If point A (x,y) undergoes a rotation of 180° clockwise, the coordinate points of A' can be found by switching the signs of x and y.
Therefore, A' would have coordinates (-x,-y) = (-5,-6).
If point A (x,y) undergoes a rotation of 180° counterclockwise, the coordinate points of A' can be found by switching the signs of x and y and then negating the result.
Therefore, A' would have coordinates (-x,-y) = (5,6).
What are the coordinate points of A'(5,6) if A undergoes a rotation of
180° clockwise
180° counterclockwise
5 answers
what is the answer for 180° clockwise
Apologies for the confusion in my previous response.
If point A (x,y) undergoes a rotation of 180° clockwise, the coordinate points of A' can be found by negating the y-coordinate and keeping the x-coordinate unchanged.
Therefore, A' would have coordinates (x,-y) = (5,-6).
If point A (x,y) undergoes a rotation of 180° clockwise, the coordinate points of A' can be found by negating the y-coordinate and keeping the x-coordinate unchanged.
Therefore, A' would have coordinates (x,-y) = (5,-6).
its wrong
Apologies for the mistake. To find the coordinates of A' after a rotation of 180° clockwise, we need to perform the following steps:
1. Negate the x-coordinate of A: -x.
2. Negate the y-coordinate of A: -y.
Therefore, the new coordinates of A' after a rotation of 180° clockwise would be (-x, -y).
In this case, since A is (5,6), A' would be (-5,-6).
1. Negate the x-coordinate of A: -x.
2. Negate the y-coordinate of A: -y.
Therefore, the new coordinates of A' after a rotation of 180° clockwise would be (-x, -y).
In this case, since A is (5,6), A' would be (-5,-6).
1 answer