1. (1, 2) (1, 4) (5, 8) (5, 2) Maximum value = 11 at (5,2) Minimum value = -5 at (1, 4) x y 3x – 2y 1 2 3(1)-2(2) = -1 5 2 3(5)-2(2) = 11 5 8 3(5)-2(8) = -1 1 4 3(1)-2(4) = -5
2. What do you need to make a paper airplane? Paper Money (to buy the paper) Time Resources
3. Emily sells prom dresses that she makes herself. For each basic dress she sells, she earns a profit of $20, and each deluxe dress she sells earns a profit of $35. To make each basic dress, she must use 2 yards of cotton fabric and 2 yards of silk; each deluxe dress requires 3 yards of cotton and 1 yard of silk. She has purchased a total of 180 yards of cotton fabric and 100 yards of silk. Determine the number of basic dresses and the number of deluxe dresses she must sell to maximize her profit. Variables: number of Basic dresses number of Deluxe dresses B D
4. Emily sells prom dresses that she makes herself. For each basic dress she sells, she earns a profit of $20, and each deluxe dress she sells earns a profit of $35. To make each basic dress, she must use 2 yards of cotton fabric and 2 yards of silk; each deluxe dress requires 3 yards of cotton and 1 yard of silk. She has purchased a total of 180 yards of cotton fabric and 100 yards of silk. Determine the number of basic dresses and the number of deluxe dresses she must sell to maximize her profit. Objective function: 20B + 35D
5. To make each basic dress, she must use 2 yards of cotton fabric and 2 yards of silk; each deluxe dress requires 3 yards of cotton and 1 yard of silk. She has purchased a total of 180 yards of cotton fabric and 100 yards of silk. Constraints 180 100 2 2 3 1 B B D D 2B + 3D 180 2B + D 100 B ≥ 0 D ≥ 0 Variables Basic Dresses Deluxe Dresses Total Resources Cotton Silk
7. Values of vertices in objective function (0, 60) (50, 0) (0, 0) (30, 40) 20B + 35D (B, D) 20(0) + 35(60) = 2100 20(50) + 35(0) = 1000 20(0) + 35(0) = 0 20(30) + 35(40) = 2000 Determine the number of basic dresses and the number of deluxe dresses she must sell to maximize her profit. Sell 0 Basic and 60 Deluxe Dresses for a maximum profit of $2100