Putnam 1942 B1
Source: Putnam 1942
March 1, 2022
Putnamsquareconics
Problem Statement
A square of side , lying always in the first quadrant of the -plane, moves so that two consecutive vertices
are always on the - and -axes respectively. Prove that a point within or on the boundary of the square will in general describe a portion of a conic. For what points of the square does this locus degenerate?