To find the maximum value of the expression (5x + 2y) in a feasible region, you would typically use methods such as linear programming, considering constraints that define the feasible region. By evaluating the vertices of the feasible region, you can determine the maximum value. Without specific constraints provided, it's impossible to give a numerical answer. Please provide the constraints for a detailed solution.
To find the maximum value of (2x + 2y) in the feasible region, you typically need to identify the constraints that define this region, often in the form of inequalities. Then, you would evaluate the objective function at the vertices of the feasible region, which are the points of intersection of the constraints. The maximum value will be found at one of these vertices. If you provide the specific constraints, I can help you calculate the maximum value.
To find the minimum value of (2x + 2y) in a feasible region, you typically need to know the constraints that define that region. If you have a specific set of inequalities or constraints, you can apply methods like the corner point theorem or linear programming techniques to evaluate the objective function at the vertices of the feasible region. Without specific constraints, it's impossible to determine the minimum value accurately. If you provide the constraints, I can assist you further in finding the minimum.
9
Put x = 1 in the equation. So 6*1 - 2y = 12 that is, 6 - 2y = 12 Subtract 6 from both sides: -2y = 6 Divide both sides by -2: y = 6/-2 = -6/2 = -3
Unless y has a numerical value, it would be 2y.
42
14
To find the maximum value of (2x + 2y) in the feasible region, you typically need to identify the constraints that define this region, often in the form of inequalities. Then, you would evaluate the objective function at the vertices of the feasible region, which are the points of intersection of the constraints. The maximum value will be found at one of these vertices. If you provide the specific constraints, I can help you calculate the maximum value.
2x+2y
The question cannot be answered because:there is no symbol shown between 2y and x,there is no information on the feasible region.The question cannot be answered because:there is no symbol shown between 2y and x,there is no information on the feasible region.The question cannot be answered because:there is no symbol shown between 2y and x,there is no information on the feasible region.The question cannot be answered because:there is no symbol shown between 2y and x,there is no information on the feasible region.
To find the minimum value of (2x + 2y) in a feasible region, you typically need to know the constraints that define that region. If you have a specific set of inequalities or constraints, you can apply methods like the corner point theorem or linear programming techniques to evaluate the objective function at the vertices of the feasible region. Without specific constraints, it's impossible to determine the minimum value accurately. If you provide the constraints, I can assist you further in finding the minimum.
1y
1y
If you want to ask questions about the "region shown", then it would have helped if you could make sure that there is some region that is shown. However, given the limitations of the browser used by this site, you do not have much of a hope!
If: 2Y+3 = 11 then the value of Y is 4
If: 2y-10 = 8 Then: y = 9
7