设A为三阶矩阵,三维列向量a1,a2,a3线性无关,
设A为三阶矩阵,三维列向量a1,a2,a3线性无关,
设A为三阶矩阵,三维列向量a1,a2,a3线性无关,且满足Aa1=2a1+a2+a3,Aa2=2a2,Aa3=-a2+a
设A是3阶矩阵,a1a2a3是三维线性无关的列向量,且Aa1=4a1-4a2+3a3 Aa2=负6a1-a2+a3 Aa
设三维列向量a1,a2,a3线性无关,A是三阶矩阵,且有Aa1=a1+2a2+3a3,Aa2=2a2+3a3,Aa3=3
设三维列向量a1,a2,a3线性无关,A是三阶矩阵,且有Aa1=2a1+4a2+6a3,Aa2=4a2+6a3,Aa3=
设矩阵A=(a1,a2,a3,a4),其中a2,a3,a4线性无关,a1=2a2-a3,向量b=a1+a2+a3+a4,
设矩阵A=(a1,a2,a3,a4)其中a2,a3,a4线性无关,a1=2a2-a3,向量b=a1+a2+a3+a4,求
设矩阵A=[a1.a2.a3.a4],其中a2.a3.a4线性无关,a1=2a3-3a4.向量b=a1+2a2+3a3+
设A=(A1,A2,A3,A4),其中列向量A1,A2,A3线性无关,且A4=A1-A2+2A3,则齐次线性方程组AX=
已知A是3阶矩阵,a1,a2,a3是3维线性无关列向量,Aa1=a1+2a3,
设向量组a1,a2,a3,线性无关.证明:向量组a1+a2+a3,a2+a3,a3也线性无关
设5×4矩阵A的4个列向量a1,a2,a3,a4线性无关,b=a1+a2-a3-a4,那么线性方程组AX=b有__解,并