Let `g(x) = 2f ((x)/(2)) + f(2 - x) and f''(x) lt 0 AA x in (0, 2)`. Then g(x) increases in

Let g(x) = f(x) + f(1-x) and f''(x) gt 0, AA x in (0, 1) . Then g(x) a)monotonically decreases in (0, 1). b)monotonically increases in (0, 1). c)non-monotonic and increases in (0, 1/2). d)non-monotonic and decreases in (0, 1/2).

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

Let g(x) = f(x) -1 . If f(x) + f(1-x) = 2AA x in R , then g (x)is symmetrical about a)the origin b)the line x=1/2 c)the point (1,0) d)the point (1/2,0)

Let f(x)=x(x-1)(x-2) , x in [0,2] Find f^'(x)

Let f(x)=x(x-1)(x-2) , x in [0,2] Find f(0) and f(2)

Let f(x) and g(x) be two continuous functions defined from R rarr R , such that f(x_(1)) gt f(x_(2)) and g(x_(1)) lt g(x_(2)) AA x_(1) gt x_(2) . Then find the solution set of f(g(alpha^(2) - 2 alpha)) gt f(g(3 alpha - 4)) .

Let f (x+y) =f (x) f(y) and f(x)=1 +sin (3x) g(x) , where g(x) is continuous , then f '(x) is : a)f(x) g(0) b)3g(0) c)f(x) cos (x) d)3f(x)g(0)