Algebra lineare Esempi

Two matrices can be multiplied if and only if the number of columns in the first matrix is equal to the number of rows in the second matrix. In this case, the first matrix is ${\displaystyle 3\times 3}$ and the second matrix is ${\displaystyle 3\times 3}$.

Moltiplica ogni riga nella prima matrice per ogni colonna nella seconda matrice.

Semplifica ogni elemento della matrice moltiplicando tutte le espressioni.

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 ${\displaystyle 2}$ by its cofactor and add.

Moltiplica ${\displaystyle 0}$ per ${\displaystyle \left|\begin{array}{cc}1& 1\\ -1& -1\end{array}\right|}$.

Calcola ${\displaystyle \left|\begin{array}{cc}r& 1\\ -1& -1\end{array}\right|}$.

Calcola ${\displaystyle \left|\begin{array}{cc}r& 1\\ -1& -1\end{array}\right|}$.

Semplifica il determinante.

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

Perform the row operation ${\displaystyle R_3=R_3+R_1}$ to make the entry at ${\displaystyle 3,1}$ a ${\displaystyle 0}$.

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

Perform the row operation ${\displaystyle R_3=R_3-(-1+\frac{1}{r})R_2}$ to make the entry at ${\displaystyle 3,2}$ a ${\displaystyle 0}$.

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

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

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

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