If `f(x)= int_(0)^(x)t sin t dt`, then `f'(x)` is

If f(x)=int_0^xtsintdt , then f'(x) is :

Let f(x) = int_(-2)^(x)|t + 1|dt , then a. f(x) is continuous in [-1, 1] b. f(x) is differentiable in [-1, 1] c. f'(x) is continuous in [-1, 1] d. f'(x) is differentiable in [-1, 1]

For x epsilon(0,(5pi)/2) , definite f(x)=int_(0)^(x)sqrt(t) sin t dt . Then f has

If f(x)=int_(0)^(x) log ((1-t)/(1+t)) dt , then discuss whether even or odd?

Statement I If f (x) = int_(0)^(1) (xf(t)+1) dt, then int_(0)^(3) f (x) dx =12 Statement II f(x)=3x+1

Let y= int_(u(x))^(y(x)) f (t) dt, let us define (dy)/(dx) as (dy)/(dx)=v'(x) f^(2) (v(x)) - u' (x) f^(2) (u(x)) and the equation of the tangent at (a,b) and y-b=((dy)/(dx))(a,b) (x-a) . If f(x)=int _(x)^(x^2) t^(2) dt " then" (d)/(dx) f(x) at x = 1 is

Let f(x) =int_0^1|x-t|t dt , then A. f(x) is continuous but not differentiable for all x in R B. f(x) is continuous and differentiable for all x in R C. f(x) is continuous for x in R-{(1)/(2)} and f(x) is differentiable for x in R - {(1)/(4),(1)/(2)} D. None of these

If f(x) = underset(0)overset(x)intt sin t dt , then write the value of f'(x).

Let f : (0, oo) rarr R be a continuous function such that f(x) = int_(0)^(x) t f(t) dt . If f(x^(2)) = x^(4) + x^(5) , then sum_(r = 1)^(12) f(r^(2)) , is equal to