Rotation Rules (2024)

// Last Updated: January 21, 2020 - Watch Video //

In today’s geometry lesson, we’re going to review Rotation Rules.

Jenn, Founder Calcworkshop^®, 15+ Years Experience (Licensed & Certified Teacher)

You’re going to learn about rotational symmetry, back-to-back reflections, and common reflections about the origin.

Let’s dive in and see how this works!

A rotation is an isometric transformation that turns every point of a figure through a specified angle and direction about a fixed point.

To describe a rotation, you need three things:

Direction (clockwise CW or counterclockwise CCW)
Angle in degrees
Center point of rotation (turn about what point?)

The most common rotations are 180° or 90° turns, and occasionally, 270° turns, about the origin, and affect each point of a figure as follows:

Rotations About The Origin

90 Degree Rotation

When rotating a point 90 degrees counterclockwise about the origin our point A(x,y) becomes A'(-y,x). In other words, switch x and y and make y negative.

90 Counterclockwise Rotation

180 Degree Rotation

When rotating a point 180 degrees counterclockwise about the origin our point A(x,y) becomes A'(-x,-y). So all we do is make both x and y negative.

180 Counterclockwise Rotation

270 Degree Rotation

When rotating a point 270 degrees counterclockwise about the origin our point A(x,y) becomes A'(y,-x). This means, we switch x and y and make x negative.

Composition of Transformations

And just as we saw how two reflections back-to-back over parallel lines is equivalent to one translation, if a figure is reflected twice over intersecting lines, this composition of reflections is equal to one rotation.

Composition of Transformations

In fact, the angle of rotation is equal to twice that of the acute angle formed between the intersecting lines.

Angle of Rotation

Rotational Symmetry

Lastly, a figure in a plane has rotational symmetry if the figure can be mapped onto itself by a rotation of 180° or less. This means that if we turn an object 180° or less, the new image will look the same as the original preimage. And when describing rotational symmetry, it is always helpful to identify the order of rotations and the magnitude of rotations.

The order of rotations is the number of times we can turn the object to create symmetry, and the magnitude of rotations is the angle in degree for each turn, as nicely stated by Math Bits Notebook.

In the video that follows, you’ll look at how to:

Describe and graph rotational symmetry.
Describe the rotational transformation that maps after two successive reflections over intersecting lines.
Identify whether or not a shape can be mapped onto itself using rotational symmetry.

Video – Lesson & Examples

38 min

Introduction to Rotations
00:00:23 – How to describe a rotational transformation (Examples #1-4)
Exclusive Content for Member’s Only

00:12:12 – Draw the image given the rotation (Examples #5-6)
00:16:41 – Find the coordinates of the vertices after the given transformation (Examples #7-8)
00:19:03 – How to describe the rotation after two repeated reflections (Examples #9-10)
00:26:32 – Identify rotational symmetry, order, and magnitude of the rotation? (Examples #11-16)
Practice Problems with Step-by-Step Solutions
Chapter Tests with Video Solutions

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FAQs

How do you remember the rules of rotation? ›

The way that I remember it is that 90 degrees and 270 degrees are basically the opposite of each other. So, (-b, a) is for 90 degrees and (b, -a) is for 270. 180 degrees and 360 degrees are also opposites of each other. 180 degrees is (-a, -b) and 360 is (a, b).

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What is the rule for 180 * rotation? ›

180 Degree Rotation

When rotating a point 180 degrees counterclockwise about the origin our point A(x,y) becomes A'(-x,-y). So all we do is make both x and y negative.

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What is the formula for rotation? ›

Rotation Formula

Type of Rotation	A point on the Image	A point on the Image after Rotation
Rotation of 90° (Clockwise)	(x, y)	(y, -x)
Rotation of 90° (Counter Clockwise)	(x, y)	(-y, x)
Rotation of 180° (Both Clockwise and Counterclockwise)	(x, y)	(-x, -y)
Rotation of 270° (Clockwise)	(x, y)	(-y, x)

1 more row

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How do you explain rotation in math? ›

Rotation is a geometric transformation that involves rotating a figure a certain number of degrees about a fixed point. A positive rotation is counterclockwise and a negative rotation is clockwise.

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What is rotation question answers? ›

What is Rotation? A rotation is a circular movement of an object around a centre of rotation. If three-dimensional objects like the earth, moon and other planets always rotate around an imaginary line, it is called a rotation axis.

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What is the first order of rotation? ›

To find the order of rotational symmetry then, we count the number of times the figure looked the same after rotation. So the first time was after 180 degrees, and the second time was after 360 degrees, when it was back upon the original starting position.

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What is 90 clockwise? ›

What Is 90 Degree Clockwise Rotation? A figure rotated about a fixed point in the clockwise direction by 90 degrees on a coordinate plane is called 90 degree clockwise rotation. So here the angle of rotation is 90 degrees. The figure or the point is rotated about a fixed point called the center of rotation.

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How do you rotate 90 degrees clockwise? ›

Answer: To rotate the figure 90 degrees clockwise about a point, every point(x,y) will rotate to (y, -x). Let's understand the rotation of 90 degrees clockwise about a point visually. So, each point has to be rotated and new coordinates have to be found. Then we can join the points and find the new positioned figure.

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How do you rotate 90 degrees? ›

Rotating by 90 degrees:

When you rotate by 90 degrees, you take your original X and Y, swap them, and make Y negative. So from 0 degrees you take (x, y), swap them, and make y negative (-y, x) and then you have made a 90 degree rotation.

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How do you rotate clockwise? ›

Clockwise involves a turn to the right as it follows the hands of a clock. Think about an analogue clock. Starting from the top, a hand moving clockwise would move to the right-hand side. Then turns down and to the left.

Is 90 clockwise 270 counterclockwise? ›

One revolution is 360 degrees. A 180-degree clockwise rotation is the same as a 180-degree counterclockwise rotation. The sum of the measures is 360. So, moving in a clockwise direction for 270 degrees would end at the same place as moving 90 degrees in a counterclockwise direction.

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What is the rule for rotating 90 degrees? ›

Rotating by 90 degrees:

When you rotate by 90 degrees, you take your original X and Y, swap them, and make Y negative. So from 0 degrees you take (x, y), swap them, and make y negative (-y, x) and then you have made a 90 degree rotation.

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What is the general rule for a 360 rotation? ›

The rotation of a point ( 𝑥 , 𝑦 ) by 360 degrees does not alter its coordinates, and such a rotation can be represented by the coordinate transformation ( 𝑥 , 𝑦 ) → ( 𝑥 , 𝑦 ) . We also note that all rotations about the same point that differ by a multiple of 360 degrees are equivalent.

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What is the rule of rotation and reflection? ›

Rotations — The figure rotates around a fixed point in the plane, preserving size and shape. Reflections — The figure is flipped onto the opposite side of a line of symmetry, producing a mirror image that preserves size and shape.

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