Abstract
We develop a sixth order Steffensen-type method with one parameter in order to solve systems of equations. Our study's novelty lies in the fact that two types of local convergence are established under weak conditions, including computable error bounds and uniqueness of the results. The performance of our methods is discussed and compared to other schemes using similar information. Finally, very large systems of equations (100x100and200x200) are solved in order to test the theoretical results and compare them favorably to earlier works.