\newpage \section{Class \tkzClass{rectangle}} The variable \code{R} holds a table used to store triangles. It is optional, and you are free to choose the variable name. However, using \code{R} is a recommended convention for clarity and consistency. If you use a custom variable (e.g., rectangles), you must initialize it manually. The \code{init\_elements()} function reinitializes the \code{R} table if used. \subsection{Rectangle attributes} \label{sub:rectangle_attributes} Points are created in the direct direction. A test is performed to check whether the points form a rectangle, otherwise compilation is blocked. \begin{mybox} Creation | R.ABCD = rectangle:new(z.A, z.B, z.C, z.D)| \end{mybox} \bgroup \catcode`_=12 \small \captionof{table}{rectangle attributes.}\label{rectangle:attributes} \begin{tabular}{lll} \toprule \textbf{Attributes} & \textbf{Application} & \\ \midrule \tkzAttr{rectangle}{pa} & |z.A = R.ABCD.pa| & \\ \tkzAttr{rectangle}{pb} & |z.B = R.ABCD.pb| & \\ \tkzAttr{rectangle}{pc} & |z.C = R.ABCD.pc| & \\ \tkzAttr{rectangle}{pd} & |z.D = R.ABCD.pd| & \\ \tkzAttr{rectangle}{type} & |R.ABCD.type= 'rectangle'| &\\ \tkzAttr{rectangle}{center} & |z.I = R.ABCD.center| & center of the rectangle\\ \tkzAttr{rectangle}{length} & |R.ABCD.length| & the length \\ \tkzAttr{rectangle}{width} & |R.ABCD.width| & the width \\ \tkzAttr{rectangle}{diagonal} & |R.ABCD.diagonal| & diagonal length\\ \tkzAttr{rectangle}{ab} & |R.ABCD.ab| & line passing through two vertices \\ \tkzAttr{rectangle}{ac} & |R.ABCD.ca| & idem. \\ \tkzAttr{rectangle}{ad} & |R.ABCD.ad| & idem. \\ \tkzAttr{rectangle}{bc} & |R.ABCD.bc| & idem. \\ \tkzAttr{rectangle}{bd} & |R.ABCD.bd| & idem. \\ \tkzAttr{rectangle}{cd} & |R.ABCD.cd| & idem. \\ \bottomrule \end{tabular} \egroup \subsubsection{Example} \begin{minipage}{.5\textwidth} \begin{verbatim} \directlua{ init_elements() z.A = point(0, 0) z.B = point(4, 0) z.C = point(4, 4) z.D = point(0, 4) R.new = rectangle(z.A, z.B, z.C, z.D) z.I = R.new.center} \begin{tikzpicture} \tkzGetNodes \tkzDrawPolygon(A,B,C,D) \tkzDrawPoints(A,B,C,D) \tkzLabelPoints(A,B) \tkzLabelPoints[above](C,D) \tkzDrawPoints[red](I) \end{tikzpicture} \end{verbatim} \end{minipage} \hspace{\fill}\begin{minipage}{.5\textwidth} \directlua{ init_elements() z.A = point(0, 0) z.B = point(4, 0) z.C = point(4, 4) z.D = point(0, 4) R.new = rectangle(z.A, z.B, z.C, z.D) z.I = R.new.center} \begin{tikzpicture}[scale =1.5] \tkzGetNodes \tkzDrawPolygon(A,B,C,D) \tkzDrawSegment[dashed](A,C) \tkzDrawPoints(A,B,C,D) \tkzLabelPoints(A,B) \tkzLabelPoints[above](C,D) \tkzDrawPoints[red](I) \tkzLabelPoint[right = 10pt](I){$I$\\ |R.new.center|} \tkzLabelSegment[sloped,above](C,D){|R.new.length| = \pmpn{\tkzUseLua{R.new.length}}} \tkzLabelSegment[sloped,above](A,C){|R.new.diagonal| = \pmpn{\tkzUseLua{R.new.diagonal}}} % \tkzUseLua{R.new.length} and \tkzUseLua{R.new.diagonal} to get the values. \end{tikzpicture} \end{minipage} \newpage \subsection{Rectangle methods} \bgroup \catcode`_=12 \small \captionof{table}{Rectangle methods.}\label{rectangle:methods} \begin{tabular}{lll} \textbf{Methods} & \texttt{Reference} & \\ \toprule \tkzMeth{rectangle}{new(za ,zb, zc, zd)} &[\ref{meth_rectangle_new}]\\ \tkzMeth{rectangle}{angle (zi, za, angle)} & [\ref{ssub:angle_method}]\\ \tkzMeth{rectangle}{gold (za, zb)} & [\ref{ssub:gold_method}]\\ \tkzMeth{rectangle}{diagonal (za, zc)} &[\ref{ssub:diagonal_method}]\\ \tkzMeth{rectangle}{side (za, zb, d)} & [\ref{ssub:side_method}]\\ \tkzMeth{rectangle}{get\_lengths ()} & [\ref{ssub:function_rectangle_get__lengths}]\\ \bottomrule % \end{tabular} \egroup \subsubsection{Method \tkzMeth{rectangle}{new(pt,pt,pt,pt)}} \label{meth_rectangle_new} This function creates a square using four points. No test is performed, and verification is left to the user. \begin{tkzexample}[latex=.5\textwidth] \directlua{ z.A = point(0, 0) z.B = point(4, 0) z.C = point(4, 3) z.D = point(-2, -3) L.AB = line(z.A,z.B) L.CD = line(z.C,z.D) z.I = intersection(L.AB, L.CD) C.I = circle(through(z.I, 3.5)) z.G,z.E = intersection(L.AB, C.I) z.F,z.H = intersection(L.CD, C.I) R.I = rectangle(z.E, z.F, z.G, z.H) z.X = R.I.ab:projection(z.I)} \begin{tikzpicture} \tkzGetNodes \tkzDrawPolygon(E,F,G,H) \tkzDrawPoints(A,B,C,D,I,E,F,G,H,X) \tkzLabelPoints(A,B,C,D,I,E,F,G,H,X) \tkzDrawPoints(I) \end{tikzpicture} \end{tkzexample} \subsubsection{Method \tkzMeth{rectangle}{angle(pt,pt,an)}} \label{ssub:angle_method} |R.ang = rectangle:angle(z.I,z.A)| ; |z.A | vertex ; ang angle between 2 vertices \begin{minipage}{.5\textwidth} \begin{verbatim} \directlua{ init_elements() z.A = point(0, 0) z.B = point(4, 0) z.I = point(4, 3) P.ABCD = rectangle:angle(z.I, z.A, math.pi / 6) z.B = P.ABCD.pb z.C = P.ABCD.pc z.D = P.ABCD.pd} \begin{tikzpicture}[scale = .5] \tkzGetNodes \tkzDrawPolygon(A,B,C,D) \tkzDrawPoints(A,B,C) \tkzLabelPoints(A,B,C,D) \tkzDrawPoints[new](I) \end{tikzpicture} \end{verbatim} \end{minipage} \begin{minipage}{.5\textwidth} \directlua{ init_elements() z.A = point(0, 0) z.B = point(4, 0) z.I = point(4, 3) P.ABCD = rectangle:angle(z.I, z.A, math.pi / 6) z.B = P.ABCD.pb z.C = P.ABCD.pc z.D = P.ABCD.pd} \begin{tikzpicture}[scale = .5] \tkzGetNodes \tkzDrawPolygon(A,B,C,D) \tkzDrawPoints(A,B,C) \tkzLabelPoints(A,B) \tkzLabelPoints[above](C,D) \tkzDrawPoints[new](I) \tkzLabelSegment[sloped,above](A,B){% |rectangle: angle (z.C,z.A,math.pi/6)|} \end{tikzpicture} \end{minipage} \subsubsection{Method \tkzMeth{rectangle}{side(pt,pt,d)}} \label{ssub:side_method} \begin{minipage}{.5\textwidth} \begin{verbatim} \directlua{ init_elements() z.A = point(0, 0) z.B = point(4, 3) R.side = rectangle:side(z.A, z.B, 3) z.C = R.side.pc z.D = R.side.pd z.I = R.side.center} \begin{tikzpicture} \tkzGetNodes \tkzDrawPolygon(A,B,C,D) \tkzDrawPoints(A,B,C,D) \tkzLabelPoints(A,B) \tkzLabelPoints[above](C,D) \tkzDrawPoints[red](I) \end{tikzpicture} \end{verbatim} \end{minipage} \begin{minipage}{.5\textwidth} \directlua{ init_elements() z.A = point(0, 0) z.B = point(4, 3) R.side = rectangle:side(z.A, z.B, 3) z.C = R.side.pc z.D = R.side.pd z.I = R.side.center} \begin{tikzpicture} \tkzGetNodes \tkzDrawPolygon(A,B,C,D) \tkzDrawPoints(A,B,C,D) \tkzLabelPoints(A,B) \tkzLabelPoints[above](C,D) \tkzDrawPoints[red](I) \tkzLabelSegment[sloped,above](A,B){% |rectangle:side(z.A,z.B,3)|} \end{tikzpicture} \end{minipage} \subsubsection{Method \tkzMeth{rectangle}{diagonal(pt,pt)}} \label{ssub:diagonal_method} \begin{minipage}{.5\textwidth} \begin{verbatim} \directlua{ init_elements() z.A = point(0, 0) z.C = point(4, 3) R.diag = rectangle:diagonal(z.A, z.C) z.B = R.diag.pb z.D = R.diag.pd z.I = R.diag.center} \begin{tikzpicture} \tkzGetNodes \tkzDrawPolygon(A,B,C,D) \tkzDrawPoints(A,B,C,D) \tkzLabelPoints(A,B) \tkzLabelPoints[above](C,D) \tkzDrawPoints[red](I) \tkzLabelSegment[sloped,above](A,B){% |rectangle:diagonal(z.A,z.C)|} \end{tikzpicture} \end{verbatim} \end{minipage} \begin{minipage}{.5\textwidth} \directlua{ z.A = point(0, 0) z.C = point(4, 3) R.diag = rectangle:diagonal(z.A, z.C) z.B = R.diag.pb z.D = R.diag.pd z.I = R.diag.center} \begin{tikzpicture} \tkzGetNodes \tkzDrawPolygon(A,B,C,D) \tkzDrawPoints(A,B,C,D) \tkzLabelPoints(A,B) \tkzLabelPoints[above](C,D) \tkzDrawPoints[red](I) \tkzLabelSegment[sloped,above](A,B){% |rectangle:diagonal(z.A, z.C)|} \end{tikzpicture} \end{minipage} \subsubsection{Method \tkzMeth{rectangle}{gold(pt,pt)}} \label{ssub:gold_method} \begin{minipage}{.5\textwidth} \begin{verbatim} \directlua{ init_elements() z.X = point(0, 0) z.Y = point(4, 2) R.gold = rectangle:gold(z.X, z.Y) z.Z = R.gold.pc z.W = R.gold.pd z.I = R.gold.center} \begin{tikzpicture} \tkzGetNodes \tkzDrawPolygon(X,Y,Z,W) \tkzDrawPoints(X,Y,Z,W) \tkzLabelPoints(X,Y) \tkzLabelPoints[above](Z,W) \tkzDrawPoints[red](I) \tkzLabelSegment[sloped,above](X,Y){% |rectangle:gold(z.X,z.Y)|} \end{tikzpicture} \end{verbatim} \end{minipage} \begin{minipage}{.5\textwidth} \directlua{ init_elements() z.X = point(0, 0) z.Y = point(4, 2) R.gold = rectangle:gold(z.X, z.Y) z.Z = R.gold.pc z.W = R.gold.pd z.I = R.gold.center} \begin{tikzpicture} \tkzGetNodes \tkzDrawPolygon(X,Y,Z,W) \tkzDrawPoints(X,Y,Z,W) \tkzLabelPoints(X,Y) \tkzLabelPoints[above](Z,W) \tkzDrawPoints[red](I) \tkzLabelSegment[sloped,above](X,Y){% |rectangle:gold(z.X,z.Y)|} \end{tikzpicture} \end{minipage} \subsubsection{Method \tkzMeth{rectangle}{get\_lengths}()} \label{ssub:function_rectangle_get__lengths} \begin{tkzexample}[latex=.45\textwidth] \directlua{ init_elements() z.I = point(2, 1) z.A = point(0, 0) R.ABCD = rectangle:angle(z.I, z.A, math.pi / 3) z.B = R.ABCD.pb z.C = R.ABCD.pc z.D = R.ABCD.pd tkzx,tkzy = R.ABCD:get_lengths()} \begin{tikzpicture} \tkzGetNodes \tkzDrawPolygon(A,B,C,D) \tkzDrawCircle(I,A) \tkzDrawPoints(A,B,C,D) \tkzLabelPoints(A,B) \tkzLabelPoints[above](C,D) \tkzDrawPoints[](I) \tkzLabelSegment(A,B){% $\pmpn{\tkzUseLua{tkzx}}$} \tkzLabelSegment[right](B,C){% $\pmpn{\tkzUseLua{tkzy}}$} \end{tikzpicture} \end{tkzexample} \endinput