- pair of
antihomologous points of two
circles exists a
third circle which is
tangent to the
given ones and
touches them at the
antihomologous points. The...
- H2{\displaystyle G_{1},H_{2}} and H1,G2{\displaystyle H_{1},G_{2}} of
points are
antihomologous points. The
pairs G1,G2{\displaystyle G_{1},G_{2}} and H1,H2{\displaystyle...
-
similitude for the two
circles C1 and C2; then, A1/A2 and B1/B2 are
pairs of
antihomologous points, and
their lines intersect at X3. It follows, therefore, that...