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What else can I help you with?
What is the maximum value of 2x 5y in the feasible region?
To find the maximum value of 2x + 5y within the feasible region, you would need to evaluate the objective function at each corner point of the feasible region. The corner points are the vertices of the feasible region where the constraints intersect. Calculate the value of 2x + 5y at each corner point and identify the point where it is maximized. This point will give you the maximum value of 2x + 5y within the feasible region.
What is the minimum value of 6x plus 5y in the feasible region?
Since there is no feasible region defined, there is no answer possible.
What is the maximum value of 3x 5y in the feasible region?
The question cannot be answered because:there is no symbol shown between 3x and 5y,there is no information on the feasible region.The question cannot be answered because:there is no symbol shown between 3x and 5y,there is no information on the feasible region.The question cannot be answered because:there is no symbol shown between 3x and 5y,there is no information on the feasible region.The question cannot be answered because:there is no symbol shown between 3x and 5y,there is no information on the feasible region.
What is the maximum and minimum value of the objective function for z3x 5y?
To determine the maximum and minimum values of the objective function ( z = 3x + 5y ), we need additional constraints, typically provided in the form of inequalities. Without these constraints, the values of ( z ) can be infinitely large or small, depending on the values of ( x ) and ( y ). If specific constraints are provided, we can use methods like linear programming or graphical analysis to find the maximum and minimum values within the feasible region defined by those constraints.
Using the function f(x,y) =2x+ 5y determine the maximum value of the region if the point are (-2,3),(5,-3), and (1,4)?
f(-2,3) = 11 f(5,-3) = -5 f(1,4) = 22, maximum
What is the maximum value of 6x plus 5y in the feasible region?
(6x)(5y)
What is the maximum value of 2x plus 5y in the feasible region?
The answer obviously depends on what the boundaries of the feasibility region are.
What is the maximum value of 2x 5y in the feasible region?
To find the maximum value of 2x + 5y within the feasible region, you would need to evaluate the objective function at each corner point of the feasible region. The corner points are the vertices of the feasible region where the constraints intersect. Calculate the value of 2x + 5y at each corner point and identify the point where it is maximized. This point will give you the maximum value of 2x + 5y within the feasible region.
What is the minimum value of 6x plus 5y in the feasible region?
Since there is no feasible region defined, there is no answer possible.
What is the maximum value of 3x 5y in the feasible region?
The question cannot be answered because:there is no symbol shown between 3x and 5y,there is no information on the feasible region.The question cannot be answered because:there is no symbol shown between 3x and 5y,there is no information on the feasible region.The question cannot be answered because:there is no symbol shown between 3x and 5y,there is no information on the feasible region.The question cannot be answered because:there is no symbol shown between 3x and 5y,there is no information on the feasible region.
What is the minimum value of 3x plus 5y in the feasible region?
It is 18.
What is the minimum value of 6x plus 5y in the feasible region excluding point (0 0)?
The answer depends on the feasible region and there is no information on which to determine that.
What is the value of 6x 5y at point D in the feasible region?
Given definitions, or descriptions at least, of "point D" and "the feasible region",I might have had a shot at answering this one.
What is the minimum value of 3x plus 5y in the feasible region (07)(37)(63)(60)?
It is 18.
What is the maximum and minimum value of the objective function for z3x 5y?
To determine the maximum and minimum values of the objective function ( z = 3x + 5y ), we need additional constraints, typically provided in the form of inequalities. Without these constraints, the values of ( z ) can be infinitely large or small, depending on the values of ( x ) and ( y ). If specific constraints are provided, we can use methods like linear programming or graphical analysis to find the maximum and minimum values within the feasible region defined by those constraints.
Using the function f(x,y) =2x+ 5y determine the maximum value of the region if the point are (-2,3),(5,-3), and (1,4)?
f(-2,3) = 11 f(5,-3) = -5 f(1,4) = 22, maximum
What is the value of x if 4x equals 5y?
If: 4x = 5y Then: x = 5y/4
