Function `f(x)=|x|-|x-1|` is monotonically increasing when

The function f(x)=cos(pi/x) is monotonically increasing in the interval K is any positive integer is

The function f(x)=cosx-2lambda x is monotonicallly decreasing when

{:("Column -I","Column -II"),((A)f(x)=(x)/(1+xtanx)"has maximum value in the domain when x= of definition of function","P Any real"),((B)f(x)=((x)/(1+tanx))^(-1)"has minimum value when x=","Q"(pi)/(4)),((C)f(x)=((x)/(1+xcotx)) " is monotonically increasing when" x=,"R cosx"),((D)f(x)=((x)/(1+xcotx))^(-1) "has minimum value in "(0,(pi)/(4)) "thenx= of point of intercection of y=x and y = cos x","S sinx"),(,"T The x - coordinate"):}

Find the intervals on which the function f(x)=x^(3)+5x^(2)-8x+1 is a strictly increasing function.

Find the intervals in which the function f(x)=x^(3)-3x^(2)+4 is strictly increasing all xepsilonR .

If f(x)=kx^(3)-9x^(2)+9x+3 is monotonically increasing in R , then

If f(x) = (2k + 1) x- 3 - ke^(-x) + 2e^(x) is monotonically increasing for all x in R then the least value of k is