 In this video, we provide the solution to question number 14 for practice exam number three for math 1030. In which case we have an apportionment problem. We have five states, A, B, C, D, E, their populations are given here. The total population for this region is 27.4 million and we have 137 seats that we have to apportion. We're going to use Jefferson's method and for the sake of simplicity, we've already correctly found a modified divisor that works. So our modified divisor is going to be 178,000. So what we have to do is we have to take the populations of each of these states and divide them by the modified divisor we found. So we're going to take 8.24 million divided by 178,000. Feel free to use a calculator on that one. You're going to end up with 46.29. We're going to do it for B, 6.38 million divided by 178,000 is going to give you 35.84, 2.48 million divided by the modified divisor is going to give you 13.93, 4.52 million divided by 178,000 gives you 25.39. And lastly, if you take 3.3 million divided by 178,000, they give you 18.54, like so. Now with Jefferson's method, once you have your modified quotas, you're going to round each and every one of them down. So you round each of these quotas down, so 46, 35, 13, 25, 25, and 18. And you can sure enough check that 46 plus 35 plus 13 plus 25 plus 18 is equal to 137. This gives you the correct apportionment of the seeds using Jefferson's method.