" Find the value of "k_(1)" so that the function "f(x)" defined by "f(x)={[(e^(2)tx)/(F^(2)),x!=0],[1,x=0]" moy be continuous ot "x=0

Find the values of 'a' so that the function f(x) defined by f(x)={(s in^(2)ax)/(x^(2)),quad x!=0quad 1,quad x=0 may be continuous at x=0

Find the value of a, so that the function f(x) is defined by f(x)={{:((sin^(2)"ax")/(x^(2))", "x!=0),("1, "x=0):} may be continuous at x=0.

Find the values of a so that the function f defined by f(X) = {:{((sin^2ax)/x^2, x ne 0),(1, x = 0):} may be continuous at x = 0.

Find the values of ' a ' so that the function f(x) defined by f(x)={(sin^2a x)/(x^2),\ \ \ x!=0\ \ \ 1,\ \ \ \ \ \ \ \ \ x=0 may be continuous at x=0 .

Find the value of a such that the function f defined by f(x)={((sinax)/(sinx) if xne0),(1/a if x=0):} is continuous at x=0.

Find the value of k so that the function f defined below is continuous at x=0 f(x)={[(sin2x)/(5x)",",x!=0],[k",",x=0]:}

If the function defined by f(x) = {((sin3x)/(2x),; x!=0), (k+1,;x=0):} is continuous at x = 0, then k is

Find the value of a such that the function f defined by f(x)={{:((sinax)/(sinx), "if", x ne 0),((1)/(a), "if", x=0):} is continuous at x=0

if the function f(x) defined by f(x)=(log(1+ax)-log(1-bx))/(x), if x!=0 and k if x=0 is continuous at x=0, find k