x⁴ − y⁴: Does a Pattern Apply Here?
- Two terms, subtraction — looks like difference of squares
- But
requires both terms to be perfect squares
Question: Is
What expression, when squared, equals
The Substitution Insight: x⁴ = (x²)²
The expression
Six Steps for Any Hidden Structure
- Examine — what does it look like?
- Substitute — let $u = $ (inner expression)
- Recognize — which pattern fits?
- Factor — apply the pattern
- Back-substitute — restore the original variable
- Check further — any factor factorable again?
x⁴ − y⁴: Full Worked Example
Sum of Squares: a Factoring Dead End
After back-substituting, you may encounter
| Expression | Further factoring? |
|---|---|
| Yes: |
|
| No — sum of squares |
The sign makes all the difference.
Second Type: Quadratic in After Substituting
Factor:
Let
- Factor:
- Back-substitute:
- Check further: both sums of squares — done
Check-In: How Many Factors After Substituting?
Factor:
- What substitution is useful?
- What pattern appears after substituting?
- How many factors does the complete factorization have?
Count carefully — check further after back-substituting.
Check-In Answer: Three Factors, Not Two
Factor:
- Let
: - Back-substitute:
: sum of squares — no further factoring : difference of squares →
Compound Expressions as Values of a and b
Now:
Example:
- Two terms, subtraction, both squares → difference of squares
,- Factor:
Simplify each bracket before advancing.
Always Factor Out the GCF First
Before any pattern: factor out the GCF.
Example:
- GCF = 8:
- Recognize sum of cubes (
): - Verify at
: ✓
Worked Example: Compound Difference of Squares
Factor:
Step 1: DoS with
Step 2:
Step 3: Check further — both linear, done
Step 4: Verify at
Worked Example: Two Rounds of Difference of Squares
Factor:
- Round 1:
, so ,
- Round 2:
- Round 3:
Why does
Guided Practice: Identify and Start
Factor:
Your turn — fill in:
- Pattern: _______________
(hint: ) (hint: )- Middle-term check:
, middle = ?
Identify the pattern and verify before writing the factored form.
Guided Practice: Confirm Your Work
Factor:
- Pattern: Perfect square trinomial
, ; middle check: ✓
Independent Practice: Apply and Verify
Factor:
Steps:
- Identify the pattern
- Identify
and (remember: , so ) - Apply the formula and simplify
- Verify by expanding
Work all four steps independently.
Independent Practice: Confirm Your Work
Factor:
, ; verify: both sides give ✓
What If the Sign Were Plus Instead?
Consider:
- Let
: becomes — a sum of squares - Sum of squares does not factor over the reals
Conclusion:
Substitution is powerful — but it can't bypass dead ends.
Full Procedure: No Prompts This Time
Factor
Run the six steps independently:
- Examine; 2. Identify pattern; 3. Identify
and - Apply formula and simplify
- Check further; 6. Verify at
Full Procedure: Answer and Verification
Factor:
- DoS:
, ; both linear — done- Verify at
: ; ✓
Complete Strategy: The Full Picture
✓ Examine first — structure reveals the strategy
✓ GCF before patterns — always
✓ Four tools: DoS, PST, SoC/DoC,
✓ Check every factor — done when no degree-≥2 factor remains
Sum of squares = dead end over the reals
What These Two Lessons Equip You to Do
SSE.B.3: factoring reveals polynomial zeros — the factored form shows where the graph crosses the x-axis.
REI.B.4: substitution converts higher-degree equations to quadratic form —
The structural analysis habit is the foundation for both.