Linear Programming  The Graphical Method
posted by siri
Solve the linear programming programming by graphing and then determining which vertex minimizes the objective function G=4x+3y .
{5x+15y≥15
{5x+5y≥35
{x≥0
{y≥0
x =
y =
What is the minimum value? G=

Steve
This web site is very useful:
http://www.zweigmedia.com/RealWorld/LPGrapher/lpg.html
Respond to this Question
Similar Questions

Math
graphing method to solve linear programming problem. z=8x+12y 40x+80y=560 6x+8y=72 x=0y=0 Is there a short cut to find the mmaximum without using the graph? 
Mathlinear programming
Which of the following mathematical relationships could be found in a linear programming model? 
Linear Programming
Tab 1: Linear Program: 50 points Consider the Linear Program: Max 2A + 3B s.t. 1A + 2B <= 6 5A + 3B <= 15 A, B >= 0 Use the Solver function of MS Excel to determine the optimal solution for this problem. What is the value … 
calculus
1)Which term best describes the linear programming situation represented by x+y=2 why is the answer infeasible? 
Precalculus
1)Which term best describes the linear programming situation represented by x+y=2 why is the answer infeasible? 
Tod
Solve the linear programming programing by graphing and then determining which vertex minimizes the objective function C=3x+5y. {x+y≥40 {2x+3y≥60 {x≥0 {y≥0 x = y = What is the minimum value? 
ST
linear programming programming by graphing and then determining which vertex minimizes the objective function G=4x+3y . {5x+15y≥15 {5x+5y≥35 {x≥0 {y≥0 x = y = What is the minimum value? 
linear programming problem
Consider the linear programming problem: Maximize P=60x+50y. x+y≤80 5x+10y≤560 50x+20y≤1600 x≥0 y≥0 Use the simplex method to solve the problem. Use s, t, and u as your slack variables for the first, second, and third inequalities … 
math
Solve the linear programming problem by the method of corners. Find the minimum and maximum of P = 3x + 2y subject to 3x + 5y ≥ 20 3x + y ≤ 16 −2x + y ≤ 2 x ≥ 0, y ≥ 0 The minimum is P = at (x, y) = 
math
Solve the linear programming problem by the method of corners. Find the minimum and maximum of P = 3x + 2y subject to 3x + 5y ≥ 20 3x + y ≤ 16 −2x + y ≤ 2 x ≥ 0, y ≥ 0 The minimum is P = at (x, y) =