3. The table below gives the populations of four districts A, B, C, and D, among which a total of 20 seats are to be apportioned. Use Jefferson's method with a modified divisor of 49,000 to allocate...

3. The table below gives the populations of four districts A, B, C, and D, among which a total of 20 seats<br>are to be apportioned. Use Jefferson's method with a modified divisor of 49,000 to allocate the seats<br>and explain how the rounding works.<br>District<br>Population<br>Modified Quota<br>Allocation<br>A<br>544,000<br>183,000<br>C<br>229,000<br>98,000<br>4. Repeat Problem 3 but use Webster's Method with a modified divisor of 52,000 and explain how the<br>rounding works.<br>District<br>Population<br>Modified Quota<br>Allocation<br>544,000<br>183,000<br>229,000<br>D<br>98,000<br>

Extracted text: 3. The table below gives the populations of four districts A, B, C, and D, among which a total of 20 seats are to be apportioned. Use Jefferson's method with a modified divisor of 49,000 to allocate the seats and explain how the rounding works. District Population Modified Quota Allocation A 544,000 183,000 C 229,000 98,000 4. Repeat Problem 3 but use Webster's Method with a modified divisor of 52,000 and explain how the rounding works. District Population Modified Quota Allocation 544,000 183,000 229,000 D 98,000

Jun 09, 2022

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3. The table below gives the populations of four districts A, B, C, and D, among which a total of 20 seats are to be apportioned. Use Jefferson's method with a modified divisor of 49,000 to allocate...

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