Rotate the point (5,8) on a geometric figure 180 degrees clockwise. What is the new point
FOR THOSE WHO HAVE IT DIFERENT ITS
-5,-8
4,6
4,-2
-4,2
4,-2
alright i have the answers their all right
8, -5
-6, 4
-8, 5
6 -4
-5, 9
THANK YOU SM SILLY5 IS RIGHT!!! 100%
To rotate a point (x, y) 180 degrees clockwise, we can multiply both the x and y coordinates by -1 and then switch the signs.
For the point (5, 8), the new x-coordinate will be -5 and the new y-coordinate will be -8.
Therefore, the new point after rotating 180 degrees clockwise is (-5, -8).
silly 5 for me the first one is not even a option nore question 3 so do i go with joshuas answers?
Rotate the point ( -4, -6) on a geometric figure 180 degree’s counterclockwise. What is the new point
To rotate a point (x, y) 180 degrees counterclockwise, we can multiply both the x and y coordinates by -1, and then switch the signs.
For the point (-4, -6), the new x-coordinate will be -(-4) = 4, and the new y-coordinate will be -(-6) = 6.
Therefore, the new point after rotating 180 degrees counterclockwise is (4, 6).
To rotate a point (x, y) 180 degrees clockwise, you can follow these steps:
1. Take the negative of the original x-coordinate, -x, to find the new x-coordinate.
2. Take the negative of the original y-coordinate, -y, to find the new y-coordinate.
Let's apply these steps to the given point (5, 8):
1. x = 5, so the new x-coordinate is -5.
2. y = 8, so the new y-coordinate is -8.
Therefore, the new point after rotating (5, 8) 180 degrees clockwise is (-5, -8).
To rotate a point (x,y) 180 degrees clockwise, we need to understand the concept of rotational symmetry.
Rotational symmetry refers to an object or a figure that remains unchanged after a rotation of a certain angle around a fixed point called the center of rotation. In this case, we want to rotate the point (5,8) by 180 degrees clockwise.
1. First, let's find the center of rotation. In the given question, it is not explicitly mentioned, so we can assume it to be the origin (0,0).
2. Next, we need to find the coordinates of the new point after rotating it by 180 degrees clockwise. To do this, we will use the following formulas:
- New X-coordinate = -Old X-coordinate
- New Y-coordinate = -Old Y-coordinate
3. Applying these formulas to the given point (5,8):
- New X-coordinate = -(5) = -5
- New Y-coordinate = -(8) = -8
Therefore, the new point after rotating the point (5,8) 180 degrees clockwise is (-5,-8).