有限数学 例

Choose the row or column with the most ${\displaystyle 0}$ elements. If there are no ${\displaystyle 0}$ elements choose any row or column. Multiply every element in row ${\displaystyle 3}$ by its cofactor and add.

${\displaystyle 0}$に${\displaystyle \left|\begin{array}{cc}1& 4\\ 2& 1\end{array}\right|}$をかけます。

${\displaystyle 0}$に${\displaystyle \left|\begin{array}{cc}3& 1\\ 1& 2\end{array}\right|}$をかけます。

${\displaystyle \left|\begin{array}{cc}3& 4\\ 1& 1\end{array}\right|}$の値を求めます。

行列式を簡約します。

Multiply each element of ${\displaystyle R_1}$ by ${\displaystyle \frac{1}{3}}$ to make the entry at ${\displaystyle 1,1}$ a ${\displaystyle 1}$.

Perform the row operation ${\displaystyle R_2=R_2-R_1}$ to make the entry at ${\displaystyle 2,1}$ a ${\displaystyle 0}$.

Multiply each element of ${\displaystyle R_2}$ by ${\displaystyle \frac{3}{5}}$ to make the entry at ${\displaystyle 2,2}$ a ${\displaystyle 1}$.

Perform the row operation ${\displaystyle R_3=R_3-R_2}$ to make the entry at ${\displaystyle 3,2}$ a ${\displaystyle 0}$.

Multiply each element of ${\displaystyle R_3}$ by ${\displaystyle 5}$ to make the entry at ${\displaystyle 3,3}$ a ${\displaystyle 1}$.

Perform the row operation ${\displaystyle R_2=R_2+\frac{1}{5}{R}_3}$ to make the entry at ${\displaystyle 2,3}$ a ${\displaystyle 0}$.

Perform the row operation ${\displaystyle R_1=R_1-\frac{4}{3}{R}_3}$ to make the entry at ${\displaystyle 1,3}$ a ${\displaystyle 0}$.

Perform the row operation ${\displaystyle R_1=R_1-\frac{1}{3}{R}_2}$ to make the entry at ${\displaystyle 1,2}$ a ${\displaystyle 0}$.