If `f(x) = xe^(x (1- x))`, then f(x) is a)increasing on [-1/2, 1] b)decreasing on R c)increasing on R d)decreasing on [-1/2, 1]

Let f(x) = x sqrt(4ax - x^(2)), (a gt 0) . Then f(x) is a)increasing in (0, 3a), decreasing in (3a, 4a) b)increasing in (a, 4a), decreasing in (5a, oo) c)increasing in (0, 4a) d)None of these

If x in (0, pi//2) , then the function f(x) = x sin x + cos x + cos^(2) x is a)Increasing b)Decreasing c)Neither increasing nor decreasing d)None of these

Show that the function given by f(x)=sin x is a) strictly increasing in (0, pi/2) b) Strictly decreasing in (pi/2, pi) c) Neither increasing nor decreasing in (0,pi) .

Let h(x) = f(x)-(f(x))^(2) + (f(x))^(3) for every real number x. Then a)h is increasing whenever f is increasing b)h is increasing whenever f is decreasing c)h is decreasing whenever f is decreasing d)nothing can be said in general

If f(x) = |x-2| + |x+1| - x , then f'(-10) is equal to a)-3 b)-2 c)-1 d)0

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)

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

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

If f(x)=2x^(2)+bx+c and f(0)=3 and f(2)=1 , then f(1) is equal to a)1 b)2 c)0 d) 1/2