证明: [tex=9.643x1.357]0uijVr0ZqWqqlcBM8Dsby1BrwrIHLO+XsfQhOEXHBEnx2GsZFViLgQRIWawVQ5zXjesvEwAAMKhwB2QVJmWvbA==[/tex].
举一反三
- 【单选题】设X为连续型随机变量, 其概率密度: f(x)=Ax2, x∈(0,2); 其它为0. 求(1)A=(); (2) 分布函数F(x)=(); (3) P{1<X<2} (10.0分) A. (1)3/8; (2)x<0, F(x)=0; 0≤x<2, F(x)=1/8x³; x≥2, F(x)=1; (3) 7/8 B. (1)5/8; (2)x<0, F(x)=0; 0≤x<2, F(x)=1/8x³; x≥2, F(x)=0 (3) 1/8
- 设函数f具有一阶连续导数,f''(0)存在,且f'(0)=0,f(0)=0,[tex=11.143x2.929]FgiJWgRQAKO6KUAKNMtpr42BveQYl/ToVviQ5cCtM9wcSY0QBIbGsihuelZ2Y0bAzYEbycD2Q2vfi4GC2Ijs1kB6/BRoIojNsaonEeVPYMMzs1ywITo1iMnLUJQZym3e[/tex].(1)确定a,使得g(x)处处连续;(2)对以上所确定的a,证明g(x)具有一阶连续导数.
- “[ 2*x+2 for x in range(5) ]”生成的列表是( )。 A: [2, 4, 6, 8, 10] B: [0, 2, 4, 6, 8] C: [1, 2, 3, 4, 5] D: [0, 1, 2, 3, 4]
- 若多项式[tex=11.214x1.286]SjK0S1WZKzbJ274ItOnkARL7nFK+zdRrCU6QNLzudTI=[/tex]能被[tex=2.214x1.286]wAsYQMu7MmTp6bSm/DQuDw==[/tex]整除,则实数[tex=1.571x1.286]HKnp+uHPBk2bwxzOgbygNw==[/tex] A: 0 B: 1 C: 0或1 D: 2 E: 1或2
- 【单选题】Which of the following matrices does not have the same determinant of matrix B: [1, 3, 0, 2; -2, -5, 7, 4; 3, 5, 2, 1; -1, 0, -9,-5] A. [1, 3, 0, 2; -2, -5, 7, 4; 0, 0, 0, 0; -1, 0, -9, -5] B. [1, 3, 0, 2; -2, -5, 7, 4; 1, 0, 9, 5; -1, 0, -9, -5] C. [1, 3, 0, 2; -2, -5, 7, 4; 3, 5, 2, 1; -3, -5, -2, -1] D. [1, 3, 0, 2; -2, -5, 7, 4; 0, 0, 0, 1; -1, 0, -9, -5]