The value of k such that the function f(x)=`|x^(2)+(k-1)|x|-k|` is non differentiable at exactly flve points is 3 4 (i) 5 -2

The value of k such that the function f(x)=|x^(2)+(k-1)|x|-k| is non differentiable at exactly five points is

If f(x)=3x^(2)+k|sin x| is differentiable at x=0 then the value of k is-

If f(x)=3x^(2)+k|sin x| is differentiable at x=0 then the value of 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.

The set of values of k(k in R) for which the equation x^(2)-4|x|+3-|k-1|=0 will have exactly four real roots,is

Find the value of k for which the function f(x)={k x+5, if x lt=2x-1, if x >2} is continuous at x=2

The set of value of k (k in R) for which the equation x ^(2) -4 |x|+3 -|k-1|=0 will have exactly four real roots, is:

Find the values of k so that the function f is continuous at the indicated point in f(x)={{:(k x+1, ifxlt=5),( 3x-5, ifx >5):} at x = 5

Find the values of k so that the function f is continuous at the indicated point f(x) = {(3x-8",","if" x le 5),(2k",","if" x gt 5):} at x= 5

Find the values of k so that the function f is continuous at the indicated point in f(x)={k x+1, if""xlt=5 3x-5, if""""x >5 at x" "=" "5