Find the value of `k`, so that the function is continuous at `x = 0` `f(x)={(1-cos 4x), x!=0 ; k, x=0`.

Find the value of k, so that the function is continuous at x=0f(x)={(1-cos4x),x!=0;k,x=0

Find the value of f(0) so that the function given below is continuous at x=0 f(x)=(1-cos2x)/(2x^2)

Find the values (s) of k so that the following function is continuous at x=0 f(x ) = {{:( (1- cos kx )/( x sin x ) , " if " x ne o),( 1/2, I f x=0):}

Find the value of the constant k so that the function given below is continuous at x=0 .f(x)={(1-cos2x)/(2x^(2)),quad x!=0quad k,quad x=0

Find the values of k so that the function f is continuous at the indicated point f(x) = {((1- cos (kx))/(x^(2))",","if " x ne 0),((1)/(2)",","if " x= 0):} at x= 0

Find the value of k so that f(x) is continous at x = 0 f(x) = {{:((1 - cos 8x)/(4x^2)"," ,x != 0),(k",", x = 0):}

Find the value of k so that f(x) is continouns at x = 0 f(x) = {{:((1 - cos 2x)/(4x^2)"," ,x != 0),("k,", x = 0):}

Find the value of the constant k so that the function given below is continuous at x=0 . f(x)={(1-cos2x)/(2x^2),\ \ \ x!=0\ \ \ \ \ \ \ \ k ,\ \ \ \ \ \ \ \ \ \ \ \ \ 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]:}

(a) Determine the value of k so that the following function f(x) is continous at x=0 f(x)={((sin2x)/(x)" , if "xne0),(k" , if "x=0):} (b) Determine k, if the following function is continuous at x=0: f(x)={((sin3x)/(4x)" , "xne0),(k" , "x=0):} (c) Determine k so that the following function f(x) is continuous at x=0 f(x)={((sin5x)/(3x)" , "xne0),(k" , "x=0):}