Let `g(x)=int_0^x f(t).dt`,where f is such that `1/2<=f(t)<=1` for `t in [0,1]` and `0<=f(t)<=1/2` for `t in [1,2]`.Then g(2) satisfies the inequality

Let f(x) be a periodic function with period 3 and f(-2/3)=7 and g(x) = int_0^x f(t+n) dt .where n=3k, k in N . Then g'(7/3) =

Evaluation of definite integrals by subsitiution and properties of its : g(x)=int_(0)^(x)f(t)dt where (1)/(2)lef(t)le1,tin[0,1] and 0lef(t)le(1)/(2),tin(1,2] then ………..

Let g(x) = ln f(x) where f(x) is a twice differentiable positive function on (0, oo) such that f(x+1) = x f(x) . Then for N = 1,2,3 g''(N+1/2)- g''(1/2) =

Let f(x)=int_1^xsqrt(2-t^2)dtdot Then the real roots of the equation , x^2-f^(prime)(x)=0 are:

Let f: RvecR be a continuous function which satisfies f(x)= int_0^xf(t)dtdot Then the value of f(1n5) is______

A function satisfying int_0^1f(tx)dt=nf(x) , where x>0 is

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

For x in x != 0, if y(x) differential function such that x int_1^x y(t)dt=(x+1)int_1^x t y(t)dt, then y(x) equals: (where C is a constant.)

If f(x)= int_(0)^(x)(f(t))^(2) dt, f:R rarr R be differentiable function and f(g(x)) is differentiable at x=a , then

Let f:RtoR be a differentiable function such that f(x)=x^(2)+int_(0)^(x)e^(-t)f(x-t)dt . f(x) increases for