Aggregating linear complementarity problems under a general definition of constrained consistency leads to the possibility of consistent aggregation of linear and quadratic programming models and bimatrix games. Under this formulation, consistent aggregation of dual variables is also achieved. Furthermore, the existence of multiple sets of aggregation operators is discussed and illustrated with a numerical example. Constrained consistency can also be interpreted as a disaggregation rule. This aspect of the problem may be important for implementing macro (economic) policies by means of micro (economic) agents.