# 6.13: Identify Lines of Symmetry

**At Grade**Created by: CK-12

**Practice**Lines of Symmetry

Have you ever tried to balance a pattern? Well, if so then symmetry was probably involved. Take a look at this dilemma.

Dylan looked at the work his friend Marcus was doing in class. Marcus had decided to design and build a tepee. Like Dylan’s geodesic dome, Marcus was having a difficult time with the construction aspect of the teepee.

“What seems to be the trouble?” Dylan asked Marcus as he saw Marcus sit down frustrated next to his sticks and cloth covering.

“This thing won’t stand up. I put the sticks together. They are all the same length, then I try to put the canvas over the sticks and it doesn’t fit. I am so frustrated!” Marcus exclaimed putting his head in his hands.

Dylan looked at the sticks and then as the canvas. As soon as he looked at the canvas, he knew what was wrong with Marcus’ design.

“I know how to fix it.”

“How?” Marcus asked puzzled.

“Symmetry is the key here, not the length of the sticks.” Dylan said.

**Do you know what Dylan means? What is symmetry? How does a teepee have symmetry? What would Marcus have to do to be sure that his canvas was symmetrical?**

**Pay attention during this Concept and you will learn all that you need to know to solve this problem and help Marcus with his teepee.**

### Guidance

Sometimes, a figure will have parts that mirror themselves within one object. In this case, parts of the object match other parts of the picture. This is called ** symmetry**. Take a look.

Look at this heart. It has two sides that match. The heart is symmetrical because there is symmetry in its design. This heart can be divided in half vertically where one half matches the other half. **This line that divides the heart into matching parts is called the** *line of symmetry.*

We can determine other lines of symmetry by looking at other objects.

Look at this cross. It has two lines of symmetry. If you look, the cross can be divided in half perfectly vertically and in half horizontally. This means that there are two lines of symmetry in the cross.

**We can find symmetry all around us. There is symmetry in real – world objects that we see all the time. Look around you today and locate three different things that have lines of symmetry.**

**Here are some butterflies to think about.**

#### Example A

Does the figure below have symmetry? Can it be a reflection?

**Solution: Yes, this figure has symmetry and can be a reflection.**

#### Example B

How many lines of symmetry does this figure have?

**Solution: This figure has two lines of symmetry.**

#### Example C

Do these figures have symmetry?

**Solution: No, these figures do not have symmetry.**

Now let's go back to the dilemma from the beginning of the Concept.

We need to answer three questions.

**What is symmetry?**

Symmetry is when two halves of an object match. In other words, you can divide the object into parts and the parts are congruent. A heart is a symmetrical object, so is a teepee.

**How does a teepee have symmetry?**

A teepee has symmetry because it can be divided in half so that one half of the teepee matches the other half.

**What would Marcus have to do to be sure that his canvas was symmetrical?**

While Marcus was sure that his sticks were all the same length that is only half of the necessary piece. Marcus also needs to be sure that the canvas is the same all the way around. If he does, then all sides will match or be symmetrical, if not then one side will be different that the other.

### Vocabulary

- Symmetry
- when an object has the ability to be divided into matching parts.

- Line of Symmetry
- the line that divides an object into matching parts.

### Guided Practice

Here is one for you to try on your own.

Does this figure have symmetry? Can it be a reflection?

**Solution**

Yes, you can divide this butterfly evenly so that one side can reflect the other. Therefore, it has symmetry.

### Video Review

### Practice

Directions:Use the illustration to answer each question.

1. Do these figures have symmetry?

2. Can they be reflections?

3. How many lines of symmetry does each figure have?

Directions: Find all lines of symmetry for the shapes below.

4.

5.

6.

Directions:Name the number of lines of symmetry for each letter.

Directions:Answer each question true or false.

12. All triangles have symmetry.

13. All circles have symmetry.

14. The letter "x" has two lines of symmetry.

15. The letter "s" has two lines of symmetry.

### Notes/Highlights Having trouble? Report an issue.

Color | Highlighted Text | Notes | |
---|---|---|---|

Please Sign In to create your own Highlights / Notes | |||

Show More |

Term | Definition |
---|---|

Lines of Symmetry |
Lines of symmetry are the lines that can be drawn to divide a figure into equal halves. |

Reflection |
A reflection is a transformation that flips a figure on the coordinate plane across a given line without changing the shape or size of the figure. |

Symmetry |
A figure has symmetry if it can be transformed and still look the same. |

### Image Attributions

Here you'll identify lines of symmetry.