A. $\frac{2}{5} \sigma^2$
B. $\frac{2}{15} \sigma^2$
C. $\frac{2}{5} \sigma^4$
D. $\frac{2}{15} \sigma^4$
[单选题]系统特征方程为D(s)=s3+2s2+s+2=0,则该系统( )。A.右半S平面有1个闭环极点B.稳定C.右半S平面有2个闭环极点D.临界稳定A.B.C.D.
(5)从正态总体X~N(μ,σ²)中抽取一容量为16的样本,S²为样本方差,则D(S^2)/(sigma^2)=______.(5)从正态总体X~N(μ,σ²)
8.设在总体N(μ,σ^2 ^2)中抽取容量为16的样本(μ,σ^2均未知),试求:-|||-(1)P S^2/2≤2.041},其中S^2为样本方差;-|||
[单选题]s=left$(“abcd”,2)+Mid$(“efgh”,2,2),则s的值为()。A . abghB . abfgC . cdghD . cdfg
[单选题]s=left$(“abcd”,2)+right$(“efgh”,2),则s的值为()。A . abefB . cdefC . abghD . cdgh
已知 F(s)= (e^-s)/(s(2s+1)),则 f(t)= ()A. $[1-e^{-(t-1)/2}]u(t)$B. $[1-e^{-(t-1)/2}
(0,1) , =2s-1,则(0,1) , =2s-1,( )。A.(0,1) , =2s-1,B.(0,1) , =2s-1,C.(0,1) , =2
f(t)的波形如图所示, 则F(s)=_____。1 ---|||-t-|||-(}^2[ dfrac {1)(2)-dfrac (1)(2)(e)^-2s-s
2、向量组a1,α2,···,α,线性相关且秩为s,则 [ ]-|||-(A) r=s (B) leqslant S (C) leqslant r (D) lt
设X_(1),X_(2),...,X_(n)是来自总体N(mu,sigma^2)的样本,overline(X),S^2分别为样本均值和方差,则(overline