The increasing function in `(0,pi//4)` is

Show that the function f given by f(x) = tan^(-1)(sin x + cos x), x gt 0 is always an strictly increasing functions in (0, (pi)/(4))

Let f(x)) be an increasing function defined on (0.oo) If f(2a^(2)+a+1)gtf(3a^(2)-4a+1) , then the possible integers in the range of a is /are

Prove that the function given by f(x) = cos x is (a) decreasing in (0, pi ) (b) increasing in (pi, 2pi) , and (c) neither increasing nor decreasing in (0, 2pi) .

Show that the function f(x) = sin x defined on R is neither increasing nor decreasing on (0, pi) .

The range of the function sin([x]pi) is:

Statement-1: The fucntion x^(2)(e^(x)+e^(-x)) is increasing for all x gt 0 . Statement-2 : The function x^(2)e^(x) and x^(2)e^(-x) are increasing for all x gt 0 and the sum of two increasing functions in any interval (a,b) is an increasing function in (a,b)

Define the increasing function and decreasing function on an interval.

The interval of increasing for y=x-2 sin x,[0,2pi] is