Let `f: RrarrR` be a differential function, such that f(3) = 3 and `f'(3) =1/2` then `lim_(x rarr3)((int_3^(fx)x.t^2dt)/(x^2-9))` is

Let f:R to R be a differentiable function such that f(2)=2 . Then, the value of lim_(xrarr2) int_(2)^(f(x))(4t^3)/(x-2) dt , is

Let f:R rarr R be a differentiable function having f(2)=6,f'(2)=(1)/(48). Then evaluate lim_(x rarr2)int_(6)^(f(x))(4t^(3))/(x-2)dt

Let f be real-valued function such that f(2)=2 and f'(2)=1 then lim_(x rarr2)int_(2)^(f(x))(4t^(3))/(x-2)backslash dt is equal to :

Let f : R to R be a continuously differentiable function such that f(2) = 6 and f'(2) = 1/48 * If int_(6)^(f(x)) 4t^(3) dt = (x-2) g(x)" than" lim_( x to 2) g(x) is equal to

Let f(x) be twice differentiable function such that f'(0) =2 , then, lim_(xrarr0) (2f(x)-3f(2x)+f(4x))/(x^2) , is

Suppose f:R rarr R is a differentiable function and f(1)=4. Then value of (lim)_(x rarr1)(int_(4)^(f(x))(2t))/(x-1)dt is

If f(9)=9 and f'(9)=1 then lim_(x rarr 9) (3-sqrt(f(x)))/(3-sqrtx)

Let f(x) be a twice-differentiable function and f'(0)=2. The evaluate: lim_(x rarr0)(2f(x)-3f(2x)+f(4x))/(x^(2))

Let f:R rarr R be a differentiable and strictly decreasing function such that f(0)=1 and f(1)=0. For x in R, let F(x)=int_(0)^(x)(t-2)f(t)dt

Let f : R to R be a differentiable function satisfying f'(3) + f'(2) = 0 , Then lim_(x to 0) ((1+f(3+x)-f(3))/(1+f(2-x)-f(2)))^(1/x) is equal to