Answer :
To determine whether the statement is true or false, let's analyze the given data:
We are provided with a list of measurements and need to count how many are within two specific intervals:
1. Interval 167 to 169 (including 167 but not 169):
- In the given list: 167, 168, 169
- The numbers that fall in this range are 167 and 168.
- Count: 2 boys
2. Interval 169 to 170 (including 169 but not 170):
- In the given list: 167, 168, 169, 170
- The number that falls in this range is 169.
- Count: 1 boy
Now that we have the counts:
- There are 2 boys between 167 and 169.
- There is 1 boy between 169 and 170.
The statement asserts that there are approximately as many boys in each of these two groups.
In mathematical terms, when we say "approximately," we often mean the numbers can be close to equal, typically allowing for a difference of 1. Here, the difference between the two counts is 1.
Therefore, given that the counts are close and differ by 1, the statement is considered to be true.
We are provided with a list of measurements and need to count how many are within two specific intervals:
1. Interval 167 to 169 (including 167 but not 169):
- In the given list: 167, 168, 169
- The numbers that fall in this range are 167 and 168.
- Count: 2 boys
2. Interval 169 to 170 (including 169 but not 170):
- In the given list: 167, 168, 169, 170
- The number that falls in this range is 169.
- Count: 1 boy
Now that we have the counts:
- There are 2 boys between 167 and 169.
- There is 1 boy between 169 and 170.
The statement asserts that there are approximately as many boys in each of these two groups.
In mathematical terms, when we say "approximately," we often mean the numbers can be close to equal, typically allowing for a difference of 1. Here, the difference between the two counts is 1.
Therefore, given that the counts are close and differ by 1, the statement is considered to be true.
