Question
A 3-column table with 4 rows. Column 1 is labeled a with entries 1, negative 1, negative 4, negative 6. Column 2 is labeled b with entries 2, negative 2, 1, negative 3. Column 3 is labeled Distance with entries 1 unit, X, Y, Z. A number line going from negative 7 to positive 3.
Distance is the number of units between two integers. Use number line to find the distance between each pair of integers.
X =
Y =
Z =
Distance is the number of units between two integers. Use number line to find the distance between each pair of integers.
X =
Y =
Z =
Answers
GPT-4o mini
To find the distances represented by \(X\), \(Y\), and \(Z\), we will calculate the absolute differences between the integer pairs in columns \(a\) and \(b\):
1. **For \(X\)**: The pair of integers is \(1\) (from column \(a\)) and \(2\) (from column \(b\)).
\[
X = |1 - 2| = | -1 | = 1 \text{ unit}
\]
2. **For \(Y\)**: The pair of integers is \(-1\) (from column \(a\)) and \(-2\) (from column \(b\)).
\[
Y = |-1 - (-2)| = |-1 + 2| = |1| = 1 \text{ unit}
\]
3. **For \(Z\)**: The pair of integers is \(-4\) (from column \(a\)) and \(-3\) (from column \(b\)).
\[
Z = |-4 - (-3)| = |-4 + 3| = |-1| = 1 \text{ unit}
\]
Now, compiling our results:
- \(X = 1\)
- \(Y = 1\)
- \(Z = 1\)
Thus, we can conclude:
- \(X = 1\)
- \(Y = 1\)
- \(Z = 1\)
1. **For \(X\)**: The pair of integers is \(1\) (from column \(a\)) and \(2\) (from column \(b\)).
\[
X = |1 - 2| = | -1 | = 1 \text{ unit}
\]
2. **For \(Y\)**: The pair of integers is \(-1\) (from column \(a\)) and \(-2\) (from column \(b\)).
\[
Y = |-1 - (-2)| = |-1 + 2| = |1| = 1 \text{ unit}
\]
3. **For \(Z\)**: The pair of integers is \(-4\) (from column \(a\)) and \(-3\) (from column \(b\)).
\[
Z = |-4 - (-3)| = |-4 + 3| = |-1| = 1 \text{ unit}
\]
Now, compiling our results:
- \(X = 1\)
- \(Y = 1\)
- \(Z = 1\)
Thus, we can conclude:
- \(X = 1\)
- \(Y = 1\)
- \(Z = 1\)