Similarity & Congruence
TipLearning Objectives
- Determine whether triangles are similar or congruent.
- Use criteria: AA~, SSS~, SAS~, SSS, SAS, ASA.
- Solve for missing sides in proportional triangles.
Key Ideas
Similar Triangles (∼)
- Same shape, proportional sides.
- Angle-Angle (AA) guarantees similarity.
Congruent Triangles (≅)
- Same shape and size.
- Proven by SSS, SAS, ASA (and AAS).
Corresponding sides matter:
Set proportions correctly: \[ \frac{a_1}{a_2} = \frac{b_1}{b_2} = \frac{c_1}{c_2}. \]

Triangle Criteria Summary
| Criterion | Sim? | Cong? | Notes |
|---|---|---|---|
| SSS | ✔️ | ✔️ | Similarity: sides proportional. Congruence: sides equal. |
| SAS | ✔️ | ✔️ | Similarity: included angle with proportional adjacent sides. |
| ASA | ✔️ | ✔️ | Works for both; similarity also works with AAA. |
| AAS | ✔️ | ✔️ | Same reasoning as ASA; AAA enough for similarity. |
| AAA | ✔️ | ❌ | Determines shape only, not size → no congruence. |
| HL | ❌ | ✔️ | Right triangle hypotenuse–leg criterion (congruence only). |
| SSA | ❌ | ❌ | Ambiguous case; does not guarantee similarity or congruence. |
Common Problem Types
Proving Similarity
Use AA or proportional sides.
Solving for Missing Sides
Cross-multiply proportional sides.
Congruence Proofs
Identify correct correspondence.
Scale Factor
Determine enlargement or reduction.
Area Relations
If scale factor is k, area scales by \(k^2\).
Strategies
- Match vertices carefully.
- Use angle markings.
- Check ratios before solving.
- Look for parallel lines → create similar triangles.
Worked Examples
Example 1 — Similarity
Triangles with two equal angles → similar.
Example 2 — Proportion
If triangles are similar and
\(\frac{AB}{DE}=\frac{4}{10}\),
then scale factor = 0.4.
WarningCommon Mistakes
- Mismatching order of vertices.
- Using wrong sides in ratios.
- Confusing similarity (∼) with congruence (≅).
Practice Problems
- Given two angles match, are triangles similar?
- If corresponding sides are 6 and 9, find scale factor.
- If scale factor = 2, by what factor does area change?
- In similar triangles, if small side = 4 and scale factor = 3, find large side.
TipStep-by-Step Solutions
- Yes (AA).
- \(6/9 = 2/3\).
- Area multiplies by \(2^2 = 4\).
- \(4 × 3 = 12\).
Summary
- Similar → proportional sides; congruent → identical.
- AA is enough for similarity.
- Scale factor determines side and area relationships.
TipQuick Tips
- Always match vertices in order.
- Scale factor applies linearly; area uses \(k^2\).