The Civic Arts Guild is having a show. There is room for 33 booths. The guild has 80 painters, 59 sculptors, and 57 weavers. Use the Hamilton method to apportion the booths to each of the three groups. The painters should have booths, the sculptors should have booths, and the weavers should have booths.

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### Booth Allocation Using the Hamilton Method

The Civic Arts Guild is organizing a show with space for 33 booths. The guild comprises 80 painters, 59 sculptors, and 57 weavers. To allocate the booths fairly among these groups, we will utilize the Hamilton method. 

Please calculate the number of booths each group should receive:

- The painters should have [ ] booths.
- The sculptors should have [ ] booths.
- The weavers should have [ ] booths.

The Hamilton method ensures a fair distribution based on proportional representation. You will need to determine the initial allocation and then distribute any remaining booths by following this method.
Transcribed Image Text:### Booth Allocation Using the Hamilton Method The Civic Arts Guild is organizing a show with space for 33 booths. The guild comprises 80 painters, 59 sculptors, and 57 weavers. To allocate the booths fairly among these groups, we will utilize the Hamilton method. Please calculate the number of booths each group should receive: - The painters should have [ ] booths. - The sculptors should have [ ] booths. - The weavers should have [ ] booths. The Hamilton method ensures a fair distribution based on proportional representation. You will need to determine the initial allocation and then distribute any remaining booths by following this method.
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