设X为随机变量,E(X)=μ,D(x)=σ2,当()时,有E(Y)=0,D(Y)=1
A: Y=σX+μ
B: Y=σX-μ
C:
D:
A: Y=σX+μ
B: Y=σX-μ
C:
D:
举一反三
- 设二维随机变量(X,Y)满足:E(X)=E(Y)=0,D(X)=D(Y)=1,Cov(X,Y)=c,证明:
- 方程${{x}^{2}}{{y}^{''}}-(x+2)(x{{y}^{'}}-y)={{x}^{4}}$的通解是( ) A: $y={{C}_{1}}x+{{C}_{2}}{{e}^{x}}-(\frac{1}{2}{{x}^{3}}+{{x}^{2}})$ B: $y={{C}_{1}}x+{{C}_{2}}{{e}^{x}}-(\frac{1}{2}{{x}^{3}}+{{x}^{4}})$ C: $y={{C}_{1}}x+{{C}_{2}}x{{e}^{x}}-(\frac{1}{2}{{x}^{3}}+{{x}^{4}})$ D: $y={{C}_{1}}x+{{C}_{2}}x{{e}^{x}}-(\frac{1}{2}{{x}^{3}}+{{x}^{2}})$
- 已知齐次方程$(x-1){{y}^{''}}-x{{y}^{'}}+y=0$的通解为$Y={{C}_{1}}x+{{C}_{2}}{{e}^{x}}$,则方程$(x-1){{y}^{''}}-x{{y}^{'}}+y={{(x-1)}^{2}}$的通解是( ) A: ${{\text{C}}_{1}}x+{{\text{C}}_{2}}{{e}^{x}}-({{x}^{2}}+1)$ B: ${{\text{C}}_{1}}x+{{\text{C}}_{2}}{{e}^{x}}-({{x}^{3}}+1)$ C: ${{\text{C}}_{1}}x+{{\text{C}}_{2}}{{e}^{x}}-{{x}^{2}}$ D: ${{\text{C}}_{1}}x+{{\text{C}}_{2}}{{e}^{x}}-{{x}^{2}}+1$
- 设整型变量x为5,y为2,结果值为1的表达式是( )。 A: x != y || x >= y B: !(y == x / 2) C: y != x % 3 D: x > 0 && y < 0
- 设二维随机变量 (X , Y )服从二维正态分布,则随机变量X + Y与X – Y不相关的充要条件为( ) A: E (X ) = E (Y ) B: E (X 2) – [E (X )]2 = E (Y 2 ) – [E (Y )]2 C: E (X 2 ) = E (Y 2) D: E (X 2) + [E (X )]2 = E (Y 2 ) + [E (Y )]2