Let f be a function defined on the interval `[0,2pi]` such that `int_(0)^(x)(f^(')(t)-sin2t)dt=int_(x)^(0)f(t)tantdt` and `f(0)=1`. Then the maximum value of `f(x)`is…………………..

Let f be a non-negative function defined on the interval .[0,1].If int_0^x sqrt[1-(f'(t))^2].dt=int_0^x f(t).dt, 0<=x<=1 and f(0)=0,then

Let f be a non-negative function defined on the interval [0,1] . If int_0^x sqrt(1-(f'(t))^(2))dt=int_0^x f(t)dt , 0 lexle1 and f(0)=0 then the value of lim_(x to0)int_0^xf(t)/x^2 dt is

If int_(0)^(x)f(t)dt=x+int_(x)^(1)f(t)dt ,then the value of f(1) is

If int_(0)^(1) f(t)dt=x^2+int_(0)^(1) t^2f(t)dt , then f'(1/2)is

If int_(0)^(x) f(t)dt=x+int_(x)^(1) t f(t) dt , then the value of f(1), is

If int_(0)^(x)f(t)dt=x^(2)+int_(x)^(1)t^(2)f(t)dt, then f'((1)/(2)) is

If int_(0)^(x)f(t)dt = x^(2)-int_(0)^(x^(2))(f(t))/(t)dt then find f(1) .

If int_(0)^(x)f(t)dt=e^(x)-ae^(2x)int_(0)^(1)f(t)e^(-t)dt , then