Same Shape, But a Different Size
No rule from last lesson can do this. So what move changes size?
What Does Multiplying a Coordinate Do?
Take the point
- You get
— twice as far from the origin in both directions - Last lesson we only added; now we multiply
Predict: does the point move closer to the origin, or farther?
The Dilation Rule and the Effect of k
A dilation centered at the origin with scale factor
enlarges; shrinks; leaves it unchanged- The origin stays fixed:
Why Shape Survives but Size Does Not
Multiplying both coordinates by
- Every side length scales by the same factor
- Every angle stays exactly the same
- Same proportions, same shape — just resized
Enlargement With a Scale Factor of Three
Dilate
, ,- Side
becomes — tripled, as expected
Reduction With a Scale Factor of One-Half
Dilate the same triangle with
, ,- Side
becomes — halved, and it moved inward
Does Scale Factor Two Mean Add Two?
A tempting wrong move: dilating by
- "Add
": — same size, just shifted (a translation!) - "Times
": — actually larger
Quick Check: Find the Scale Factor
A triangle's side goes from length
- The image side is the original times
- What is the scale factor
? Commit before advancing.
Four Rules: Three Keep Size, One Changes It
You now know four coordinate rules.
- Translation, reflection, rotation — every length stays the same
- Dilation — every length multiplies by
Let's line all four up against one triangle and compare.
Read Rigid or Non-Rigid From the Rule
The coordinate rule itself tells you whether size is preserved.
- Add or rearrange coordinates
distances unchanged rigid - Multiply by
distances scaled non-rigid
The operation in the rule reveals the type of transformation.
One Triangle Under Four Transformations
Three images are the same size as the original. One is not — find it.
Comparing Congruent Versus Similar Images
- Rigid motions
same size congruent - Dilation
different size similar
Explain It in Your Own Words
A dilation with scale factor
- Why does the size change but the shape stay the same?
- Use the words "multiply," "distance," and "angle" in your answer
- Write two sentences before advancing
On Your Own: Dilate and Classify
Dilate the quadrilateral
- Apply the rule to all four vertices and plot the image
- Is the image congruent to the original, or similar? Why?
Congruent, Similar, and the Coordinate Clue
✓ Dilation:
✓ Rigid motions keep size
✓ Read the rule: adding keeps size, multiplying changes it
Scale factor means multiply, not add; dilation keeps shape — it doesn't distort it
Coming Up: Defining True Similarity
You can now make a similar figure with one dilation.
Next, we combine dilation with rigid motions to define what similar truly means.
A figure is similar to another if a sequence of rigid motions and a dilation maps one onto it.
Click to begin the narrated lesson
Describe the effect of dilations, translations, rotations, and reflections on two-dimensional figures using coordinates