Abstract: We will discuss an exciting new direction in enumerative geometry, called A1-enumerative geometry or enriched enumerative geometry. This growing body of work incorporates methods from motivic homotopy theory in order to investigate enumerative problems over arbitrary fields, producing solutions valued in the Grothendieck—Witt ring, which can then be geometrically interpreted over your favorite field. We will discuss various recent results in the program of Kass and Wickelgren, and provide an introduction to the main tool of A1-enumerative geometry, which is a Brouwer degree for varieties as developed by Morel.