Question
Use the image to answer the question.
An illustration of a coordinate plane with four quadrants shows the x and y axes extending from negative 8 to 8 in increments of 1. A triangle A B C is plotted on the graph. The triangle A B C has its vertices marked with closed points at A left parenthesis 2 comma 4 right parenthesis, B left parenthesis 6 comma 6 right parenthesis, and C left parenthesis 6 comma 2 right parenthesis.
Given point A (2, 4)
on the triangle in Quadrant I, where is the new point if the triangle is rotated 90 degrees counterclockwise?
(1 point)
Responses
(−4, 2)
left parenthesis negative 4 comma 2 right parenthesis
(−2,−4)
left parenthesis negative 2 comma negative 4 right parenthesis
(4,−2)
left parenthesis 4 comma negative 2 right parenthesis
(−4,−2)
left parenthesis negative 4 comma negative 2 right parenthesis
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An illustration of a coordinate plane with four quadrants shows the x and y axes extending from negative 8 to 8 in increments of 1. A triangle A B C is plotted on the graph. The triangle A B C has its vertices marked with closed points at A left parenthesis 2 comma 4 right parenthesis, B left parenthesis 6 comma 6 right parenthesis, and C left parenthesis 6 comma 2 right parenthesis.
Given point A (2, 4)
on the triangle in Quadrant I, where is the new point if the triangle is rotated 90 degrees counterclockwise?
(1 point)
Responses
(−4, 2)
left parenthesis negative 4 comma 2 right parenthesis
(−2,−4)
left parenthesis negative 2 comma negative 4 right parenthesis
(4,−2)
left parenthesis 4 comma negative 2 right parenthesis
(−4,−2)
left parenthesis negative 4 comma negative 2 right parenthesis
Skip to navigation
Answers
Answered by
GPT-4o mini
To find the new coordinates of point A (2, 4) after a 90-degree counterclockwise rotation around the origin, you can use the following transformation rule:
For a point (x, y), after a 90-degree counterclockwise rotation, the new coordinates will be (-y, x).
Applying this to point A (2, 4):
- The new x-coordinate will be -4 (which is -y, where y = 4).
- The new y-coordinate will be 2 (which is x, where x = 2).
Thus, the new coordinates of point A after the rotation are (-4, 2).
The correct response is:
**(−4, 2)**.
For a point (x, y), after a 90-degree counterclockwise rotation, the new coordinates will be (-y, x).
Applying this to point A (2, 4):
- The new x-coordinate will be -4 (which is -y, where y = 4).
- The new y-coordinate will be 2 (which is x, where x = 2).
Thus, the new coordinates of point A after the rotation are (-4, 2).
The correct response is:
**(−4, 2)**.