Question

What is the distance between the points (14,16) and (14,-9) in the coordinate plane?

Answer 1

The distance between the points (14,16) and (14,-9) on the coordinate plane is 25 units, determined by the difference in their y-coordinates.

Step-by-step explanation:

To calculate the distance between the points (14,16) and (14,-9) on a coordinate plane, we use the distance formula for two points in a Cartesian coordinate system. However, since the x-coordinates are the same, this distance is simply the absolute difference of the y-coordinates.

The distance is found by subtracting -9 from 16, which gives us:

Distance = |16 - (-9)| = |16 + 9| = 25

Therefore, the distance between the points (14,16) and (14,-9) is 25 units.

Answer 2

The distance between the points (14,16) and (14,-9) on the coordinate plane is the absolute difference between their y-coordinates, which is 25 units.

Step-by-step explanation:

The question is asking to find the distance between two points on the coordinate plane. These points are (14,16) and (14,-9). To find the distance between two points that are vertical or horizontal from each other, you can simply calculate the difference between their x-coordinates (if they are vertical from each other) or y-coordinates (if they are horizontal from each other). Here, since the x-coordinates are the same, we know that the points are vertically aligned.

The distance is then the absolute difference between the y-coordinates, which is |16 - (-9)| = |16 + 9| = 25. Therefore, the distance between the points (14,16) and (14,-9) on the coordinate plane is 25 units.