设alpha_(1),alpha_(2),alpha_(3)是四元非齐次线性方程组Ax=b的三个解向量,且A的秩R A. =3,alpha_(1)=(1,2,3,4)^T,alpha_(2)+alpha_(3)=(0,1,2,3)^T,k为任意常数,则线性方程组Ax=b的通解为()。A. x=k(1,1,1,1)^T+alpha_(1)B. x=k(0,1,2,3)^T+alpha_(1)C. x=k(2,3,4,5)^T+alpha_(1)D. x=k(3,4,5,6)^T+alpha_(1)

设向量组 a_1, a_2, dotsc ,a_m ,其一个极大线性无关组为 a_(r_1), a_(r_2), dotsc ,a_(r_s),则以下说法错误的是 A. 对任意 i=1,2, dotsc ,m ,向量 alpha_i 均可由向量组 a_(r_1), a_(r_2), dotsc ,a_(r_s)线性表出 B. 向量组 alpha_1, alpha_2, dotsc ,alpha_m 与向量组 a_(r_1), a_(r_2), dotsc ,a_(r_s)等价 C. 对任意 i=1,2, dotsc ,m ,向量组 alpha_i, a_(r_1), a_(r_2), dotsc ,a_(r_s)线性相关 D. 可能存在某个向量 alpha_i (i=1,2, dotsc ,m ),该向量不能由向量组 a_(r_1), a_(r_2), dotsc ,a_(r_s)线性表出

设向量0 1 2-|||-(alpha )_(1)= 1 _(2)= 1 ,beta = 1-|||--1 1 3,则0 1 2-|||-(alpha )_(1)= 1 _(2)= 1 ,beta = 1-|||--1 1 3中系数0 1 2-|||-(alpha )_(1)= 1 _(2)= 1 ,beta = 1-|||--1 1 3的取值为()A 0 1 2-|||-(alpha )_(1)= 1 _(2)= 1 ,beta = 1-|||--1 1 3B 0 1 2-|||-(alpha )_(1)= 1 _(2)= 1 ,beta = 1-|||--1 1 3C 0 1 2-|||-(alpha )_(1)= 1 _(2)= 1 ,beta = 1-|||--1 1 3D0 1 2-|||-(alpha )_(1)= 1 _(2)= 1 ,beta = 1-|||--1 1 3

设A, B均为n阶方阵,且AX=B,则X=()A. BA^-1B. B^-1C. A^-1D. A^-1B

[题目]设在一次实验中,事件A发生的概率为P,-|||-现进行n次独立试验,则A至少发生一次的概率为 __-|||-__ 而事件A至多发生一次的概率为 __

设曲线 y = f ( x ) 在原点处的切线方程为 y = 4 x,则lim _(narrow infty )nf(dfrac (4)(n))=()A.16B.1C.8D.4

(10)设随机变量X的概率密度为 (x)=(Ae)^-(x^2+x)(-infty lt xlt +infty ), 则常数 A= __ .

已知1 0 1-|||-α1= 0 α2= -1 α3= 1-|||--1 2 t线性无关,则参数t的值为A.1 0 1-|||-α1= 0 α2= -1 α3= 1-|||--1 2 tB.1 0 1-|||-α1= 0 α2= -1 α3= 1-|||--1 2 tC.1 0 1-|||-α1= 0 α2= -1 α3= 1-|||--1 2 tD.1 0 1-|||-α1= 0 α2= -1 α3= 1-|||--1 2 t

已知函数=ln [ ln (ln x)] ,则=ln [ ln (ln x)] _____.=ln [ ln (ln x)] =ln [ ln (ln x)] =ln [ ln (ln x)] =ln [ ln (ln x)]

设随机变量x1,A2····, Xn相互独立,且x1,A2····, Xn在区间 ( -1 , 1 ) 上服从均匀分布x1,A2····, Xn,则当 n 充分大时,随机变量x1,A2····, Xn近似服从()分布A.区间 ( -1 , 1 ) 的均匀分布B. N ( 0 , 1 )C.区间 ( - n , n ) 的均匀分布D.x1,A2····, Xn

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