Lösning till övning 3
SamverkanLinalgLIU
| (34 mellanliggande versioner visas inte.) | |||
| Rad 1: | Rad 1: | ||
Låt <math>\boldsymbol{u}=\underline{\boldsymbol{e}}X_1=\underline{\boldsymbol{e}}\begin{pmatrix}{a_1}\\{b_1}\\{c_1}\end{pmatrix}</math> och <math>\boldsymbol{v}=\underline{\boldsymbol{e}}X_2=\underline{\boldsymbol{e}}\begin{pmatrix}{a_2}\\{b_2}\\{c_2}\end{pmatrix}</math>. | Låt <math>\boldsymbol{u}=\underline{\boldsymbol{e}}X_1=\underline{\boldsymbol{e}}\begin{pmatrix}{a_1}\\{b_1}\\{c_1}\end{pmatrix}</math> och <math>\boldsymbol{v}=\underline{\boldsymbol{e}}X_2=\underline{\boldsymbol{e}}\begin{pmatrix}{a_2}\\{b_2}\\{c_2}\end{pmatrix}</math>. | ||
Vi behöver summan | Vi behöver summan | ||
| - | <center><math>\boldsymbol{u}+\boldsymbol{v}=\underline{\boldsymbol{e}}\begin{pmatrix}{a_1}\\{b_1}\\{c_1}\end{pmatrix}+\underline{\boldsymbol{e}}\begin{pmatrix}{a_2}\\{b_2}\\{c_2}\end{pmatrix}=\underline{\boldsymbol{e}}\begin{pmatrix}{a_1+a_2}\\{b_1+b_2}\\{c_1+c_2}\end{pmatrix}</center></math> | + | <center><math>\boldsymbol{u}+\boldsymbol{v}=\underline{\boldsymbol{e}}\begin{pmatrix}{a_1}\\{b_1}\\{c_1}\end{pmatrix}+\underline{\boldsymbol{e}}\begin{pmatrix}{a_2}\\{b_2}\\{c_2}\end{pmatrix}=\underline{\boldsymbol{e}}\begin{pmatrix}{a_1+a_2}\\{b_1+b_2}\\{c_1+c_2}\end{pmatrix}</math></center> |
| + | och | ||
| + | <center><math> | ||
| + | \lambda\boldsymbol{u}=\lambda\underline{\boldsymbol{e}}\begin{pmatrix}{a_1}\\{b_1}\\{c_1}\end{pmatrix}=\underline{\boldsymbol{e}}\begin{pmatrix}{\lambda | ||
| + | a_1}\\{\lambda b_1}\\{\lambda | ||
| + | c_1}\end{pmatrix}. | ||
| + | </math></center> | ||
| + | Avbildningen <math>G</math> är inte linjär, ty | ||
| + | <center><math>1.\quad G(\boldsymbol{u}+\boldsymbol{v})\neq G(\boldsymbol{u})+G(\boldsymbol{v})\qquad\qquad 2.\quad G(\lambda\boldsymbol{u})\neq\lambda G(\boldsymbol{u}).</math></center> | ||
| + | T.ex., följer att | ||
| + | |||
| + | <center><math> | ||
| + | \begin{align}G(\lambda\boldsymbol{u})&=G\left(\underline{\boldsymbol{e}}\begin{pmatrix}{\lambda a_1}\\{\lambda b_1}\\{\lambda c_1}\end{pmatrix}\right)=G\left(\underline{\boldsymbol{e}}\begin{pmatrix}{\lambda a_1}\\{\lambda b_1}\\{\lambda c_1}\end{pmatrix}\right)=\underline{\boldsymbol{e}}\begin{pmatrix}{\lambda a_1\cdot\lambda c_1}\\{\lambda^2b_1^2}\\{\lambda b_1+\lambda c_1}\end{pmatrix}\\ | ||
| + | &=\lambda\underline{\boldsymbol{e}}\begin{pmatrix}{\lambda a_1c_1}\\{\lambda b_1^2}\\{b_1+c_1}\end{pmatrix}\neq\lambda G(\boldsymbol{u}).\end{align}</math></center> | ||
Nuvarande version
Låt \displaystyle \boldsymbol{u}=\underline{\boldsymbol{e}}X_1=\underline{\boldsymbol{e}}\begin{pmatrix}{a_1}\\{b_1}\\{c_1}\end{pmatrix} och \displaystyle \boldsymbol{v}=\underline{\boldsymbol{e}}X_2=\underline{\boldsymbol{e}}\begin{pmatrix}{a_2}\\{b_2}\\{c_2}\end{pmatrix}. Vi behöver summan
och
\lambda\boldsymbol{u}=\lambda\underline{\boldsymbol{e}}\begin{pmatrix}{a_1}\\{b_1}\\{c_1}\end{pmatrix}=\underline{\boldsymbol{e}}\begin{pmatrix}{\lambda a_1}\\{\lambda b_1}\\{\lambda c_1}\end{pmatrix}.
Avbildningen \displaystyle G är inte linjär, ty
T.ex., följer att
\begin{align}G(\lambda\boldsymbol{u})&=G\left(\underline{\boldsymbol{e}}\begin{pmatrix}{\lambda a_1}\\{\lambda b_1}\\{\lambda c_1}\end{pmatrix}\right)=G\left(\underline{\boldsymbol{e}}\begin{pmatrix}{\lambda a_1}\\{\lambda b_1}\\{\lambda c_1}\end{pmatrix}\right)=\underline{\boldsymbol{e}}\begin{pmatrix}{\lambda a_1\cdot\lambda c_1}\\{\lambda^2b_1^2}\\{\lambda b_1+\lambda c_1}\end{pmatrix}\\
&=\lambda\underline{\boldsymbol{e}}\begin{pmatrix}{\lambda a_1c_1}\\{\lambda b_1^2}\\{b_1+c_1}\end{pmatrix}\neq\lambda G(\boldsymbol{u}).\end{align}