`f(x)=|x|` is increasing in

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

Prove that the function f given by f(x)=x-[x] is increasing in (0,1) .

Prove that the function f given by f(x)=x-[x] is increasing in (0,\ 1) .

the function f(x)=logx/x is increasing in the interval

Function f(x)=a^x is increasing on R , if (a) a >0 (b) a 1

Function f(x)=a^x is increasing on R , if (a) a >0 (b) a 1

What are the values of 'a' for which f(x)=a^(x) is increasing on R

What are the values of ' a ' for which f(x)=a^x is increasing on R

which of the following statement is // are true ? (i) f(x) =sin x is increasing in interval [(-pi)/(2),(pi)/(2)] (ii) f(x) = sin x is increasing at all point of the interval [(-pi)/(2),(pi)/(2)] (3) f(x) = sin x is increasing in interval ((-pi)/(2),(pi)/(2)) UU ((3pi)/(2),(5pi)/(2)) (4) f(x)=sin x is increasing at all point of the interval ((-pi)/(2),(pi)/(2)) UU ((3pi)/(2),(5pi)/(2)) (5) f(x) = sin x is increasing in intervals [(-pi)/(2),(pi)/(2)]& [(3pi)/(2),(5pi)/(2)]

which of the following statement is // are true ? (i) f(x) =sin x is increasing in interval [(-pi)/(2),(pi)/(2)] (ii) f(x) = sin x is increasing at all point of the interval [(-pi)/(2),(pi)/(2)] (3) f(x) = sin x is increasing in interval ((-pi)/(2),(pi)/(2)) UU ((3pi)/(2),(5pi)/(2)) (4) f(x)=sin x is increasing at all point of the interval ((-pi)/(2),(pi)/(2)) UU ((3pi)/(2),(5pi)/(2)) (5) f(x) = sin x is increasing in intervals [(-pi)/(2),(pi)/(2)]& [(3pi)/(2),(5pi)/(2)]