a local florist is making two types of floral arrangements for thanksgiving: regular and special. Each regular arrangement requires 3 mums, 3 daisies, and 2 roses, and each special arrangement reguires 4 mums, 2 daisies, and 4 roses. The florist has set aside 60 mums, 54 daisies, and 52 roses for the two types of arrangements,
The florist will make a profit of $2 on each regular arrangement and $3 on each special arrangement.
1. write an objective function for the profit.
2. Create a system of inequalities to represent the constraints. Graph the feasible region.
3. identify the vertices of the feasible region.
4. how much of each type of arrangement should the florist make in order to maximize the profit? what is the maximum profit?
5. If the maximum profit is achieved, will there be any flowers left over? Explain your reasoning.
I need Help with this math it is so so hard?
I am not going to do the work for you but I will help.
The profit is what you get for each sale of each arrangement type. So the total profit is the total profit from the combined sales.
The constraints are if all of one arrangement is sold and the other is 0. There are 2.
To max the profit you need to find the combination of reg and spec arrangements that give the most money and leave as few flowers as possible.
Hope this helps
Reply:your not the only one but try using a homework help website
Reply:What do you think the answer is?
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