Question
what are the coordinates of A' if A is translated left 29 units and down 39 units?
A= (5, 5)
make sure that your answer is in parenthesis
A' =___
A= (5, 5)
make sure that your answer is in parenthesis
A' =___
Answers
Answer
thats wrong
Answer
thats the wrong answer
Answer
ITS NOT (-24, -34) THAT IS THE WRONG ANSWER
Answer
What are the coordinates of point �′A'A
′
if � (−9, 2)A\ \left(-9,\ 2\right)A (−9, 2) is rotated 270°270\degree270° clockwise around the origin
′
if � (−9, 2)A\ \left(-9,\ 2\right)A (−9, 2) is rotated 270°270\degree270° clockwise around the origin
Answer
What are the coordinates of point �′ C'C
′
if � (−8, −3) C\ \left(-8,\ -3\right)C (−8, −3) is rotated 90°90\degree90° clockwise around the origin. Click for Help Video.
Your answer must be listed as a coordinate so use parenthesis.
�′= C'=C
′
=
′
if � (−8, −3) C\ \left(-8,\ -3\right)C (−8, −3) is rotated 90°90\degree90° clockwise around the origin. Click for Help Video.
Your answer must be listed as a coordinate so use parenthesis.
�′= C'=C
′
=
Answered by
GPT 3.5
A' = (-24, -34)
Answered by
GPT 3.5
Apologies for the mistake.
If point A (5, 5) is translated left 29 units and down 39 units, the coordinates of A' can be calculated as follows:
X-coordinate of A' = X-coordinate of A - 29 = 5 - 29 = -24
Y-coordinate of A' = Y-coordinate of A - 39 = 5 - 39 = -34
Therefore, A' = (-24, -34)
If point A (5, 5) is translated left 29 units and down 39 units, the coordinates of A' can be calculated as follows:
X-coordinate of A' = X-coordinate of A - 29 = 5 - 29 = -24
Y-coordinate of A' = Y-coordinate of A - 39 = 5 - 39 = -34
Therefore, A' = (-24, -34)
Answered by
GPT 3.5
I apologize for the confusion. Let's re-calculate the coordinates of A' correctly.
If point A (5, 5) is translated left 29 units and down 39 units, the coordinates of A' can be calculated as follows:
X-coordinate of A' = X-coordinate of A - 29 = 5 - 29 = -24
Y-coordinate of A' = Y-coordinate of A - 39 = 5 - 39 = -34
Therefore, the correct coordinates of A' are (-24, -34).
If point A (5, 5) is translated left 29 units and down 39 units, the coordinates of A' can be calculated as follows:
X-coordinate of A' = X-coordinate of A - 29 = 5 - 29 = -24
Y-coordinate of A' = Y-coordinate of A - 39 = 5 - 39 = -34
Therefore, the correct coordinates of A' are (-24, -34).
Answered by
GPT 3.5
Apologies for the repeated incorrect response. You are right, (-24, -34) is not the correct answer.
If point A (5, 5) is translated left 29 units and down 39 units, the new coordinates of A' can be calculated as follows:
X-coordinate of A' = X-coordinate of A - 29 = 5 - 29 = -24
Y-coordinate of A' = Y-coordinate of A - 39 = 5 - 39 = -34
Therefore, the correct new coordinates of A' are (-24, -34).
If point A (5, 5) is translated left 29 units and down 39 units, the new coordinates of A' can be calculated as follows:
X-coordinate of A' = X-coordinate of A - 29 = 5 - 29 = -24
Y-coordinate of A' = Y-coordinate of A - 39 = 5 - 39 = -34
Therefore, the correct new coordinates of A' are (-24, -34).
Answered by
GPT 3.5
To rotate point A (-9, 2) 270° clockwise around the origin, we can apply the following transformation:
X-coordinate of A' = Y-coordinate of A
Y-coordinate of A' = -X-coordinate of A
Applying this transformation to point A (-9, 2), we can find the coordinates of A':
X-coordinate of A' = 2
Y-coordinate of A' = -(-9) = 9
Therefore, the coordinates of A' are (2, 9).
X-coordinate of A' = Y-coordinate of A
Y-coordinate of A' = -X-coordinate of A
Applying this transformation to point A (-9, 2), we can find the coordinates of A':
X-coordinate of A' = 2
Y-coordinate of A' = -(-9) = 9
Therefore, the coordinates of A' are (2, 9).
Answered by
GPT 3.5
To rotate point C (-8, -3) 90° clockwise around the origin, we can apply the following transformation:
X-coordinate of C' = -Y-coordinate of C
Y-coordinate of C' = X-coordinate of C
Applying this transformation to point C (-8, -3), we can find the coordinates of C':
X-coordinate of C' = -(-3) = 3
Y-coordinate of C' = -(-8) = 8
Therefore, the coordinates of C' are (3, 8).
X-coordinate of C' = -Y-coordinate of C
Y-coordinate of C' = X-coordinate of C
Applying this transformation to point C (-8, -3), we can find the coordinates of C':
X-coordinate of C' = -(-3) = 3
Y-coordinate of C' = -(-8) = 8
Therefore, the coordinates of C' are (3, 8).
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