可逆阵
$\bf命题:$设$A$为$m\times n$矩阵,$B$为$n\times m$矩阵,若$E_n-BA$可逆,证明:$E_m-AB$可逆,并求其逆矩阵
$\bf命题:$设$A,B$均为$n$阶矩阵,且$A+B=AB$,则
(1)${\left( {E - A} \right)^{ - 1}} = E - B$
(2)$AB=BA$
(3)$r(A)=r(B)$
$\bf命题:$
$\bf命题:$设$A$为$n$阶幂等阵$\left( {{A^2} = A} \right)$,证明:$E+A$可逆,且${\left( {E + A} \right)^{ - 1}} = E - \frac{1}{2}A$
$\bf命题:$设$A$为$n$阶幂零阵$\left( {{A^k} = 0,k \in {N_ + }} \right)$,证明:$E-A$可逆,且${\left( {E - A} \right)^{ - 1}} = E + A + {A^2} + \cdots + {A^{k - 1}}$
$\bf命题:$设$A$为数域$F$上的$n$阶方阵$(n>2)$,试求${\left( {{A^*}} \right)^*}$
$\bf命题:$设$A,B \in {P^{n \times n}}$,则${\left( {AB} \right)^*} = {B^*}{A^*}$
$\bf命题:$设$A$为$n$阶不可逆阵,则${A^*}$的$n$个特征值至少有$n-1$个为零且另一个非零特征值(如果存在)等于${A_{11}} + {A_{22}} + \cdots + {A_{nn}}$
$\bf命题:$