In her social studies report, Suzanne included a bar graph that showed the populations of different native Americans nations in 1800. The interval she used was 2000 people. If one nation had a population represented by 2.5 intervals, how many members of this nation existed in 1800?

To find the number of members of the nation in 1800, you first need to determine the value of one interval. Since Suzanne used an interval of 2000 people, divide the population represented by 2.5 intervals by 2.5 to find the value of one interval:

Value of one interval = (Population represented by 2.5 intervals) / 2.5

Once you know the value of one interval, you can multiply it by the number of intervals (2.5) to determine the total population of the nation:

Total population of the nation = Value of one interval x 2.5

By performing these calculations, you can find how many members of this nation existed in 1800.

To find the number of members in the native American nation represented by 2.5 intervals on the bar graph, we need to calculate the total population within one interval and then multiply it by 2.5.

First, we need to determine the value of one interval on the bar graph. According to the information given, Suzanne used an interval of 2000 people. Therefore, each interval on the bar graph represents a population of 2000 people.

To find the number of people represented by one interval, we multiply the interval size (2000 people) by 1:

2000 people × 1 = 2000 people.

Now, we can calculate the population represented by 2.5 intervals. We multiply the population represented by one interval (2000 people) by 2.5:

2000 people × 2.5 = 5000 people.

Therefore, in 1800, the native American nation represented by 2.5 intervals on Suzanne's bar graph would have had a population of 5000 people.