A cereal manufacturer makes two different kinds of cereal, Senior Citizen’s Feast and Kids Go. Each pound of Senior Citizen’s Feast requires 0.6 lb of wheat and 0.2 lb of vitamin-enriched syrup, and each pound of Kids Go requires 0.4 lb of wheat, 0.2 lb of sugar, and 0.2 lb of vitamin-enriched syrup. Suppliers can deliver at most 3200 lb of wheat, at most 1000 lb of sugar, and at least 1200 lb of the vitamin-enriched syrup. (a) Write the inequalities that describe how many pounds of each type of cereal can be made. (Let x represent the number of pounds of Senior Citizen’s Feast, and let y represent the number of pounds of Kids Go.) wheat constraint vitamin-enriched syrup constraint sugar constraint x ≥ 0 pounds of Senior Citizen’s Feast constraint y ≥ 0 pounds of Kids Go constraint (b) Graph the region determined by these constraint inequalities.