Chapter 10 - Polynomials Tab 1: Identifying Polynomials
Definition Polynomials : Is a monomial or a sum of monomials The prefix poly- means more than one, the suffix –nomial mean name but in math it means terms. Therefore, Polynomial means more than one term. Examples of Polynomials: * Terms are separated by a + or - sign. 2 12x³y 8x² + 4x – 3 x² - 9
Identifying Polynomials Polynomials are identified in two ways by the number of terms and by degree.
Identifying Polynomials by Terms Monomial: Mon means one, a polynomial with one term. Examples of Monomials: -4x 5 6x²y³
Identifying Polynomials by Terms * Terms are separated by a + or - sign. Binomial: Bi means two, a polynomial with two terms. Examples of Binomials: -4x + 3 x³ x²y³ - x
Identifying Polynomials by Terms * Terms are separated by a + or - sign. Trinomial: Tri means three, a polynomial with three terms. Examples of Trinomials: 8x² + 4x – 3 x²y³ + xy² – y 64y³ + y² – 2 * More than 3 terms is called a polynomial*
Identifying Polynomials by Degree Degree of the Polynomial is determined by the largest exponent of the variable. Examples: 5x³ + 4x² -6has a degree of 3Cubic x² + 4 has a degree of 2Quadratic 3x + 1 has a degree of 1Linear 2has a degree of 0Constant * More than a degree of 3, just write the number.*
Let’s Put IT All Together PolynomialDegreeIdentify by Degree Identify by Terms 6 3x + 1 -x²+2x-5 4x³ - 8x 5x³+4x²-6x+14
Let’s Put IT All Together PolynomialDegreeIdentify by Degree Identify by Terms 60 3x + 1 -x²+2x-5 4x³ - 8x 5x³+4x²-6x+14
Let’s Put IT All Together PolynomialDegreeIdentify by Degree Identify by Terms 60Constant 3x + 1 -x²+2x-5 4x³ - 8x 5x³+4x²-6x+14
Let’s Put IT All Together PolynomialDegreeIdentify by Degree Identify by Terms 60ConstantMonomial 3x + 1 -x²+2x-5 4x³ - 8x 5x³+4x²-6x+14
Let’s Put IT All Together PolynomialDegreeIdentify by Degree Identify by Terms 60ConstantMonomial 3x x²+2x-5 4x³ - 8x 5x³+4x²-6x+14
Let’s Put IT All Together PolynomialDegreeIdentify by Degree Identify by Terms 60ConstantMonomial 3x + 11Linear -x²+2x-5 4x³ - 8x 5x³+4x²-6x+14
Let’s Put IT All Together PolynomialDegreeIdentify by Degree Identify by Terms 60ConstantMonomial 3x + 11LinearBinomial -x²+2x-5 4x³ - 8x 5x³+4x²-6x+14
Let’s Put IT All Together PolynomialDegreeIdentify by Degree Identify by Terms 60ConstantMonomial 3x + 11LinearBinomial -x²+2x-52 4x³ - 8x 5x³+4x²-6x+14
Let’s Put IT All Together PolynomialDegreeIdentify by Degree Identify by Terms 60ConstantMonomial 3x + 11LinearBinomial -x²+2x-52Quadratic 4x³ - 8x 5x³+4x²-6x+14
Let’s Put IT All Together PolynomialDegreeIdentify by Degree Identify by Terms 60ConstantMonomial 3x + 11LinearBinomial -x²+2x-52QuadraticTrinomial 4x³ - 8x 5x³+4x²-6x+14
Let’s Put IT All Together PolynomialDegreeIdentify by Degree Identify by Terms 60ConstantMonomial 3x + 11LinearBinomial -x²+2x-52QuadraticTrinomial 4x³ - 8x3 5x³+4x²-6x+14
Let’s Put IT All Together PolynomialDegreeIdentify by Degree Identify by Terms 60ConstantMonomial 3x + 11LinearBinomial -x²+2x-52QuadraticTrinomial 4x³ - 8x3Cubic 5x³+4x²-6x+14
Let’s Put IT All Together PolynomialDegreeIdentify by Degree Identify by Terms 60ConstantMonomial 3x + 11LinearBinomial -x²+2x-52QuadraticTrinomial 4x³ - 8x3CubicBinomial 5x³+4x²-6x+14
Let’s Put IT All Together PolynomialDegreeIdentify by Degree Identify by Terms 60ConstantMonomial 3x + 11LinearBinomial -x²+2x-52QuadraticTrinomial 4x³ - 8x3CubicBinomial 5x³+4x²-6x+143
Let’s Put IT All Together PolynomialDegreeIdentify by Degree Identify by Terms 60ConstantMonomial 3x + 11LinearBinomial -x²+2x-52QuadraticTrinomial 4x³ - 8x3CubicBinomial 5x³+4x²-6x+143Cubic
Let’s Put IT All Together PolynomialDegreeIdentify by Degree Identify by Terms 60ConstantMonomial 3x + 11LinearBinomial -x²+2x-52QuadraticTrinomial 4x³ - 8x3CubicBinomial 5x³+4x²-6x+143CubicPolynomial