Let f(x) be and even function in R. If f(x) is monotonically increasing in [2, 6], then

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

Let f(x) =x - tan^(-1)x. Prove that f(x) is monotonically increasing for x in R

Let f be an even function and f'(x) exists, then f'(0) is

f(x)=[x] is step-up function. Is it a monotonically increasing function for x in R ?

Show that the function f(x) = 2x+1 is strictly increasing on R.

Let f(x) = tan^-1 (g(x)) , where g (x) is monotonically increasing for 0 < x < pi/2.

Let f(x) be a continuous function in R such that f(x) does not vanish for all x in R . If int_1^5 f(x)dx=int_-1^5 f(x)dx , then in R, f(x) is (A) an even function (B) an odd function (C) a periodic function with period 5 (D) none of these

Let f(x)=|x^2-3x-4|,-1lt=xlt=4 Then f(x) is monotonically increasing in [-1,3/2] f(x) monotonically decreasing in (3/2,4) the maximum value of f(x)i s(25)/4 the minimum value of f(x) is 0

Let f be the function f(x)=cosx-(1-(x^2)/2)dot Then (a) f(x) is an increasing function in (0,oo) (b) f(x) is a decreasing function in (-oo,oo) (c) f(x) is an increasing function in (-oo,oo) (d) f(x) is a decreasing function in (-oo,0)

If g(x) is monotonically increasing and f(x) is monotonically decreasing for x in R and if (gof) (x) is defined for x in R , then prove that (gof)(x) will be monotonically decreasing function. Hence prove that (gof) (x +1)leq (gof) (x-1).