We dene a Bertrand-B curve in Riemannian manifold M such that there
exists an isometry \phi of M, that is, \left( \phi \circ \beta \right) (s)=X\left( s,t(s)\right) and the binormal vector of another curve \beta is the paralel vector of binormal vector of \alpha at corresponding points. We obtain the conditions of existence of a Bertrand-B curve in the event E^3, S^3 and H^3 of M. The rst of our main results is that the curve \alpha in E^3 is a Bertrand-B curve if and only if it is planar. Second one, we prove that the curve \alpha with the curvatures \epsilon _{1},\epsilon _{2} in S^3 is a Bertrand-B curve if and only if it is satises \epsilon _{1}^{2}+\epsilon _{2}^{2}=1. Finally, we state that there not exists a Bertrand-B curve in H^3.

M. Barros, "General helices and a theorem of Lancret." Proceedings of the American Mathematical Society 125.5: 1503-1509, 1997.

J. Bertrand, "Mémoire sur la théorie des courbes à double courbure." Journal de Mathématiques Pures et Appliquées, 332-350, 1850.

R, Blum, "A remarkable class of Mannheim curves." Canad. Math. Bull 9.2: 223-228,1966.

J. H. Choi, T. H. Kang, and Y. H. Kim, "Bertrand curves in 3-dimensional space forms." Applied Mathematics and Computation 219.3: 1040-1046,2012.

J. H. Choi, T. H. Kang, and Y. H. Kim, "Mannheim curves in 3-dimensional space forms." Bulletin of the Korean Mathematical Society 50.4: 1099-1108,2013.

A. O. Öğrenmiş, H. Öztekin, and M. Ergüt, "Bertrand curves in Galilean space and their characterizations." Kragujevac Journal of Mathematics 32.32: 139-147,2009.

K. Orbay, and E. Kasap, "On Mannheim partner curves in E3." International Journal of Physical Sciences 4.5: 261-264,2009.

J. A. Thorpe, Elementary topics in differential geometry. Springer Science & Business Media, 2012.

F. Yerlikaya, S. Karaahmetoglu, and I. Aydemir. "ON THE BERTRAND B-PAIR CURVES IN 3-DIMENSIONAL EUCLIDEAN SPACE." Journal of Science and Arts 3: 215-224,2016.

M. Y. Yilmaz, and M. Bektaş. "General properties of Bertrand curves in Riemann–Otsuki space." Nonlinear Analysis: Theory, Methods & Applications 69.10: 3225-3231,2008.

S. Yılmaz, and M. Turgut. "A new version of Bishop frame and an application to spherical images." Journal of Mathematical Analysis and Applications 371.2: 764-776,2010.

W. Zhao, D. Pei, and X. Cao. "Mannheim curves in nonflat 3-dimensional space forms." Advances in Mathematical Physics, 2015.