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

Let f(x) be an odd continuous function which is periodic with period 2. if g(x)=underset(0)overset(x)intf(t)dt , then

Let g(t) = underset(x_(1))overset(x_(2))intf(t,x) dx . Then g'(t) = underset(x_(1))overset(x_(2))int(del)/(delt) (f(t,x))dx , Consider f(x) = underset(0)overset(pi)int (ln(1+xcostheta))/(costheta) d theta . The number of critical point of f(x) , in the interior of its domain, is

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

For y=f(x)=overset(x)underset(0)int 2|t| dt, the tangent lines parallel to the bi-sector of the first quadrant angle are

If overset(4)underset(-1)int f(x)=4 and overset(4)underset(2)int (3-f(x))dx=7 , then the value of overset(-1)underset(2)int f(x)dx , is

If y = underset(u(x))overset(v(x))intf(t) dt , let us define (dy)/(dx) in a different manner as (dy)/(dx) = v'(x) f^(2)(v(x)) - u'(x) f^(2)(u(x)) alnd the equation of the tangent at (a,b) as y -b = (dy/dx)_((a,b)) (x-a) If F(x) = underset(1)overset(x)inte^(t^(2)//2)(1-t^(2))dt , then d/(dx) F(x) at x = 1 is

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

The poins of extremum of phi(x)=underset(1)overset(x)inte^(-t^(2)//2) (1-t^(2))dt are

If f(x)=overset(x)underset(0)int(sint)/(t)dt,xgt0, then

If a function y=f(x) such that f'(x) is continuous function and satisfies (f(x))^(2)=k+underset(0)overset(x)int [{f(t)}^(2)+{f'(t)}^(2)]dt,k in R^(+) , then find f(x)