Let F : R `to` R be a thrice differentiable function . Suppose that `F(1)=0,F(3)=-4 and F(x) lt 0 " for all" x in (1,3).` f(x) = x F(x) for all `x inR`.
`Ifint_(1)^(3)x^(2)F'(x)dx=-12 andint_(1)^(3)x^(3)F'' (x)dx =40`, then the correct expression (s) is //are

Let F : R to R be a thrice differentiable function . Suppose that F(1)=0,F(3)=-4 and F(x) lt 0 " for all" x in (1,3). f(x) = x F(x) for all x inR . The correct statement (s) is / are

Let F : R rarr R be a thrice differentiable function, Supose that F(1) = 0, F(3) = -4 and F'(x) lt 0 for all x in (1//2//3) . Let f(x) = xF(x) for all x in R . If underset(1)overset(3)int_(1)^(3) x^(2)F'(x) dx = -12 and int_(1)^(3)x^(3)F"(x)dx = 40 . Then the correct expression(s) is are :

Let F:R-R be a thrice differentiable function.Suppos that F(1)=0,F(3)=-4 and F(x)<0 for all x in((1)/(2),3)* Let f(x)=xF(x) for all x in R The correct statement is

Let F:RtoR be a thrice differntiable function. Suppose that F(1)=0,F(3)=-4 and F'(x)lt0 for all x epsilon(1//2,3) . Let f(x)=xF(x) for all x epsilonR . The correct statement(s) is (are)

Let f:R rarr R be a twice differentiable function such that f(x+pi)=f(x) and f'(x)+f(x)>=0 for all x in R. show that f(x)>=0 for all x in R .

Let f be a differentiable function defined on R such that f(0) = -3 . If f'(x) le 5 for all x then

Let f: [1,3] to R be a continuous function that is differentiable in (1,3) and f '(x) = |f(x) |^(2) + 4 for all x in (1,3). Then,

The number of continous and derivable function(s) f(x) such that f(1) = -1 , f(4) = 7 and f'(x) gt 3 for all x in R is are :

Let f be a twice differentiable function defined on R such that f(0) = 1, f'(0) = 2 and f '(x) ne 0 for all x in R . If |[f(x)" "f'(x)], [f'(x)" "f''(x)]|= 0 , for all x in R , then the value of f(1) lies in the interval:

A continous function f(x) is such that f(3x)=2f(x), AA x in R . If int_(0)^(1)f(x)dx=1, then int_(1)^(3)f(x)dx is equal to