If the f(x)`=(log(1+ax)-log(1-bx))/x`,
`xne0` is continuous at x = 0 then, f(0) = .....

f(x)={(log(1+2ax)-log(1-bx))/(x),x!=0x=0

Value of f(0) so that f(x) = (log(1+bx)-log(1-ax))/x is continuous at x = 0 is

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

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

For the function f(x)=(log_(e)(1+x)+log_(e)(1-x))/(x) to be continuous at x = 0, the value of f(0) is

For the function f(x) = (log_(e )(1+x)-log_(e )(1-x))/(x) to be continuous at x = 0, the value of f(0) should be

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