Same Shape but a Different Size
Can sliding, flipping, or turning ever make the small one land on the big one?
A Move That Changes Size
You already know this rule from dilations:
Multiply every coordinate by
Check the Coordinates One by One
Triangle
Triangle
Every coordinate of
What It Means to Be Similar
Two figures are similar if a sequence of rotations, reflections, translations, and dilations maps one onto the other.
We write
Congruence Is Just a Special Case
- Congruent figures: rigid motions only
- Similar figures: rigid motions plus dilation
- If the dilation has scale factor
, nothing resizes
So every congruent pair is also similar — with
The Scale Factor Sets the Size
The scale factor is the common ratio of corresponding sides:
, , so ratio , , so ratio , , so ratio
Are These Two Squares Similar?
Two squares have side lengths
- Are they similar?
- What is the scale factor?
Decide on your own before the next slide.
When the Dilation Isn't Enough
The dilated copy is the right size — but the wrong place.
A Reliable Strategy in Four Steps
- Find the scale factor from corresponding sides
- Dilate the pre-image to match size
- Compare the dilated figure to the target
- Align it with a rigid motion
Dilate First, Then Slide It Over
Scale factor
Dilate First, Then Turn or Flip
Scale factor
Order Matters; Many Sequences Work
- Dilate first, then apply rigid motions — reliable
- Translating before dilating can shift the result
- More than one valid sequence usually exists
Your Turn to Finish the Move
Triangle dilated by
Target:
What single rigid motion finishes the job?
Spot the Mistake in This Work
A student writes: "
What went wrong?
Describe the Whole Sequence Yourself
Triangle at
Find the scale factor and describe a full sequence.
What Similarity Really Means for Figures
✓ Similar = a resized, repositioned copy
✓ Dilation sets the size; rigid motions set the place
✓ Congruence is similarity with
Watch out: compare corresponding sides; flips and turns are allowed
What Is Coming Up Next
So far we've been told two figures are similar and built the sequence.
Next lesson: how to test two figures and decide whether any similarity sequence could exist — using only measurements.
Click to begin the narrated lesson
Understand that a two-dimensional figure is similar to another if the second can be obtained from the first by a sequence of rotations, reflections, and dilations