Tips och lösning till U 5.8

\boldsymbol{u}\times\boldsymbol{v}= \left|\begin{array}{rrr}\boldsymbol{e}_1&\boldsymbol{e}_2&\boldsymbol{e}_3\\3&1&7\\2&-3&5\end{array}\right|= 26\boldsymbol{e}_1-\boldsymbol{e}_2-11\boldsymbol{e}_3=\underline{\boldsymbol{e}}\left(\begin{array}{r}26\\-1\\-11\end{array}\right).

(\boldsymbol{u}\times\boldsymbol{v})\cdot\boldsymbol{w}=\left(\begin{array}{r}26\\-1\\-11\end{array}\right) \cdot\left(\begin{array}{r}9\\0\\1\end{array}\right)=223.

\begin{array}{lcl}

    (\boldsymbol{u}\times\boldsymbol{v})\cdot\boldsymbol{w}&=&\left|\begin{array}{rrr}3&1&7\\2&-3&5\\9&0&1\\\end{array}\right|\\
                                      &=&\mbox{gå längs 1:a raden och plocka ner elementen med minus på andra}\\
                                      &=&3\cdot\left|\begin{array}{rrr}\star&1&7\\2&-3&5\\9&0&1\\\end{array}\right|
                                          -1\cdot\left|\begin{array}{rrr}3&\star&7\\2&-3&5\\9&0&1\\\end{array}\right|
                                          +7\cdot\left|\begin{array}{rrr}3&1&\star\\2&-3&5\\9&0&1\\\end{array}\right|\\
                                      &=&\mbox{stryk den rad och kolonn som }\star\mbox{ står på}\\
                                      &=&3\cdot\begin{vmatrix}{-3}&5\\1&-1\end{vmatrix}
                                              \cdot\begin{vmatrix}2&5\\9&1\end{vmatrix}
                                              7\cdot\begin{vmatrix}2&-3\\9&0\end{vmatrix}=223.
    \end{array}