In　this　paper,　we　consider　the　existence　of　solutions　for　systems　of　nonlinear　p-Laplacian　fractional　differential　equations　whose　nonlinearity　contains　the　first-order　derivative　explicity　[GRAPHICS]　in　Banach　space　E,　where　?　is　the　zero　element　of　E,　phi(p)　is　the　p-Laplacian　operator,　i.e.,　with　p＞1,　its　inverse　function　is　denoted　by　phi(q)　with　,　and　p,q　satisfy　is　standard　Caputo　derivative　and　f:IxExEE　is　continuous.　Our　main　tool　is　the　Sadovskii　fixed　point　theorem.