What Grassmann Knew: Incidence Theorems on Cubics

Traves and Wehlau recently gave a straightedge construction that checks whether 10 points lie on a plane cubic curve. They also highlighted several open problems in the synthetic geometry of cubics. Hermann Grassmann investigated incidence relations among points on cubic curves in three papers appearing in Crelle's Journal from 1846 to 1856. Grassmann's methods give an alternative way to check whether 10 points lie on a cubic. Using Grassmann's techniques, we solve the synthetic geometry problems introduced by Traves and Wehlau. In particular, we give straightedge constructions that find the intersection of a line with a cubic, find the tangent line to a cubic at a given point, and find the third point of intersection of this tangent line with the cubic. As well, given 5 points on a conic and a cubic and 4 additional points on the cubic, a straightedge construction is given that finds the sixth intersection point of the conic and the cubic. The paper ends with two open problems.