[" - "f(x)=int((4^(x)-1)^(3))/(sin((x)/(p))log(1+(x^(2))/(3)))],[qquad [12(log4)^(3),x=0]]

lim_(x rarr0)((4^(x)-1)^(3))/(sin((x)/(p))ln(1+(x^(2))/(3))) is equal to

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

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=

Find the value of p for which the fucntion f(x) = ((4^(x) -1)^(3))/(sin ((x)/(p)) log_(e)(1 + (x^(2))/(3))), x ne 0 " and " f(0) = 12 (log4)^(3) , is continuous at x = 0 .

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

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