Let `((e^(x)-1)^(2))/(sin((x)/(a))log(1+(x)/(4)))" for "x ne 0 and f(0)=12.` If f is continuous at x = 0, then the value of a is equal to

Let f : R rarr R be defined as f(x) = {{:((x^(3))/((1-cos 2x)^(2)) log_(e)((1+2x e^(-2x))/((1-x e^(-x))^(2))),",",x ne 0),(alpha,",", x =0):} . If f is continuous at x = 0, then alpha is equal to :

If f(x)={{:(,(sqrt(x+1)-1)/(sqrtx),"for "x ne 0),(,k, for x=0):} and f(x) is continuous at x=0, then the value of k 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

If f(x) = {{:((1-cosx )/(x) , x ne 0),( x , x=0):} is continuous at x =0 then the value of k is

If f(x)={((log(1+2ax)-log(1-bx))/(x)",", x ne 0),(k",", x =0):} is continuous at x = 0, then value of k is

If f(x) = (a sin x + sin 2x)/(x^(3)) ne 0 and f(x) is continuous at x =0 then

If f(x) =(e^(x)-1)^(4)/(sin(x^(2)/lambda^(2))log (1+x^(2)/2)), x ne 0 and f (0) = 8 be a continuous function then lambda =