4th grade (Eureka Math/EngageNY)
Course: 4th grade (Eureka Math/EngageNY) > Unit 4Lesson 4: Topic D: Two-dimensional figures and symmetry
- Intro to reflective symmetry
- Identifying symmetrical figures
- Identify line symmetry
- Symmetry review
- Classifying triangles by angles
- Classifying triangles
- Worked example: Classifying triangles
- Classify triangles by angles
- Classify triangles by side lengths
- Types of triangles review
- Classifying shapes by line and angles types
- Quadrilateral properties
- Classifying shapes by lines and angles
- Classify shapes by line and angle types
- Polygons review
- Classify triangles by both sides and angles
Identifying symmetrical figures
Lindsay identifies lines of symmetry on three shapes.
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- their is actually one of the lines that are not symmetrical; after Lindsay did the first line, but the second line isn't symmetrical because at5:07aone shape piece wasn't the same as the other piece.(10 votes)
- Isn't the rectangle supposed to have 4 lines of symmetry? I thought this because you can also draw a line from each corner of the rectangle.(5 votes)
- Try folding a rectangle from corner to corner(4 votes)
- how can i identify a line of symmetry on ANY regular polygon(4 votes)
- by drawing a line that splits it evenly so that both sides of the line are the same polygon or plane.(1 vote)
- How many lines of symmetry does a circle have? How many lines of symmetry does an oval have?(1 vote)
- Circle has infinite lines of symmetry. Oval has two.(8 votes)
- what is symetry(0 votes)
- Symmetry is when you split an object with a line of symmetry into two parts that are exactly similar. So, if I have a circle and draw a line of symmetry in its middle, I would be able to split the circle into two identical parts. Those identical parts are symmetry.(10 votes)
- Mam,what does line of symmetry of line mean?(3 votes)
- A line of symmetry is a line that you can draw across a shape and divide it into two mirror-images. That is to say, each half of the shape is the same, but looks like its been flipped from the other.
You can also think of a line of symmetry as a line that you can draw, that when you fold the shape over the line both edges would line up exactly, without one side overlapping the other anywhere.(4 votes)
- What's the maximum number of symmetrical lines a shape can have?(3 votes)
- Think about a circle. It has an uncountable lines of symetry. A lot of other shapes as well.
If you need more help just tell me.
-Intellectual Genius(3 votes)
- I believe there is one more line of symmetry in the third figure.(2 votes)
- even i think so too(1 vote)
- Circles have infinite symmetry lines. Why? There are infinite points on the circumference of a circle, so that means there a infinite opposite points, connect one point to opposite point and you get a line of symmetry. :)(2 votes)
- [Voiceover] Which shapes are symmetrical? To answer this, we need to know what it means for a shape to be symmetrical. A shape is symmetrical if it has at least one line of symmetry, a line of symmetry. And now that answer is only helpful if we know what a line of symmetry is. So let's talk about it. A line of symmetry is a line where we can fold the image and have both halves match exactly. Let's look at an example. Let's maybe draw a circle and then we could put a line on that circle. Let's draw a line maybe somewhere like this. This line is a line of symmetry if we can take one side of the line and fold it onto the other and have them match exactly. So let's take one side, doesn't matter which one, let's say the top side, and if we were gonna fold this top side down onto the bottom, would it match exactly what is shown under here? Let's see, it would probably look something like this. And does that match exactly? No, definitely not. So this is not a line of symmetry. Let's try another line. Maybe if we drew a line and we'll try to get as close down the center as we can here like this. Try to be as close to the center as possible and here if we took one side, again it doesn't matter which side, let's say over here, let's say the left side, and we folded this left side onto the right side, would it match exactly and if our line truly was in the center of the circle, then yes it would, which means that this line is a line of symmetry and because we can draw this line of symmetry on our circle, it means that our circle is symmetrical. Shapes are symmetrical if they have at least one line of symmetry and circles have many, many, many lines of symmetry. There was many places we could have drawn a line and folded it so that it worked so the two halves matched exactly. But here's one and as soon as we find one, we know we have a symmetrical shape. So let's go back to the shapes we were given. We can start with the triangle. If we draw a line, maybe a vertical line, let's try to draw it as close to the middle as possible, something like this, and we fold, let's take one side, if we fold this side over, these two lines might match up nicely, but this line here is gonna create something more like this, which does not match what's shown over here, so that's not a line of symmetry, and anywhere else vertical, same thing. We're not gonna have it lined up. So let's try maybe a horizontal line. Is there anywhere horizontally we could draw a line? And again, I think we're gonna see the same thing that the top and the bottom of the line are not gonna match up exactly. So maybe one last thing we could try is a diagonal line, something like this. Maybe this could be our line of symmetry. If we fold this bottom side, this might line up pretty nice here and then this side is gonna do something like this. So it's close, it's the closest we've gotten, but still does not match exactly. For it to be a line of symmetry, it needs to match exactly. So we weren't able to find a way to draw a vertical line or a horizontal line or even the diagonal line. So this shape has no lines of symmetry. So we can say it is not symmetrical. Moving on to the rectangle. Let's try here. Again, this time maybe we'll try a horizontal line. We can draw one right here and if that line truly is in the middle, which is what I've tried for, then this side should match up nicely to this one, across the top should match across the bottom and these sides, if I was right at the halfway point, should fold over each other also. So it has a line of symmetry so it is symmetrical. It has more than one line of symmetry. It has another one in the middle right here. But once we've found one, we know that it's symmetrical. And finally, let's look, we have a pentagon. Here again, trying a line in the middle in some way is usually a good place to start. We can try to draw a line right if this is right down the center here. Then if we folded this side, should line up nicely to this side, this side and this side would overlap and these two would match exactly. So again, has one line of symmetry so it is symmetrical and just like the rectangle, this one had quite a few lines of symmetry. Here's another line of symmetry, here's another line of symmetry, here's one more line of symmetry and so it has quite a few. It has it looks like one, two, three, four lines of symmetry, but as long as it has one, it is symmetrical. So of the shapes we were given, the rectangle and the pentagon were symmetrical.