If f(x) is an odd pefiodc function defined on the interval [T/2,T/2], where T is rthe perod of f(x). Then `phi(x)=int_(a)^(x) f(t)dt,` is

if f(x) is an odd periodic function defined on interval [-T/2,T/2], where T is the time period of f(x). Then time period of phi(x)=int_(a)^(x)f(x)dx is

If f(t) is a continuous function defined on [a,b] such that f(t) is an odd function, then the function phi(x)=int_(a)^(x) f(t)dt

If f(t) is an odd function, then int_(0)^(x)f(t) dt is -

The intervals of increase of f(x) defined by f(x)=int_(-1)^(x)(t^(2)+2t)(t^(2)-1)dt is equal to

If f(t) is an odd function,then varphi(x)=int_(a)^(x)f(t)dt is an even function.

Let f(x) be a function defined by f(x)=int_(1)^(x)t(t^2-3t+2)dt,x in [1,3] Then the range of f(x), is

Let f(x) be a function defined by f(x)=int_(1)^(x)t(t^2-3t+2)dt,x in [1,3] Then the range of f(x), is

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 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…………………..