Let `f(x) = underset(0)overset(x)int|2t-3|dt`, then f is

For x in (0 , (5pi)/(2)) define f(x) = underset(0)overset(x)(int) sqrtt sin t dt Then has :

Consider the function f : (-oo , oo) to (-oo , oo) defined by f(x) = (x^(2) - ax + 1)/(x^(2) + ax + 1) , 0 lt a lt 2 Let g (x) = underset(0) overset(e^(x))(int) (f'(t))/(1 + t^(2)) dt Which of the following is true ?

Let f be a real-valued function on the interval (-1,1) such that e^(-x) f(x)=2+underset(0)overset(x)int sqrt(t^(4)+1), dt, AA x in (-1,1) and let f^(-1) be the inverse function of f. Then [f^(-1) (2)] is a equal to:

Let f(x) = int_(0)^(x)|2t-3|dt , then f is

f(x) = underset(0)overset(x)(t-1)(t-2)^(2)(t-4)^(5) dt (xgt0) then numb er of points of extremum of f(x) is

Let f(x) = int_(0)^(x)(t-1)(t-2)^(2) dt , then find a point of minimum.

Let: f(x)=int_(0)^(x)|2t-3|dt. Then discuss continuity and differentiability of f(x) at x=(3)/(2)

Let f(x)=int_(0)^(1)|x-t|dt, then

Let f : R to R be a continuous function satisfying f(x)+underset(0)overset(x)(f)"tf"(t)"dt"+x^(2)=0 for all "x"inR . Then-