Zum Inhalt springen

Änderungen von Dokument Lösung Lineare Algebra

Zuletzt geändert von akukin am 2026/01/17 12:06
Von Version 10.1
bearbeitet von akukin
am 2026/01/15 19:48
Änderungskommentar: Es gibt keinen Kommentar für diese Version
Auf Version 5.2
bearbeitet von akukin
am 2026/01/14 22:01
Änderungskommentar: Es gibt keinen Kommentar für diese Version

Zusammenfassung

Details

Seiteneigenschaften
Inhalt
... ... @@ -135,7 +135,7 @@
135 135  {{formula}}
136 136  \overrightarrow{OM}= \overrightarrow{OA}+\frac{1}{2} \cdot \overrightarrow{AC}=
137 137  \begin{pmatrix}2{,}5\\1\\3\end{pmatrix}, \
138 -\Bigl| \overrightarrow{AM} \Bigr|= \Bigl| \overrightarrow{MB} \Bigr|=\Bigl| \overrightarrow{CM} \Bigr|=\sqrt{11{,}25}
138 +\Bigl| \overrightarrow{AM} \Bigr|+ \Bigl| \overrightarrow{MB} \Bigr|+\Bigl| \overrightarrow{CM} \Bigr|=\sqrt{11{,}25}
139 139  {{/formula}}
140 140  <p>
141 141  Somit haben alle drei Punkte den gleichen Abstand vom Mittelpunkt der Hypotenuse {{formula}}AC{{/formula}}.
... ... @@ -147,32 +147,5 @@
147 147  
148 148  
149 149  {{detail summary="Erläuterung der Lösung"}}
150 -Skizze:
151 -<br>
152 -[[image:SkizzeKreis (1).svg||width="250"]]
153 -<br>
154 -Aus der vorherigen Teilaufgabe wissen wir, dass {{formula}}AC{{/formula}} die Hypotenuse des Dreieckes ist. Auf der Hypotenuse {{formula}}AC{{/formula}} hat nur ihr Mittelpunkt {{formula}}M{{/formula}} denselben Abstand von {{formula}}A{{/formula}} und {{formula}}C{{/formula}}.
155 -<br>
156 -Den Mittelpunkt {{formula}}M{{/formula}} der Strecke {{formula}}AC{{/formula}} erhalten wir durch
157 -<br>
158 -{{formula}}
159 -\overrightarrow{OM}= \overrightarrow{OA}+\frac{1}{2} \cdot \overrightarrow{AC}=\begin{pmatrix}5\\-1\\4\end{pmatrix}+\frac{1}{2}\cdot \begin{pmatrix}-5\\4\\-2\end{pmatrix} =
160 -\begin{pmatrix}2{,}5\\1\\3\end{pmatrix}
161 -{{/formula}}
162 -<p></p>
163 -Nun müssen wir prüfen, dass der berechnete Mittelpunkt von den Punkten {{formula}}A{{/formula}}, {{formula}}B{{/formula}} und {{formula}}C{{/formula}} jeweils den selben Abstand besitzt:
164 -<br>
165 -{{formula}}
166 -\begin{align*}
167 -&\Bigl| \overrightarrow{AM} \Bigr| =\left| \begin{pmatrix}-2,5\\2\\-1\end{pmatrix}\right|=\sqrt{(-2,5)^2+2^2+(-1)^2} =\sqrt{11{,}25} \\
168 -&\Bigl| \overrightarrow{MB} \Bigr| =\left| \begin{pmatrix}-1,5\\0\\3\end{pmatrix}\right|=\sqrt{(-1,5)^2+0^2+3^2} =\sqrt{11{,}25}\\
169 -&\Bigl| \overrightarrow{CM} \Bigr|=\left| \begin{pmatrix}2,5\\-2\\1\end{pmatrix}\right|=\sqrt{2,5^2+(-2)^2+1^2} =\sqrt{11{,}25} \\
170 -\end{align*}
171 -{{/formula}}
172 -<p>
173 -Somit haben alle drei Punkte den gleichen Abstand vom Mittelpunkt der Hypotenuse {{formula}}AC{{/formula}}.
174 -Sie liegen deshalb auf einem Kreis mit diesem Punkt als Mittelpunkt.
175 -</p>
176 -Hinweis:
177 -Eine Argumentation mit dem Thaleskreis ist ebenso zulässig.
150 +
178 178  {{/detail}}
SkizzeKreis (1).svg
Author
... ... @@ -1,1 +1,0 @@
1 -XWiki.akukin
Größe
... ... @@ -1,1 +1,0 @@
1 -7.8 KB
Inhalt
... ... @@ -1,1 +1,0 @@
1 -<svg version="1.1" xmlns="http://www.w3.org/2000/svg" xmlns:xlink="http://www.w3.org/1999/xlink" width="562" height="558"><defs><clipPath id="fwrlIlnFlkyZ"><path fill="none" stroke="none" d=" M 0 0 L 562 0 L 562 558 L 0 558 L 0 0 Z"/></clipPath></defs><g transform="scale(1,1)" clip-path="url(#fwrlIlnFlkyZ)"><g><rect fill="rgb(255,255,255)" stroke="none" x="0" y="0" width="562" height="558" fill-opacity="1"/><path fill="none" stroke="rgb(0,0,0)" paint-order="fill stroke markers" d=" M 486.78975246059804 263.5558029039587 C 486.78975246059804 374.44807012479384 396.8938080663022 464.3440145190899 286.0015408454674 464.3440145190899 C 175.10927362463258 464.3440145190899 85.21332923033677 374.44807012479384 85.21332923033677 263.5558029039587 C 85.21332923033677 152.66353568312354 175.10927362463258 62.76759128882745 286.0015408454674 62.76759128882745 C 396.8938080663022 62.76759128882745 486.78975246059804 152.66353568312354 486.78975246059804 263.5558029039587 Z" stroke-opacity="0.6980392156862745" stroke-linecap="round" stroke-linejoin="round" stroke-miterlimit="10" stroke-width="2.5"/><path fill="none" stroke="rgb(0,0,0)" paint-order="fill stroke markers" d=" M 144.0228348300891 405.53450891933744 L 427.9802468608457 121.57709688857994" stroke-opacity="0.6980392156862745" stroke-linecap="round" stroke-linejoin="round" stroke-miterlimit="10" stroke-width="2.5"/><path fill="none" stroke="rgb(0,0,0)" paint-order="fill stroke markers" d=" M 427.9802468608457 121.57709688857994 L 427.9802468608457 405.53450891933744" stroke-opacity="0.6980392156862745" stroke-linecap="round" stroke-linejoin="round" stroke-miterlimit="10" stroke-width="2.5"/><path fill="none" stroke="rgb(0,0,0)" paint-order="fill stroke markers" d=" M 144.0228348300891 405.53450891933744 L 427.9802468608457 405.53450891933744" stroke-opacity="0.6980392156862745" stroke-linecap="round" stroke-linejoin="round" stroke-miterlimit="10" stroke-width="2.5"/><path fill="rgb(77,77,255)" stroke="none" paint-order="stroke fill markers" d=" M 432.9802468608457 121.57709688857994 C 432.9802468608457 124.33852063773391 430.74167060999963 126.57709688857994 427.9802468608457 126.57709688857994 C 425.21882311169173 126.57709688857994 422.9802468608457 124.33852063773391 422.9802468608457 121.57709688857994 C 422.9802468608457 118.81567313942598 425.21882311169173 116.57709688857994 427.9802468608457 116.57709688857994 C 430.74167060999963 116.57709688857994 432.9802468608457 118.81567313942598 432.9802468608457 121.57709688857994 Z" fill-opacity="1"/><path fill="none" stroke="rgb(0,0,0)" paint-order="fill stroke markers" d=" M 432.9802468608457 121.57709688857994 C 432.9802468608457 124.33852063773391 430.74167060999963 126.57709688857994 427.9802468608457 126.57709688857994 C 425.21882311169173 126.57709688857994 422.9802468608457 124.33852063773391 422.9802468608457 121.57709688857994 C 422.9802468608457 118.81567313942598 425.21882311169173 116.57709688857994 427.9802468608457 116.57709688857994 C 430.74167060999963 116.57709688857994 432.9802468608457 118.81567313942598 432.9802468608457 121.57709688857994 Z" stroke-opacity="1" stroke-linecap="round" stroke-linejoin="round" stroke-miterlimit="10"/><text fill="rgb(77,77,255)" stroke="none" font-family="geogebra-sans-serif, sans-serif" font-size="16px" font-style="normal" font-weight="normal" text-decoration="normal" x="432" y="112" text-anchor="start" dominant-baseline="alphabetic" fill-opacity="1">C</text><path fill="rgb(77,77,255)" stroke="none" paint-order="stroke fill markers" d=" M 149.0228348300891 405.53450891933744 C 149.0228348300891 408.2959326684914 146.78425857924307 410.53450891933744 144.0228348300891 410.53450891933744 C 141.26141108093512 410.53450891933744 139.0228348300891 408.2959326684914 139.0228348300891 405.53450891933744 C 139.0228348300891 402.7730851701835 141.26141108093512 400.53450891933744 144.0228348300891 400.53450891933744 C 146.78425857924307 400.53450891933744 149.0228348300891 402.7730851701835 149.0228348300891 405.53450891933744 Z" fill-opacity="1"/><path fill="none" stroke="rgb(0,0,0)" paint-order="fill stroke markers" d=" M 149.0228348300891 405.53450891933744 C 149.0228348300891 408.2959326684914 146.78425857924307 410.53450891933744 144.0228348300891 410.53450891933744 C 141.26141108093512 410.53450891933744 139.0228348300891 408.2959326684914 139.0228348300891 405.53450891933744 C 139.0228348300891 402.7730851701835 141.26141108093512 400.53450891933744 144.0228348300891 400.53450891933744 C 146.78425857924307 400.53450891933744 149.0228348300891 402.7730851701835 149.0228348300891 405.53450891933744 Z" stroke-opacity="1" stroke-linecap="round" stroke-linejoin="round" stroke-miterlimit="10"/><text fill="rgb(77,77,255)" stroke="none" font-family="geogebra-sans-serif, sans-serif" font-size="16px" font-style="normal" font-weight="normal" text-decoration="normal" x="128" y="428" text-anchor="start" dominant-baseline="alphabetic" fill-opacity="1">A</text><path fill="rgb(77,77,255)" stroke="none" paint-order="stroke fill markers" d=" M 432.9802468608457 405.53450891933744 C 432.9802468608457 408.2959326684914 430.74167060999963 410.53450891933744 427.9802468608457 410.53450891933744 C 425.21882311169173 410.53450891933744 422.9802468608457 408.2959326684914 422.9802468608457 405.53450891933744 C 422.9802468608457 402.7730851701835 425.21882311169173 400.53450891933744 427.9802468608457 400.53450891933744 C 430.74167060999963 400.53450891933744 432.9802468608457 402.7730851701835 432.9802468608457 405.53450891933744 Z" fill-opacity="1"/><path fill="none" stroke="rgb(0,0,0)" paint-order="fill stroke markers" d=" M 432.9802468608457 405.53450891933744 C 432.9802468608457 408.2959326684914 430.74167060999963 410.53450891933744 427.9802468608457 410.53450891933744 C 425.21882311169173 410.53450891933744 422.9802468608457 408.2959326684914 422.9802468608457 405.53450891933744 C 422.9802468608457 402.7730851701835 425.21882311169173 400.53450891933744 427.9802468608457 400.53450891933744 C 430.74167060999963 400.53450891933744 432.9802468608457 402.7730851701835 432.9802468608457 405.53450891933744 Z" stroke-opacity="1" stroke-linecap="round" stroke-linejoin="round" stroke-miterlimit="10"/><text fill="rgb(77,77,255)" stroke="none" font-family="geogebra-sans-serif, sans-serif" font-size="16px" font-style="normal" font-weight="normal" text-decoration="normal" x="432" y="427" text-anchor="start" dominant-baseline="alphabetic" fill-opacity="1">B</text><path fill="rgb(125,125,255)" stroke="none" paint-order="stroke fill markers" d=" M 291.0015408454674 263.5558029039587 C 291.0015408454674 266.31722665311264 288.76296459462134 268.5558029039587 286.0015408454674 268.5558029039587 C 283.24011709631344 268.5558029039587 281.0015408454674 266.31722665311264 281.0015408454674 263.5558029039587 C 281.0015408454674 260.79437915480474 283.24011709631344 258.5558029039587 286.0015408454674 258.5558029039587 C 288.76296459462134 258.5558029039587 291.0015408454674 260.79437915480474 291.0015408454674 263.5558029039587 Z" fill-opacity="1"/><path fill="none" stroke="rgb(0,0,0)" paint-order="fill stroke markers" d=" M 291.0015408454674 263.5558029039587 C 291.0015408454674 266.31722665311264 288.76296459462134 268.5558029039587 286.0015408454674 268.5558029039587 C 283.24011709631344 268.5558029039587 281.0015408454674 266.31722665311264 281.0015408454674 263.5558029039587 C 281.0015408454674 260.79437915480474 283.24011709631344 258.5558029039587 286.0015408454674 258.5558029039587 C 288.76296459462134 258.5558029039587 291.0015408454674 260.79437915480474 291.0015408454674 263.5558029039587 Z" stroke-opacity="1" stroke-linecap="round" stroke-linejoin="round" stroke-miterlimit="10"/><text fill="rgb(125,125,255)" stroke="none" font-family="geogebra-sans-serif, sans-serif" font-size="16px" font-style="normal" font-weight="normal" text-decoration="normal" x="270" y="250" text-anchor="start" dominant-baseline="alphabetic" fill-opacity="1">M</text></g></g></svg>