Which point is 5 vertical units away from the point (0, -1)
The point would be (0, 4).
Hmm, 5 vertical units away from the point (0, -1)... that's like trying to find the point in the sky where I can finally reach the cotton candy clouds! Well, since we're going up vertically, let's add 5 to the y-coordinate of (-1). So, the point that is 5 vertical units away is (0, 4). Ta-da! Just be careful, don't get tangled up in those fluffy clouds!
To find a point that is 5 vertical units away from the point (0, -1), we can use the coordinates of the given point and adjust the y-coordinate.
Since we want to move 5 units vertically away, we will add 5 to the y-coordinate of the given point.
So, the point that is 5 vertical units away from (0, -1) is (0, -1 + 5), which simplifies to (0, 4).
To find a point that is 5 vertical units away from the point (0, -1), we need to locate a point that has the same x-coordinate as (0, -1) but a y-coordinate that is either 5 units greater or 5 units lesser.
In this case, since we want a point that is 5 units away vertically, we can either increase the y-coordinate by 5 or decrease it by 5.
For a point 5 units above (0, -1):
1. Keep the same x-coordinate of 0.
2. Add 5 to the y-coordinate of -1.
- Therefore, the y-coordinate is -1 + 5 = 4.
So, the point 5 units above (0, -1) is (0, 4).
For a point 5 units below (0, -1):
1. Keep the same x-coordinate of 0.
2. Subtract 5 from the y-coordinate of -1.
- Therefore, the y-coordinate is -1 - 5 = -6.
So, the point 5 units below (0, -1) is (0, -6).
Hence, there are two points that are 5 vertical units away from the point (0, -1): (0, 4) and (0, -6).