Polynomials and Exponents

Key concepts (textbook)

Exponents

Summary of exponent properties

If a and b are real numbers, and m and n are whole non-zero numbers, then

  • Product property: a a = a
  • Power property: (a) = a
  • Product to a power: (abc) = abc
  • Quotient property: a/a = a if m>n
  • Quotient property: a/a = 1/(a) if n>m
  • Quotient to a power property: (a/b) = a/b
  • Zero exponent: a = 1
  • Properties of - exponents: a = 1/(a) and 1/(a) = a
  • Quotient to a - exponent: (a/b) = (b/a)

Product & Power Rules

  • Product rule for exponents - when we multiply two numbers or expressions in exponent form with the same base, we keep the base the same and add exponents

a a = a (In examples abc are real numbers, m and n are counting numbers)

  • Power to power rule for exponents - when we have a power raised to another power, we keep our base the same and we multiply the exponents

(a) = a

  • Power of a product rule for exponents - we can raise a product to a power by raising each factor to the power - useful for variables

(3 x 2) = 3 x 2

(abc) = abc

  • Power of a quotient rule for exponents - we can raise a quotient to a power by raising the numerator (dividend) and denominator (divisor) to the power

(a/b) = a/b

Negative Exponents & the Quotient Rule

3 = 1x3x3x3 = 27 3 = 1x3x3 = 9 3 = 1x3 = 3 3 = 1 0 = undefined 3 = 1/3 3 = 1/9 3 = 1/27

Any nonzero number raised to a negative exponent is not in standard form. We will need to do some rearranging.

Easier: take the reciprocal of the base and make the exponent positive:

3 = 3/1 = 1/3 || 1/9 = (1/9)/1 = 1/9

  • Quotient rule - when we divide two numbers or expressions in exponent form and the bases are the same, we can keep the base the same and subtract the exponent in the denominator away from the exponent in the numerator

a/a = a if m>n

a/a = 1/(a) if n>m

a/a = a = a

Scientific Notation

Decimal notation Scientific notation E notation
2 2×10 2E0
300 3×10 3E2
4321.768 4.321768×10 4.321768E3
−53000 −5.3×10 -5.3E4
6720000000 6.72×10 6.72E9
0.2 2×10 2E-1
987 9.87×10 9.87E2
0.00000000751 7.51×10 7.51E-9

Polynomials

See pen and paper notes for these learning aims:

Add and subtract polynomials

  • Identify polynomials, monomials, binomials, and trinomials
  • Determine the degree of polynomials and put in standard form
  • Add and subtract monomials
  • Add and subtract polynomials
  • Evaluate a polynomial for a given value

Multiply polynomials

  • Multiply a polynomial by a monomial
  • Multiply a binomial by a binomial
  • Multiply a trinomial by a binomial

Special products

  • Square a binomial using the Binomial Squares Pattern
  • Multiply conjugates using the Product of Conjugates Pattern
  • Recognize and use the appropriate special product pattern

Divide monomials

  • Simplify expressions using the Quotient Property for Exponents
  • Simplify expressions with zero exponents
  • Simplify expressions using the quotient to a Power Property
  • Simplify expressions by applying several properties
  • Divide monomials

Divide polynomials

  • Divide a polynomial by a monomial
  • Divide a polynomial by a binomial
Interactive Graph
Table Of Contents
Polynomials and Exponents
Key concepts (textbook)
Exponents
Summary of exponent properties
Product & Power Rules
Negative Exponents & the Quotient Rule
Scientific Notation
Polynomials
Add and subtract polynomials
Multiply polynomials
Special products
Divide monomials
Divide polynomials