LaTeX-examples/documents/Numerik/Klausur5/Aufgabe1.tex

\section*{Aufgabe 1}
\paragraph{Gegeben:}

\[A = \begin{pmatrix}
     2 &  3 & -1\\
    -6 & -5 &  0\\
     2 & -5 &  6
\end{pmatrix},\;\;\; b = \begin{pmatrix}20\\-41\\-15\end{pmatrix}\]

\paragraph{LR-Zerlegung:}

\begin{align}
    &&A^{(0)} &= \begin{gmatrix}[p]
         2 &  3 & -1\\
        -6 & -5 &  0\\
         2 & -5 &  6
        \rowops
        \swap{0}{1}
    \end{gmatrix}\\
    P^{(1)} &= \begin{pmatrix}
        0 & 1 & 0\\
        1 & 0 & 0\\
        0 & 0 & 1
    \end{pmatrix}
    &A^{(1)} &=
    \begin{gmatrix}[p]
        -6 & -5 &  0\\
         2 &  3 & -1\\
         2 & -5 &  6
        \rowops
        \add[\cdot \frac{1}{3}]{0}{1}
        \add[\cdot \frac{1}{3}]{0}{2}
    \end{gmatrix}\\
    L^{(2)} &=\begin{pmatrix}
        1 & 0 & 0\\
      \nicefrac{1}{3} & 1 & 0\\
      \nicefrac{1}{3} & 0 & 1
    \end{pmatrix},
    & A^{(2)} &= \begin{gmatrix}[p]
        -6 & -5 &  0\\
         0 &  \frac{4}{3} & -1\\
         0 & -\frac{20}{3} &  6
        \rowops
        \swap{1}{2}
    \end{gmatrix}\\
    P^{(3)} &= \begin{pmatrix}
        1 & 0 & 0\\
        0 & 0 & 1\\
        0 & 1 & 0
    \end{pmatrix},
    & A^{(3)} &= \begin{gmatrix}[p]
        -6 & -5 &  0\\
         0 & -\frac{20}{3} &  6\\
         0 &  \frac{4}{3} & -1
        \rowops
        \add[\cdot \frac{1}{5}]{1}{2}
    \end{gmatrix}\\
    L^{(4)} &= \begin{pmatrix}
        1 & 0 & 0\\
        0 & 1 & 0\\
        0 & \nicefrac{1}{5} & 1
    \end{pmatrix},
    & A^{(4)} &= \begin{gmatrix}[p]
        -6 & -5 &  0\\
         0 & -\frac{20}{3} &  6\\
         0 &  0 & \nicefrac{1}{5}
    \end{gmatrix} =:R
\end{align}

Es gilt nun:

\begin{align}
    P :&= P^{(3)} \cdot P^{(1)}\\
      &= \begin{pmatrix}
        1 & 0 & 0\\
        0 & 0 & 1\\
        0 & 1 & 0
    \end{pmatrix} \cdot \begin{pmatrix}
        0 & 1 & 0\\
        1 & 0 & 0\\
        0 & 0 & 1
    \end{pmatrix} \\
    &=
    \begin{pmatrix}
        0 & 1 & 0\\
        0 & 0 & 1\\
        1 & 0 & 0
    \end{pmatrix}\\
    L^{(4)} \cdot P^{(3)} \cdot L^{(2)} \cdot P^{(1)} \cdot A &= R\\
L^{-1} &= L^{(4)} \cdot \hat{L_1}\\
    \hat{L_1} &= P^{(3)} \cdot L^{(2)} \cdot (P^{(3)})^{-1}\\
&= P^{(3)} \cdot L^{(2)} \cdot P^{(3)}\\
&= \begin{pmatrix}
        1 & 0 & 0\\
      \nicefrac{1}{3} & 1 & 0\\
      \nicefrac{1}{3} & 0 & 1
    \end{pmatrix}\\
    L &= (L^{(4)} \cdot \hat{L_1})^{-1}\\
    &= \begin{pmatrix}
    1 & 0 & 0\\
    -\frac{1}{3} & 1 & 0\\
    -\frac{1}{3} & -\frac{1}{5} & 1
\end{pmatrix}
\end{align}

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minor changes (added TODOs) 2013-09-17 14:55:57 +02:00			`\section*{Aufgabe 1}`
Aufgabe 1, Klausur 5 gelöst 2013-09-19 22:20:35 +02:00			`\paragraph{Gegeben:}`

			`\[A = \begin{pmatrix}`
			`2 & 3 & -1\\`
			`-6 & -5 & 0\\`
			`2 & -5 & 6`
			`\end{pmatrix},\;\;\; b = \begin{pmatrix}20\\-41\\-15\end{pmatrix}\]`

			`\paragraph{LR-Zerlegung:}`

			`\begin{align}`
			`&&A^{(0)} &= \begin{gmatrix}[p]`
			`2 & 3 & -1\\`
			`-6 & -5 & 0\\`
			`2 & -5 & 6`
			`\rowops`
			`\swap{0}{1}`
			`\end{gmatrix}\\`
			`P^{(1)} &= \begin{pmatrix}`
			`0 & 1 & 0\\`
			`1 & 0 & 0\\`
			`0 & 0 & 1`
			`\end{pmatrix}`
			`&A^{(1)} &=`
			`\begin{gmatrix}[p]`
			`-6 & -5 & 0\\`
			`2 & 3 & -1\\`
			`2 & -5 & 6`
			`\rowops`
			`\add[\cdot \frac{1}{3}]{0}{1}`
			`\add[\cdot \frac{1}{3}]{0}{2}`
			`\end{gmatrix}\\`
			`L^{(2)} &=\begin{pmatrix}`
			`1 & 0 & 0\\`
			`\nicefrac{1}{3} & 1 & 0\\`
			`\nicefrac{1}{3} & 0 & 1`
			`\end{pmatrix},`
			`& A^{(2)} &= \begin{gmatrix}[p]`
			`-6 & -5 & 0\\`
			`0 & \frac{4}{3} & -1\\`
			`0 & -\frac{20}{3} & 6`
			`\rowops`
			`\swap{1}{2}`
			`\end{gmatrix}\\`
			`P^{(3)} &= \begin{pmatrix}`
			`1 & 0 & 0\\`
			`0 & 0 & 1\\`
			`0 & 1 & 0`
			`\end{pmatrix},`
			`& A^{(3)} &= \begin{gmatrix}[p]`
			`-6 & -5 & 0\\`
			`0 & -\frac{20}{3} & 6\\`
			`0 & \frac{4}{3} & -1`
			`\rowops`
			`\add[\cdot \frac{1}{5}]{1}{2}`
			`\end{gmatrix}\\`
			`L^{(4)} &= \begin{pmatrix}`
			`1 & 0 & 0\\`
			`0 & 1 & 0\\`
			`0 & \nicefrac{1}{5} & 1`
			`\end{pmatrix},`
			`& A^{(4)} &= \begin{gmatrix}[p]`
			`-6 & -5 & 0\\`
			`0 & -\frac{20}{3} & 6\\`
			`0 & 0 & \nicefrac{1}{5}`
			`\end{gmatrix} =:R`
			`\end{align}`

			`Es gilt nun:`

			`\begin{align}`
			`P :&= P^{(3)} \cdot P^{(1)}\\`
			`&= \begin{pmatrix}`
			`1 & 0 & 0\\`
			`0 & 0 & 1\\`
			`0 & 1 & 0`
			`\end{pmatrix} \cdot \begin{pmatrix}`
			`0 & 1 & 0\\`
			`1 & 0 & 0\\`
			`0 & 0 & 1`
			`\end{pmatrix} \\`
			`&=`
			`\begin{pmatrix}`
			`0 & 1 & 0\\`
			`0 & 0 & 1\\`
			`1 & 0 & 0`
			`\end{pmatrix}\\`
			`L^{(4)} \cdot P^{(3)} \cdot L^{(2)} \cdot P^{(1)} \cdot A &= R\\`
			`L^{-1} &= L^{(4)} \cdot \hat{L_1}\\`
			`\hat{L_1} &= P^{(3)} \cdot L^{(2)} \cdot (P^{(3)})^{-1}\\`
			`&= P^{(3)} \cdot L^{(2)} \cdot P^{(3)}\\`
			`&= \begin{pmatrix}`
			`1 & 0 & 0\\`
			`\nicefrac{1}{3} & 1 & 0\\`
			`\nicefrac{1}{3} & 0 & 1`
			`\end{pmatrix}\\`
			`L &= (L^{(4)} \cdot \hat{L_1})^{-1}\\`
			`&= \begin{pmatrix}`
			`1 & 0 & 0\\`
			`-\frac{1}{3} & 1 & 0\\`
			`-\frac{1}{3} & -\frac{1}{5} & 1`
			`\end{pmatrix}`
			`\end{align}`

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