A. $\frac{\overline{X}-2}{4}\sim N(0,1)$
B. $\frac{\overline{X}-2}{16}\sim N(0,1)$
C. $\frac{\overline{X}-2}{2}\sim N(0,1)$
D. $\frac{\overline{X}-2}{4/\sqrt{n}}\sim N(0,1)$
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)为总体Xsim N(mu,sigma^2)的样本,证明hat(mu)_(1)=(1)/(2)X_(1)+(2)/(3
16.设总体Xsim N(0,1),X_(1),X_(2),X_(3),X_(4)是来自总体X的简单随机样本,又设Y=(X_(1)+X_(2))^2+(X_(3
7.设X_(1),X_(2),X_(3)是来自总体Xsim N(0,1)的一组样本,则X_(1)+X_(2)+X_(3):____,X_(1)^2+X_(2)^
5、设总体Xsim N(mu,sigma^2),x_(1),x_(2),x_(3)为来自X的样本,则当常数a=____时,hat(mu)=(1)/(4)x_(1
X_(8)是来自正态总体Xsim N(0,9)的样本,证明:(X_(1)+X_(2)+X_(3)+X_(4))/(sqrt(X_(5)^2)+X_{6^2+X_
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.
4.设X_(1),X_(2),...,X_(n)为总体Xsim N(mu,sigma^2)的一个样本,则样本均值overline(X)=____,样本方差S^2
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.
1.填空题(1)设X_(1),X_(2),...,X_(n)为总体X的一个样本,如果g(X_(1),X_(2),...,X_(n))____,则称g(X_(1)