create and solve an optimization problem involving 2-D or 3-D shapes - solve the following and number it      

-present an optimization problem of some complexity that involves a 2-D or 3-D shape

-define variables used to solve your problem 

-create an equation for a function related to your problem 

-state the domain for the x value of your function (and your reasoning behind it) 

problem example: A soup can of volume 500cm3 is to be constructed. The material for the top costs 0.4 cents/cm2 while the material for the bottom and sides costs 0.2 cents/cm2 . Find the dimensions that will minimize the cost of producing the can 

- Your problem could be similar to this problem but you cant copy this problem           the criteria is  Complexity and Suitability of Problem (thinking)
-Problem can be solved by optimization
-Problem involves a complex 3-D or 2-D shape
(eg: a composite shape, hemisphere, etc)
-Problem involves an additional component on 
top of perimeter, surface area, volume, area, etc 
(eg: the cost of painting the surface rather than 
just the measure of the surface, etc)