Bisector Curves of Comformable Curves in R^2

Şeyda Özel; Mehmet Bektaş

doi:10.34248/bsengineering.1549965

Research Article

Bisector Curves of Comformable Curves in R^2

Year 2025, Volume: 8 Issue: 1, 35 - 36

Şeyda Özel , Mehmet Bektaş

https://doi.org/10.34248/bsengineering.1549965

Abstract

In this work, the bisector curves of two regular comformable curves from C^1-regular parametric category is inspected in R^2. Then, multivariable functions which is corresponded to bisector curves of regular comformable curves are calculated. The bisector curves are procured by two similar paths. As a result, the equations which are corresponded to bisector curves are obtained in R^2.

Keywords

Bisectorcurves, Comformable Derivative, Frenet frame

References

Anderson DR, Ulness DJ. 2015. Newly defined conformable derivatives. Adv Dyn Syst Appl, 10(2): 109-137.
Atangana A, Baleanu D, Alsaedi A. 2015. New properties of conformable derivative. Open Math, 13(1): 889-898.

Bisector Curves of Comformable Curves in R^2

Year 2025, Volume: 8 Issue: 1, 35 - 36

Şeyda Özel , Mehmet Bektaş

https://doi.org/10.34248/bsengineering.1549965

Abstract

In this work, the bisector curves of two regular comformable curves from C^1-regular parametric category is inspected in R^2. Then, multivariable functions which is corresponded to bisector curves of regular comformable curves are calculated. The bisector curves are procured by two similar paths. As a result, the equations which are corresponded to bisector curves are obtained in R^2.

Keywords

bisector curves, comformable derivative, frenet frame

References

Anderson DR, Ulness DJ. 2015. Newly defined conformable derivatives. Adv Dyn Syst Appl, 10(2): 109-137.
Atangana A, Baleanu D, Alsaedi A. 2015. New properties of conformable derivative. Open Math, 13(1): 889-898.

There are 2 citations in total.

Details

Primary Language	English
Subjects	Algebraic and Differential Geometry
Journal Section	Research Articles
Authors	Şeyda Özel 0000-0002-1519-2418 Mehmet Bektaş 0000-0002-5797-4944
Publication Date
Submission Date	September 14, 2024
Acceptance Date	November 26, 2024
Published in Issue	Year 2025 Volume: 8 Issue: 1

Cite

APA	Özel, Ş., & Bektaş, M. (n.d.). Bisector Curves of Comformable Curves in R^2. Black Sea Journal of Engineering and Science, 8(1), 35-36. https://doi.org/10.34248/bsengineering.1549965
AMA	Özel Ş, Bektaş M. Bisector Curves of Comformable Curves in R^2. BSJ Eng. Sci. 8(1):35-36. doi:10.34248/bsengineering.1549965
Chicago	Özel, Şeyda, and Mehmet Bektaş. “Bisector Curves of Comformable Curves in R^2”. Black Sea Journal of Engineering and Science 8, no. 1 n.d.: 35-36. https://doi.org/10.34248/bsengineering.1549965.
EndNote	Özel Ş, Bektaş M Bisector Curves of Comformable Curves in R^2. Black Sea Journal of Engineering and Science 8 1 35–36.
IEEE	Ş. Özel and M. Bektaş, “Bisector Curves of Comformable Curves in R^2”, BSJ Eng. Sci., vol. 8, no. 1, pp. 35–36, doi: 10.34248/bsengineering.1549965.
ISNAD	Özel, Şeyda - Bektaş, Mehmet. “Bisector Curves of Comformable Curves in R^2”. Black Sea Journal of Engineering and Science 8/1 (n.d.), 35-36. https://doi.org/10.34248/bsengineering.1549965.
JAMA	Özel Ş, Bektaş M. Bisector Curves of Comformable Curves in R^2. BSJ Eng. Sci.;8:35–36.
MLA	Özel, Şeyda and Mehmet Bektaş. “Bisector Curves of Comformable Curves in R^2”. Black Sea Journal of Engineering and Science, vol. 8, no. 1, pp. 35-36, doi:10.34248/bsengineering.1549965.
Vancouver	Özel Ş, Bektaş M. Bisector Curves of Comformable Curves in R^2. BSJ Eng. Sci. 8(1):35-6.