index of entries on compass and straightedge constructions IndexOfEntriesOnCompassAndStraightedgeConstructions 2007-06-03 04:31:08 2009-10-12 04:18:55 Topic compass and straightedge construction Euclidean geometry \usepackage{amssymb} \usepackage{amsmath} \usepackage{amsfonts} \usepackage{pstricks} \usepackage{psfrag} \usepackage{graphicx} \usepackage{amsthm} \usepackage{xypic} \usepackage{multicol} The following entries discuss compass and straightedge constructions: \begin{multicols}{2} \begin{itemize} \item geometric constructions by Euclid \item perpendicular bisector \item midpoint \item compass and straightedge construction of perpendicular \item compass and straightedge construction of angle bisector \item compass and straightedge construction of regular triangle \item compass and straightedge construction of duplicating an angle \item compass and straightedge construction of center of given circle \item construct the center of a given circle \item construction of tangent \item circumcenter (\PMlinkescapetext{constructing a circle passing through three noncollinear points}) \item compass and straightedge construction of parallel line \item compass and straightedge construction of square \item \PMlinkname{$n$-section of line segment with compass and straightedge}{NSectionOfLineSegmentWithCompassAndStraightedge} \item circle with given center and given radius \item compass and straightedge construction of similar triangles \item compass and straightedge construction of geometric mean \item construction of fourth proportional \item construction of central proportional \item compass and straightedge construction of inverse point \item compass and straightedge construction of regular pentagon \item \PMlinkname{construction of regular $2n$-gon from regular $n$-gon}{ConstructionOfRegular2nGonFromRegularNGon} \item \PMlinkname{compass and straightedge construction}{CompassAndStraightedgeConstruction} \item constructible numbers \item theorem on constructible numbers \item theorem on constructible angles \item criterion for constructibility of regular polygon \item classical problems of constructibility \end{itemize} \end{multicols}