1. Classifying Polynomials

2. Degree of a Polynomial
The degree of a polynomial is calculated by finding the largest exponent in the polynomial.
In order for a function to be polynomial:
-leading coefficient must not be zero
-exponents must be whole numbers (no negatives
-no variables in the denominator
**standard form of a polynomial function has the exponents from greatest to least

3. Degree of a Polynomial (Each degree has a special “name”)9

4. Degree of a Polynomial (Each degree has a special “name”)9
No variable
Constant

5. Degree of a Polynomial (Each degree has a special “name”)9
No variable
Constant 8x
1st degree
Linear

6. Degree of a Polynomial (Each degree has a special “name”)9
No variable
Constant 8x
1st degree
Linear
7x2 + 3x
2nd degree
Quadratic

7. Degree of a Polynomial (Each degree has a special “name”)9
No variable
Constant 8x
1st degree
Linear
7x2 + 3x
2nd degree
Quadratic
6x3 – 2x
3rd degree
Cubic

8. Degree of a Polynomial (Each degree has a special “name”)9
No variable
Constant 8x
1st degree
Linear
7x2 + 3x
2nd degree
Quadratic
6x3 – 2x
3rd degree
Cubic
3x4 + 5x – 1
4th degree
Quartic

9. Degree of a Polynomial (Each degree has a special “name”)9
No variable
Constant 8x
1st degree
Linear
7x2 + 3x
2nd degree
Quadratic
6x3 – 2x
3rd degree
Cubic
3x4 + 5x – 1
4th degree
Quartic
2x5 + 7x3
5th degree
Quintic

10. Degree of a Polynomial (Each degree has a special “name”)9
No variable
Constant 8x
1st degree
Linear
7x2 + 3x
2nd degree
Quadratic
6x3 – 2x
3rd degree
Cubic
3x4 + 5x – 1
4th degree
Quartic
2x5 + 7x3
5th degree
Quintic
5xn
6th degree or higher
“nth” degree

11. Let’s practice classifying polynomials by “degree”.
3z4 + 5z3 – 7
15a + 25
185
2c10 – 7c6 + 4c3 - 9
2f3 – 7f2 + 1
15y2
9g4 – 3g + 5
10r5 –7r
16n7 + 6n4 – 3n2
DEGREE NAME
Quartic
Linear
Constant
Tenth degree
Cubic
Quadratic
Quintic
Seventh degree
The degree name becomes the “first name” of the polynomial.

12. Naming Polynomials (by number of terms)

13. Naming Polynomials (by number of terms)
One term
Monomial

14. Naming Polynomials (by number of terms)
One term
Monomial
Two terms
Binomial

15. Naming Polynomials (by number of terms)
One term
Monomial
Two terms
Binomial
Three terms
Trinomial

16. Naming Polynomials (by number of terms)
One term
Monomial
Two terms
Binomial
Three terms
Trinomial
Four (or more) terms
Polynomial with 4 (or more) terms

17. Let’s practice classifying a polynomial by “number of terms”.
15x
2e8 – 3e7 + 3e – 7
6c + 5
3y7 – 4y5 + 8y3 64
2p8 – 4p6 + 9p4 + 3p – 1
25h3 – 15h2 + 18
55c
Classify by # of Terms:
Monomial
Polynomial with 4 terms
Binomial
Trinomial
Polynomial with 5 terms

18. Can you name them now? POLYNOMIAL 5x2 – 2x + 3 2z + 5 7a3 + 4a – 12
-15
27x8 + 3x5 – 7x + 4
9x4 – 3
10x – 185
18x5
CLASSIFICATION / NAME
Quadratic Trinomial
Linear Binomial
Cubic Trinomial
Constant Monomial
8th Degree Polynomial with 4 terms.
Quartic Binomial
Quintic Monomial