Let `f(1)=-2, f'(x) ge4.2` for `1le x le6`. The smallest possible value of `f(6)-16` is ……..

The function f (x) is differentiable for every x. f(1)=-2 and f'(x)ge 2, AA x in [1,6] . Then minimum value of f (6) is ……….

If f(x) is continuous and differentible over [-2, 5] and -4lef'(x)le3 for all x in (-2, 5) , then the greatest possible value of f(5)-f(-2) is

Let f:[1,oo) to [2,oo) be a differentiable function such that f(1)=2. If 6int_1^xf(t)dt=3xf(x)-x^3 for all xgeq1, then the value of f(2) is

2x+y ge 4, x +y le 3, 2x-3y ge6

f:RrarrR,f(x)=x^(3)+x^(2)f'(1)+xf''(2)+f'''(3)" for all "x in R. The value of f(1) is

If f(x) = ax^2+bx+12, f'(2) = 11 and f'(4)=15 then possible value of a and b are ............ .

Let f(x) = (x+1)^(2) - 1, (x ge - 1) . Then, the set S = {x : f(x) = f^(-1)(x)} is

Let f(x)=(alphax)/(x+1),x ne -1 . Then, for what values of alpha is f[f(x)]=x?

Let f(x) be a continuous function defined for 1 <= x <= 3. If f(x) takes rational values for all x and f(2)=10 then the value of f(1.5) is :

f(x)=abs(x-1)+abs(x-2), -1 le x le 3 . Find the range of f(x).