Find the possible values of `a` such that `f(x)=e^(2x)-(a+1)e^x+2x` is monotonically increasing for `x in Rdot`

Find possible values of 'a' such that f(x) =e^(2x) -2(a^(2) -21) e^(x)+ 8x+5 is monotonically increasing for x in R.

Set of all possible values of a such that f(x)=e^(2x)-(a+1)e^(x)+2x is monotonically increasing for all x in R is (-oo,a] ,then (a^(3))/(54) is

Let set of all possible values of lamda such that f (x)= e ^(2x) - (lamda+1) e ^(x) +2x is monotonically increasing for AA x in R is (-oo, k]. Find the value of k.

The function f(x)= (x^(2))/(e^(x)) monotonically increasing if

f(x)=(e^(2x)-1)/(e^(2x)+1) is

f(x)=|x-1|+2|x-3|-|x+2| is monotonically increasing at x=?

f(x)=x+(1)/(x),x!=0 is monotonic increasing when

Let f(x)={:{(x^(2),x ge 0),(ax, x lt 0):} . Find real values of a such that f(x) is strictly monotonically increasing at x = 0 .

f(x)=((e^(2x)-1)/(e^(2x)+1)) is