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The present paper deals with the differential geometry of a Lagrange space endowed with  generalized $(\gamma, \beta)$-metric, where $\gamma$ is an $m^{th}$-root  metric and $\beta$ is a 1-form. We obtain fundamental tensor, its inverse, Euler-Lagrange equations, semispray coefficients and canonical nonlinear connection for a Lagrange space with $(\gamma, \beta)$-metric. Several other properties of such space are also discussed.

Lagrange spaces, Generalized $(\gamma,\beta)$-metric, Euler-Lagrange equations, Canonical semispray, Nonlinear connection.

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P. L. Antonelli (ed.), textit{Handbook of Finsler geometry}, Kluwer Acad. Publ., Dordrecht, 2003.

R. Miron, textit{Finsler-Lagrange spaces with $(alpha, beta)$-metrics and Ingarden spaces}, Rep. Math. Phys., 58(3) (2006), 417-431.

R. Miron and M. Anastasiei, textit{The geometry of Lagrange spaces: Theory and Applications}, Kluwer Acad. Publ., 1994.

Suresh K. Shukla and P. N. Pandey, textit{Rheonomic Lagrange spaces with $(alpha, beta)$-metric}, Int. J. Pure Appl. Math., 83(3) (2013), 425-438.

Suresh K. Shukla and P. N. Pandey, textit{Lagrange spaces with $(gamma, beta)$-metric}, Geometry, vol. 2013, Article ID 106393, 7 pages, 2013. doi:10.1155/2013/106393.