Adjugate matrix and Cramer's rule/Introduction/Section

Let ${\displaystyle {}M={\left(a_{ij}\right)}_{ij}}$. Let the coefficients of the adjugate matrix be denoted by

${\displaystyle {}b_{ik}=(-1)^{i+k}\det M_{ki}\,.}$

The coefficients of the product ${\displaystyle {}(M^{\operatorname {adj} })\cdot M}$ are

${\displaystyle {}c_{ij}=\sum _{k=1}^{n}b_{ik}a_{kj}=\sum _{k=1}^{n}(-1)^{i+k}a_{kj}\det M_{ki}\,.}$

In case ${\displaystyle {}j=i}$, this is ${\displaystyle {}\det M}$, as this sum is the expansion of the determinant with respect to the ${\displaystyle {}j}$-th column. So let ${\displaystyle {}j\neq i}$, and let ${\displaystyle {}N}$ denote the matrix that arises from ${\displaystyle {}M}$ by replacing in ${\displaystyle {}M}$ the ${\displaystyle {}i}$-th column by the ${\displaystyle {}j}$-th column. If we expand ${\displaystyle {}N}$ with respect to the ${\displaystyle {}i}$-th column, then we get

${\displaystyle {}0=\det N=\sum _{k=1}^{n}(-1)^{i+k}a_{kj}\det M_{ki}=c_{ij}\,.}$

Therefore, these coefficients are ${\displaystyle {}0}$, and the first equation holds.
The second equation is proved similarly, where we use now the expansion of the determinant with respect to the rows.

For an invertible matrix ${\displaystyle {}M}$, the solution of the linear system ${\displaystyle {}Mx=c}$ can be found by applying ${\displaystyle {}M^{-1}}$, that is, ${\displaystyle {}x=M^{-1}c}$. Using fact, this means ${\displaystyle {}x={\frac {1}{\det M}}(M^{\operatorname {adj} })c}$. For the ${\displaystyle {}j}$-th component, this means

${\displaystyle {}x_{j}={\frac {1}{\det M}}{\left(\sum _{k=1}^{n}(-1)^{k+j}(\det M_{kj})\cdot c_{k}\right)}\,.}$

The right-hand factor is the expansion of the determinant of the matrix shown in the numerator with respect to the ${\displaystyle {}j}$-th column.