![]() ![]() The algebraic rule for a figure that is rotated 270° clockwise about the origin is (y, -x). A simple TRANSFORMATIONS tutorial to show how to carry out accurate rotations. This product contains notes, practice, and an exit-ticket/warm-up over Rotations on the Coordinate Plane.In these notes, students will:Rotate graphs 90 degrees counterclockwise/270 degrees clockwise.Rotate graphs 180 degrees.Rotate graphs 270 degrees counterclockwise/90 degrees clockwise. Therefore, the algebraic rule for a figure that is rotated 270° clockwise about the origin is (y, -x) Solution: When rotated through 90° about the origin in clockwise direction, the new position of the above points are (iv) The new position of point S (2, -5) will become S (-5, -2) 3. ![]() Therefore, the coordinate of a point (3, -6) after rotating 90° anticlockwise and 270° clockwise is (-6, -3). When we rotate a figure of 270 degree counterclockwise, each point of the given figure has to be changed from (x, y) to (y, -x) and graph the rotated figure. Rotating 270° clockwise, (x, y) becomes (y, -x) Rotating 90° anticlockwise, (x, y) becomes (-y, x) Given, the coordinate of a point is (3, -6) What will be the coordinate of a point having coordinates (3,-6) after rotations as 90° anti-clockwise and 270° clockwise? Rotating a figure 270 degrees clockwise is the same as rotating a figure 90 degrees counterclockwise. The amount of rotation is called the angle of rotation and it is measured in degrees. The fixed point is called the center of rotation. What is the algebraic rule for a figure that is rotated 270° clockwise about the origin?Ī rotation is a transformation in a plane that turns every point of a preimage through a specified angle and direction about a fixed point. ![]()
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