In this paper, we consider correcting an inconsistent set of linear inequalities by minimal changes in problem data using the l2-norm. A new formulation of the problem is introduced, which involves minimizing a nonconvex fractional function. Then by utilizing the generalized Newton (GN) method, two heuristic algorithms are developed to solve the fractional minimization problem. We further consider correcting inconsistent linear inequalities with extra non-negativity constraints on the variables. For this specific case, we also propose two heuristic algorithms. Finally, we report encouraging numerical results. [ABSTRACT FROM AUTHOR]