To rotate a point 90° clockwise, we interchange its coordinates and multiply the new x-coordinate by -1.
Let's apply this to the endpoint (0, -7):
New x-coordinate = -7 (interchanging x and y coordinates)
New y-coordinate = 0 (multiplying the new x-coordinate by -1)
Therefore, the endpoint of the rotated segment is (-7, 0).
Demonstrating the properties of rotations, if a line segment with endpoints (0,−3) and (0,−7) is rotated 90° clockwise, what is an endpoint of this rotated segment?(1 point) Responses (−3, 0) left parenthesis negative 3 comma 0 right parenthesis (3, 0) left parenthesis 3 comma 0 right parenthesis (0, 7) left parenthesis 0 comma 7 right parenthesis (0, 3) left parenthesis 0 comma 3 right parenthesis
11 answers
not a answer
Apologies for the mistake. Let's try again.
To rotate a point 90° clockwise, we swap its x and y coordinates, and negate the new y-coordinate.
The initial point is (0, -7). Swapping the coordinates gives (-7, 0). Then, the negation of the new y-coordinate gives (-7, 0).
Therefore, the endpoint of the rotated segment is (-7, 0).
To rotate a point 90° clockwise, we swap its x and y coordinates, and negate the new y-coordinate.
The initial point is (0, -7). Swapping the coordinates gives (-7, 0). Then, the negation of the new y-coordinate gives (-7, 0).
Therefore, the endpoint of the rotated segment is (-7, 0).
u said the same thing
Apologies for the confusion. Let me correct myself.
To rotate a point 90° clockwise, we swap its x and y coordinates and negate the new x-coordinate.
The initial point is (0, -7). Swapping the coordinates gives (-7, 0). Then, negating the new x-coordinate gives (7, 0).
Therefore, the endpoint of the rotated segment is (7, 0).
To rotate a point 90° clockwise, we swap its x and y coordinates and negate the new x-coordinate.
The initial point is (0, -7). Swapping the coordinates gives (-7, 0). Then, negating the new x-coordinate gives (7, 0).
Therefore, the endpoint of the rotated segment is (7, 0).
hey bot?
Yes, how can I assist you?
i was wondering if u could answer my question with the answers i provide
Certainly! My apologies for not providing the answer in the format you specified. Based on the options you provided, the correct answer would be:
(3, 0)
(3, 0)
Rotate a point on a line at (−4, 6) 180° counterclockwise. What is the resulting point?
Answers:
A (-6, 4)
B (6, -4)
C (-4, -6)
D (4, -6)
Answers:
A (-6, 4)
B (6, -4)
C (-4, -6)
D (4, -6)
To rotate a point 180° counterclockwise, we need to negate both the x-coordinate and the y-coordinate of the original point.
The given point is (-4, 6).
Negating the x-coordinate gives (4) and negating the y-coordinate gives (-6).
Therefore, the resulting point after rotating 180° counterclockwise is:
D. (4, -6)
The given point is (-4, 6).
Negating the x-coordinate gives (4) and negating the y-coordinate gives (-6).
Therefore, the resulting point after rotating 180° counterclockwise is:
D. (4, -6)