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Journal of Computer-Generated Euclidean Geometry |
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Anticevian Corner Triangles Deko Dekov
See the Figure:
P - Triangle Center of kind 1; Triangle ABC and the Triangle of the Incenters
of the Anticevian Corner Triangles of the Incenter are perspective with
perspector the Second de Villiers Point. See the Figure:
A1B1C1 -
Anticevian Triangle of the Incenter = Excentral Triangle; Examples
The Machine for
Questions and Answers produces examples of perspectors between triangles and
Anticevian Corner Triangles. A few examples are given below. Triangle ABC and the Triangle of the Incenters of the Anticevian Corner Triangles of the Incenter are perspective with perspector the Second de Villiers Point. Triangle ABC and the Triangle of the
Circumcenters of the Anticevian Corner Triangles of the Incenter are
perspective with perspector the Incenter. Triangle ABC and the Triangle of the
Orthocenters of the Anticevian Corner Triangles of the Incenter are
homothetic with homothetic center the Spieker Center. Triangle ABC and the Triangle of the Incenters
of the Anticevian Corner Triangles of the Centroid are homothetic with
homothetic center the Spieker Center. Triangle ABC and the Triangle of the Centroids
of the Anticevian Corner Triangles of the Centroid are homothetic with
homothetic center the Centroid. Triangle ABC and the Triangle of the
Circumcenters of the Anticevian Corner Triangles of the Centroid are
homothetic with homothetic center the Nine-Point Center. Triangle ABC and the Triangle of the
Orthocenters of the Anticevian Corner Triangles of the Centroid are
homothetic with homothetic center the Circumcenter. Triangle ABC and the Triangle of the Nine-Point
Centers of the Anticevian Corner Triangles of the Centroid are homothetic
with homothetic center the Complement of the Nine-Point Center. Triangle ABC and the Triangle of the Symmedian
Points of the Anticevian Corner Triangles of the Centroid are homothetic with
homothetic center the Symmedian Point of the Medial Triangle. Triangle ABC and the Triangle of the Gergonne
Points of the Anticevian Corner Triangles of the Centroid are homothetic with
homothetic center the Mittenpunkt. Triangle ABC and the Triangle of the Nagel
Points of the Anticevian Corner Triangles of the Centroid are homothetic with
homothetic center the Incenter. Triangle ABC and the Triangle of the
Mittenpunkts of the Anticevian Corner Triangles of the Centroid are
homothetic with homothetic center the Complement of the Mittenpunkt. Triangle ABC and the Triangle of the Spieker
Centers of the Anticevian Corner Triangles of the Centroid are homothetic
with homothetic center the Complement of the Spieker Center. Triangle ABC and the Triangle of the de
Longchamps Points of the Anticevian Corner Triangles of the Centroid are
homothetic with homothetic center the Orthocenter. Triangle ABC and the Triangle of the Bevan
Points of the Anticevian Corner Triangles of the Centroid are homothetic with
homothetic center the Midpoint of the Incenter and the Orthocenter. Triangle ABC and the Triangle of the Internal
Centers of Similitude of the Incircles and the Circumcircles of the
Anticevian Corner Triangles of the Centroid are homothetic with homothetic
center the Internal Center of Similitude of the Nine-Point Circle and the
Spieker Circle. Triangle ABC and the Triangle of the External
Centers of Similitude of the Incircles and the Circumcircles of the
Anticevian Corner Triangles of the Centroid are homothetic with homothetic
center the External Center of Similitude of the Nine-Point Circle and the
Spieker Circle. Triangle ABC and the Triangle of the Equal
Parallelians Points of the Anticevian Corner Triangles of the Centroid are
homothetic with homothetic center the Isotomic Conjugate of the Incenter. Triangle ABC and the Triangle of the Centers of
the Fuhrmann Circles of the Anticevian Corner Triangles of the Centroid are
homothetic with homothetic center the Midpoint of the Circumcenter and the
Incenter. Triangle ABC and the Triangle of the Centers of
the Orthocentroidal Circles of the Anticevian Corner Triangles of the
Centroid are homothetic with homothetic center the Midpoint of the Centroid
and the Circumcenter. Triangle ABC and the Triangle of the
Orthocenters of the Anticevian Corner Triangles of the Orthocenter are
homothetic with homothetic center the Orthocenter. Triangle ABC and the Triangle of the
Circumcenters of the Anticevian Corner Triangles of the Symmedian Point are
perspective with perspector the Kosnita Point. Triangle ABC and the Triangle of the
Orthocenters of the Anticevian Corner Triangles of the Symmedian Point are
homothetic with homothetic center the Nine-Point Center. Triangle ABC and the Triangle of the First
Feuerbach Points of the Anticevian Corner Triangles of the Symmedian Point
are homothetic with homothetic center the Centroid. Triangle ABC and the Triangle of the Kiepert
Centers of the Anticevian Corner Triangles of the Symmedian Point are
homothetic with homothetic center the Centroid. The Incentral Triangle and the Triangle of the
Circumcenters of the Anticevian Corner Triangles of the Incenter are
perspective with perspector the Incenter. The Incentral Triangle and the Triangle of the
Kosnita Points of the Anticevian Corner Triangles of the Incenter are
homothetic with homothetic center the Isogonal Conjugate of the Spieker
Center. The Incentral Triangle and the Triangle of the
Nagel Points of the Anticevian Corner Triangles of the Centroid are
perspective with perspector the Incenter. The Medial Triangle and the Triangle of the
Centroids of the Anticevian Corner Triangles of the Incenter are perspective
with perspector the Mittenpunkt. The Medial Triangle and the Triangle of the
Circumcenters of the Anticevian Corner Triangles of the Incenter are
perspective with perspector the Circumcenter. The Medial Triangle and the Triangle of the
Orthocenters of the Anticevian Corner Triangles of the Incenter are
homothetic with homothetic center the Incenter. The Medial Triangle and the Triangle of the
Nine-Point Centers of the Anticevian Corner Triangles of the Incenter are
perspective with perspector the Spieker Center. The Medial Triangle and the Triangle of the
Centroids of the Anticevian Corner Triangles of the Circumcenter are
perspective with perspector the Symmedian Point. The Medial Triangle and the Triangle of the
Orthocenters of the Anticevian Corner Triangles of the Orthocenter are
homothetic with homothetic center the de Longchamps Point. The Medial Triangle and the Triangle of the
Centroids of the Anticevian Corner Triangles of the Mittenpunkt are
perspective with perspector the Incenter. The Medial Triangle and the Triangle of the
Centroids of the Anticevian Corner Triangles of the First Feuerbach Point are
perspective with perspector the Center of the Stevanovic Circle. The Medial Triangle and the Triangle of the
Centroids of the Anticevian Corner Triangles of the Spieker Center are
perspective with perspector the Grinberg Point. The Medial Triangle and the Triangle of the
Centroids of the Anticevian Corner Triangles of the Grinberg Point are
perspective with perspector the Spieker Center. The Medial Triangle and the Triangle of the
Centroids of the Anticevian Corner Triangles of the Brocard Midpoint are
perspective with perspector the Symmedian Point of the Medial Triangle. The Medial Triangle and the Triangle of the
Centroids of the Anticevian Corner Triangles of the Center of the Stevanovic
Circle are perspective with perspector the First Feuerbach Point. The Orthic Triangle and the Triangle of the
Prasolov Points of the Anticevian Corner Triangles of the Incenter are
perspective with perspector the Perspector of the Orthic Triangle and the
Excentral Triangle. The Orthic Triangle and the Triangle of the
Circumcenters of the Anticevian Corner Triangles of the Centroid are
perspective with perspector the Orthocenter of the Tangential Triangle. The Orthic Triangle and the Triangle of the de
Longchamps Points of the Anticevian Corner Triangles of the Centroid are
perspective with perspector the Orthocenter. The Orthic Triangle and the Triangle of the
Orthocenters of the Anticevian Corner Triangles of the Orthocenter are
perspective with perspector the Orthocenter. The Orthic Triangle and the Triangle of the
Inner Kenmotu Points of the Anticevian Corner Triangles of the Orthocenter
are perspective with perspector the Inner Kenmotu Point. The Orthic Triangle and the Triangle of the
Outer Kenmotu Points of the Anticevian Corner Triangles of the Orthocenter
are perspective with perspector the Outer Kenmotu Point. The Orthic Triangle and the Triangle of the
Circumcenters of the Anticevian Corner Triangles of the Symmedian Point are
homothetic with homothetic center the Gibert Point. The Orthic Triangle and the Triangle of the
Orthocenters of the Anticevian Corner Triangles of the Symmedian Point are
perspective with perspector the Orthocenter of the Tangential Triangle. The Orthic Triangle and the Triangle of the
Inner Vecten Points of the Anticevian Corner Triangles of the Inner Kenmotu
Point are perspective with perspector the Outer Kenmotu Point. The Orthic Triangle and the Triangle of the
Inner Vecten Points of the Anticevian Corner Triangles of the Outer Kenmotu
Point are perspective with perspector the Inner Kenmotu Point. The Intouch Triangle and the Triangle of the
Circumcenters of the Anticevian Corner Triangles of the Incenter are
homothetic with homothetic center the External Center of Similitude of the
Incircle and the Circumcircle. The Intouch Triangle and the Triangle of the de
Longchamps Points of the Anticevian Corner Triangles of the Incenter are
perspective with perspector the Incenter. The Intouch Triangle and the Triangle of the
Nagel Points of the Anticevian Corner Triangles of the Centroid are
perspective with perspector the Nagel Point of the Anticomplementary
Triangle. The Intouch Triangle and the Triangle of the
Bevan Points of the Anticevian Corner Triangles of the Centroid are
perspective with perspector the Incenter. The Extouch Triangle and the Triangle of the
Orthocenters of the Anticevian Corner Triangles of the Incenter are
perspective with perspector the Bevan Point. The Extouch Triangle and the Triangle of the
Gibert Points of the Anticevian Corner Triangles of the Incenter are
homothetic with homothetic center the Circumcenter. The Extouch Triangle and the Triangle of the
Incenters of the Anticevian Corner Triangles of the Centroid are perspective
with perspector the Bevan Point. The Extouch Triangle and the Triangle of the
Gergonne Points of the Anticevian Corner Triangles of the Centroid are
perspective with perspector the Gergonne Point of the Anticomplementary
Triangle. The Excentral Triangle and the Triangle of the
Incenters of the Anticevian Corner Triangles of the Incenter are perspective
with perspector the Incenter of the Excentral Triangle. The Excentral Triangle and the Triangle of the
Centroids of the Anticevian Corner Triangles of the Incenter are perspective
with perspector the Mittenpunkt. The Excentral Triangle and the Triangle of the
Circumcenters of the Anticevian Corner Triangles of the Incenter are
homothetic with homothetic center the Incenter. The Excentral Triangle and the Triangle of the
Orthocenters of the Anticevian Corner Triangles of the Incenter are
perspective with perspector the Bevan Point. The Excentral Triangle and the Triangle of the
Symmedian Points of the Anticevian Corner Triangles of the Incenter are
perspective with perspector the Centroid of the Excentral Triangle. The Excentral Triangle and the Triangle of the
Kosnita Points of the Anticevian Corner Triangles of the Incenter are
perspective with perspector the Circumcenter. The Excentral Triangle and the Triangle of the
Internal Centers of Similitude of the Incircles and the Circumcircles of the
Anticevian Corner Triangles of the Incenter are perspective with perspector
the Gergonne Point of the Excentral Triangle. The Excentral Triangle and the Triangle of the
External Centers of Similitude of the Incircles and the Circumcircles of the
Anticevian Corner Triangles of the Incenter are perspective with perspector
the Nagel Point of the Excentral Triangle. The Excentral Triangle and the Triangle of the
Prasolov Points of the Anticevian Corner Triangles of the Incenter are
perspective with perspector the Perspector of the Orthic Triangle and the
Excentral Triangle. The Excentral Triangle and the Triangle of the
Incenters of the Anticevian Corner Triangles of the Centroid are perspective
with perspector the Bevan Point. The Excentral Triangle and the Triangle of the
Nagel Points of the Anticevian Corner Triangles of the Centroid are
perspective with perspector the Incenter. The Excentral Triangle and the Triangle of the
Mittenpunkts of the Anticevian Corner Triangles of the Centroid are
perspective with perspector the Mittenpunkt. The Excentral Triangle and the Triangle of the
First Feuerbach Points of the Anticevian Corner Triangles of the Symmedian
Point are perspective with perspector the Mittenpunkt. The Excentral Triangle and the Triangle of the
Kiepert Centers of the Anticevian Corner Triangles of the Symmedian Point are
perspective with perspector the Mittenpunkt. The Anticomplementary Triangle and the Triangle
of the Orthocenters of the Anticevian Corner Triangles of the Incenter are
homothetic with homothetic center the Nagel Point. The Anticomplementary Triangle and the Triangle
of the Incenters of the Anticevian Corner Triangles of the Centroid are
homothetic with homothetic center the Nagel Point. The Anticomplementary Triangle and the Triangle
of the Centroids of the Anticevian Corner Triangles of the Centroid are
homothetic with homothetic center the Centroid. The Anticomplementary Triangle and the Triangle
of the Circumcenters of the Anticevian Corner Triangles of the Centroid are
homothetic with homothetic center the Orthocenter. The Anticomplementary Triangle and the Triangle
of the Orthocenters of the Anticevian Corner Triangles of the Centroid are
homothetic with homothetic center the de Longchamps Point. The Anticomplementary Triangle and the Triangle
of the Nine-Point Centers of the Anticevian Corner Triangles of the Centroid
are homothetic with homothetic center the Circumcenter. The Anticomplementary Triangle and the Triangle
of the Symmedian Points of the Anticevian Corner Triangles of the Centroid
are homothetic with homothetic center the Symmedian Point of the
Anticomplementary Triangle. The Anticomplementary Triangle and the Triangle
of the Gergonne Points of the Anticevian Corner Triangles of the Centroid are
homothetic with homothetic center the Gergonne Point of the Anticomplementary
Triangle. The Anticomplementary Triangle and the Triangle
of the Nagel Points of the Anticevian Corner Triangles of the Centroid are
homothetic with homothetic center the Nagel Point of the Anticomplementary
Triangle. The Anticomplementary Triangle and the Triangle
of the Mittenpunkts of the Anticevian Corner Triangles of the Centroid are
homothetic with homothetic center the Gergonne Point. The Anticomplementary Triangle and the Triangle
of the Spieker Centers of the Anticevian Corner Triangles of the Centroid are
homothetic with homothetic center the Incenter. The Anticomplementary Triangle and the Triangle
of the Grinberg Points of the Anticevian Corner Triangles of the Centroid are
homothetic with homothetic center the Isotomic Conjugate of the Incenter. The Anticomplementary Triangle and the Triangle
of the Brocard Midpoints of the Anticevian Corner Triangles of the Centroid
are homothetic with homothetic center the Isotomic Conjugate of the Symmedian
Point. The Anticomplementary Triangle and the Triangle
of the Kiepert Centers of the Anticevian Corner Triangles of the Centroid are
homothetic with homothetic center the Steiner Point. The Anticomplementary Triangle and the Triangle
of the de Longchamps Points of the Anticevian Corner Triangles of the
Orthocenter are perspective with perspector the de Longchamps Point. The Anticomplementary Triangle and the Triangle
of the Orthocenters of the Anticevian Corner Triangles of the Symmedian Point
are homothetic with homothetic center the Orthocenter. The Anticomplementary Triangle and the Triangle
of the First Feuerbach Points of the Anticevian Corner Triangles of the
Symmedian Point are homothetic with homothetic center the Centroid. The Anticomplementary Triangle and the Triangle
of the Kiepert Centers of the Anticevian Corner Triangles of the Symmedian
Point are homothetic with homothetic center the Centroid. The Tangential Triangle and the Triangle of the
Circumcenters of the Anticevian Corner Triangles of the Incenter are perspective
with perspector the Circumcenter. The Tangential Triangle and the Triangle of the
Circumcenters of the Anticevian Corner Triangles of the Centroid are
perspective with perspector the Circumcenter. The Tangential Triangle and the Triangle of the
Prasolov Points of the Anticevian Corner Triangles of the Centroid are
perspective with perspector the Orthocenter of the Tangential Triangle. The Circum-Incentral Triangle and the Triangle
of the Kosnita Points of the Anticevian Corner Triangles of the Incenter are
perspective with perspector the Kiepert-Parry Point. The Circum-Incentral Triangle and the Triangle
of the Circumcenters of the Anticevian Corner Triangles of the Centroid are
perspective with perspector the Circumcenter. The Circum-Incentral Triangle and the Triangle
of the Nagel Points of the Anticevian Corner Triangles of the Centroid are
perspective with perspector the Incenter. The Circum-Medial Triangle and the Triangle of
the Centroids of the Anticevian Corner Triangles of the Centroid are
perspective with perspector the Centroid. The Circum-Medial Triangle and the Triangle of
the Symmedian Points of the Anticevian Corner Triangles of the Centroid are
perspective with perspector the Kiepert-Parry Point. The Circum-Medial Triangle and the Triangle of
the Centroids of the Anticevian Corner Triangles of the Symmedian Point are
perspective with perspector the Kiepert-Parry Point. The Circum-Medial Triangle and the Triangle of
the Symmedian Points of the Anticevian Corner Triangles of the Symmedian
Point are perspective with perspector the Far-Out Point. The Circum-Medial Triangle and the Triangle of
the First Feuerbach Points of the Anticevian Corner Triangles of the
Symmedian Point are perspective with perspector the Centroid. The Circum-Medial Triangle and the Triangle of
the Kiepert Centers of the Anticevian Corner Triangles of the Symmedian Point
are perspective with perspector the Centroid. The Circum-Orthic Triangle and the Triangle of
the Circumcenters of the Anticevian Corner Triangles of the Centroid are
perspective with perspector the Kiepert-Parry Point. The Circum-Orthic Triangle and the Triangle of
the de Longchamps Points of the Anticevian Corner Triangles of the Centroid
are perspective with perspector the Orthocenter. The Circum-Orthic Triangle and the Triangle of
the Centroids of the Anticevian Corner Triangles of the Circumcenter are
perspective with perspector the Kiepert-Parry Point. The Circum-Orthic Triangle and the Triangle of
the Orthocenters of the Anticevian Corner Triangles of the Orthocenter are
perspective with perspector the Orthocenter. The Circum-Orthic Triangle and the Triangle of
the Circumcenters of the Anticevian Corner Triangles of the Symmedian Point
are homothetic with homothetic center the Inverse of the Orthocenter in the
Circumcircle. The Circum-Orthic Triangle and the Triangle of
the Orthocenters of the Anticevian Corner Triangles of the Symmedian Point
are perspective with perspector the Kiepert-Parry Point. The Euler Triangle and the Triangle of the
Circumcenters of the Anticevian Corner Triangles of the Centroid are
homothetic with homothetic center the Center of the Orthocentroidal Circle. The Euler Triangle and the Triangle of the
Orthocenters of the Anticevian Corner Triangles of the Centroid are
homothetic with homothetic center the Centroid. The Euler Triangle and the Triangle of the
Nine-Point Centers of the Anticevian Corner Triangles of the Centroid are
homothetic with homothetic center the Nine-Point Center. The Euler Triangle and the Triangle of the de
Longchamps Points of the Anticevian Corner Triangles of the Centroid are
homothetic with homothetic center the Orthocenter. The Euler Triangle and the Triangle of the Bevan
Points of the Anticevian Corner Triangles of the Centroid are homothetic with
homothetic center the External Center of Similitude of the Bevan Circle and
the Nine-Point Circle. The Euler Triangle and the Triangle of the
Orthocenters of the Anticevian Corner Triangles of the Orthocenter are
homothetic with homothetic center the Orthocenter. The Euler Triangle and the Triangle of the
Orthocenters of the Anticevian Corner Triangles of the Symmedian Point are
homothetic with homothetic center the Center of the Orthocentroidal Circle. The Euler Triangle and the Triangle of the First
Feuerbach Points of the Anticevian Corner Triangles of the Symmedian Point
are homothetic with homothetic center the Nine-Point Center. The Euler Triangle and the Triangle of the
Kiepert Centers of the Anticevian Corner Triangles of the Symmedian Point are
homothetic with homothetic center the Nine-Point Center. The Euler Triangle and the Triangle of the Inner
Napoleon Points of the Anticevian Corner Triangles of the Second Isodynamic
Point are perspective with perspector the Inner Fermat Point. The Euler Triangle and the Triangle of the
Orthocenters of the Anticevian Corner Triangles of the Center of the
Stevanovic Circle are perspective with perspector the First Feuerbach Point. The Intangents Triangle and the Triangle of the
de Longchamps Points of the Anticevian Corner Triangles of the Incenter are
perspective with perspector the Incenter. The Intangents Triangle and the Triangle of the
Bevan Points of the Anticevian Corner Triangles of the Centroid are
perspective with perspector the Incenter. The Intangents Triangle and the Triangle of the
Circumcenters of the Anticevian Corner Triangles of the Symmedian Point are
homothetic with homothetic center the Moses Point. The Extangents Triangle and the Triangle of the
Orthocenters of the Anticevian Corner Triangles of the Incenter are
perspective with perspector the Bevan Point. The Extangents Triangle and the Triangle of the
Incenters of the Anticevian Corner Triangles of the Centroid are perspective
with perspector the Bevan Point. The Mixtilinear Triangle and the Triangle of the
Circumcenters of the Anticevian Corner Triangles of the Incenter are
perspective with perspector the Incenter. The Mixtilinear Triangle and the Triangle of the
Nagel Points of the Anticevian Corner Triangles of the Centroid are
perspective with perspector the Incenter. The Fuhrmann Triangle and the Triangle of the
Circumcenters of the Anticevian Corner Triangles of the Incenter are
perspective with perspector the Circumcenter. The Fuhrmann Triangle and the Triangle of the
Orthocenters of the Anticevian Corner Triangles of the Incenter are
perspective with perspector the Nagel Point. The Fuhrmann Triangle and the Triangle of the
Incenters of the Anticevian Corner Triangles of the Centroid are perspective
with perspector the Nagel Point. The Mid-Arc Triangle and the Triangle of the
Circumcenters of the Anticevian Corner Triangles of the Incenter are
perspective with perspector the Incenter. The Mid-Arc Triangle and the Triangle of the
Nagel Points of the Anticevian Corner Triangles of the Centroid are
perspective with perspector the Incenter. The Reflection Triangle and the Triangle of the
de Longchamps Points of the Anticevian Corner Triangles of the Centroid are
perspective with perspector the Orthocenter. The Reflection Triangle and the Triangle of the
Orthocenters of the Anticevian Corner Triangles of the Orthocenter are
perspective with perspector the Orthocenter. The Reflection Triangle and the Triangle of the
Second Isodynamic Points of the Anticevian Corner Triangles of the Inner
Fermat Point are perspective with perspector the Second Isodynamic Point. The First Brocard Triangle and the Triangle of
the Circumcenters of the Anticevian Corner Triangles of the Second Beltrami
Point are perspective with perspector the Circumcenter. The Fourth Brocard Triangle and the Triangle of
the Centroids of the Anticevian Corner Triangles of the Centroid are
perspective with perspector the Centroid. The Fourth Brocard Triangle and the Triangle of
the First Feuerbach Points of the Anticevian Corner Triangles of the
Symmedian Point are perspective with perspector the Centroid. The Fourth Brocard Triangle and the Triangle of
the Kiepert Centers of the Anticevian Corner Triangles of the Symmedian Point
are perspective with perspector the Centroid. The Yff Central Triangle and the Triangle of the
Circumcenters of the Anticevian Corner Triangles of the Incenter are
homothetic with homothetic center the Dimovski Point. The de Villiers Triangle and the Triangle of the
Bevan Points of the Anticevian Corner Triangles of the Incenter are
perspective with perspector the Incenter. The Malfatti Central Triangle and the Triangle
of the Circumcenters of the Anticevian Corner Triangles of the Incenter are
perspective with perspector the Incenter. The Malfatti Central Triangle and the Triangle
of the Nagel Points of the Anticevian Corner Triangles of the Centroid are
perspective with perspector the Incenter. The Lucas Central Triangle and the Triangle of
the Orthocenters of the Anticevian Corner Triangles of the Centroid are
perspective with perspector the Circumcenter. The Reflected Neuberg Triangle and the Triangle
of the Circumcenters of the Anticevian Corner Triangles of the Second
Beltrami Point are perspective with perspector the Circumcenter. The Hexyl Triangle and the Triangle of the de
Longchamps Points of the Anticevian Corner Triangles of the Incenter are
perspective with perspector the Incenter. The Hexyl Triangle and the Triangle of the
Kosnita Points of the Anticevian Corner Triangles of the Incenter are
perspective with perspector the Circumcenter. The Hexyl Triangle and the Triangle of the
Orthocenters of the Anticevian Corner Triangles of the Centroid are
perspective with perspector the Bevan Point. The Hexyl Triangle and the Triangle of the Bevan
Points of the Anticevian Corner Triangles of the Centroid are perspective
with perspector the Incenter. The Johnson Triangle and the Triangle of the
Circumcenters of the Anticevian Corner Triangles of the Incenter are
perspective with perspector the Circumcenter. The Johnson Triangle and the Triangle of the
Centroids of the Anticevian Corner Triangles of the Circumcenter are
perspective with perspector the Kiepert-Parry Point. The Inner Johnson-Yff Triangle and the Triangle
of the Circumcenters of the Anticevian Corner Triangles of the Incenter are
perspective with perspector the Incenter. The Inner Johnson-Yff Triangle and the Triangle
of the Circumcenters of the Anticevian Corner Triangles of the Centroid are
homothetic with homothetic center the Second Feuerbach Point. The Inner Johnson-Yff Triangle and the Triangle
of the Orthocenters of the Anticevian Corner Triangles of the Centroid are
homothetic with homothetic center the Moses Point. The Inner Johnson-Yff Triangle and the Triangle
of the Nagel Points of the Anticevian Corner Triangles of the Centroid are
homothetic with homothetic center the Incenter. The Inner Johnson-Yff Triangle and the Triangle
of the Orthocenters of the Anticevian Corner Triangles of the Symmedian Point
are homothetic with homothetic center the Second Feuerbach Point. The Outer Johnson-Yff Triangle and the Triangle
of the Circumcenters of the Anticevian Corner Triangles of the Incenter are
perspective with perspector the Incenter. The Outer Johnson-Yff Triangle and the Triangle
of the Circumcenters of the Anticevian Corner Triangles of the Centroid are
homothetic with homothetic center the First Feuerbach Point. The Outer Johnson-Yff Triangle and the Triangle
of the Orthocenters of the Anticevian Corner Triangles of the Centroid are
homothetic with homothetic center the Inverse of the Incenter in the
Circumcircle. The Outer Johnson-Yff Triangle and the Triangle
of the Nagel Points of the Anticevian Corner Triangles of the Centroid are
homothetic with homothetic center the Incenter. The Outer Johnson-Yff Triangle and the Triangle
of the Orthocenters of the Anticevian Corner Triangles of the Symmedian Point
are homothetic with homothetic center the First Feuerbach Point. Invitation
The reader is
invited to submit a note/paper containing synthetic proofs of results from
the above list. DefinitionsWe use the
definitions in accordance with [1 - 6]. The LevelThe Machine for
Questions and Answers is used to produce results in this paper. Currently the
Machine has 6 levels of depths - 0,1,2,3,4,5. We use for this paper the level
0, that is, the Machine produces only elementary results. If we need deeper
investigation, we have to use a level bigger than 0. Since the Machine for
Questions and Answers produces too many results, it is suitable we to use
bigger levels upon request, that is, for specific questions. ThanksThe figures in this note are produced by using the program C.a.R.
(Compass and Ruler), an amazing program created by Rene Grothmann. The
Grothmann's program is available for download in the Web: Rene Grothmann's C.a.R.. It is free and open
source. The reader may verify easily the statements of this paper by using
C.a.R. Many thanks to Rene Grothmann for his wonderful program. References
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