[right][color=#ff0000][i][b][size=50][size=85][b][i][size=50]Diese Aktivität ist eine Seite des[i][b] [color=#980000]geogebra-books[/color][/b][/i] [url=https://www.geogebra.org/m/gz4cyje5][color=#0000ff][u][i][b]conics bicircular-quartics Darboux-cyclides[/b][/i][/u][/color][/url] [color=#ff7700][i][b](April 2021)[br][size=85][i][b][size=50][color=#ff7700][/color][/size][/b][/i][b][size=50][color=#000000]Diese Aktivität ist auch eine Seite[/color][/size][/b][i][b][size=50][color=#000000] des[/color] [color=#980000][url=https://www.geogebra.org/m/kCxvMbHb]geogebra-books Moebiusebene[/url][/color][/size][/b][/i][/size][/b][/i][/color][/size][/i][/b][/size][/size][/b][/i][/color][/right][size=85]Eine [color=#134F5C][i][b]Darboux Cyclide[/b][/i][/color] ist eine implizit definierte Fläche mit einer Gleichung des Typs:[br][/size][list][*][size=85][math]\alpha\cdot\left(x^2+y^2+z^2\right)^2+L\left(x,y,z\right)\cdot\left(x^2+y^2+z^2\right)+Q\left(x,y,z\right)=0[/math] mit linearem [math]L\left(x,y,z\right)[/math] [br]und quadratischem [math]Q\left(x,y,z\right)[/math], jeweils mit reellen Koeffizienten [/size][br][/*][/list][size=85]Die reell 12-dimensionale Klasse dieser Fläche ist invariant unter räumlichen [color=#0000ff][i][b]Möbiustransformationen[/b][/i][/color].[br]Jede solche Fläche besitzt mindestens eine [color=#f1c232][i][b]Symmetrie-Kugel[/b][/i][/color], dh. eine [color=#ff0000][i][b]Kugel[/b][/i][/color], an welcher gespiegelt die Fläche invariant ist. [b][sup]1[/sup])[/b]s.u.[br]Wählt man eine solche [color=#e69138][i][b]Symmetrie-Kugel[/b][/i][/color] als (komplexe) Koordinaten-Ebene, so ist die Schnittkurve eine [color=#ff7700][i][b]bizirkulare Quartik[/b][/i][/color].[br][color=#ff7700][i][b]Bizirkulare Quartiken[/b][/i][/color] lassen sich charakterisieren über die Anzahl der paarweise orthogonalen [color=#e69138][i][b]Symmetrie-Kreise[/b][/i][/color]. [b][sup]2[/sup])[/b][br]Im obigen Applet ist die [color=#ff7700][i][b]bizirkulare Schnittkurve[/b][/i][/color] [i][b]2-teilig[/b][/i], mit einer geeigneten [color=#0000ff][i][b]Möbiustransformation[/b][/i][/color] erreicht man, [br]dass die [/size][size=85][color=#134F5C][i][b]Cyclide[/b][/i][/color][/size][size=85] symmetrisch zu den [color=#f1c232][i][b]Koordinatenebenen[/b][/i][/color], zur [color=#f1c232][i][b]Einheitskugel[/b][/i][/color] und zu einer weiteren orthogonalen [br]imaginären [color=#BF9000][i][b]Kugel[/b][/i][/color] liegt [b][sup]4[/sup])[/b]. Die Gleichung der [/size][size=85][i][b][size=85][color=#134F5C][i][b]Cyclide[/b][/i][/color][/size][/b][/i] reduziert sich auf[br][/size][list][*][size=85][math]\mathbf{darboux}(x,y,z):=\left(x^2+y^2+z^2\right)^2-2\cdot A_x\cdot x^2-2\cdot B_y\cdot y^2-2\cdot C_z\cdot z^2+1=0[/math][br][/size][/*][/list][size=85]Wir betrachten die [/size][size=85][b][size=85][color=#f1c232][i][b]Koordinatenebenen[/b][/i][/color][/size][/b] als komplexe [i][b]Gauss[/b][/i]sche Zahlenebenen, damit vereinfachen sich viele Rechnungen. [br][color=#ff0000][i][b]Punkte[/b][/i][/color], welche für die [/size][size=85][size=85][i][b][size=85][color=#134F5C][i][b]Cyclide[/b][/i][/color][/size][/b][/i][/size] eine Rolle spielen, treten wegen der [color=#BF9000][i][b]Symmetrieen[/b][/i][/color] in den Ebenen stets als Quadrupel auf:[br][math]p,-p,\frac{1}{p},-\frac{1}{p}\in\mathbb{C}[/math], von den wenigen Ausnahmen [math]0,\infty,1,-1,i,-i[/math] abgesehen. [br]Leider kennen wir für diese [color=#134F5C][i][b]Darboux Cycliden[/b][/i][/color] keine Parameterdarstellung [b][sup]5[/sup])[/b].[color=#980000][i][b][br][br]Schnittpunkte mit den Koordinatenachsen:[/b][/i][/color][br][list][*][math]s_x,-s_x,1/s_x,-1/s_x:=\pm\sqrt{A_x\pm\sqrt{A_x\,^2-1}}[/math],[math]s_y,-s_y,\frac{1}{s_y},-\frac{1}{s_y}:=\pm i\cdot\sqrt{B_y\pm\sqrt{B_y\,^2-1}}[/math], [br]mit [math]s_z:=\sqrt{C_z+\sqrt{C_z\,^2-1}}[/math] ergeben sich die [color=#ff7700][i][b]Schnittpunkte[/b][/i][/color] mit der [math]z[/math]-Achse [math](0,0,\pm s_z),\left(0,0,\frac{\pm1}{s_z}\right)[/math].[br][/*][/list][color=#980000][i][b]Schnittpunkte mit den Einheitskreisen in den Koordinatenebenen:[/b][/i][/color][br][list][*][math]s_E:=\pm\sqrt{\frac{B_y-1}{B_y-A_x}}\pm i\cdot\sqrt{\frac{1-A_x}{B_y-A_x}}[/math] liefert die Schnittpunkte mit dem [color=#f1c232][i][b]Einheitskreis[/b][/i][/color] der [math]xy[/math]-Ebene; [br]entsprechend berechnet man die Schnittpunkte mit den [color=#f1c232][i][b]Einheitskreisen[/b][/i][/color] der anderen Koordinatenebenen, [br]sofern sie existieren.[/*][/list][/size]

[size=85][i][b][color=#980000]Brennpunkte:[/color][br][/b][/i]Einzelne [i][b][color=#134F5C]Darboux Cycliden[/color] [/b][/i]gehören stets zu einer Schar [color=#38761D][i][b]konfokaler[/b][/i][/color] [color=#134F5C][i][b]Darboux Cycliden[/b][/i][/color]: gemeinsam sind die [b]3*4[/b] [i][b][color=#00ff00]Brennpunkte[/color][/b][/i],[br]zusammenfallende [color=#00ff00][i][b]Brennpunkte[/b][/i][/color] mitgezählt.[br][/size][list][*][size=85]Mit [math]Q_{xy}:=\frac{1-A_x\cdot B_y}{A_x-B_y}=:-Q_{yx}[/math] berechnet man das [color=#00ff00][i][b]Brennpunkt[/b][/i][/color]-Quadrupel [math]f_{xy}:=\pm\sqrt{Q_{xy}\pm\sqrt{Q_{xy}\,^2-1}}[/math] [br]in der [math]xy[/math]-Ebene. Diese Rechnung liefert komplex die [color=#00ff00][i][b]Brennpunkte[/b][/i][/color] auch dann, wenn sie auf dem [color=#f1c232][i][b]Einheitskreis[/b][/i][/color] liegen!![/size][/*][*][size=85]Sind die [color=#00ff00][i][b]Brennpunkte[/b][/i][/color] bekannt, so kann man [math]Q_{xy}[/math] berechnen: [math]Q_{xy}:=\frac{1}{2}\cdot\left(f_{xy}\;^2+\frac{1}{f_{xy}\;^2}\right)[/math].[br][/size][/*][/list][size=85]Zu den fantastischen Möglichkeiten, in [color=#980000][i][b]geogebra[/b][/i][/color] [color=#0000ff][i][b]komplex[/b][/i][/color] zu rechnen, siehe die [color=#980000][i][b]Hinweise[/b][/i][/color] und Bemerkungen unten! [b][sup]3[/sup])[/b][br]Für die [math]xz[/math]- und die [math]yz[/math]-Ebene wurden oben die zugehörigen [color=#ff7700][i][b]bizirkularen Schnittquartiken[/b][/i][/color] in der [math]xy[/math]-Ebene [math]\mathbb{C}[/math] dargestellt.[br]Deren [color=#00ff00][i][b]Brennpunkte[/b][/i][/color] berechnen sich mit Hilfe der entsprechenden Formeln für [math]Q_{xz}[/math] und [math]Q_{yz}[/math].[br]Die [color=#00ff00][i][b]Brennpunkte[/b][/i][/color] müssen in die zugehörigen Koordinatenebenen gedreht werden.[br]Leider unterstützt [color=#980000][i][b]geogebra[/b][/i][/color] keine [i]impliziten Kurven[/i] in der [math]xz[/math]- bzw. der [math]yz[/math]-Ebene. [i][br]Implizite Kurven[/i] in der [math]xy[/math]-Ebene lassen sich in den Raum [i][b]verschieben[/b][/i], aber nicht [i][b]drehen[/b][/i]. [br]Die [color=#ff7700][i][b]Höhenlinien[/b][/i][/color] sind verschobene [i]implizite Kurven[/i], die [color=#ff7700][i][b]bizirkularen Quartiken[/b][/i][/color][br]in den anderen Ebenen sind als [i][b]Ortskurven[/b][/i] erzeugt - und daher manchmal etwas instabil![br]Man variiere im Applet oben die Koeffizienten [math]A_x,B_y,C_z[/math] ([b]fs-Fix[/b] entsperren!) und beobachte die [color=#00ff00][i][b]Brennpunkte.[/b][/i][/color][br]Die Koeffizienten [math]A_x,B_{y},C_z[/math] bestimmen die Lage der [color=#00ff00][i][b]Brennpunkte[/b][/i][/color]. [br]Diese sind entscheidend für die [i][b]Form[/b][/i] und die [i][b]Eigenschaften[/b][/i] der [/size][size=85][size=85][i][b][color=#134F5C]Darboux Cyclide[/color][/b][/i][/size]![br][br][color=#980000][i][b]Geometrische Bedeutung der Brennpunkte:[/b][/i][/color][br]Eine [color=#ff7700][i][b]bizirkulare Quartik[/b][/i][/color] besitzt 4 [color=#00ff00][i][b]Brennpunkte[/b][/i][/color]. Wenn sie verschieden sind, kann man sie auf [b]3[/b] Arten in 2 [color=#00ff00][i][b]Brennpunkt[/b][/i][/color]-Paare [br]zerlegen. Jede solche Zerlegung bestimmt 2 [color=#ff0000][i][b]elliptische Kreisbüschel[/b][/i][/color]: ein [color=#ff0000][i][b]elliptisches Kreisbüschel[/b][/i][/color] besteht[br]aus den [color=#ff0000][i][b]Kreisen[/b][/i][/color] durch die beiden Grundpunkte - hier sind das 2 der [color=#00ff00][i][b]Brennpunkte[/b][/i][/color]. Durch jeden Punkt der [color=#ff7700][i][b]Quartik[/b][/i][/color] geht[br]aus jedem der 2 [color=#ff0000][i][b]Kreisbüschel[/b][/i][/color] genau ein [color=#ff0000][i][b]Kreis[/b][/i][/color]; die [color=#ff7700][i][b]Quartik[/b][/i][/color] ist [color=#0000ff][i][b]Winkelhalbierende[/b][/i][/color] dieser [color=#ff0000][i][b]Kreise[/b][/i][/color]![/size]

[size=85][color=#980000][i][b]Konfokale Cycliden, Fokal-Kurven:[br][/b][/i][/color][br]Durch jeden Punkt des [color=#0000ff][i][b]Möbiusraumes[/b][/i][/color], von den [color=#00ff00][i][b]Brennpunkten[/b][/i][/color] abgesehen, gehen genau 3 [color=#0000ff][i][b]orthogonale[/b][/i][/color] [color=#38761D][i][b]konfokale[/b][/i][/color] [color=#134F5C][i][b]Darboux Cycliden[/b][/i][/color]. [br]Die Koordinatenebenen und die Einheitskugel zählen dabei mit.[br]Auf den Achsen gibt es also zu fast jedem Punkt eine "echte" [color=#134F5C][i][b]Darboux Cyclide[/b][/i][/color] durch diesen Punkt; die [color=#00ff00][i][b]Brennpunkte[/b][/i][/color] [br]dieser [color=#38761D][i][b]konfokalen[/b][/i][/color] [color=#134F5C][i][b]Cyclide[/b][/i][/color] sind per definitionem dieselben. [br]Wie berechnet man die zugehörigen Koeffizienten [math]AC_x,BC_y,CC_z[/math]?[br]Mit dem [i][b]Schieberegler[/b][/i] [math]sC[/math] wird oben zunächst ein [math]x[/math]-Achsenschnittpunkt [math]sC_x[/math] ([color=#ff7700][i][b]Scheitelpunkt[/b][/i][/color]) auf der [math]x[/math]-Achse variiert.[br]Hiermit erhält man die Koeffizienten:[br][list][*] [math]AC_x:=\frac{1}{2}\cdot\left(sC^2+\frac{1}{sC^2}\right)[/math]. Mit der oben berechneten reellen Zahl [math]Q_{xy}[/math] ergibt sich:[/*][br][*][math]BC_y:=\frac{1-AC_x\cdot Q_{xy}}{AC_x-Q_{xy}}[/math] und, da der [size=85][color=#ff7700][i][b]Scheitelpunkt[/b][/i][/color][/size] [math]sC_x[/math] auch für die [math]xz[/math]-Ebene [size=85][color=#ff7700][i][b]Scheitelpunkt[/b][/i][/color][/size] ist: [/*][br][*][math]CC_z:=\frac{1-AC_x\cdot Q_{xz}}{AC_x-Q_{xz}}[/math][br][/*][/list]Beachtenswert ist die auf den vielen [color=#f1c232][i][b]Symmetrieen[/b][/i][/color] beruhenden Einfachheit und Symmetrie der Formeln.[br][br]Im obigen Applet ist die [b]Start-Lage[/b] der [/size][size=85][size=85][color=#134F5C][i][b]Cyclide[/b][/i][/color][/size] so gewählt, dass durch die [/size][size=85][size=85][color=#ff7700][i][b]Scheitel[/b][/i][/color][/size] auf der [math]x[/math]-Achse [br]alle [/size][size=85][size=85][size=85][color=#134F5C][i][b]Cycliden[/b][/i][/color][/size][/size] der [color=#38761D][i][b]konfokalen[/b][/i][/color] Schar erreicht werden.[br][br]Bei anderen Ausgangslagen kann es eintreten, dass manche [/size][size=85][size=85][size=85][size=85][color=#134F5C][i][b]Cycliden[/b][/i][/color][/size][/size][/size] der Schar die [math]x[/math]-Achse [i][b]nicht[/b][/i] schneiden.[br]Dann muss man [/size][size=85][size=85][color=#ff7700][i][b]Scheitelpunkte[/b][/i][/color][/size] auf einer der anderen Achsen zu Hilfe nehmen: [br]Mit Hife des Schiebereglers [math]x\longleftrightarrow y[/math] kann man den [/size][size=85][size=85][size=85][color=#ff7700][i][b]Scheitelpunkt [/b][/i][/color][/size][/size]auf der [math]y[/math]-Achse wählen. [br][br]Besondere [color=#ff7700][i][b]Quartiken[/b][/i][/color] sind diejenigen, deren [color=#ff7700][i][b]Scheitelpunkt[/b][/i][/color] mit einem der [i][b]anderen[/b][/i] [color=#00ff00][i][b]Brennpunkte[/b][/i][/color] übereinstimmt.[br]In der [math]xy[/math]-Ebene könnte das die [color=#ff7700][i][b]Quartik[/b][/i][/color] mit den [color=#00ff00][i][b]Brennpunkten[/b][/i][/color] [math]f_{xy}[/math] und dem [color=#ff7700][i][b]Scheitelpunkt[/b][/i][/color] [math]f_{xz}[/math] sein.[br]Diese Kurven sind die [color=#38761D][i][b]Fokal-Kurven[/b][/i][/color] der Schar. Nähern die [color=#ff7700][i][b]Scheitelpunkte[/b][/i][/color] sich einer solchen Lage, so entarten [br]die [/size][size=85][size=85][size=85][size=85][size=85][color=#134F5C][i][b]Cycliden[/b][/i][/color][/size][/size][/size][/size] in flache Flächenstücke, deren Ränder die [/size][size=85][size=85][color=#38761D][i][b]Fokal-Kurven[/b][/i][/color][/size] sind. [br]Die Koeffizienten dieser entarteten [/size][size=85][size=85][size=85][size=85][size=85][size=85][color=#134F5C][i][b]Cycliden[/b][/i][/color][/size][/size][/size][/size][/size] werden mit den obigen Formeln berechnet, beispielsweise mit [math]sC_x=f_{xz}[/math]. [/size]

[size=85][color=#980000][i][b]Sonderfälle:[/b][/i][/color][br]Wir haben die Gleichung im Applet [i][b]nicht[/b][/i] in der etwas allgemeineren Form[br][/size][list][*][size=85][math]\lambda\cdot\left(x^2+y^2+z^2\right)^2-2\cdot A_x\cdot x^2-2\cdot B_y\cdot y^2-2\cdot C_z\cdot z^2+\delta=0[/math][/size] [size=85]mit [/size][math]\lambda,\delta\in\left\{-1,0,1\right\}[/math][br][/*][/list][size=85]verwendet, um die nötigen Fallunterscheidungen zu begrenzen.[br][br][list][*][math]\lambda=0[/math]: [color=#ff7700][i][b]Quadriken[/b][/i][/color] mit 3 [color=#f1c232][i][b]Symmetrie-Ebenen[/b][/i][/color][/*][br][*][math]\delta=0[/math]: [color=#ff7700][i][b]Quadriken[/b][/i][/color] invertiert[/*][br][*][math]\lambda=1,\delta=-1[/math]: [math]\hookrightarrow[/math] [u][b][/b][url=https://www.geogebra.org/m/gz4cyje5#material/s9egxqws][b]1[/b]-teilige [color=#134F5C][i][b]Darboux-Cycliden[/b][/i][/color][/url][color=#134F5C][i][b][/b][/i][/color][/u][/*][br][*][b]2 [/b]der Koeffizienten[i][b] [math]A_x,B_y,C_z[/math] [/b][/i]sind gleich: [color=#741B47][i][b]Rotations-Symmetrie[/b][/i][/color][/*][br][*]Einer der Koeffizienten ist gleich [b]1[/b] bzw. gleich [b]-1[/b]: die [color=#ff7700][i][b]Quartiken[/b][/i][/color] in den zugehörigen Ebenen zerfallen [br]in [color=#ff0000][i][b]elliptische Kreispaare[/b][/i][/color] (2 sich schneidende [color=#ff0000][i][b]Kreise[/b][/i][/color]) bzw. in [color=#ff0000][i][b]hyperbolische Kreispaare[/b][/i][/color] (ohne Schnittpunkte)[/*][br][*][math]\left(x^2+y^2+z^2\right)^2+2\left(R^2-r^2\right)\cdot\left(x^2+y^2+z^2\right)+4\cdot R^2\cdot\left(x^2+y^2\right)+\left(R^2-r^2\right)=0[/math] [br]sind die verschiedenen [i][b]Tori[/b][/i]-Typen, [math]R^2-r^2=1[/math] erreicht man durch geeignete Streckung. [br]Der [i][b]Torus[/b][/i] liegt dann [color=#f1c232][i][b]symmetrisch[/b][/i][/color] zur [color=#f1c232][i][b]Einheitskugel[/b][/i][/color].[/*][br][*][i][b]Möbius-transformierte[/b][/i] der [color=#45818e][i][b]Dupinschen Cycliden[/b][/i][/color]: Zitat ([url=https://de.wikipedia.org/wiki/Dupinsche_Zyklide]wikipedia[/url]) [br]"Jede Dupinsche Zyklide ist das Bild eines senkrechten Kreiszylinders oder eines senkrechten Kreiskegels[br]oder eines Rotationstorus unter einer Inversion (Spiegelung an einer Kugel)."[br][/*][/list][/size]

[size=85][color=#980000][i][b]Hinweise und Links:[br][/b][/i][/color][br][b][sup]1[/sup])[/b]: Die Punkte des [color=#0000ff][i][b]Möbiusraum[/b][/i][/color]s kann man projektiv beschreiben in einem reellen 4-dimensionalen Raum mit nicht-ausgearteter [br][color=#0000ff][i][b]Möbius-Quadrik [/b][/i][/color]der Signatur (+,+,+,+,-). Die Punkte des [color=#0000ff][i][b]Möbiusraum[/b][/i][/color]s sind dann die Punkte auf der [/size][size=85][size=85][color=#0000ff][i][b]Möbius-Quadrik[/b][/i][/color][/size]. [br]Eine [color=#134F5C][i][b]Darboux Cyclide[/b][/i][/color] ist der Schnitt dieser [color=#0000ff][i][b]Quadrik[/b][/i][/color] mit einer 2-ten [color=#ff7700][i][b]Quadrik[/b][/i][/color]. [br]Neben der [color=#0000ff][i][b]Möbius-Form[/b][/i][/color] besitzt der zugehörige 5-dimensionale reelle Vektorraum [br]eine 2-te [i][b]symmetrische selbstadjungierte Bilinearform[/b][/i]. Dazu sollte es mindestens einen Eigenvektor geben. [br][br][/size][size=85][size=85][b][sup]2[/sup])[/b]: [/size]Die Eigenräume sind paarweise orthogonal bezüglich der [color=#0000ff][i][b]Möbiusform[/b][/i][/color], bestenfalls ergeben sich [br]5 paarweise orthogonale [color=#f1c232][i][b]Symmetrie-Kugeln[/b][/i][/color], welche als die 3 [color=#BF9000][i][b]Koordinatenebenen[/b][/i][/color], die [color=#BF9000][i][b]Einheitskugel[/b][/i][/color] [br]und eine dazu orthogonale imaginäre Kugel gewählt werden können.-[br][br][b][sup]3[/sup])[/b]: Obwohl im Handbuch zu lesen ist, dass [color=#980000][i][b]geogebra[/b][/i][/color] [color=#0000ff][i][b]komplexe Zahlen[/b][/i][/color] [i][b]nicht[/b][/i] unterstützt, kann man in [color=#980000][i][b]geogebra[/b][/i][/color] ganz trefflich[br][color=#0000ff][i][b]komplex[/b][/i][/color] rechnen. Die wichtigsten Funktionen ([math]\sqrt{ }[/math], [b]sin[/b], [b]cos[/b], [b]exp[/b], [b]ln[/b] ...) können als [math]\hookrightarrow[/math] [url=https://www.geogebra.org/m/kCxvMbHb#chapter/409348][i][b]komplexe Funktionen[/b][/i][/url] behandelt werden, [br]Berechnungen lassen sich klaglos [color=#0000ff][i][b]komplex[/b][/i][/color] durchführen![br]Z.B.: die Koeffizienten [math]A_x,B_y,C_z[/math] sind reell, die Zahlen [math]Q_{xy}=\frac{1-A_x\cdot B_y}{A_x-B_y}[/math] ebenfalls, [br]abgesehen vom Sonderfall [math]A_x=B_y[/math], bei welchem die [color=#134F5C][i][b]Cyclide[/b][/i][/color] rotationssymmetrisch ist und [color=#00ff00][i][b]Brennpunkte[/b][/i][/color] zusammenfallen!![br]Die (reelle) Berechnung [math]f_{xy}:=\sqrt{Q_{xy}+\sqrt{Q_{xy}\,^2-1}}[/math] liefert in manchen Fällen [br]wegen des bekannten Verhaltens der [color=#9900ff][i][b]Wurzel-Funktion[/b][/i][/color] bei negativen Radikanten [i][b]kein[/b][/i] Ergebnis.[br]Mit dem "Trick" [math]f_{xy}:=\sqrt{Q_{xy}+\sqrt{Q_{xy}\,^2-1+0\cdot i}}[/math] rechnet in [color=#980000][i][b]geogebra[/b][/i][/color] die [color=#9900ff][i][b]Wurzel-Funktion[/b][/i][/color] [color=#0000ff][i][b]komplex[/b][/i][/color], [br]und so werden in entsprechenden Fällen die [color=#00ff00][i][b]Brennpunkte[/b][/i][/color] mit denselben Formeln [color=#0000ff][i][b]komplex[/b][/i][/color] berechnet, [br]wenn sie auf dem [color=#BF9000][i][b]Einheitskreis[/b][/i][/color] liegen![br][br][b][sup]4[/sup])[/b]: Zur [color=#0000ff][i][b]Möbiusgeometrie[/b][/i][/color]: [math]\hookrightarrow[/math] vgl. das [color=#980000][i][b]geogebra-book[/b][/i][/color] [url=https://www.geogebra.org/m/kCxvMbHb]Moebiusebene[/url][br][br][sup][b]5[/b][/sup]): Für [b]2[/b]-teilige [color=#ff7700][i][b]bizirkulare Quartiken[/b][/i][/color] kennen wir [math]\hookrightarrow[/math] [url=https://www.geogebra.org/m/kCxvMbHb#material/f95nys8v]Parameterdarstellungen[/url][br][br][/size]

[table][tr][td][color=#38761D][i][b]Konfokale[/b][/i][/color][br]2-teilige[br][color=#134F5C][i][b]Darboux Cycliden[/b][/i][/color][/td][td][img]data:image/png;base64,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[/img][/td][td][i][size=85]erstellt mit[br]obigem Applet[/size][/i][/td][/tr][/table]