n Vektor der Siegelungsachse (AlgebraView)[br]S[sub]e[/sub] Spiegelungsmatrix aus Einheitsvektor |n|=1[br]S[sub]G[/sub] Spiegelungsmatrix für nicht normierten Vektor[br][table] [tr][br] [td][br][math]t \; n \; Lotpunkt \; von \; e_i \; auf \; n\\Lotvektor \cdot Richtungsvektor = 0\\\left(t \; n - e_i \right) \; n = 0 \to \textcolor{red}{t = \frac{e_i \;n}{n^{2}}}\\Lot: t\,n \to \frac{e_i \;n}{n^{2}} \; n\\[br]Lotvektor\, 2x\, abtragen\\e_i'=e_i + 2 \; \left(t \; n - e_i \right) \\[br]e_i'=e_i + 2 \; \left(\textcolor{red}{\frac{e_i \,n}{n^{2}}\cdot} n - e_i \right)\\[br]e_i'=2 \; \left(\textcolor{red}{\frac{e_i \,n}{n^{2}}\cdot} n \right) - e_i\\[br]\\Reflect(n, e_i) \, := \, 2 \cdot \frac{e_i \; n}{n^{2}} \; n - e_i[/math][br][/td][br] 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[/img][br][/td][br][/tr][br][/table][math]Matrix-Version: X' = \left(\frac{2}{n^{2}} \; (n \; n) - id_3 \right) \; X, \; (n \; n) \to Matrix\, dyadisches \; Produkt [/math][br][br][icon]/images/ggb/toolbar/mode_circle3.png[/icon][url=https://www.geogebra.org/m/ag6qunap]Konstruktion Spiegelung ausführlich[/url][math]\nwarrow[/math][br]