The function `f(x) = (x (x - 2))^(2)` is increasing in the interval

The function f(x)=(9-x^(2))^(2) increases in

The function f given by f(x)=x^(3)e^(x) is increasing on the interval

Find the least value of k for which the function x^(2) + kx + 1 is an increasing function in the interval 1 lt x lt 2 .

Let f(x) = cos x - (1 - (x^(2))/(2)) then f(x) is increasing in the interval a) (-oo, 1] b) [0, oo) c) (-oo, -1] d) (-oo, oo)

The function f(x)=3x^(3)-36x+99 is increasing for

A function g(x) is defined as g(x) = (1)/(4) f(2x^(2) - 1) + (1)/(2) f(1- x^(2)) and f'(x) is an increasing function. Then g(x) is increasing in the interval

Consider the functions f(x) = sin x and g(x) = cos x in the interval [0,2 pi] find the area enclosed by these curves in the given interval ?

Consider the functions f(x) = sin x and g(x) = cos x in the interval [0,2 pi] draw the rough sketch of the above function ?