Presentation is loading. Please wait.

Presentation is loading. Please wait.

01 Polynomials, The building blocks of algebra College Algebra.

Published byMyron Morton Modified over 8 years ago

Similar presentations

Presentation on theme: "01 Polynomials, The building blocks of algebra College Algebra."— Presentation transcript:

1 01 Polynomials, The building blocks of algebra College Algebra

2 Numbers Natural / Counting Integers Rational Irrational 1.1 Underlying field of numbers

3 Real Numbers Irrational

4 1.2 Indeterminates, variables, parameters Given: ax 2 + bx + c Usual thought: x = variable a, b, & c = constants

5 mx + c you may recognize and associate this expression with a linear equation The idea (and warning) is to look for definitions Likewise…

6 Linear equations Most books teach the following: Slope Intercept Form: Standard Form: Point Slope Form: y = mx + b Ax + By = C y – y 1 = m(x - x 1 )

7 These are the same types of equations c = pn + d pn + c = d Profit = price*quanity - cost

8 Pythagorean Theorem is a good example also a 2 + b 2 = c 2 What if we are talking about a: Building = B Ladder = L Ground Distance = G L G B B 2 + G 2 = L 2

9 Variables Used to represent and unknown quantity or a changing value. x y + 2 3x – 2y mx + b

10 1.3 Basics of Polynomials Parts –Coefficient –Variable –Terms Monomials Polynomial (multiple terms) 3x 2 y + 4xy Remember you may have definitions

11 1.4 Working with Polynomials To add or subtract one must have like terms. 3xy + 4xy = 7xy 3xy+4x is in simplified form

12 Rules of Exponents: MULTIPLICATION Multiply like Bases a m * a n 3 2 * 3 4 Add exponents a m+n 3 2+4 = 3 6

13 Rules of Exponents: Exponents Exp raised to an Exp (a m ) n (3 2 ) 4 Multiply exponents a m*n 3 2*4 = 3 8

14 Rules of Exponents: DIVISION Divide like Bases amam anan 3434 3232 Subtract exponents a m-n 3 4-2 = 3 2

15 Rules of Exponents: Qty raised to an Exp (ab) m (3x) 4 Distribute exponents ambmambm 34x434x4 Quantity to an Exponent

16 Rules of Exponents: Negative Exp Number raised to a neg Exp a -m 3 -2 = the reciprocal 1 amam 1 2 1 3 2 9 =

17 Degrees of Polynomials Degrees will be dependent on the definition of the variables. The degree is the highest (combined value) of the exponents of one term. Degree of x 2 y = 3 Degree of xy = 2 Therefore the degree of 3x 2 y + 4xy = 3 3x 2 y + 4xy

18 Degrees of Polynomials Generally speaking, the degree of 3x 2 y + 4xy = 3 How will this change is y is defined as a constant and x is a variable? 3x 2 y + 4xy

19 Degrees of Polynomials Generally speaking, the degree of 3x 2 y + 4xy = 3 How will this change is y is defined as a constant and x is a variable? The Degree = 2 because 2 is the highest exponent of the VARIABLE 3x 2 y + 4xy

20 1.5 Examples of Polynomial Expressions What is the degree of f(x)? f(x) = x 6 -3x 5 +3x 4 -2x 3 -2x 2 -x+3 What is the degree? 11x 4 y-3x 3 y 2 +7x 2 y 3 -6xy 4 What is the degree if y is a variable? g(x) = 11x 4 y-3x 3 y 3 +7x 2 y 3 -2xy 4

21 1.5 Examples of “NOW WHAT” happens…Polynomial Expressions f(x) = x 6 -3x 5 +3x 4 -2x 3 -2x 2 -x+3 g(x) = 11x 4 -3x 3 +7x 2 -2x 1.f(x)+g(x) 2.f(x)g(x) 3.f(g(x))

22 1.5 Examples of “NOW WHAT” happens…Polynomial Expressions f(x) = x 6 -3x 5 +3x 4 -2x 3 -2x 2 -x+3 g(x) = 11x 4 -3x 3 +7x 2 -2x 1.f(x)+g(x) x 6 -3x 5 +3x 4 -2x 3 -2x 2 -x+3 + 11x 4 -3x 3 +7x 2 -2x x 6 -3x 5 +14x 4 -5x 3 +5x 2 -3x+3 Possible questions.. What is the degree? What is the coefficient of the x cubed term?

23 1.5 Examples of “NOW WHAT” happens…Polynomial Expressions f(x) = x 6 -3x 5 +3x 4 -2x 3 -2x 2 -x+3 g(x) = 11x 4 -3x 3 +7x 2 -2x 2. f(x)g(x) -- distributive property This could be ugly if one was asked to complete the multiplication (x 6 -3x 5 +3x 4 -2x 3 -2x 2 -x+3 )( 11x 4 -3x 3 +7x 2 -2x)= 11x 10 -3x 9 +7x 8 -2x 7 -33x 9 +9x 8 -21x 7 +6x 6 +33x 8 -9x 7 +21x 6 -6x 5 … what is the degree of the product?

24 1.5 Examples of “NOW WHAT” happens…Polynomial Expressions f(x) = x 6 -3x 5 +3x 4 -2x 3 -2x 2 -x+3 g(x) = (11x 4 -3x 3 +7x 2 -2x) 3. f(g(x)) (11x 4 -3x 3 +7x 2 -2x) 6 -3(11x 4 -3x 3 +7x 2 -2x) 5 +3(11x 4 -3x 3 +7x 2 -2x) 4 -2(11x 4 -3x 3 +7x 2 -2x) 3 - 2 (11x4-3x3+7x2-2x) 2 - (11x4-3x3+7x2-2x) +3 = (11x 4 -3x 3 +7x 2 -2x) 6 - … 11 6 x 24 -3 6 x 18 +7 6 x 12 -64x 6 - … what is the degree?

25 WebHomework Syntax add subtract multiply divide quantities exponents Be SPECIFIC!!!!! + - * / ( ) ^ Be SPECIFIC!!!!!

26 WebHomework Syntax 3x 2 y + 4xy 3*x^2*y+4*x*y 4Ab - 5aB 3 4*A*b-5*a*B^3 (Case Sensitive) Quantities ((7+x^2)/(2*z))*y No extra spaces

27 Free Mathematics Software http://math.exeter.edu/rparris//

Download ppt "01 Polynomials, The building blocks of algebra College Algebra."

Similar presentations

Lesson 1.2 Calculus. Mathematical model: A mathematical description of a real world situation.

Lesson 1.2 Calculus. Mathematical model: A mathematical description of a real world situation.
MATH Part 2. Linear Functions - Graph is a line Equation of a Line Standard form: Ax + By = C Slope Intercept Form: y = mx + b m = slope b = y – intercept.

MATH Part 2. Linear Functions - Graph is a line Equation of a Line Standard form: Ax + By = C Slope Intercept Form: y = mx + b m = slope b = y – intercept.
RATIONAL EXPRESSIONS Chapter 5. 5-1 Quotients of Monomials.

RATIONAL EXPRESSIONS Chapter Quotients of Monomials.
Chapter 6 Polynomials.

Chapter 6 Polynomials.
Solving Linear Equations

Solving Linear Equations
Greatest Common Divisor Exponents Sections 1.2 & 1.3

Greatest Common Divisor Exponents Sections 1.2 & 1.3
A POLYNOMIAL is a monomial or a sum of monomials.

A POLYNOMIAL is a monomial or a sum of monomials.
1.Be able to divide polynomials 2.Be able to simplify expressions involving powers of monomials by applying the division properties of powers.

1.Be able to divide polynomials 2.Be able to simplify expressions involving powers of monomials by applying the division properties of powers.
4.1 The Product Rule and Power Rules for Exponents

4.1 The Product Rule and Power Rules for Exponents
Section 5.1 Polynomials Addition And Subtraction.

Section 5.1 Polynomials Addition And Subtraction.
An equation is a mathematical statement that two expressions are equivalent. The solution set of an equation is the value or values of the variable that.

An equation is a mathematical statement that two expressions are equivalent. The solution set of an equation is the value or values of the variable that.
Lesson 8.4 Multiplication Properties of Exponents

Lesson 8.4 Multiplication Properties of Exponents
Chapter 6 Polynomial Functions and Inequalities. 6.1 Properties of Exponents Negative Exponents a -n = –Move the base with the negative exponent to the.

Chapter 6 Polynomial Functions and Inequalities. 6.1 Properties of Exponents Negative Exponents a -n = –Move the base with the negative exponent to the.
Objectives: To evaluate and simplify algebraic expressions.

Objectives: To evaluate and simplify algebraic expressions.
Review Topics (Ch R & 1 in College Algebra Book) Exponents & Radical Expressions (P. 21-25 and P. 72-77) Complex Numbers (P. 109 – 114) Factoring (p.

Review Topics (Ch R & 1 in College Algebra Book) Exponents & Radical Expressions (P and P ) Complex Numbers (P. 109 – 114) Factoring (p.
Monomials Multiplying Monomials and Raising Monomials to Powers.

Monomials Multiplying Monomials and Raising Monomials to Powers.
Chapter 5: Polynomials & Polynomial Functions

Chapter 5: Polynomials & Polynomial Functions
Adding and Subtracting Polynomials Section 0.3. Polynomial A polynomial in x is an algebraic expression of the form: The degree of the polynomial is n.

Adding and Subtracting Polynomials Section 0.3. Polynomial A polynomial in x is an algebraic expression of the form: The degree of the polynomial is n.
Polynomials P4.

Polynomials P4.
2nd Degree Polynomial Function

2nd Degree Polynomial Function

Similar presentations

Ads by Google