If `f(x)=(sin3x+Asin2x+Bsinx)/(x^(5))` for`x!=0` is continuous at `x=0`, then `A+B+f(0)` is

if f(x)=(4+sin2x+A sin x+B cos x)/(x^(2)) for x!=0 is continuous at x=0 then A+B+f(0) is

If f(x) = (Sin 3x + A sin 2x + B sinx)/x^5 for x != 0is continuous at x = 0. Find A,B and f(0).

f(x)=(x tan2x)/(sin3x*sin5x) for x!=0 is continuous at x=0 then f(0)

If f(x)=(sin2x+A sin x+B cos x)/(x^(3)) is continuous at x=0, the value of A,B and f(0) are :

If f(x)=(2x+3sin x)/(3x+2sin x),x!=0 is continuous at x=0, then find f(0)

If f(x)=(2x+3sin x)/(3x+2sin x),x!=0 is continuous at x=0, then find f(0)

If the function f(x) {: (3 sin x - sin 3x)/(x^(3)), x != 0 , is continuous at the point x = 0 , then : f(0) =

If f(x)=(sin 2x+A sinx+B cosx)/(x^(3)) is continuous at x = 0, then the values of A, B and f(0) are

If the function f(x)=(sin3x+a sin 2x+b)/(x^(3)), x ne 0 is continuous at x=0 and f(0)=K, AA K in R , then b-a is equal to