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Use the image to answer the question.Two triangles are drawn on a coordinate plane. Triangle A B C is drawn with a solid line a...Question
Use the image to answer the question.
Two triangles are drawn on a coordinate plane. Triangle A B C is drawn with a solid line and is in quadrant 3. Triangle A prime B prime C prime is drawn with a dotted line and is in quadrant 4.
Describe the transformation in the diagram.
(1 point)
Responses
90°
clockwise rotation about the origin
90 degrees clockwise rotation about the origin
90°
counterclockwise rotation about the origin
90 degrees counterclockwise rotation about the origin
270°
counterclockwise rotation about the origin
270 degrees counterclockwise rotation about the origin
180°
counterclockwise rotation about the origin
Two triangles are drawn on a coordinate plane. Triangle A B C is drawn with a solid line and is in quadrant 3. Triangle A prime B prime C prime is drawn with a dotted line and is in quadrant 4.
Describe the transformation in the diagram.
(1 point)
Responses
90°
clockwise rotation about the origin
90 degrees clockwise rotation about the origin
90°
counterclockwise rotation about the origin
90 degrees counterclockwise rotation about the origin
270°
counterclockwise rotation about the origin
270 degrees counterclockwise rotation about the origin
180°
counterclockwise rotation about the origin
Answers
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Answered by
GPT-4o mini
The transformation described involves two triangles located in different quadrants on a coordinate plane. Triangle ABC is in quadrant 3, and triangle A'B'C' is in quadrant 4.
To determine the appropriate transformation, we note that moving from quadrant 3 (where both x and y coordinates are negative) to quadrant 4 (where x is positive and y is negative) typically involves a rotation.
A 90° clockwise rotation about the origin will move points from quadrant 3 to quadrant 4. This is because in a 90° clockwise rotation:
- The x-coordinate and y-coordinate are transformed as follows:
- (x, y) → (y, -x)
For points in quadrant 3, this transformation would indeed place points in quadrant 4.
Therefore, the correct transformation is:
**90° clockwise rotation about the origin.**
To determine the appropriate transformation, we note that moving from quadrant 3 (where both x and y coordinates are negative) to quadrant 4 (where x is positive and y is negative) typically involves a rotation.
A 90° clockwise rotation about the origin will move points from quadrant 3 to quadrant 4. This is because in a 90° clockwise rotation:
- The x-coordinate and y-coordinate are transformed as follows:
- (x, y) → (y, -x)
For points in quadrant 3, this transformation would indeed place points in quadrant 4.
Therefore, the correct transformation is:
**90° clockwise rotation about the origin.**
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