Value of 'k' so that `f(k)=int_0^4|4x-x^2-k|dx` is minimum is-

Value of k' so that f(k)=int_(0)^(4)|4x-x^(2)-k|dx is minimum is-

The value of k so that x^4 -4x^3 +5x^2 -2x +k is divisible by x^2 -2x +2 is

The value of k so that x^4 -4x^3 +5x^2 -2x +k is divisible by x^2 -2x +2 is

The value of K so that x^(4)-4x^(3)+5x^(2)-2x+k is divisible by x^(2)-2x+2

The value of k + f(0) so that f (x)={{:((sin (4k-1)x)/(3x)"," , x lt 0),((tan (4k +1)x )/(5x)"," , 0 lt x lt (pi)/(2)), ( 1"," , x =0):} can bemade continous at x=0 is:

The value of k + f(0) so that f (x)={{:((sin (4k-1)x)/(3x)"," , x lt 0),((tan (4k +1)x )/(5x)"," , 0 lt x lt (pi)/(2)), ( 1"," , x =0):} can bemade continous at x=0 is:

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 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 the function is continuous at x=0f(x)={(1-cos4x),x!=0;k,x=0