设随机变量ξ的密度函数为p(x)=
{Asinx,x∈[0,π]
{0,其他
试求:(1)常数A;
(2)ξ的分布函数F(x);
(1)由1=∫+∞-∞p(x)dx=∫x0Asinxdx =A∫x0sinxdx(-cosx)|π0=A[1+1]=2A, 故A=1/2. (2)F(x)=∫+∞-∞)p(t)dt= {0,x<0, {1/2(1-cos),0≤x<π, {1,π≤x. (3)P{π/2<ξ<(3/4)π}=F[(3/4)π]-F(π/2) =1/2(1+√2/2-[1/2(1-0)]=√2/4
