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HOW DO WE CHARACTERIZE STRAIGHT? WHAT IS STRAIGHT ON A ________? The notion of (intrinsically) straightness is characterized through symmetries! Any path that is (intrinsically) straight on a surface is called a geodesic. [This would be a line on the plane or a great circle on a sphere.] Reflection-through-itself symmetry This can be seen by placing a mirror on the geodesic and “testing” that the one half of the surface is reflected onto the other half of the surface. Reflection-perpendicular-to-itself symmetry A reflection through any geodesic will take any geodesic perpendicular to the original geodesic onto itself. B' P B Half-turn symmetry A rotation through half of a full revolution about any point P on a geodesic interchanges the part of the geodesic on one side of P with the part on the other side of P. B' P B Rigid-motion-along-itself symmetry Translation along the geodesic – being able to move along the geodesic without leaving the geodesic. B' B Point symmetry (or Central symmetry) Viewed intrinsically, central symmetry through a point P on the surface sends any point A to the point A’ at the same geodesic distance from P but on the opposite side. B' P B Side-Angle-Side Congruency Are two triangles congruent if two sides and the included angle of one are congruent to two sides and the included angle of the other? Is SAS Congruency true on the sphere? If so, reflect on how you might prove it for all triangles. If it is not true for all triangles, see if you can find a set of conditions on the triangles so that SAS Congruency is true. Angle-Side-Angle Congruency Are two triangles congruent if one side and the adjacent angles of one are congruent to one side and the adjacent angles of another? Is ASA Congruency true on the sphere? If so, reflect on how you might prove it for all triangles. If it is not true for all triangles, see if you can find a set of conditions on the triangles so that ASA Congruency is true. Connection to Algebraic Thinking Generic Problem: Find the maximum number of regions you can create on the given surface by using a given number of geodesic, i.e., 0 geodesics, 1 geodesic, 2 geodesics, 3 geodesics, 4 geodesics, 5 geodesics, and 6 geodesics. Record your data in a table, and then generalize the pattern for n geodesics. A) You are to use lines on the plane. B) You are to use great circles on the sphere.
