Research Article
Year 2021,
Volume: 14 Issue: 1, 226 - 230, 15.04.2021
Abstract
References
- [1] Bakers, H. F.:The principles of Geometry. Vol I Foundations, Cambridge at the University Press, (1929).
- [2] Bataille, M. : Correction of the problem 3945 Proposed by J. Chris Fisher. Crux Mathematicorum. 41/5, May Solutions 221 (2015).
- [3] Cohl, T.: A purely synthetic proof of Dao’s theorem on six circumcenters associated with a cyclic hexagon. Forum Geom. 14, 261-264 (2014).
- [4] Dao, O.T.: Problem 3845. Crux Mathematicorum. 39, Issue May (2013).
- [5] Dergiades, N.: Dao’s Theorem on Six Circumcenters associated with a Cyclic Hexagon. Forum Geom. 14, 243-246 2014).
- [6] Dung, N.T.: A simple proof of Dao’s theorem on sic circles . Global Journal of Advanced Research on Classical and Modern Geometries. 6/1, 58–61 (2017).
- [7] Glaeser, G, Stachel, H. and Odehnal, B.: The Universe of Conics. SpringerSpektrum, Springer-Verlag Berlin Heidelberg, (2016).
- [8] Gévay, G.: An extension of Miquel’s six-circles theorem. Forum Geometricorum. 18 , 115–118 (2018).
- [9] Gévay, G.: Resolvable configurations. Discrete Applied Mathematics. 266, 319-330 (2019).
- [10] Ngo, O. D.: Some problems around the Dao’s theorem on six circumcenters associated with a cyclic hexagon configuration. International Journal of Computer Discovered Mathematics. 1/2, 40–47 (2016).
- [11] Miquel, A.: Theoremes sur les intersections des cercles et des spheres. Journal de mathematiques pures et appliquees Ire serie. 3, 517–522 (1838).
Year 2021,
Volume: 14 Issue: 1, 226 - 230, 15.04.2021
Abstract
In this note, we study a chain of circles whose pairwise intersection points, taken in a certain order, also lie on two circles. We give a short elementary proof of the following fact. There exists a conic which touches each line connecting the centres of adjacent circles of such chain. In the case of six circles of the chain, this means that the centres of these circles form a Brianchon hexagon. We consider all cases of the possible radically distinct positions of the original chain of circles. In the case when the touching conic is unique, we find out its type.
References
- [1] Bakers, H. F.:The principles of Geometry. Vol I Foundations, Cambridge at the University Press, (1929).
- [2] Bataille, M. : Correction of the problem 3945 Proposed by J. Chris Fisher. Crux Mathematicorum. 41/5, May Solutions 221 (2015).
- [3] Cohl, T.: A purely synthetic proof of Dao’s theorem on six circumcenters associated with a cyclic hexagon. Forum Geom. 14, 261-264 (2014).
- [4] Dao, O.T.: Problem 3845. Crux Mathematicorum. 39, Issue May (2013).
- [5] Dergiades, N.: Dao’s Theorem on Six Circumcenters associated with a Cyclic Hexagon. Forum Geom. 14, 243-246 2014).
- [6] Dung, N.T.: A simple proof of Dao’s theorem on sic circles . Global Journal of Advanced Research on Classical and Modern Geometries. 6/1, 58–61 (2017).
- [7] Glaeser, G, Stachel, H. and Odehnal, B.: The Universe of Conics. SpringerSpektrum, Springer-Verlag Berlin Heidelberg, (2016).
- [8] Gévay, G.: An extension of Miquel’s six-circles theorem. Forum Geometricorum. 18 , 115–118 (2018).
- [9] Gévay, G.: Resolvable configurations. Discrete Applied Mathematics. 266, 319-330 (2019).
- [10] Ngo, O. D.: Some problems around the Dao’s theorem on six circumcenters associated with a cyclic hexagon configuration. International Journal of Computer Discovered Mathematics. 1/2, 40–47 (2016).
- [11] Miquel, A.: Theoremes sur les intersections des cercles et des spheres. Journal de mathematiques pures et appliquees Ire serie. 3, 517–522 (1838).
There are 11 citations in total.
Details
| Primary Language | English |
|---|---|
| Subjects | Mathematical Sciences |
| Journal Section | Research Article |
| Authors | |
| Publication Date | April 15, 2021 |
| Acceptance Date | February 26, 2021 |
| Published in Issue | Year 2021 Volume: 14 Issue: 1 |
