We consider cyclic codes associated to quadratic trace forms in variables determined by a family of -linearized polynomials over , and three related codes , and . We describe the spectra for all these codes when is an even rank family, in terms of the distribution of ranks of the forms in the family , and we also compute the complete weight enumerator for . In particular, considering the family , with fixed in , we give the weight distribution of four parametrized families of cyclic codes , , and over with zeros , , and respectively, where with prime, is a generator of and is even. Finally, we give simple necessary and sufficient conditions for Artin-Schreier curves , prime, associated to polynomials to be optimal. We then obtain several maximal and minimal such curves in the case and .