Aksoyak, Ferdağ Karaman2022-12-272022-12-272022https://doi.org/10.31801/cfsuasmas.991631http://hdl.handle.net/20.500.12575/86488In this paper, we give some characterization of quaternionic Bertrand curves whose the torsion is non-zero but bitorsion is zero in R 4 according to Type 2-Quaternionic Frame. One of the most important points in working on quaternionic curves is that given a curve in R 4 , the curve in R 3 associated with this curve is determined individually. So, we obtain some relationships between quaternionic Bertrand curve α ( 4 ) in R 4 and its associated spatial quaternionic curve α in R 3 . Also, we support some theorems in the paper by means of an example.enIn this paper, we give some characterization of quaternionic Bertrand curves whose the torsion is non-zero but bitorsion is zero in R 4 according to Type 2-Quaternionic Frame. One of the most important points in working on quaternionic curves is that given a curve in R 4 , the curve in R 3 associated with this curve is determined individually. So, we obtain some relationships between quaternionic Bertrand curve α ( 4 ) in R 4 and its associated spatial quaternionic curve α in R 3 . Also, we support some theorems in the paper by means of an example.Article7123954061303-5991