Bob's Bell Phone Company makes both smart and basic phones. The company has at most 320 square inches worth of glass to use each week. A smart phone requires 10 square inches of glass, and basic phone requires 4 square inches of glass. The company only has 50 batteries to install each week. The CEO wants to quit making basic phones so she said to never make more than 40 basic phones per week. If the company makes a profit of $125 on each smart phone and $35 on each basic phone, how many of each will the company need to make to maximize profit? 1. Make a table of your "Resources." Resources Scientific(x) & Graphing(y.) Totals X-int. Y-int Max Cost ? v

both sheets are for the same problem.

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Bob's Bell Phone Company makes both smart and basic phones. The company has at most 320 square inches worth of glass to use each week. A smart phone requires 10 square inches of glass, and basic phone requires 4 square inches of glass. The company only has 50 batteries to install each week. The CEO wants to quit making basic phones so she said to never make more than 40 basic phones per week. If the company makes a profit of $125 on each smart phone and $35 on each basic phone, how many of each will the company need to make to maximize profit? 1. Make a table of your "Resources. Resources Scientific(x) & Graphing(y) Totals X-int. Y-int Мax Cost 2. Graph your inequalities by their intercepts: 1000 750 500 (0. 250) (500, 250) -250 Max-Per-Day- (0, 100 750, 100 Gost 250 500 750 1000 Scientific Caicuiaiuis dasmos Drag the intercepts to the correct location for each graph. Then click on the vertices of Graphing Calculators

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-500 (0, 250) Max-Per-Day- (500, 250) -250 (0,100 (750, 100 Cost 750 1000 desmos Scientific Caicuiators 0. 250 500 Drag the intercepts to the correct location for each graph. Then click on the vertices of your feasibility region 3. Find the vertices of your "Feasibility Region" Vertices: ** Put a comma or space between each of your vertices. 4. Find a "Profit Equation" that calculates the profits from scientific and graphing calculators: Profit (x,y) = 5. Find the best profit vertex. The small calculator company should build: Scientific Calculators Graphing Calculators With a maximum profit of Ş