In the special case when the polygon is
cyclic, the circumcenter of mass coincides with the
circumcenter. The circumcenter of mass satisfies an analog of Archimedes' Lemma, which states that if a polygon is decomposed into two smaller polygons, then the circumcenter of mass of that polygon is a weighted sum of the circumcenters of mass of the two smaller polygons. As a consequence, any triangulation with nondegenerate triangles may be used to define the circumcenter of mass. For an
equilateral polygon, the circumcenter of mass and center of mass coincide. More generally, the circumcenter of mass and center of mass coincide for a simplicial polytope for which each face has the sum of squares of its edges a constant. The circumcenter of mass is invariant under the operation of "recutting" of polygons. and the discrete bicycle (Darboux) transformation; in other words, the image of a polygon under these operations has the same circumcenter of mass as the original polygon. The
generalized Euler line makes other appearances in the theory of integrable systems. Let V_i=(x_i,y_i) be the vertices of P and let A denote its area. The circumcenter of mass CCM(P) of the polygon P is given by the formula : CCM(P)=\frac{1}{4 A}(\sum_{i=0}^{n-1} -y_i y_{i+1}^2+y_i^2 y_{i+1} +x_i^2 y_{i+1}-x_{i+1}^2 y_i, \sum_{i=0}^{n-1} -x_{i+1} y_i^2+x_i y_{i+1}^2+x_i x_{i+1}^2-x_i^2 x_{i+1}). The circumcenter of mass can be extended to smooth curves via a limiting procedure. This continuous limit coincides with the center of mass of the homogeneous
lamina bounded by the curve. Under natural assumptions, the centers of polygons which satisfy Archimedes' Lemma are precisely the points of its Euler line. In other words, the only "well-behaved" centers which satisfy Archimedes' Lemma are the affine combinations of the circumcenter of mass and center of mass. ==Generalized Euler line==