3.设 approx N(0,(4)^2), approx N(1,(3)^2), 且 (rho )_(x)=-dfrac (1)(2), 令 =dfrac (x)(2)+dfrac (y)(3), 求-|||-(1)EZ,DZ;(2)X与Z的相关系数ρg;(3)X与Z是否相互独立?

1.设 approx N(2,18), 若 Y=(B) ),则 approx N(0,1).-|||-(A) dfrac (x-2)(18): (B) dfra

已知 approx N(1,(3)^2), backsim N((0.4)^2), 且X与Y的相关系数 rho =-1/2, 设 =dfrac (x)(3)--

4.10 设随机变量X 1,X2,X3相互独立,且 _(1)approx B(4,dfrac (1)(2)) _(2)approx B(6,dfrac (1)(

2.已知随机变量X Y分别服从N(1,4^2 ),N(0,3^2),它们的相关系数 (rho )_(xy)=-dfrac (1)(2), 设 =-|||-dfr

[题目]设总体 approx N(mu ,1), (x1,x2,x3)为其样本,-|||-若估计量-|||-mu =dfrac (1)(2)(x)_(1)+df

设l为椭圆dfrac ({x)^2}(4)+dfrac ({y)^2}(3)=1，其周长记为a，则dfrac ({x)^2}(4)+dfrac ({y)^2}(

、设随机变量 approx P(lambda ), 已知 (X=1)=P(X=2), 则 P(X=4)=-|||-A) dfrac (1)(3)(e)^2 (B

4.设随机变量 sim N(1,9) , sim N(0,16) ,相关系数 (rho )_(xy)=-dfrac (1)(2) ,设-|||-.=dfrac

设连续型随机变量 X - N ( 1 , 4 )， 则 dfrac (x-1)(2)approx (A N ( 0 , 2 ) B N ( 1 , 2 ) C

设L为椭圆dfrac ({x)^2}(2)+dfrac ({y)^2}(3)=1，其周长为a，则dfrac ({x)^2}(2)+dfrac ({y)^2}(3