of the following numbers which is an integer but does not belong to either of the subsets of integers -13, 0, or 13? I believe it's -13
You are correct. -13 is an integer but it does not belong to either of the subsets of integers mentioned (-13 belongs to both the subset of negative integers and the subset of odd integers).
Which of the following is an intrigger but not a whole number 0 - 2 7 783
The number -13 does indeed belong to the subset of integers.
The number that is an integer but does not belong to either of the subsets -13, 0, or 13 is 14.
To determine which number is an integer but does not belong to either of the subsets -13, 0, or 13, we need to understand what constitutes an integer and the subsets mentioned.
Integers are whole numbers (without fractional or decimal parts) that can be positive, negative, or zero. In this case, we are looking for an integer that is not part of the subsets -13, 0, or 13.
The subsets mentioned consist of -13, 0, and 13. Therefore, we need to find an integer that is distinct from these numbers.
From the given subsets, we see that -13 is part of the set -13. So, -13 is not the correct answer.
Similarly, 0 is part of the set {0}. Therefore, 0 is not the correct answer.
However, 13 is not part of any subset mentioned, so it fulfills the condition of being an integer but not belonging to the given subsets. Therefore, the correct answer is 13.
In summary, the integer that does not belong to either of the subsets -13, 0, or 13 is 13.