证明：设F(x)=∫(0,x)f(t)dtF(-x)=∫(0,-x)f(t)dt,对此积分,代换t=-y,代入得：F(-x)=∫(0,-x)f(t)dt=∫(0,x)[-f(-y)]dy=∫(0,x)[-f(-t)]dt如果f(t)是连续的奇函数,那么：f(-t)=-f(t) ,F(-x)=∫(0,x)[f(t)]dt=F(x),F(...