Refer to the accompanying graph. Complete parts (a) through (c) in order. (a) Use the nearest neighbor algorithm starting at each of the vertices in turn to determine an approximate solution to the problem of finding a minimum Hamilton circuit for the graph. In each case, find the total weight of the circuit. Starting at A, the circuit is V and the total weight is Starting at B, the circuit is V and the total weight is Starting at C, the circuit is V and the total weight is Starting at D, the circuit is V and the total weight is Starting at E, the circuit is V and the total weight is (Simplify your answers.) (b) Which of the circuits found in part (a) gives the best solution to the problem of finding a minimum Hamilton circuit for the graph? Select all that apply. OA. The circuit that started at A O B. The circuit that started at B. O C. The circuit that started at C. O D. The circuit that started at D. O E. The circuit that started at E. (c) Just by looking carefully at the graph, find a Hamilton circuit in the graph that has lower total weight than any of the circuits found in part (a). Select the correct choice below and fill in the answer box to complete your choice. (Simplify your answer.) O A. A-B-c--D-E-A, with a total weight of O B. D-C-B-E-A-D, with a total weight of OC. BA-E-C-D-B, with a total weight of O Time Remaining: 00:36:55 Submit test

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Refer to the accompanying graph. Complete parts (a) through (c) in order. (a) Use the nearest neighbor algorithm starting at each of the vertices in turn to determine an approximate solution to the problem of finding a minimum Hamilton circuit for the graph. In each case, find the total weight of the circuit. Starting at A, the circuit is V and the total weight is Starting at B, the circuit is V and the total weight is Starting at C, the circuit is V and the total weight is Starting at D, the circuit is V and the total weight is Starting at E, the circuit is V and the total weight is (Simplify your answers.) (b) Which of the circuits found in part (a) gives the best solution to the problem of finding a minimum Hamilton circuit for the graph? Select all that apply. O A. The circuit that started at A. O B. The circuit that started at B. Oc. The circuit that started at C. OD. The circuit that started at D. O E. The circuit that started at E. (c) Just by looking carefully at the graph, find a Hamilton choice. (Simplify your answer.) O A. A-B-C-D-EA, with a total weight of O B. D-C-B E→AD, with a total weight of OC. B-A-E CD-B, with a total weight of O Time Remaining: 00:36:55 Submit test