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Author Question: An organization helping to provide meals to city shelters for the homeless has a membership of 30 ... (Read 4425 times)

Shelles

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Question 1

An organization helping to provide meals to city shelters for the homeless has a membership of 100 volunteers. They are assigned among the four city areas A, B, C, and D in proportion to the number of people fed in the respective areas. The  numbers of people fed at the city shelters in each city area are shown in the following table.

                                       

Use Adams's method to extend the table and apportion the 100 volunteers among the city areas.

                     










Question 2

An organization helping to provide meals to city shelters for the homeless has a membership of 30 volunteers. They are assigned among the four city areas A, B, C, and D in proportion to the number of people fed in the respective areas. The  numbers of people fed at the city shelters in each city area are shown in the following table.

                                       

Use Webster's method to extend the table and apportion the 30 volunteers among the city areas.

                     










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Marked as best answer by Shelles on Feb 2, 2020

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<p><span class="a_bt">Answer 1</span></p><br /><img src="data:image/png;base64, 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" alt="" /><br/><br/><p><span class="a_bt">Answer 2</span></p><br /><img src="data:image/png;base64, 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" 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Did you know?

Despite claims by manufacturers, the supplement known as Ginkgo biloba was shown in a study of more than 3,000 participants to be ineffective in reducing development of dementia and Alzheimer’s disease in older people.

Did you know?

In 1835 it was discovered that a disease of silkworms known as muscardine could be transferred from one silkworm to another, and was caused by a fungus.

Did you know?

The term pharmacology is derived from the Greek words pharmakon("claim, medicine, poison, or remedy") and logos ("study").

Did you know?

The toxic levels for lithium carbonate are close to the therapeutic levels. Signs of toxicity include fine hand tremor, polyuria, mild thirst, nausea, general discomfort, diarrhea, vomiting, drowsiness, muscular weakness, lack of coordination, ataxia, giddiness, tinnitus, and blurred vision.

Did you know?

Ether was used widely for surgeries but became less popular because of its flammability and its tendency to cause vomiting. In England, it was quickly replaced by chloroform, but this agent caused many deaths and lost popularity.

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