EN
ON THE ZEROS OF THE DERIVATIVES OF FIBONACCI AND LUCAS POLYNOMIALS
Abstract
The purpose of this article is to derive some functions which map the zeros of Fibonacci
polynomials to the zeros of Lucas polynomials. Also we find some equations which are satisfied by
F
0
n (x) and so L
00
n (x). To obtain these equations, formulizations which are made up of hyperbolic
functions for Fibonacci and Lucas polynomials are used.
Keywords
Details
Primary Language
English
Subjects
-
Journal Section
-
Publication Date
August 1, 2015
Submission Date
August 1, 2015
Acceptance Date
-
Published in Issue
Year 2015 Number: 7
APA
Özgür, N. Y., & Kaymak, Ö. Ö. (2015). ON THE ZEROS OF THE DERIVATIVES OF FIBONACCI AND LUCAS POLYNOMIALS. Journal of New Theory, 7, 22-28. https://izlik.org/JA58HF28DM
AMA
1.Özgür NY, Kaymak ÖÖ. ON THE ZEROS OF THE DERIVATIVES OF FIBONACCI AND LUCAS POLYNOMIALS. JNT. 2015;(7):22-28. https://izlik.org/JA58HF28DM
Chicago
Özgür, Nihal Yılmaz, and Öznur Öztunç Kaymak. 2015. “ON THE ZEROS OF THE DERIVATIVES OF FIBONACCI AND LUCAS POLYNOMIALS”. Journal of New Theory, nos. 7: 22-28. https://izlik.org/JA58HF28DM.
EndNote
Özgür NY, Kaymak ÖÖ (August 1, 2015) ON THE ZEROS OF THE DERIVATIVES OF FIBONACCI AND LUCAS POLYNOMIALS. Journal of New Theory 7 22–28.
IEEE
[1]N. Y. Özgür and Ö. Ö. Kaymak, “ON THE ZEROS OF THE DERIVATIVES OF FIBONACCI AND LUCAS POLYNOMIALS”, JNT, no. 7, pp. 22–28, Aug. 2015, [Online]. Available: https://izlik.org/JA58HF28DM
ISNAD
Özgür, Nihal Yılmaz - Kaymak, Öznur Öztunç. “ON THE ZEROS OF THE DERIVATIVES OF FIBONACCI AND LUCAS POLYNOMIALS”. Journal of New Theory. 7 (August 1, 2015): 22-28. https://izlik.org/JA58HF28DM.
JAMA
1.Özgür NY, Kaymak ÖÖ. ON THE ZEROS OF THE DERIVATIVES OF FIBONACCI AND LUCAS POLYNOMIALS. JNT. 2015;:22–28.
MLA
Özgür, Nihal Yılmaz, and Öznur Öztunç Kaymak. “ON THE ZEROS OF THE DERIVATIVES OF FIBONACCI AND LUCAS POLYNOMIALS”. Journal of New Theory, no. 7, Aug. 2015, pp. 22-28, https://izlik.org/JA58HF28DM.
Vancouver
1.Nihal Yılmaz Özgür, Öznur Öztunç Kaymak. ON THE ZEROS OF THE DERIVATIVES OF FIBONACCI AND LUCAS POLYNOMIALS. JNT [Internet]. 2015 Aug. 1;(7):22-8. Available from: https://izlik.org/JA58HF28DM