6th grade (WNCP)
- Intro to reflective symmetry
- Rigid transformations intro
- Performing translations
- Translate points
- Rotating points
- Rotate points
- Performing reflections
- Reflect points
- Finding a quadrilateral from its symmetries
- Finding a quadrilateral from its symmetries (example 2)
- Reflective symmetry of 2D shapes
Intro to reflective symmetry
Introduction to the concept of an "axis of symmetry". Created by Sal Khan.
Want to join the conversation?
- What does
line of symmetrymean and how can you apply it to a shape? because i don't understand that at all and what can you not use it on?(118 votes)
- The line of symmetry is the imaginary line where you could fold the image and have both halves match exactly.(210 votes)
- A circle has infinite lines of symmetry right?(44 votes)
Any straight line that passes through the center of a circle is also a line of symmetry of that circle.(40 votes)
- i thought the line of symmetry was where you could fold the image and have both hales match exactly(20 votes)
- You thought right! Some shapes cannot have a line of symmetry, but for those, which can, an imaginary line (sometimes called the axis) runs through the center cutting the figure into two identical parts. Keep in mind, the two parts will often be mirror images, depending on the figure.(28 votes)
- Does the number of sides of the shape change the amount of lines of symmetry?(15 votes)
- It does change, but depends more on if the polygon is regular or not. If a polygon is irregular, chances are there will be less lines of symmetry. An equilateral triangle will have 3 lines of symmetry, but a scalene triangle will have none. If a polygon is regular, the number of sides it has is the amount of symmetry lines it will have.(12 votes)
- can there be a infinite number of lines of symmetry?(13 votes)
- Yes, circles have infinite lines of symmetry.(7 votes)
- what is 721,390 x 635,495(13 votes)
- *I am not sure. What is it?*(6 votes)
- can rotational symmetry be used in organic shapes?(9 votes)
- yes, organic shapes such as snow flakes can have rotational symmetry.(13 votes)
- Why the line of symmetry in rectangle have only two why not four(9 votes)
- Great question!
A line of symmetry must not only divide the figure into two congruent parts, but also must be perpendicular to every segment that connects a point in one part to the corresponding point in the other part.
While a diagonal divides a rectangle into two congruent triangles, that alone doesn’t necessarily imply that it is a line of symmetry.
Let’s say we have a non-square rectangle ABCD (in counterclockwise order) with diagonal BD. In the two congruent triangles formed, point A must correspond to point C. However, the segment connecting A and C is not perpendicular to diagonal BD. So diagonal BD is not a line of symmetry. For a similar reason, diagonal AC is not a line of symmetry.
Therefore, the two diagonals of a non-square rectangle do not count as lines of symmetry!
Have a blessed, wonderful day!(12 votes)
- This concept makes absolutely no sense. I have tried to do it over and over, and I am having no luck. I reflect the point over the line as Sal says, and it moves onto the other point. But the hint says it doesn't. can anyone help me with this?(12 votes)
- Keep on trying! bold(2 votes)
- they are congroied shaps right?(6 votes)
For each of these diagrams, I want to think about whether this blue line represents an axis of symmetry. And the way we can tell is if on both sides of the blue line we essentially have mirror images. So let's imagine. Let's take this top part of this polygon, the part that is above this blue line here, and let's reflect it across the blue line-- you could almost imagine that it's a reflection over some type of a lake or something-- and see if we get exactly what we have below. Then this would be an axis of symmetry. So this point right over here, this distance to the blue line, let's go-- the same amount on the other side would get you right there. And so you immediately see we start ending up with a point that is off what's actually here in black, the actual bottom part of the polygon. So this is a pretty good clue that this is not an axis of symmetry. But let's just continue it, just to go through the exercise. So this point, if you reflected it across this blue line, would get you here. This point-- I'll do it in a different color. This point, if you were to reflect it across this blue line, it would get you-- let me make sure I can do that relatively straight. I can do a straighter job than that. So if you go about that distance about it, and I want to go straight down into the blue line, and I'm going to go the same distance on the other side, it gets me to right around there. And then this point over here, if I were to drop it straight down, then if I were to go the same distance on the other side, it gets me right around there. And then finally, this point gets me right around there. So its mirror image of this top part would look something like this. My best attempt to draw it would look something like this, which is very different than the part of the polygon that's actually on the other side of this blue line. So in this case, the blue line is not an axis of symmetry. So this is no. No, this blue line is not an axis of symmetry. Now let's look at it over here. And our eyes pick this out very naturally. Here you can see that it looks like this blue line really divides this polygon in half. It really does look like mirror images. It really does look like, if you imagine that this is some type of a lake, a still lake, so I shouldn't actually draw waves, but this is some type of a lake, that this is the reflection. And we can even go point by point here. So this point right over here is the same distance from, if we dropped a perpendicular to this point as this one right over here; this one over here, same distance, same distance as this point right over here; and we could do that for all of the points. So in this case, the blue line does represent an axis of symmetry.