A. $E(Y)=0$;
B. $D(Y)=2$;
C. $Y \sim N(0,1)$;
D. $Y \sim N(0,2)$.
(3)设X_(1)sim N(1,2),X_(2)sim N(0,3),X_(3)sim N(2,1),且X_(1),X_(2),X_(3)相互独立,则P0le
6、设X_(1)sim N(1,2),X_(2)sim N(0,3),X_(3)sim N(2,1),且X_(1),X_(2),X_(3)独立,则P(0le 2
5 判断 设随机变量X_(1),X_(2),...,X_(n),...相互独立,且X_(i)sim U(2,4)(sim i=1,2,...),则lim_(n
2.单选题 X_(1),X_(2),X_(3),X_(4)独立,X_(i)sim N(0,1),(i=1,2,3,4)以下不正确的是A. $\frac{(X_{
1.设X~N(0,1),X_(1),X_(2),X_(3),X_(4),X_(5)为其样本,求(2X_(5))/(sqrt(sum_(i=1)^4)X_{i^2
1 设总体Xsim N(0,1),X_(1),X_(2),...,X_(n)为X的样本,则((X_(1)-X_(2))/(X_(3)+X_{4)})^2服从__
设X_(1),X_(2)...,X_(n)是来自总体X的样本,则(1)/(n-1)sum_(i=1)^n(X_(i)-overline(X))^2为().A.
设X_(1),X_(2),...,X_(n)是来自总体X的样本,则(1)/(n-1)sum_(i=1)^n(X_(i)-overline(X))^2是()A.
设总体 X sim N(mu, sigma^2), X_(1), X_(2), ..., X_(n) 为来自总体X的简单随机样本,则 sum_(i=1)^n((
52202A.设Phi(x)为标准正态分布的分布函数,X_(i)=}1,事件A发生(i=1,2,...,n)且P(A)=p,X_(1),X_(2),...,X_