Consider the following all-integer linear program. Max 1x1 + 1x2 s.t. 5x1 + 7x2 ≤ 42 1x1 + 6x2 ≤ 18 2x1 + 1x2 ≤ 15 x1, x2 ≥ 0 and integer (a) Graph the constraints for this problem. Use dots to indicate all feasible integer solutions. On the coordinate plane the horizontal axis is labeled x₁ and the vertical axis is labeled x₂. A region bounded by a series of connected line segments and several points are on the graph. The line segments connect the approximate points (0, 7.5), (1, 7), (2.09, 5.48), and (3, 0). The region is above the horizontal axis, to the right of the vertical axis, and below the line segments. All ordered pairs with integer values in the region, on the series of connected line segments, but not on the horizontal nor vertical axes, are shown. On the coordinate plane the horizontal axis is labeled x₁ and the vertical axis is labeled x₂. A region bounded by a series of connected line segments and several points are on the graph. The line segments connect the approximate points (0, 3), (5.48, 2.09), (7, 1), and (7.5, 0). The region is above the horizontal axis, to the right of the vertical axis, and below the line segments. All ordered pairs with integer values in the region, on the series of connected line segments, but not on the horizontal nor vertical axes, are shown. On the coordinate plane the horizontal axis is labeled x₁ and the vertical axis is labeled x₂. A region bounded by a series of connected line segments and several points are on the graph. The line segments connect the approximate points (0, 3), (5.48, 2.09), (7, 1), and (7.5, 0). The region is above the horizontal axis, to the right of the vertical axis, and below the line segments. All ordered pairs with integer values in the region and on its boundaries are shown. On the coordinate plane the horizontal axis is labeled x₁ and the vertical axis is labeled x₂. A region bounded by a series of connected line segments and several points are on the graph. The line segments connect the approximate points (0, 7.5), (1, 7), (2.09, 5.48), and (3, 0). The region is above the horizontal axis, to the right of the vertical axis, and below the line segments. All ordered pairs with integer values in the region and on its boundaries are shown. (b) Solve the LP Relaxation of this problem. 4 at (x1, x2) = 4.2,0.6 (c) Find the optimal integer solution. at (x1, x2) = 0,7
Consider the following all-integer linear program. Max 1x1 + 1x2 s.t. 5x1 + 7x2 ≤ 42 1x1 + 6x2 ≤ 18 2x1 + 1x2 ≤ 15 x1, x2 ≥ 0 and integer (a) Graph the constraints for this problem. Use dots to indicate all feasible integer solutions. On the coordinate plane the horizontal axis is labeled x₁ and the vertical axis is labeled x₂. A region bounded by a series of connected line segments and several points are on the graph. The line segments connect the approximate points (0, 7.5), (1, 7), (2.09, 5.48), and (3, 0). The region is above the horizontal axis, to the right of the vertical axis, and below the line segments. All ordered pairs with integer values in the region, on the series of connected line segments, but not on the horizontal nor vertical axes, are shown. On the coordinate plane the horizontal axis is labeled x₁ and the vertical axis is labeled x₂. A region bounded by a series of connected line segments and several points are on the graph. The line segments connect the approximate points (0, 3), (5.48, 2.09), (7, 1), and (7.5, 0). The region is above the horizontal axis, to the right of the vertical axis, and below the line segments. All ordered pairs with integer values in the region, on the series of connected line segments, but not on the horizontal nor vertical axes, are shown. On the coordinate plane the horizontal axis is labeled x₁ and the vertical axis is labeled x₂. A region bounded by a series of connected line segments and several points are on the graph. The line segments connect the approximate points (0, 3), (5.48, 2.09), (7, 1), and (7.5, 0). The region is above the horizontal axis, to the right of the vertical axis, and below the line segments. All ordered pairs with integer values in the region and on its boundaries are shown. On the coordinate plane the horizontal axis is labeled x₁ and the vertical axis is labeled x₂. A region bounded by a series of connected line segments and several points are on the graph. The line segments connect the approximate points (0, 7.5), (1, 7), (2.09, 5.48), and (3, 0). The region is above the horizontal axis, to the right of the vertical axis, and below the line segments. All ordered pairs with integer values in the region and on its boundaries are shown. (b) Solve the LP Relaxation of this problem. 4 at (x1, x2) = 4.2,0.6 (c) Find the optimal integer solution. at (x1, x2) = 0,7
Practical Management Science
6th Edition
ISBN:9781337406659
Author:WINSTON, Wayne L.
Publisher:WINSTON, Wayne L.
Chapter5: Network Models
Section: Chapter Questions
Problem 45P
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Consider the following all-integer linear program.
| Max | 1x1 | + | 1x2 | |
| s.t. | ||||
| 5x1 | + | 7x2 ≤ | 42 | |
| 1x1 | + | 6x2 ≤ | 18 | |
| 2x1 | + | 1x2 ≤ | 15 | |
| x1, x2 ≥ 0 and integer |
(a)
Graph the constraints for this problem. Use dots to indicate all feasible integer solutions.
On the coordinate plane the horizontal axis is labeled x₁ and the vertical axis is labeled x₂. A region bounded by a series of connected line segments and several points are on the graph.
- The line segments connect the approximate points (0, 7.5), (1, 7), (2.09, 5.48), and (3, 0).
- The region is above the horizontal axis, to the right of the vertical axis, and below the line segments.
- All ordered pairs with integer values in the region, on the series of connected line segments, but not on the horizontal nor vertical axes, are shown.
On the coordinate plane the horizontal axis is labeled x₁ and the vertical axis is labeled x₂. A region bounded by a series of connected line segments and several points are on the graph.
- The line segments connect the approximate points (0, 3), (5.48, 2.09), (7, 1), and (7.5, 0).
- The region is above the horizontal axis, to the right of the vertical axis, and below the line segments.
- All ordered pairs with integer values in the region, on the series of connected line segments, but not on the horizontal nor vertical axes, are shown.
On the coordinate plane the horizontal axis is labeled x₁ and the vertical axis is labeled x₂. A region bounded by a series of connected line segments and several points are on the graph.
- The line segments connect the approximate points (0, 3), (5.48, 2.09), (7, 1), and (7.5, 0).
- The region is above the horizontal axis, to the right of the vertical axis, and below the line segments.
- All ordered pairs with integer values in the region and on its boundaries are shown.
On the coordinate plane the horizontal axis is labeled x₁ and the vertical axis is labeled x₂. A region bounded by a series of connected line segments and several points are on the graph.
- The line segments connect the approximate points (0, 7.5), (1, 7), (2.09, 5.48), and (3, 0).
- The region is above the horizontal axis, to the right of the vertical axis, and below the line segments.
- All ordered pairs with integer values in the region and on its boundaries are shown.
(b)
Solve the LP Relaxation of this problem.
4 at
(x1, x2) =
4.2,0.6
(c)
Find the optimal integer solution.
at
(x1, x2) =
0,7
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