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Grade 8 math (FL B.E.S.T.)
Determining reflections
CCSS.Math:
Finding the line of reflection by considering the image and the source of the reflection.
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are there any tricks or rules with rigid transformations?(20 votes)
I can't think of any tricks, but I do know a rule:
A rigid transformation only occours if the 2nd image of the shape preserves distance between points, and preserves the angle measure of the lines.(15 votes)
- How do change figure across the y-axis(6 votes)
To "reflect" a figure across the y-axis, you want to do two things. For each of the figure's points:
- multiply the x-value by -1
- keep the y-value the same
For instance, Triangle ABC (in the video) has the following three points:
A (2, 6)
B (5, 7)
C (4, 4)
To reflect Triangle ABC across the y-axis, we need to take the negative of the x-value but leave the y-value alone, like this:
A (-2, 6)
B (-5, 7)
C (-4, 4)
* Please note that the process is a bit simpler than in the video because the line of reflection is the actual y-axis. If the line of reflection was something else (like x = -4), you would need to do more than just taking the negative of the x-value - the process would be similar to what Sal does in the video.
Hope this helps!(9 votes)
I can't seem to find it anywhere, but one of the questions in a worksheet given by my teacher, we are asked to:
Reflect at "y = -x"
Is there a video or exercise on this that I missed? if not then pls guide me(6 votes)- *Nevermind, punching y = -x into desmos gave me the line of reflection!*(6 votes)
Why is there nothing on dilation in this playlist? It's the only type of transformation not covered,(3 votes)- there is, just keep going down, it's the third to last group in this playlist(4 votes)
I have a question. To find the line of reflection for a triangle, could someone count all the spaces between the two same vertices and then divide them by two. Then add that quotient to a vertice. One example could be in the video. The distance between Triangle ABC's vertice of C and Triangle A'B'C''s vertice of C is six. So then divide six by two to get 3. Then add that 3 to Triangle A'B'C' vertice c's Y-coordinate to get 1. The line of reflection is on the Y-coordinate of 1. Sorry if this was a little confusing. It is difficult to type about Triangle A'B'C' and the different vertices. Sorry.(4 votes)
So was that reflection a reflection across the y-axis?(2 votes)
No, It would be a reflection across something on the x-axis.
Hope that helps!(4 votes)
is there a specific reason as to why u would put half of the total number of spaces ?(3 votes)- If it is 6 spaces the line divides it by too, that's my understanding.(1 vote)
How do you explain if there is or is not a line of refection(3 votes)- Reflecting across a graph,does the Y always stay the same?(2 votes)
The y only stays the same if it is reflected across the y-axis, otherwise it will change.(2 votes)
- so even if the shape is flipped is it still a reflection(2 votes)
I think it would be if it has a line of symmetry.(2 votes)
Video transcript
- [Instructor] We're asked to
draw the line of reflection that reflects triangle ABC,
so that's this blue triangle, onto triangle A prime B prime C prime, which is this red
triangle right over here. And they give us a
little line drawing tool in order to draw the line of reflection. So the way I'm gonna think about it is well, when I just eyeball it, it looks like I'm just flipped over some type of a horizontal line here. But let's see if we can actually construct a horizontal line where
it does actually look like the line of reflection. So let's see, C and C prime, how far apart are they from each other? So if we go one, two,
three, four, five, six down. So they are six apart. So let's see if we just put
this three above C prime and three below C, let's see
if this horizontal line works as a line of reflection. So C, or C prime is
definitely the reflection of C across this line. C is exactly three units above it, and C prime is exactly
three units below it. Let's see if it works for A and A prime. A is one, two, three,
four, five units above it. A prime is one, two, three,
four, five units below it. So that's looking good. Now let's just check out B. So B, we can see it's at the
y-coordinate here is seven. This line right over here
is y is equal to one. And so what we would
have here is, let's see, this looks like it's six
units above this line, and B prime is six units below the line. So this indeed works. We've just constructed
the line of reflection that reflects the blue
triangle, triangle ABC, onto triangle A prime B prime C prime.