@article{article_1518403, title={ON THE LAGRANGE INTERPOLATIONS OF THE JACOBSTHAL AND JACOBSTHAL-LUCAS SEQUENCES}, journal={Journal of Universal Mathematics}, volume={7}, pages={128–137}, year={2024}, DOI={10.33773/jum.1518403}, author={Dişkaya, Orhan}, keywords={Fibonacci numbers, Lucas numbers, Jacobsthal numbers, Lagrange interpolations, Binet formula}, abstract={This study explores the formation of polynomials of at most degree $n$ using the first $n+1$ terms of the Jacobsthal and Jacobsthal-Lucas sequences through Lagrange interpolation. The paper provides a detailed examination of the recurrence relations and various identities associated with the Jacobsthal and Jacobsthal-Lucas Lagrange Interpolation Polynomials.}, number={To memory "Assoc. Prof. Dr. Zeynep AKDEMİRCİ ŞANLI"}, publisher={Gökhan ÇUVALCIOĞLU}