Angle MNO with M(-2, 2), N(0, -2), O(1, 0); 180°. Where is N?
The given information states that the angle MNO is 180°. Angle MNO is formed by two line segments: MN and NO. MN connects points M(-2, 2) and N(0, -2), while NO connects points N(0, -2) and O(1, 0).
To find the position of N, we need to determine the coordinates of point N. By looking at the given information, we can see that N is the endpoint of MN and the starting point of NO.
Therefore, the coordinates of N are N(0, -2).
To find the location of point N, we will use the given information about angle MNO and the coordinates of points M and O.
1. Start by plotting the given points on a coordinate plane.
M(-2, 2)
N(0, -2)
O(1, 0)
2. Draw lines connecting the points M, N, and O.
3. Since we know that angle MNO is 180 degrees, we can conclude that point N lies on the line segment MO, which is a straight line passing through points M and O.
Therefore, the location of point N is on the line segment MO, which connects points M(-2, 2) and O(1, 0).
To determine the location of point N, we can use the given coordinates of points M, N, and O.
Given:
Point M has coordinates M(-2, 2)
Point N has coordinates N(0, -2)
Point O has coordinates O(1, 0)
We want to find the location of point N, which corresponds to the coordinates (x, y) of N.
Since we know the coordinates of point N as N(0, -2), we can conclude that point N is located at the x-coordinate of 0 and the y-coordinate of -2.
Therefore, point N is located at (0, -2).