[img]data:image/png;base64,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[/img]

The company wants to break the city down into regions so that whenever someone orders from an address, their order is sent to the store closest to their home. They have hired you to decide how to partition the city between the 3 stores. Explain or show your reasoning.

If there are 100 employees, how should they be distributed among the 3 locations?[br]

Is there anywhere in the city that has the same distance to all 3 stores?[br]

[size=150][size=100]In 1854, there was an outbreak of cholera in London. A physician named John Snow thought the water supply might be responsible. He made a map showing the location of all the water pumps in the city and the locations of all the deaths due to cholera in the city. How could he have used the ideas in this activity to help isolate the cause of the outbreak? The diagrams you made in the activity and that Snow made are called Voronoi diagrams, and are still actively studied by mathematicians. [/size][/size]

Who might be interested in this information?[br]

Write a letter to the person or organization, explaining what the diagram tells them about the map you chose.[br]