Which set of integers are in the right order from least to greatest? (1 point) Responses –8, 8, 6, |–7|, 5 –8, 8, 6, |–7|, 5 |–7|, –8, 8, 6, 5 |–7|, –8, 8, 6, 5 –8, 5, 6, |–7|, 8 –8, 5, 6, |–7|, 8 5, 6, 8, –8, |–7|
|–7|, –8, 5, 6, 8
The set of integers in the right order from least to greatest is: |–7|, –8, 5, 6, 8.
To determine the set of integers in the right order from least to greatest, we can compare the given numbers and arrange them accordingly:
- In the first set, -8 is the smallest, followed by -7 (since the absolute value notation |–7| means taking the positive value of -7), then 5, 6, and finally 8. So the first set is: -8, -7, 5, 6, 8.
Let's now check the other sets:
- In the second set, again, -8 is the smallest, followed by -7 (taking the absolute value), then 5, 6, and finally 8. So the second set is also: -8, -7, 5, 6, 8.
- In the third set, the order is slightly different. |–7| (which is 7) comes first, then -8, followed by 8, 6, and finally 5. Therefore, the third set is: 7, -8, 8, 6, 5.
- In the fourth set, |–7| comes first (again, 7), followed by -8, 8, 6, and finally 5. So the fourth set is: 7, -8, 8, 6, 5.
- In the fifth set, 5 is the smallest, followed by 6, 8, -8, and finally |–7| (which is again 7, after taking the absolute value). Thus, the fifth set is: 5, 6, 8, -8, 7.
- Lastly, in the sixth set, the order is the same as the fifth set, with 5 being the smallest, followed by 6, 8, -8, and |–7| (which is 7). Therefore, the sixth set is: 5, 6, 8, -8, 7.
So, the only set of integers that is in the correct order from least to greatest is: -8, -7, 5, 6, 8.