A rectangular container with open top is required to have a volume of 24 cubic meters. Also, one side of the rectangular base is required to be 4 meters long. If material for the base costs $8 per square meter, and material for the side's costs $2 per square meter, find the dimensions of the container so that the cost of material to make it will be a minimum. Step:1(a) Make a diagram V L (b) What formulas will be used in this problem? ( C) Figure out what the constraint is (d) What do you want to maximize or minimize? Step 2 Write down formulasStep:3 Substitute in to formula you want to maximize or minimize Step:4 Find the Critical points Step:5 Test the critical points