Recall: Polynomials and Their Vocabulary
- A polynomial: terms with non-negative integer exponents
- Monomial (1 term):
— Binomial (2 terms): - Degree: highest exponent —
has degree
Can you recognize a polynomial when you see one?
Three Operations Stay Inside, One Escapes
| Op | Example | Result |
|---|---|---|
| ✓ integer | ||
| ✓ integer | ||
| ✓ integer | ||
| ✗ not integer |
Same for polynomials?
Predict What Polynomials Give You
| Integers | Polynomials |
|---|---|
What type does each operation give?
Closure: Polynomials Stay in Their System
Polynomials are closed under addition, subtraction, and multiplication.
- Adding two polynomials → always a polynomial ✓
- Subtracting two polynomials → always a polynomial ✓
- Multiplying two polynomials → always a polynomial ✓
- Division can escape:
✗
Like Terms: The Foundation of Addition
Like terms have identical variable parts — same variable, same exponent.
and are like terms (both ) and are not like terms — different exponents and are not like terms — different variables
Adding polynomials means combining like terms only.
Adding Polynomials Step by Step
Add:
Step 1: Group like terms
Step 2: Combine
Degree: 3 ✓ — leading term is
Subtract by Distributing Negative One
Find the Sign Error Here
A student subtracted
Which term is wrong, and why?
Identify the error before advancing.
Subtract and Check Your Answer
Subtract:
Result:
Verify at
- Original:
- Result:
✓
Quick Check: Addition and Subtraction
Simplify:
Distribute the negative, then combine like terms.
- What sign does the
term take after distribution? - What is the final simplified expression?
Addition Combines — Multiplication Expands
- Adding:
— sort and combine like terms - Multiplying:
— every term × every term
Multiplication uses the distributive property, applied to polynomials.
It never fails, no matter how many terms you have.
Distributive Property Powers All Multiplication
FOIL: Binomial × Binomial Only
First
When FOIL Misses Three Products
Distribute each row instead:
Multiplying with the Table Method
Sum all cells:
Degree of a Product: Predict It First
- Degree of product = sum of degrees
- Leading term = product of leading terms
| Expression | Degree | Leading term |
|---|---|---|
Always Expand Squared Binomials Fully
Check at
Predict Degree and Leading Term
Without computing, predict for
- What is the degree of the product?
- What is the leading term?
Apply the degree rule — predict before computing.
What Changes When a Sign Flips?
We computed:
What if the second factor becomes
- Which products change?
- Does the degree change?
- Does the sign of the constant term change?
Reason about this before computing the full product.
Mixing All Three Operations Together
- Add/Subtract: combine like terms
- Multiply: distribute every term × every term
- Mixed: multiply first, then combine
Order of operations still applies — expand products before collecting terms.
Mixed Operations: Two Squared Binomials
Simplify:
- Subtract:
and constant terms cancel →
Verify at
Mixed: Expand First, Then Subtract
Simplify:
Expand:
Subtract and collect:
Simplify This Completely on Your Own
No hints — expand, distribute, and combine.
State the degree and leading coefficient of your answer.
Is It Still a Polynomial?
Reflection: Is
A polynomial requires:
- Non-negative integer exponents
- Real number coefficients
- Finite number of terms
Apply the definition. Where does
Watch for These Three Common Errors
Sign flip:
FOIL scope:
Unlike terms:
What You Can Now Do with Polynomials
✓ Closed under
✓ Subtract: distribute
✓ Multiply: distribute every term; FOIL for binomials only
Division breaks closure — rational expressions come later
Next Lesson: Division and the Remainder
Division breaks closure — but the remainder carries information.
Dividing by
APR.B.2 — The Remainder Theorem
Click to begin the narrated lesson
Perform polynomial operations