what are thevvalues of each vertex in the objective function
p=5x+6y
what is the maximum value
The vertex values in the objective function p = 5x + 6y cannot be determined without additional information.
To find the maximum value of the objective function, we need to know the constraints or the feasible region that the values of x and y can take. Without this information, we cannot determine the maximum value.
To determine the values of each vertex in the objective function, we need to solve a system of linear inequalities. However, as the inequalities are not specified, we cannot determine the values of each vertex.
To find the maximum value of the objective function p = 5x + 6y, we need more information such as constraints or a feasible region. Without additional information, we cannot determine the maximum value of the objective function.
To find the values of each vertex in the objective function, you need to solve the linear programming problem and determine the feasible region. However, from the given objective function p = 5x + 6y, it appears that you're looking for the maximum value.
Since we don't have any constraints or additional information about the problem, we can assume that x and y are unrestricted. In this case, it means that x and y can take any real values.
To find the maximum value of p = 5x + 6y, we know that we need to consider the highest possible values for x and y to maximize the objective function.
If we assume that x and y can take infinite values, there is no upper limit for their values. Therefore, the maximum value of p = 5x + 6y doesn't exist.
However, please provide additional information or constraints if available, which will help in finding the maximum value.