Berechne die Koordinaten des Punktes C aus Aufgabe A1. ([math]x,y\in\mathbb{R}[/math])[br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAMYAAAAnCAYAAABUgzd6AAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAAZkSURBVHhe7Zw7Ly5PGMDH/wuIOLXCpaago3SptHwDoZWQiFKBqEWjplBoiEuioVJRyysiSpf4BO/Z3/z3OWfOmL0vXjy/ZLK78871ucxtl7ZmhFEU5R/+i6+KojioYyhKAHWMH8Du7q7p7e2Nn5Q8qGN8Y56enszc3Jy5v783jUYjjlXyoJvvH0JbW5tRVedHZwxFCaCOoSgB1DEUJYA6xg/g4uLCXq+vr+1VyUYd45szMTFhRkZG7P3AwIB9VrLRUylFCaAzRguzvr5uj1kJLIfcZ2D0l2c/ZDE9PW3TUcbt7a19AZgn34+BGUNpTR4fH5uDg4PNpaWlOKZpn3d2duKnakxNTTW3traaV1dXzZ6eHntV/kcdo8XBCTBawFHkPg+Me0kBpLzx8XF7r/xFl1ItDkue5+dnu5Ta3t42Kysr8S/ZS6lIv4lBGBsbM5eXl+bh4SGOUSyRkJQWh6UUyx6WUUVoNBo2X0dHh50l/JmBcnlmOUWa8/Pz+BdFHeMLgIFj2EX3Fhg6zoTxUwbLJpwAcBjKJA2Bex0n/6LHtV8AvpLt6+szNzc3prOzM44tztDQkJmfn7fLMyUddYwvAMe0sLCwYK9FwbHYn9zd3ZnNzc04VklDN98tjLy3eH19Le0UbNp//fplVldX7TNOouSAGUP5/rDHYL+xtrYWx7Q2sq+SPVEVypRV24zBn0/W/R0OZcoHcIIcRbYyvEmW5c/h4aFd0/v9+Aiok7qZJdrb2yvtT6pS1D44QobR0VF7Fcro3y8L3fCXjegpkdhB/sDbTznecwMnGu4bWJfZ2VkbQlAev1Fmmse6JyNu8I8QifsIaLec6GTht5ngjswyWtf1xjovtB3ZS5u4z9OfvBwcHNh+SfncE+eTZh9JYGuhPNRTlFBZ2BU2nfS2P1gLSnUbgDAlzjdu4jkfD4Eh4BBcMY40xDGyKCOYokhf89ZFOt+BfZAhsvgun11gB/Rb7EGc37eFNPtIg7JCsiqj/6SyxDlCg0WwFt8xgMyuICBN2eIUeQ2hVRyD0YVRL297gHRZjgGUXcZI6gB91DVjyZodO3FBbm7/qgwGvGcJUUb/SWUBTuP3A4K1+I6BIJiKKMT1LgSNx4VAIKEKk2gVxxDewzEwENJmzZ5Z5K3PB/3V4RyUQRuyDD5kH+TBNsgvv8nsk2RLLqQTJB9BBmw3Lo9Dkj5Ub1Dz4hhuILOvUJwlNAIycpCHclAG9whDGh9CBOamD3py9NtHUMQxkI20m4BcQtMz8HtoHV4EyijjGOgPuVZ1Dn/gTCLJPkTXYg/0xR90k/DrDX0qQ51ptuYievbrTnUMQWYMOuM6Bw0IGa/kp3FSIffE5fFikPS+Et12haBNpEkLIWX5FHEMF/IhJ+QVgjJDMiuC25eyoQp5HSPJPgA7oAx+J10epwC/XtGT2CXXPDOPIPm5uuQ6ru3u7rZvTF9eXsze3l4cm83MzMyfI0Lu4fj42F6zIH00Epj9/f04Jh9HR0dILjWQ5r0YHh42kVPY48n3JFJksG9pITIaEzmtiQabuJRqpB53ZtDf328ipzCLi4tmeXm59FEy8sZONjY27DNX9wvkslR+j8FbWZ+uri57DQmO8/S84IhfkVZtd7TssANc1W+lohHeXk9PT+1V4J2N/64iZB/AP2Y4Ozsz0crATE5OVvpHDXz/xUBEGScnJ/V8CxaNJG/wp0pZShHnTjlJa0imRVlOyBRJme5SzJ/CZNr1l17+FJfQ5NqRfZK0V/DbTZtZ57r9op/EhyBv1T1GGViSVt1buKAv+ilyoP+s9V17SLIPllHungL5sfzJs5wK6V/sjVC0j6JPv+43tcjGiMRuoCO+QmlE0nqOchCK5Kfz7v5CGiRxGBJ1pNUH/Pae0Ce33ciCZ2mn327a6KZHHklOIXl9Z/uKYEgYvmsr6NjVWcg+kBtpyScyJI3EZUG6EByFJ9liGugqlK+SlYmnyqhRBASI8RclSTAfRdl2w2e+x/gMqthHEkn6x0nLzIjoMjSQVbYyCi2jbEYXf/rKw2c7Rtl2M0u4o+RPoax9JOHqn7JxBpm1i0I+ZouQPmuxMryV8BF8tmOUAcEzMpUZ0b4DddqH7xg84xRFBysGKJwiaaCqzcpkba78C8sIZpk6lxNfkVayDw52cNS0vZ7+BZ+iBNC/4FOUNxjzGzZXmQstivihAAAAAElFTkSuQmCC[/img][br][size=85][i](Rechne schriftlich im Heft [icon]/images/ggb/toolbar/mode_pen.png[/icon]. Runde auf 2 Stellen nach dem Komma. Gib unten dein Ergebnis in der Form P(1,23|4,56) ein.)[/i][/size]

Berechne die Koordinaten des Bildpunktes A'. [math]\left(x,y\in\mathbb{R}\right)[/math][br][br][img]data:image/png;base64,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[/img][br][i][size=85][i](Rechne schriftlich im Heft [icon]https://www.geogebra.org/images/ggb/toolbar/mode_pen.png[/icon]. Runde auf 2 Stellen nach dem Komma. Gib unten dein Ergebnis in der Form P(1,23|4,56) ein.)[/i][/size][/i]

Der Punkt P(10|4) wird durch Achsenspiegelung an der Ursprungsgeraden s: y = –0.95x auf den Punkt P' abgebildet. Wähle die korrekten Koordinaten des Punktes P'. ([math]x,y\in\mathbb{R}[/math])