Further Algebra Lecture 2 PDF

Summary

This is a lecture on further algebra, covering topics like scientific notation, simplifying rational expressions, and operations on polynomials. Specific examples are provided to enhance understanding.

Full Transcript

1

Further Algebra
 Objectives
2

After completing this Lecture, you should be able to understand:

Scientific notation

Simplifying Rational Expressions

Rational Expression operations

Polynomials operations

Recognize special products
 Scientific Notation

A positive real number is written in scientific notation when it is written in the
form
𝑎 × 10𝑛 ,
where 1 ≤ 𝑎 < 10 and 𝑛 is an integer.
A reminder: Powers of 10

Power of 10−4 10−3 10−2 10−1 100 101 102 103 104
𝟏𝟎
Value 0.0001 0.001 0.01 0.1 1 10 100 1000 10000

Warning:
A number can be written in many ways using the powers of 10, but only one of
them represents the scientific notation. For example, while
𝟏𝟔. 𝟓 = 𝟏𝟔𝟓 × 𝟏𝟎−𝟏 = 𝟏𝟔. 𝟓 × 𝟏𝟎𝟎 = 𝟏. 𝟔𝟓 × 𝟏𝟎𝟏 = 𝟎. 𝟏𝟔𝟓 × 𝟏𝟎𝟐 is true,
only 𝟏. 𝟔𝟓 × 𝟏𝟎𝟏 is the scientific notation of 16.5
 Example 5: Writing Numbers in Scientific Notation

Write each number in scientific notation.
a) 295000000
b) 0.00000000105

Solution:
a) 295000000 = 2.95 × 108
b) 0.00000000105 = 1.05 × 10−9

Try & Check
Write each number in scientific notation.
a) 6400000
b) 0.000000002
 Example 6: Converting from Scientific Notation to Decimals

Rewrite the following numbers in decimal form.
a) 2.05 × 104
b) 5.01 × 10−5

Solution:
a) 2.05 × 104 = 2.05 × 10000 = 20500
b) 5.01 × 10−5 = 5.01 × 0.00001 = 0.0000501

Try & Check

Rewrite the following numbers in decimal form.
a) 1.05 × 106
b) 4. 1 × 10−6
Rational Expression

A Rational Expression is a fraction where the numerator and denominator are polynomials

Some Examples:

𝑥+1 𝑥𝑦 2𝑥 3𝑥+1
, , ,
𝑥 𝑥 2 +𝑥𝑦+𝑦 2 𝑥 2 +1 𝑥 2 −4

Some Remarks on Rational Expressions:

1. The denominator of a rational expression cannot be 0.
2. When the denominator of a rational expression is 0, we say that the
expression is undefined.
𝑥+1
For example, in order for 𝑥
not to be undefined, the variable 𝑥 must be

different from 0
Same rule of fractions of the previous lectures will be used
 Simplifying Rational Expression
Theorem (The Cancellation Law)

If 𝑎, 𝑏 and 𝑐 are real numbers such that 𝑏 ≠ 0 and 𝑐 ≠ 0, then
𝑎𝑐 𝑎
=.
𝑏𝑐 𝑏

Example : Simplifying Rational Expressions
𝑥 4 +𝑥 3
Simplify the rational expression 𝑥 3 +𝑥 2.

Factor the numerator. First, factor out 𝑥4 + 𝑥3 𝑥3 𝑥 + 1
the GCF, 𝑥 3. 3 2
=
𝑥 +𝑥 𝑥3 + 𝑥2
Factor the denominator, First, factor out 𝑥3 𝑥 + 1 3−2
𝑥+1
= 2 =𝑥
the GCF, 𝑥 2. 𝑥 (𝑥 + 1ሻ 𝑥+1

Simplify. =𝑥
 Example : Simplifying Rational Expression
25−𝑥 2
Simplify 𝑥 2 −7𝑥+10.

25 − 𝑥 2
Solution 𝑥 2 − 7𝑥 + 10
Factor the numerator (use the factoring of 5−𝑥 5+𝑥
=
the difference of two squares). 𝑥 2 − 7𝑥 + 10
5−𝑥 5+𝑥
Factor the denominator. =
𝑥 − 5ሻ(𝑥 − 2

In the binomial 5 − 𝑥, factor out −1; 5 (−1ሻ 𝑥 − 5 5 + 𝑥
− 𝑥 = (−1ሻ(𝑥 − 5ሻ. =
𝑥 − 5ሻ(𝑥 − 2

Identify common factors (−1ሻ 𝑥 − 5 5 + 𝑥
=
𝑥 − 5ሻ (𝑥 − 2
Simplify 𝑥+5
=−
𝑥−2
 Try & Check
4𝑥 3 +8𝑥 2
Simplify
𝑥 2 +2𝑥

Example 5: Simplifying Rational Expressions containing factors that are additive inverses

Solution

Reminder:
𝑎−𝑏 =− 𝑏−𝑎
= −1(𝑏 − 𝑎ሻ

Try& Check
Addition and Subtraction of Rational Expression

Addition and Subtraction of Fractions with Common Denominator
If 𝑎, 𝑏, 𝑐 are real numbers such that 𝑐 ≠ 0 then
𝑎 𝑏 𝑎+𝑏 𝑎 𝑏 𝑎−𝑏
+ = and − =.
𝑐 𝑐 𝑐 𝑐 𝑐 𝑐

Example : Adding or Subtraction Rational Expression

Perform the following operations and simplify
𝑥 2 +1 2𝑥 𝑥 2 +1 2
a. + b. −
𝑥+1 𝑥+1 𝑥+1 𝑥+1

a. 𝑥 2 +1 2𝑥 𝑥 2 +1+2𝑥
+ =
Add the numerators. 𝑥+1 𝑥+1 𝑥+1

𝑥 2 + 2𝑥 + 1
=
𝑥+1
 continued

Factor the numerator 𝑥+1 2
=
𝑥+1
Simplify.
=𝑥+1

b.
𝑥2 + 1 2 𝑥2 + 1 − 2
Subtract the numerators. − =
𝑥+1 𝑥+1 𝑥+1
𝑥2 − 1
Simplify =
𝑥+1

Factor the numerator 𝑥 − 1ሻ(𝑥 + 1
=
𝑥+1

Simplify
=𝑥−1
 Multiplying and Dividing Rational Expression

To multiply rational expressions, we always simplify each expression
before multiplying. If 𝑎, 𝑏, 𝑐 and 𝑑 are real numbers such that 𝑏 ≠ 0, and 𝑑
𝑎 𝑐 𝑎𝑐
≠ 0 then ⋅ =.
𝑏 𝑑 𝑏𝑑

Example 7: Multiplying Rational Expressions

3𝑥𝑦 𝑥 2 +6𝑥+9
Simplify the product: 𝑥 2 𝑦+3𝑥𝑦
⋅ 3𝑥+9.

3𝑥𝑦 𝑥+3 2
Factor all numerators and all = ⋅
𝑥𝑦(𝑥 + 3ሻ 3(𝑥 + 3ሻ
denominators.
3𝑥𝑦 𝑥+3 2
Identify common factors. = ⋅
𝑥𝑦(𝑥 + 3 3(𝑥 + 3ሻ
ሻ

Simplify. =1
 Division of Fractions

Example : Dividing Rational Expression

𝑝2 −4𝑝−12 2𝑝2 +6𝑝+4
Simplify: 𝑝2 −6𝑝
÷ 8𝑝6.
Solution:
Rewrite the division as a multiplication by 𝑝2 − 4𝑝 − 12 8𝑝6
= ⋅ 2
the reciprocal. 𝑝2 − 6𝑝 2𝑝 + 6𝑝 + 4
𝑝−6 𝑝+2 8𝑝6
Factor all terms. = ⋅
𝑝 𝑝−6 2(𝑝2 + 3𝑝 + 2ሻ

𝑝−6 𝑝+2 8𝑝6
Factor 𝑝2 + 3𝑝 + 2. = ⋅
𝑝 𝑝−6 2 𝑝 + 2 (𝑝 + 1ሻ
𝑝−6 𝑝+2 2 ⋅ 4 ⋅ 𝑝 ⋅ 𝑝5
Find common factors. = ⋅
𝑝 𝑝−6 2 𝑝 + 2 (𝑝 + 1ሻ
4𝑝5
Simplify =
𝑝+1
 Try & Check
Simplify:
𝑤 2 −3𝑤+5 𝑤 2 +10𝑤+16
÷.
𝑤 2 −4 𝑤 2 −1
 Polynomial 15

A monomial is a real number or a product of a real number and one or more variables
with non negative integer exponents. The number is called the coefficient of the
monomial.

Example:
1 1
− 𝑥 2 𝑦𝑧 is a monomial in 𝑥 , 𝑦 𝑎𝑛𝑑 𝑧, its coefficient is −.
2 2
−𝑢2 𝑣 3 is a monomial in u 𝑎𝑛𝑑 𝑣, its coefficient is −1.
15 is a constant monomial, its coefficient is 15.

The degree of a monomial is the sum of the exponents of its variables.
1
The degree of − 𝑥 2 𝑦𝑧 is 4.
2
The degree of −𝑢2 𝑣 3 is 5.
The degree of 15 = 15𝑥0 is 0.
The number 0 has no defined degree.
 Polynomial 16

A monomial in one variable, 𝒂𝒙𝒌 , is the product of a constant and a variable
raised to a nonnegative-integer power. The constant 𝒂 is called the coefficient
of the monomial, and 𝒌 is called the degree of the monomial. A polynomial is
the sum of monomials. The monomials that are part of a polynomial are called
terms.
Example:
1 1
− 𝑥 2 is a monomial in 𝑥, its coefficient is − and its degree is 2
2 2

A polynomial is a monomial or a sum of monomials. Each monomial in that sum is
a term of the polynomial.
A polynomial with two terms is a binomial, for example : 𝑥 3 + 4.7
A polynomial with three terms is a trinomial, for example : 𝑥 4 + 2𝑥 + 9
The degree of a polynomial is the degree of its term with the highest degree.
Any non zero real number is a polynomial with degree 0.
The number 0 is a polynomial with no defined degree, it is called the zero
polynomial.
 Polynomial 17

A polynomial in 𝒙 is an algebraic expression of the form
𝑎𝑛 𝑥 𝑛 + 𝑎𝑛−1 𝑥 𝑛−1 + ⋯ + 𝑎2 𝑥 2 + 𝑎1 𝑥 + 𝑎0
where 𝑎𝑛 , 𝑎𝑛−1 , … , 𝑎1 , 𝑎0 are real numbers, with 𝑎𝑛 ≠ 0, and 𝑛 is a nonnegative
integer. The degree of the polynomial is 𝑛, the leading coefficient is 𝑎𝑛 , and
the constant term is 𝑎0.

Example:
Write the polynomial 3𝑥 2 − 8 + 14𝑥 3 − 20𝑥 8 + 𝑥 in standard form and
state its degree, leading coefficient, and constant term.
Solution:
Standard form: −20𝑥 8 + 14𝑥 3 + 3𝑥 2 + 𝑥 − 8
Degree: 8
Leading coefficient: −20
Constant term: −8
 Add and Subtract polynomials
18
Polynomials are added and subtracted by combining like terms. Like terms are
terms having the same variables and exponents. Like terms can be combined by
adding their coefficients.
5𝑥 3 − 2𝑥 − 𝑥 3 − 2𝑥 3
= 5𝑥 3 − 𝑥 3 − 2𝑥 3 − 2𝑥
= 5𝑥 3 − 𝑥 3 − 2𝑥 3 − 2𝑥
= 2𝑥 3 − 2𝑥

Example:

Find the difference and simplify 3𝑥 3 − 2𝑥 + 1 − 𝑥 2 + 5𝑥 − 9.

3𝑥 3 − 2𝑥 + 1 − 𝑥 2 + 5𝑥 − 9
= 3𝑥 3 − 2𝑥 + 1 − 𝑥 2 − 5𝑥 + 9
= 3𝑥 3 − 𝑥 2 − 2𝑥 − 5𝑥 + 9 + 1
=3𝑥 3 − 𝑥 2 − 7𝑥 + 10
CTECH-215 COLLEGE OF
APPLIED MEDICAL SCIENCES
 Multiply polynomials.
19

Multiplying a Monomial and a Polynomial Multiplying Two Polynomials

Find the product and simplify Multiply and simplify
5𝑥 2 −𝑥 3 + 7𝑥 2𝑥 2 − 3𝑥 + 1 𝑥 2 − 5𝑥 + 7

2𝑥 2 + 1 𝑥 2 − 5𝑥 + 7
= 5𝑥 2 −𝑥 3 + 7𝑥

= −5𝑥 2 (𝑥 3 ሻ + 5𝑥 2 (7𝑥) = 2𝑥 2 𝑥 2 − 5𝑥 + 7 +1 𝑥 2 − 5𝑥 + 7
= 2𝑥 4 − 10𝑥 3 + 14𝑥 2 + 𝑥 2 − 5𝑥 + 7
= −5𝑥 5 + 35𝑥 3 = 2𝑥 4 − 10𝑥 3 + 15𝑥 2 − 5𝑥 + 7

CTECH-215 COLLEGE OF
APPLIED MEDICAL SCIENCES
 Special Products
20

𝑎 − 𝑏 𝑎 + 𝑏 = 𝑎2 − 𝑏 2 Difference of two Squares
𝑎+𝑏 2
= 𝑎 2 + 2𝑎𝑏 + 𝑏2 Square of a binomial sum
𝑎−𝑏 2
= 𝑎 2 − 2𝑎𝑏 + 𝑏2 Square of a binomial difference

𝑎3 − 𝑏3 = 𝑎 − 𝑏 𝑎2 + 𝑎𝑏 + 𝑏2 Difference of cubs
𝑎3 + 𝑏3 = 𝑎 + 𝑏 𝑎2 − 𝑎𝑏 + 𝑏2 Sum of cubs

Example :
Find the following:

a) (3𝑥 + 1ሻ2 b) (3 − 𝑦ሻ2

(c) (4𝑎 + 2ሻ(4𝑎 − 2ሻ d) 64 − 8𝑥 3

3
(d) 27 + 125𝑦
CTECH-215 COLLEGE OF
APPLIED MEDICAL SCIENCES DEPAENT OF
CARD
EXAMPLE Factoring a Perfect Square

Factor k2 + 20k + 100.

 k 2  20k  100
  k  10 
2

Check :
2  k 10  20k

Copyright © 2008 Pearson Education, Inc.
Publishing as Pearson Addison-Wesley
 Example

Factor each trinomial.

  x  12 
2
x  24 x  144
2

  5 x  3
2
25 x  30 x  9
2

36a 2  20a  25 prime

 2 x  9 x 2  42 x  49   2 x  3x  7 
2
18 x  84 x  98 x
3 2

Copyright © 2008 Pearson Education, Inc.
Publishing as Pearson Addison-Wesley
Example difference of two squares

Determine whether the binomial is a difference of two squares. If so, factor. If
not, explain.
5. 9x2 – 144y4 (3x + 12y2)(3x – 12y2)

6. 30x2 – 64y2 not a difference of two squares; 30x2 is not a perfect square

7. 121x2 – 4y8 (11x + 2y4)(11x – 2y4)
 EXAMPLE Factoring Sums and difference of Cubes

Factor each polynomial.

𝑝3 + 64 = 𝑝 + 4 𝑝2 − 4𝑝 + 16

27𝑥 3 − 64𝑦 3 = 3𝑥 + 4𝑦 9𝑥 2 + 12𝑥𝑦 + 16𝑦 2

512𝑎6 + 𝑏3 = 8𝑎2 + 𝑏 64𝑎 4 − 8𝑎2 𝑏 + 𝑏2

Copyright © 2008 Pearson Education, Inc.
Publishing as Pearson Addison-Wesley Slide 6.4 - 24
END OF LECTURE
Week 2