Question
A graph shows 2 points, Point 1 is (-4, 4) and point 2 is (3, 4)
How would you find the distance between these two points?
Since the y-coordinates are the same, you would do 3 - 4 to get the distance.
Since the y-coordinates are the same, y ou would do 3 - 4 to get the distance.
Since the y-coordinates are the same, you would add -4 + 3 to get the distance.
Since the y-coordinates are the same, you would add -4 + 3 to get the distance.
Since the y-coordinates are the same, you would subtract -4 - 3 to get the distance and then take the absolute value since distance is positive.
Since the y-coordinates are the same, y ou would subtract -4 - 3 to get the distance and then take the absolute value since distance is positive.
Since the y-coordinates are the same, you would subtract 4 - 3 to get the distance.
How would you find the distance between these two points?
Since the y-coordinates are the same, you would do 3 - 4 to get the distance.
Since the y-coordinates are the same, y ou would do 3 - 4 to get the distance.
Since the y-coordinates are the same, you would add -4 + 3 to get the distance.
Since the y-coordinates are the same, you would add -4 + 3 to get the distance.
Since the y-coordinates are the same, you would subtract -4 - 3 to get the distance and then take the absolute value since distance is positive.
Since the y-coordinates are the same, y ou would subtract -4 - 3 to get the distance and then take the absolute value since distance is positive.
Since the y-coordinates are the same, you would subtract 4 - 3 to get the distance.
Answers
GPT-4o mini
To find the distance between the two points (-4, 4) and (3, 4), we can use the fact that they share the same y-coordinate (both are 4). Since we are working with horizontal coordinates, the distance between these two points will simply be the difference in their x-coordinates.
1. Identify the x-coordinates of the points:
- Point 1: x = -4
- Point 2: x = 3
2. Calculate the distance using the formula for distance when y-coordinates are the same:
\[
\text{Distance} = |x_2 - x_1| = |3 - (-4)|
\]
This simplifies to:
\[
= |3 + 4| = |7| = 7
\]
So, the distance between the points (-4, 4) and (3, 4) is 7 units.
In summary, the correct approach is:
- Since the y-coordinates are the same, calculate the distance as the absolute value of the difference between the x-coordinates: \( |3 - (-4)| = |3 + 4| = 7 \).
1. Identify the x-coordinates of the points:
- Point 1: x = -4
- Point 2: x = 3
2. Calculate the distance using the formula for distance when y-coordinates are the same:
\[
\text{Distance} = |x_2 - x_1| = |3 - (-4)|
\]
This simplifies to:
\[
= |3 + 4| = |7| = 7
\]
So, the distance between the points (-4, 4) and (3, 4) is 7 units.
In summary, the correct approach is:
- Since the y-coordinates are the same, calculate the distance as the absolute value of the difference between the x-coordinates: \( |3 - (-4)| = |3 + 4| = 7 \).