[size=50]Nach diesem Rezept läßt sich auch online kochen, das entstandene Gericht muss allerdings gespeichert werden, sonst ist die Mühe umsonst! [br]Nützlicher ist es, das Applet downzuloaden und offline zu kochen.[br]Die Küchengeräte und Kochutensilien (moebius-werkzeuge etc.) werden mitgeliefert. Das Rezept ist als pdf-Datei erhältlich![/size]
[size=85][right][size=50]Diese Seite ist Teil des [color=#980000][i][b]GeoGebra-Books[/b][/i][/color] [url=https://www.geogebra.org/m/kCxvMbHb]Moebiusebene[/url] ([color=#ff0000]August 2019[/color])[/size][/right][/size][br][list][*]Drei Scharen von [color=#666666][i][b]Kreisen/Geraden[/b][/i][/color], welche einen [color=#ff7700][i][b]Kegelschnitt[/b][/i][/color] ([size=85][color=#ff7700][i][b]Ellipse[/b][/i][/color] oder [color=#ff7700][i][b]Hyperbel[/b][/i][/color][/size]) [color=#666666][i][b][br]doppelt-berühren[/b][/i][/color], erzeugen ein [color=#ff0000][i][b]Sechs-Eck-Gewebe[/b][/i][/color]! [size=50]Zwei der Schahren müssen aus Tangenten bestehen![br]siehe die Seiten[/size] [math]\hookrightarrow[/math] [size=50][url=https://www.geogebra.org/m/kCxvMbHb#material/HwveTRcV]Ellipsen-6-Eck-Netz[/url] und [math]\hookrightarrow[/math] [url=https://www.geogebra.org/m/kCxvMbHb#material/dW4mMDqC]Hyperbel-6-Eck-Netz[/url][/size].[br][size=85][br][/size][/*][/list][size=85][table][tr][td] 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[/img] [/td][/tr][/table][/size]
[size=85]Diese Aussage ist [b]MOEBIUS[/b]-geometrisch formuliert und soll kurz erläutert werden:[br][color=#ff7700][i][b]Ellipse[/b][/i][/color] und [color=#ff7700][i][b]Hyperbel[/b][/i][/color] sind MOEBIUS-geometrisch [i][b]bizirkulare Quartiken[/b][/i] mit [color=#00ff00][i][b]2 einfachen[/b][/i][/color] [br]und dem [color=#00ff00][i][b]doppelt-zählenden Brennpunkt[/b][/i][/color] [math]\infty[/math].[br]Die [color=#666666][i][b]Tangenten[/b][/i][/color] an diese Kegelschnitte gehen durch [math]\infty[/math], dh. sie [color=#666666][i][b]berühren[/b][/i][/color] gewissermaßen [color=#666666][i][b]doppelt[/b][/i][/color]! [br]Daneben gibt es im Endlichen [color=#666666][i][b]doppelt berührende Kreise[/b][/i][/color], bei [color=#ff7700][i][b]Ellipsen[/b][/i][/color] besitzen viele von ihnen nur imaginäre [color=#ff7700][i][b]Berührpunkte[/b][/i][/color]![br]In dem offenen, vom [color=#ff7700][i][b]Kegelschnitt[/b][/i][/color] berandeten Gebiet, welches die [color=#00ff00][i][b]Brennpunkte[/b][/i][/color] [i]n i c h t[/i] enthält, gehen durch jeden [color=#ff0000][i][b]Punkt[/b][/i][/color] [br][b]vier[/b] im obigen Sinne [color=#666666][i][b]doppelt-berührende Kreise[/b][/i][/color]![br]Wählt man 3 von diesen 4 Kreisscharen aus, so erzeugen diese Kreise ein [color=#ff0000][i][b]6-Eck-Netz[/b][/i][/color]! ([size=50]2 davon müssen Tangentenscharen sein![/size])[br][br]Der [color=#ff7700][i][b]Kegelschnitt[/b][/i][/color] im Applet oben ist nicht mit den Kegelschnitt-Werkzeugen von [color=#980000][i][b]Ge[icon]/images/ggb/toolbar/mode_conic5.png[/icon]Gebra[/b][/i][/color] erzeugt [icon]/images/ggb/toolbar/mode_ellipse3.png[/icon][icon]/images/ggb/toolbar/mode_hyperbola3.png[/icon],[br]sondern als [color=#0000ff][i][b]Ortslinie[/b][/i][/color] [icon]/images/ggb/toolbar/mode_locus.png[/icon] unter Verwendung von Eigenschaften, die für viele [color=#ff7700][i][b]bizirkulare Quartiken[/b][/i][/color] allgemein gelten:[br]Spiegelt man einen der [color=#00ff00][i][b]Brennpunkte[/b][/i][/color] (oben ist es [color=#00ff00][b]F[/b][/color]) an den [color=#666666][i][b]doppelt-berührenden Kreisen[/b][/i][/color], so liegen die [color=#00ffff][i][b]Spiegelpunkte[/b][/i][/color] [br]auf den [color=#0000ff][i][b]Leitkreisen[/b][/i][/color]. [color=#ff7700][i][b]Ellipse[/b][/i][/color] und [color=#ff7700][i][b]Hyperbel[/b][/i][/color] besitzen einen "[color=#0000ff][i][b]Leitkreis[/b][/i][/color]", der durch [math]\infty[/math] geht: d. i. die [color=#0000ff][i][b]Leitgerade[/b][/i][/color] - [br]und einen [color=#0000ff][i][b]Leitkreis[/b][/i][/color].[br]Die [color=#0000ff][i][b]Leitkreise[/b][/i][/color] sind senkrecht zur [color=#BF9000][i][b]reellen Achse[/b][/i][/color]. Die [color=#999999][i][b]Tangenten[/b][/i][/color] in den Scheiteln auf der [math]x[/math]-Achse sind [color=#666666][i][b][br]doppelt-berührende[/b][/i][/color] Kreise, durch Spiegelung an diesen ergeben sich 2 Punkte des [color=#0000ff][i][b]Leitkreises[/b][/i][/color], oft auch [color=#0000ff][i][b]Direktrix[/b][/i][/color] genannt![br]Die zu diesem [color=#0000ff][i][b]Leitkreis[/b][/i][/color] gehörenden [color=#666666][i][b]doppelt-berührenden Kreise[/b][/i][/color] gehen durch [math]\infty[/math], es sind also die [color=#999999][i][b]Tangenten[/b][/i][/color]![br]Ein [color=#00ffff][i][b]Punkt [/b][/i][b]L[/b][/color] auf den [color=#0000ff][i][b]Leitkreis[/b][/i][/color] ist dann Spiegelpunkt von [color=#00ff00][b]F[/b][/color] an einem "[color=#666666][i][b]doppelt-berührenden Kreis[/b][/i][/color]", wenn es sich [br]bei diesem doppelt-berührenden Kreis um die [color=#666666][i][b]Mittelsenkrechte[/b][/i][/color] [icon]/images/ggb/toolbar/mode_linebisector.png[/icon] von [color=#00ff00][b]F[/b][/color] und [color=#00ffff][b]L[/b][/color] handelt! [br]Den zugehörigen [color=#ff7700][i][b]Kegelschnitt-Berührpunkt[/b][/i][/color] erhält man als Schnittpunkt [color=#ff7700][b]P[/b][/color] mit der [color=#ff0000][i][b]Brenngeraden[/b][/i][/color] [/size][size=85][size=85][color=#00ff00][b]F'[/b][/color][/size] [/size][size=85][size=85][color=#00ffff][b]L[/b][/color][/size]. [br]Die [color=#666666][i][b]Tangente[/b][/i][/color] ist Winkelhalbierende der beiden [color=#ff0000][i][b]Brenngeraden[/b][/i][/color] [/size][size=85][size=85][size=85][color=#00ff00][b]F'[/b][/color][/size][/size][size=85][size=85][color=#00ffff][b]L[/b][/color][/size][/size] und [color=#00ff00][b] F[/b][/color][/size][size=85][size=85][color=#ff7700][b]P[/b][/color][/size]. Dies ist die [color=#0000ff][b]Gärtner-Konstruktion[/b][/color]!![br][br]Der [color=#ff7700][i][b]Kegelschnitt[/b][/i][/color] oben ist konstruiert als [i][b]Ortslinie[/b][/i] des Punktes [color=#ff0000][b]P[/b][/color] mit dem auf dem [color=#0000ff][i][b]Leitkreis[/b][/i][/color] beweglichen Punkt [color=#00ffff][b]L[/b][/color].[br]Vorgegeben ist nur die [math]y[/math]-Achse als [color=#BF9000][i][b]Symmetrie-Achse[/b][/i][/color], der [color=#00ff00][i][b]Brennpunkt [/b][/i][b]F[/b][/color] und der [color=#ff7700][i][b]Scheitel [/b][/i][b]S[/b][/color].[br]Je nach der Lage von [color=#ff7700][b]S[/b][/color] zu den Brennpunkten [color=#00ff00][b]F[/b][/color] und [color=#00ff00][b]F' [/b][/color]erhält man eine [color=#ff7700][i][b]Ellipse[/b][/i][/color] oder eine [color=#ff7700][i][b]Hyperbel[/b][/i][/color]![br][size=50]Unsere [i][b]Ortslinien-Konstruktion[/b][/i] funktioniert unabhängig von der Lage des Scheitels!! [br]Mit den [color=#980000][i][b]Geo[/b][/i][/color][/size][color=#980000][i][b][icon]/images/ggb/toolbar/mode_conic5.png[/icon][/b][/i][/color][size=50][color=#980000][i][b]Gebra[/b][/i][/color]-Werkzeugen muss man je nach Lage von [color=#ff7700][b]S[/b][/color][/size] [icon]/images/ggb/toolbar/mode_ellipse3.png[/icon] [/size][size=50]oder [/size][size=85][icon]/images/ggb/toolbar/mode_hyperbola3.png[/icon][size=50] verwenden![/size][br][br][b]III.1[/b] : [u][i][color=#38761D]Wie konstruiert man den[/color] [color=#0000ff][b]Leitkreis[/b][/color] [color=#38761D]und die[/color][color=#0000ff][b] Leitgerade[/b][/color]?[/i][/u][br] Vorgegeben ist [color=#00ff00][b]F[/b][/color], der Scheitel [color=#ff7700][b]S[/b][/color] auf der [math]x[/math]-Achse und die [math]y[/math]-Achse als [color=#BF9000][i][b]Symmetrieachse[/b][/i][/color].[br] Spiegelung an der [math]y[/math]-Achse liefert den 2.ten Brennpunkt [color=#00ff00][b]F'[/b][/color] und den 2. Scheitel [color=#ff7700][b]S'[/b][/color].[br] Spiegelt man [color=#00ff00][b]F[/b][/color] an den beiden Scheitel-Tangenten, so erhält man die 2 [color=#3c78d8][i][b]Punkte[/b][/i][/color] des [color=#0000ff][i][b]Leitkreises[/b][/i][/color] auf der [math]x[/math]-Achse,[br] und damit den [color=#0000ff][i][b]Leitkreis[/b][/i][/color]. [br] Spiegelt man [color=#00ff00][b]F[/b][/color] an dem [color=#666666][i][b]Scheitelkreis[/b][/i][/color] durch [color=#ff7700][b]S[/b][/color] und [color=#ff7700][b]S'[/b][/color], so erhält man den [color=#3c78d8][i][b]Schnittpunkt[/b][/i][/color] der orthogonalen [br] [color=#0000ff][i][b]Leitgeraden[/b][/i][/color] mit der [math]x[/math]-Achse - damit die [color=#0000ff][i][b]Leitgerade[/b][/i][/color].[br][br][b]III.2[/b] : [u][i][color=#38761D]Wie konstruiert man die[/color] 4 d[color=#666666][b]oppelt-berührenden Kreise[/b][/color] [color=#38761D]durch einen vorgegebenen Punkt[/color] [/i][color=#ff0000][b]P[/b][/color][i]?[/i][/u][br] Ist der [color=#ff7700][i][b]Kegelschnitt[/b][/i][/color] aktiv, so kann man von einem Punkt [color=#ff0000][b]P[/b][/color] die Tangenten anlegen [icon]/images/ggb/toolbar/mode_tangent.png[/icon].[br] Ist die [i][b]Ortskurve[/b][/i] aktiv, so sind für die Tangenten die [color=#00ff00][i][b]Brennpunkt-Paare[/b][/i][/color] { [color=#00ff00][b]F[/b][/color], [math]\infty[/math] } und { [color=#00ff00][b]F'[/b][/color], [math]\infty[/math] } und der [color=#0000ff][i][b]Leitkreis[/b][/i][/color] [br] [/size][size=85][size=85]zuständig. Den Spiegelpunkt von P muß man sich in [math]\infty[/math] vorstellen, ein [color=#0000ff][i][b]Mittellotkreis[/b][/i][/color] von [color=#00ff00][b]F[/b][/color] auf [color=#ff0000][b]P[/b][/color]_[math]\infty[/math], dh. ein Kreis durch [color=#00ff00][b]F[/b][/color],[br] der diese beiden Punkte bei der Spiegelung vertauscht, ist der Kreis [math]k[/math] um [color=#ff0000][b]P[/b][/color] durch [color=#00ff00][b]F[/b][/color] [icon]/images/ggb/toolbar/mode_circle2.png[/icon]. [br] [math]k[/math] schneidet den [color=#0000ff][i][b]Leitkeis [/b][/i][/color]in 2 Punkten [color=#00ffff][b]L[sub]1[/sub][/b][/color] und [color=#00ffff][b]L[sub]2[/sub][/b][/color], die [color=#0000ff][i][b]Mittellote[/b][/i][/color] zu [/size][/size][size=85][size=85][size=85][size=85][color=#00ff00][b]F[/b][/color][/size][/size] [/size][/size][size=85][size=85][size=85][size=85][color=#00ffff][b]L[sub]1[/sub][/b][/color][/size][/size] und zu [/size][/size][size=85][size=85][size=85][size=85][color=#00ff00][b]F[/b][/color][/size][/size] [/size][/size][size=85][size=85][size=85][size=85][color=#00ffff][b]L[sub]2[/sub][/b][/color][/size][/size] [icon]/images/ggb/toolbar/mode_linebisector.png[/icon] sind Tangenten durch [color=#ff0000][b]P[/b][/color]!![br] Die [color=#ff7700][i][b]Berührpunkte[/b][/i][/color] erhält man als Schnitt mit den [color=#ff0000][i][b]Brenngeraden[/b][/i][/color] [/size][/size][size=85][size=85][size=85][size=85][size=85][size=85][color=#00ff00][b]F[/b][/color][/size][/size][/size][/size][size=85][size=85][size=85][size=85][color=#00ffff][b]L[sub]1[/sub][/b][/color][/size][/size][/size][/size][/size] bzw.[/size][size=85][size=85][size=85][size=85][size=85][size=85][size=85][color=#00ff00][b] F[/b][/color][/size][/size][/size][/size][size=85][size=85][size=85][size=85][color=#00ffff][b]L[sub]2[/sub][/b][/color][/size][/size][/size][/size][/size][/size].[br] Die [color=#666666][i][b]doppelt-berührenden Kreise[/b][/i][/color] durch einen Punkt [color=#ff0000][b]P[/b][/color] sind [color=#BF9000][i][b]symmetrisch[/b][/i][/color] zur [math]y[/math]-Achse [br] und benötigen den Spiegelpunkt [color=#ff0000][b]P'[/b][/color] und die [color=#0000ff][i][b]Leitgerade[/b][/i][/color]. [table][tr][td] Von [color=#00ff00][b]F[/b][/color] wird der [color=#0000ff][i][b]Mittellot-Kreis[/b][/i][/color] auf [color=#ff0000][b]PP'[/b][/color] gefällt [/td][td][img]data:image/png;base64,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[/img][/td][td][size=85], dieser schneidet die [color=#0000ff][i][b]Leitgerade[/b][/i][/color] in [/size][size=85][size=85][size=85][size=85][size=85][color=#00ffff][b]L[sub]1[/sub][/b][/color][/size][/size][/size][/size] und [/size][size=85][size=85][size=85][size=85][size=85][color=#00ffff][b]L[sub]2[/sub][/b][/color][/size][/size][/size][/size]. [/size][/td][/tr][/table][/size][size=85] Die [color=#0000ff][i][b]Mittellot-Kreise[/b][/i][/color] zu [/size][size=85][size=85][size=85][size=85][size=85][color=#00ff00][b]F[/b][/color][/size][/size] [/size][/size][size=85][size=85][size=85][size=85][color=#00ffff][b]L[sub]1[/sub][/b][/color][/size][/size][/size][/size] bzw. zu [/size][size=85][size=85][size=85][size=85][size=85][color=#00ff00][b]F[/b][/color][/size][/size] [/size][/size][size=85][size=85][size=85][size=85][color=#00ffff][b]L[sub]2[/sub][/b][/color][/size][/size][/size][/size], von [color=#ff0000][b]P[/b][/color] aus gefällt, sind die gesuchten [color=#666666][i][b]doppelt-berührende Kreise[/b][/i][/color] durch [color=#ff0000][b]P[/b][/color]. [br] Die Berührpunkte ergeben sich als Schnitt der Parallelen zur x-Achse durch die Punkte [/size][size=85][size=85][size=85][size=85][size=85][size=85][color=#00ffff][b]L[sub]1[/sub][/b][/color][/size][/size][/size][/size][/size] oder [/size][size=85][size=85][size=85][size=85][size=85][size=85][color=#00ffff][b]L[sub]2[/sub][/b][/color][/size][/size][/size][/size][/size] mit den DB-Kreisen. [br] Das [color=#ff0000][i][b]Sechs-Eck[/b][/i][/color] erhält man, wenn man 3 der [color=#666666][i][b]DB-Kreise[/b][/i][/color] auswählt, auf einem der [/size][size=85][size=85][color=#666666][i][b]DB-Kreise[/b][/i][/color][/size] einen weiteren Punkt [/size][size=85][size=85][color=#ff0000][b]P'[/b][/color][/size] als [br] Ausgangspunkte für weitere DB-Kreise wählt und so fort ... . [br] Man muss nur darauf achten, dass man in den 3 ausgewählten [color=#666666][i][b]Kreisscharen[/b][/i][/color] bleibt![/size]