The value of `k` for which the function `f(x)={(sin3x)/(x),` if `x!=0, k if x=0` is continuous at `x=0` is

Determine the values of a,b,c for which the function f(x)={(sin(a+1)x+sin x)/(x) for x 0 is continuous at x=0

For what value of k is the function f(x)={(sin5x)/(3x),\ \ \ if\ x!=0,\ \ \ \ \ k ,\ \ \ if\ x=0 continuous at x=0 ?

Determine the value of the constant k so that the function f(x)={(sin2x)/(5x),quad if x!=0k,quad if x=0 is continuous at x=0

The value of k for which f(x) = {((sin 5x)/(3x)","," if " x !=0),(" k,"," if " x = 0):} is contnuous at x = 0 is

For what value of k is the function f(x)={(sin2x)/(x),quad x!=0k,quad x=0 continuous at x=0?

[f(x)={[(sin3x)/(sin x),,x!=0],[k,,x=0] is continuous,if k is

the function f(x)={(sin x)/(x)+cos x,x!=0 and f(x)={k,x=0 is continuous at x=0 then find the value of k

Determine the value of the constant k, so that the function f(x)={(kx)/(|x|), if x =0 is continuous at 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 k, such that the function f(x) = {(k(x^2-2x), if x = 0):} at x=0 is continuous.