-

Melike Ay; Mustafa Kazaz

doi:10.18466/cbufbe.76371

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Year 2014, Volume: 10 Issue: 1, 33 - 44, 06.01.2015

Melike Ay Mustafa Kazaz

https://doi.org/10.18466/cbufbe.76371

Abstract

Let P and Q be two given fixed points in the Euclid planepoints X whose distances from the points P and Q are in a constant ratio m : n is a circle, where m, n2. It is well known that the locus of

Keywords

Apollonian Curve, Unit Sphere, Great circle

References

Brannan, D. A., Esplen, M. F., Gray, J. J., Geometry, Cambridge University Press (2000).
Do Carmo, M. P., Differential Geometry of Curves and Surfaces, Prentice-Hall, Inc., London 19 Oprea, J., Differential Geometry and Its Applications, Prentice Hall, Inc., London 1997. Geliş Tarihi:28.05.2013 Kabul Tarihi:02.05.2014

BİRİM KÜRE YÜZEYİ ÜZERİNDE APOLLONIAN EĞRİLERİ - APOLLONIAN CURVES ON THE SURFACE OF THE UNIT SPHERE

Year 2014, Volume: 10 Issue: 1, 33 - 44, 06.01.2015

Melike Ay Mustafa Kazaz

https://doi.org/10.18466/cbufbe.76371

Abstract

BİRİM KÜRE YÜZEYİ ÜZERİNDE APOLLONIAN EĞRİLERİ

Öklid düzleminde P ve Q verilen iki sabit nokta olsun. P ve Q noktalarından uzaklıkları sabit bir m: n oranında olan tüm X noktalarının geometrik yerinin bir çember olduğu iyi bilinir, burada m, n (m  n ) pozitif tamsayılardır. Bu çember Apollonius’ın çemberi (veya Apollonian çemberi) olarak bilinir [Brannan-Esplen-Gray, 1]. Eğer m  n ise, d P, X  : d Q, X  1:1 olacak şekildeki X noktalarının geometrik yeri ise [PQ] doğru parçasının orta dikme doğrusudur. Bu makalede, 2 S birim küre yüzeyi üzerinde Apollonian eğrileri tanımlanmış ve bu eğrilerin küre yüzeyi üzerinde düzlemsel eğriler (büyük çemberler) ve düzlemsel olmayan eğriler olduğu elde edilmiştir.

APOLLONIAN CURVES ON THE SURFACE OF THE UNIT SPHERE

Let P and Q be two given fixed points in the Euclid plane 2 . It is well known that the locus of points X whose distances from the points P and Q are in a constant ratio m : n is a circle, where m, n ( ) m n  are some positive integers. This circle is known as the circle of Apollonius (or Apollonian circle) [Brannan-Esplen-Gray, 1]. If m n  , the locus of points X such that d P X d Q X  , : , 1:1     is the perpendicular bisector of the line segment [ ] PQ . In this paper, Apollonian curves on the surface of the unit sphere 2 S is defined, and these curves were obtained as planar curves (great circles) and non-planar curves on the sphere.

Keywords

Apollonian eğrisi, Birim küre, Büyük çember

References

Brannan, D. A., Esplen, M. F., Gray, J. J., Geometry, Cambridge University Press (2000).
Do Carmo, M. P., Differential Geometry of Curves and Surfaces, Prentice-Hall, Inc., London 19 Oprea, J., Differential Geometry and Its Applications, Prentice Hall, Inc., London 1997. Geliş Tarihi:28.05.2013 Kabul Tarihi:02.05.2014

There are 2 citations in total.

Details

Primary Language	TR
Journal Section	Articles
Authors	Melike Ay This is me Mustafa Kazaz
Publication Date	January 6, 2015
Published in Issue	Year 2014 Volume: 10 Issue: 1

Cite

APA	Ay, M., & Kazaz, M. (2015). -. Celal Bayar University Journal of Science, 10(1), 33-44. https://doi.org/10.18466/cbufbe.76371
AMA	Ay M, Kazaz M. -. CBUJOS. January 2015;10(1):33-44. doi:10.18466/cbufbe.76371
Chicago	Ay, Melike, and Mustafa Kazaz. “-”. Celal Bayar University Journal of Science 10, no. 1 (January 2015): 33-44. https://doi.org/10.18466/cbufbe.76371.
EndNote	Ay M, Kazaz M (January 1, 2015) -. Celal Bayar University Journal of Science 10 1 33–44.
IEEE	M. Ay and M. Kazaz, “-”, CBUJOS, vol. 10, no. 1, pp. 33–44, 2015, doi: 10.18466/cbufbe.76371.
ISNAD	Ay, Melike - Kazaz, Mustafa. “-”. Celal Bayar University Journal of Science 10/1 (January 2015), 33-44. https://doi.org/10.18466/cbufbe.76371.
JAMA	Ay M, Kazaz M. -. CBUJOS. 2015;10:33–44.
MLA	Ay, Melike and Mustafa Kazaz. “-”. Celal Bayar University Journal of Science, vol. 10, no. 1, 2015, pp. 33-44, doi:10.18466/cbufbe.76371.
Vancouver	Ay M, Kazaz M. -. CBUJOS. 2015;10(1):33-44.