A tourist is staying in Toronto, Canada, and would like to visit four other Canadian cities by train. The visitor wants to go from one city to the next and return to Toronto while minimizing the total travel distance. The distances between cities, in kilometers, are given in the following table. Represent the distances between the cities using a weighted graph; then have a Hamilton circuit which has the lowest computed value. Toronto Kingston Niagara Falls Ottawa Windsor Toronto 259 142 423 381 | Kingston 259 397 174 623 307 562 402

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5. A tourist is staying in Toronto, Canada, and would like to visit four other
Canadian cities by train. The visitor wants to go from one city to the next and
return to Toronto while minimizing the total travel distance. The distances
between cities, in kilometers, are given in the following table. Represent the
distances between the cities using a weighted graph; then have a Hamilton
circuit which has the lowest computed value.
Тогonto
Kingston
Niagara Falls
Ottawa
Windsor
Toronto
259
142
423
381
Kingston
259
397
174
623
Niagara Falls
142
397
562
402
-
Ottawa
423
174
562
787
Windsor
381
623
402
787
N 2: PLANARITY AND EULER'S FORMULA
Transcribed Image Text:5. A tourist is staying in Toronto, Canada, and would like to visit four other Canadian cities by train. The visitor wants to go from one city to the next and return to Toronto while minimizing the total travel distance. The distances between cities, in kilometers, are given in the following table. Represent the distances between the cities using a weighted graph; then have a Hamilton circuit which has the lowest computed value. Тогonto Kingston Niagara Falls Ottawa Windsor Toronto 259 142 423 381 Kingston 259 397 174 623 Niagara Falls 142 397 562 402 - Ottawa 423 174 562 787 Windsor 381 623 402 787 N 2: PLANARITY AND EULER'S FORMULA
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