Explanation Given: Maximize: z = 8 x + 4 y x + y ≤ 4 3 x + 12 y ≤ 36 x ≥ 0 y ≥ 0 Explanation: Provided inequality x + y ≤ 4 : x + y = 4 Put x = 0 to find value of y : x + y = 4 0 + y = 4 y = 4 Thus, the obtained point to plot the equation is ( 0 , 4 ) . Now, put y = 0 to find the value of x : x + y = 4 x + 0 = 4 x = 4 Thus, the obtained point to plot the equation is ( 4 , 0 ) . Check for the inequality x + y ≤ 4 for the test point ( 0 , 0 ) : 0 + 0 ≤ 4 0 ≤ 4 Thus, the inequality is true for test point. Therefore, the shaded region is toward the test point. Provided inequality 3 x + 12 y ≤ 36 3 x + 12 y = 36 Put x = 0 to find value of y : 3 x + 12 y = 36 3 × 0 + 12 y = 36 y = 3 Thus, the obtained point to plot the equation is ( 0 , 3 ) . Now, put y = 0 to find the value of x : 3 x + 12 y = 36 3 x + 12 × 0 = 36 x = 12 Thus, the obtained point to plot the equation is ( 12 , 0 ) . Check for the inequality 3 x + 12 y ≤ 36 for the test point ( 0 , 0 ) : 3 x + 12 y ≤ 36 0 ≤ 36 Thus, the inequality is true for test point. Therefore, the shaded region is toward the test point. As for inequality x ≥ 0 , shaded portion is for all positive values of x , that is, complete quadrant first and fourth. As for inequality y ≥ 0 , shaded portion is for all positive values of y , that is, complete quadrant first and second. The obtained graph is As the plotted graph is bounded, objective function will be maximum at one of its corner points. Now, to find the solution of objective function z , follow the method given below. As shown in the figure above, the corner points are A = ( 0 , 3 ) , B = ( 0 , 0 ) , and C = ( 4 , 0 )

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Chapter 3, Problem 32RE

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The solution of objective function z, that is, to minimize objective function z=8x+4y by solving linear programming problem x≥0, y≥0, x+y≤4, and 3x+12y≤36 using graphical method.

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Chapter 3, Problem 31RE

Chapter 3, Problem 33RE

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Finite Mathematics (11th Edition)

Ch. 3.1 - Graph each linear inequality. x + y 2 Ch. 3.1 - Graph each linear inequality. y x + 1 Ch. 3.1 - Graph each linear inequality. x 2 y Ch. 3.1 - Graph each linear inequality. y x 3 Ch. 3.1 - Graph each linear inequality. 4x y 6 Ch. 3.1 - Graph each linear inequality. 4y + x 6 Ch. 3.1 - Graph each linear inequality. 7. 4x + y 8 Ch. 3.1 - Graph each linear inequality. 2x y 2 Ch. 3.1 - Graph each linear inequality. x + 3y 2 Ch. 3.1 - Graph each linear inequality. 2x + 3y 6

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The solution of objective function z , that is, to minimize objective function z = 8 x + 4 y by solving linear programming problem x ≥ 0 , y ≥ 0 , x + y ≤ 4 , and 3 x + 12 y ≤ 36 using graphical method.

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The solution of objective function z, that is, to minimize objective function z=8x+4y by solving linear programming problem x≥0, y≥0, x+y≤4, and 3x+12y≤36 using graphical method.

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