The following question refers to a country with five states. There are 240 seats in the legislature, and the populations of the states are given in the table below.
![](data:image/png;base64, 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)
Under Jefferson's method, the apportionments to each state are
◦ State A: 11; State B: 19; State C: 109; State D: 97; State E: 4.
◦ State A: 10; State B: 18; State C: 110; State D: 98; State E: 4.
◦ State A: 10; State B: 19; State C: 110; State D: 97; State E: 4.
◦ State A: 10; State B: 19; State C: 111; State D: 97; State E: 3.
◦ none of these