/(a))log(1+(x^(2))/(3)))",",x ne0),(9(log_(e)5)^(3)",",x=0):} is continuous at x=0 , then value of 'a' equals