Let `f(1)=-2a n df^(prime)(x)geq4. 2for1lt=xlt=6.` The smallest possible value of `f(6)` is 9 (b) 12 (c) 15 (d) 19

If cot^(-1)((n^2-10 n+21. 6)/pi)>pi/6, where x y<0 then the possible values of z is (are) 3 (b) 2 (c) 4 (d) 8

Suppose that f is differentiable for all x and that f^(prime)(x)lt=2 for all x If f(1)=2 and f(4)=8 then f(2) has the value equal to (a) 3 (b) 4 (c) 6 (d) 8

Let f: Rvec[0,pi/2) be defined by f(x)=tan^(-1)(x^2+x+a)dot Then the set of values of a for which f is onto is (a) (0,oo) (b) [2,1] (c) [1/4] (d) [1/4,oo]

Suppose the function f(x)-f(2x) has the derivative 5 at x=1 and derivative 7 at x=2 . The derivative of the function f(x)-f(4x) at x=1 has the value equal to (a) 19 (b) 9 (c) 17 (d) 14

Let f(x)=x+2|x+1|+x-1| . If f(x)=k has exactly one real solution, then the value of k is (a) 3 (b) 0 (c) 1 (d) 2

Let f:[1/2,1]->R (the set of all real numbers) be a positive, non-constant, and differentiable function such that f^(prime)(x)<2f(x))a n df(1/2)=1 . Then the value of int_(1/2)^1f(x)dx lies in the interval (a) (2e-1,2e) (b) (3-1,2e-1) ((e-1)/2,e-1) (d) (0,(e-1)/2)

Let f(x)=(alphax)/((x+1)),x!=-1. The for what value of alpha is f(f(x))=x ? (a) sqrt(2) " " (b) -sqrt(2) " " (c) 1 " " (d) -1

Let f(x)=(1+b^2)x^2+2b x+1 and let m(b) the minimum value of f(x)dot As b varies, the range of m(b) is (a) [0,1] (b) (0,1/2] (c) [1/2,1] (d) (0,1]

Let f(x)=ab sin x+bsqrt(1-a^(2))cosx+c , where |a|lt1,bgt0 then a. maximum value of f(x) is b, if c = 0 b. difference of maximum and minimum value of f(x) is 2b c. f(x)=c, if x=-cos^(-1)a d. f(x)=c, if x=cos^(-1)a

The function f(x)=e^x+x , being differentiable and one-to-one, has a differentiable inverse f^(-1)(x)dot The value of d/(dx)(f^(-1)) at the point f(log2) is 1/(1n2) (b) 1/3 (c) 1/4 (d) none of these