0
What else can I help you with?
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 minimum value of 2x plus 2y in the feasible region?
2x+2y
When a feasible region is bounded on all sides where will the maximum and minimum values of the objective function occur?
Surely, you should check the value of the function at the boundaries of the region first. Rest depends on what the function is.
What is the maximum value of 4x 3y in the feasible region?
26
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 minimum value of 6x 8y in the feasible region?
The answer depends on what the feasible region is and on what operator is between 6x and 8y.
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 minimum value of 2x plus 2y in the feasible region?
2x+2y
What is the minimum value of 6x 10y in the feasible region?
To find the minimum value of the expression (6x + 10y) in a feasible region, you need to identify the constraints defining that region. Typically, the minimum occurs at one of the vertices of the feasible set formed by these constraints. By evaluating the objective function (6x + 10y) at each vertex, you can determine which one gives the lowest output, thus identifying the minimum value. If you provide the specific constraints, I can help you find the exact minimum.
What is the minimum value of 3x plus 3y in the feasible region?
If we knew the values of 'x' and 'y', and the boundaries of the feasible region, we could answer that question quickly and easily.
What is the minimum value of 3x 4y in the feasible region?
To determine the minimum value of the expression (3x + 4y) in a feasible region, you typically need to evaluate the vertices of the region defined by any constraints. If you have specific constraints (like linear inequalities), you can graph them, find the vertices of the feasible region, and then substitute those vertex coordinates into the expression (3x + 4y) to identify the minimum value. Without specific constraints, it's impossible to provide a numerical answer.
What is the maximum value of 3x plus 3y in the feasible region?
It would depend on the feasible region.
When a feasible region is bounded on all sides where will the maximum and minimum values of the objective function occur?
Surely, you should check the value of the function at the boundaries of the region first. Rest depends on what the function is.
What is the maximum value of 4x 3y in the feasible region?
26
What is the maximum value of 5x plus 2y in the feasible region?
42
