a b s t r a c tIn this paper we consider the bifurcation of limit cycles of the systemẋ = y(for ε sufficiently small, where a, b ∈ R − {0}, and P, Q are polynomials of degree n, we obtain that up to first order in ε the upper bounds for the number of limit cycles that bifurcate from the period annulus of the quintic center given by ε = 0 are (3/2)(n + sin 2 (nπ /2)) + 1 if a = b and n − 1 if a = b. Moreover, there are systems with at least (3/2)(n + sin 2 (nπ /2)) + 1 if a = b and, n − 1 limit cycles if a = b.
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