设二维连续型随机变量(X,Y)的联合分布函数为F(x,y)=A(B+arctanx/2)(C+arctany/3),判断X和Y的独_数学解答

设二维连续型随机变量(X,Y)的联合分布函数为F(x,y)=A(B+arctanx/2)(C+arctany/3),判断X和Y的独立性
其中A=1/π^2,B=π/2,C=π/2

人气：117 ℃　时间：2019-10-23 07:41:15

解答

F(x,y)=A(B+arctanx/2)(C+arctany/3)F(-∞,-∞)=A(B-π/2)(C-π/2)=0F(-∞,+∞)=A(B-π/2)(C+π/2)=0F(+∞,-∞)=A(B+π/2)(C-π/2)=0F(+∞,+∞)=A(B+π/2)(C+π/2)=1解得：A=1/π^2,B=π/2,C=π/2F(+∞,y)=1/2+1/π*...