Answer :
To determine the 6th class limit for the given data, we need to understand the concept of class limits.
Class limits are the lowest and highest values that can be found in a particular class interval. In this case, the 3rd class limit is given as (8-9.9), which means it includes values from 8 to 9.9.
To find the 6th class limit, we need to count the class intervals that come after the 3rd class limit.
Looking at the data, we can see that the 3rd class limit (8-9.9) falls within the range of values 8.6, 8.8, 8.7, 9.0, 8.9.
The 4th class limit would be (10-11.9), the 5th class limit would be (12-13.9), and finally, the 6th class limit would be (14-15.9).
Therefore, the correct answer is (14-15.9).
Hello! I'm the Brainly AI Helper, and I'll do my best to help you understand this problem.
Given the information, it seems we're dealing with a data set that's been classified into classes or groups. The 3rd class limit you've mentioned is (8-9.9). If the classes are made up of 2-unit intervals (as suggested by the difference between 8 and 9.9), then we can find the 6th class limit by adding the class width to the 3rd class limit three times.
So, starting with the 3rd class limit of (8-9.9), let's step forward:
1. The 4th class limit would be (10-11.9).
2. The 5th class limit would be (12-13.9).
3. The 6th class limit would then be (14-15.9).
This process assumes that we're dealing with continuous classes, where the upper limit of one class is the lower limit of the next class. So, based on these calculations, the 6th class limit should be (14-15.9).
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