Homework Checks Must Have Work Where Appropriate. Answers Only Receive No Credit

Homework checks must have work where appropriate. Answers only receive no credit.

WORK = CREDIT

NO WORK = NO CREDIT

“I DID IT ON THE CALCULATOR” = NO CREDIT

DAY / TOPIC / ASSIGNMENT
1 / SETS OF NUMBERS AND NOTATIONS
(Emphasis on Set-Builder and Interval Notation) / Skip Roster Notation
1.1 p. 10-13 #15, 18, 20,27- 39 odd, 46, 47, 63-65
2 / PROPERTIES OF REAL NUMBERS AND APPLICATIONS / 1.2 p. 17-18 #15-26, 29, 30, 35-41 (you need to actually explain #41)
3 / More on Notation and Properties / worksheets
4 / QUIZ / TO BE ANNOUNCED
5 / Solving Linear Equations and Inequalities / 2.1 p. 94-95 #2, 3-19 odd, Choose 2 of the following: 21, 40, 48
6 / Graphing Linear Equations
p. 109 #21 together if time / Graphs on graph paper; use a ruler
2.3 p. 109-110 #1-8, 13, 14, 17-20;
7 / Finding slope, Writing Linear Equations / 2.4 p.120-122 #1-11 (skip 9), 23-25, 42
8 / same as above / 2.4 p. 121-123 #13-18, 22a [use y-y1=m(x-x1)], 31, 35, 44-46
9 / Solving and Graphing Linear Inequalities
(#10 in class if time) / 2.5 p.128-130 #1-5, 10, 25, 26, 38-40, 44-46, 52,
10/11 / Loose Ends/REVIEW / Review: p.76 #1-12, p.166-168 #4-13, 19-40
12 / TEST / PSSA/SAT Review TBA

All numbers that you have dealt with up until this point are known as ______numbers.
______numbers are based on the idea that ______. More on this to come in a later chapter!
Real numbers can be broken down into groups known as ______.

Subsets of Real Numbers
Name / Explanation / Example
Natural Numbers
Whole Numbers
Integers
Rational Numbers
Irrational Numbers

State which set(s) each number is in, choosing from N (natural), W (whole), Z (Integer), Q(rational), Irrational, and R (real). Then order from least to greatest.

a) b)

True or False?

a)Every natural number is an integer: ______

b)Every integer is a whole number: ______

c) Some rational numbers are integers: ______

d) Every whole number is an integer:______

Methods of Notation
Words / Set Notation / Interval Notation / Number Line
All numbers greater than or equal to 4
Properties of Real Numbers
If a, b, and c are all real numbers, then…
Property / Addition / Multiplication
Commutative /
Associative
Distributive /
Inverse / *opposite or additive inverse / *reciprocal or multiplicative inverse
Identity / ,

Find the additive and multiplicative inverse of each number

Note: We are trying to find a number so that our “pair” will add to _____ and multiply to _____.

a) b) c) d)

add:add:add:add:

mult:mult:mult:mult:

Determine which property is being used and be sure to include which operation (add or multiply)

PropertyOperation

______
______
______
______
______
______

Fill in each of the blanks below, and then state the property (and operation) that was used.

PropertyOperation

______
______
______
______
______
______

Applications of the properties: Use the table at the right to answer each of the following questions.
Cost of 2 pens and 3 notebooks

Cost of 1 binder and 5 notebooks

Cost of 3 notebooks at 20% discount,

a binder at 25% discount, and 2 pens

1.Rewrite using set-builder notation: {-1, 0, 1, 2, 3, 4}

2.Rewrite using set-builder notation: {5, 6, 7, 8}

Represent the numbers between -7 and 11 using set-builder notation. Note: the word "between" suggests t

hat the endpoints are not included. Also note that I did not say the integers between -7 and 11, I said the numbers between -7 and 11.

4.Rewrite using interval:

5.Rewrite using interval:

6.Draw on a number line:

10.

11.the numbers between 4 and 10

12.the numbers less than -2 or greater than 7

13. Given the numbers above, determine which could be classified as the following:

a. Which numbers are Natural Numbers?______

b. Which numbers are Rational Numbers?______

c. Which numbers are Integers?______

d. Which numbers are Real Numbers?______

e. Which numbers are Irrational Numbers?______

14. List the numbers above in order from least to greatest…

15. Fill in the blank, where appropriate, and state the appropriate property.

Property:Property:Property:

Solving inequalities is (almost) like solving equations….

When solving equations, one of three outcomes can occur…
b. c.

To summarize…
When the variable does not drop out, there is ______solution.
When the variable drops out and the equation is true, then there are ______solutions 
When the variable drops out and the equation is false, then there are ______solutions 

Examples to try:

b. c.

d. e. f.

Solving and Graphing Inequalities
All rules that apply for solving equations are ______, except for one…

When you multiply or divide by a ______number, you must…

< or > / or
< or / > or

Examples:

Word Problems
Blair wants to spend less than $50 at the grocery store. He already has $37 worth of groceries in his shopping cart and is going to buy some fresh vegetables for $0.75 each. How many vegetables v can he buy and stay under his limit?

The average of 4 numbers is 42. Three of the numbers are 35, 53, and 60. What must the missing number be?

You create a fenced in rectangle from 510ft of fencing. If the length of the rectangle is fifteen greater than three times the width, determine the area of the fenced in yard. Draw a diagram to help.

Find two consecutive even integers such that two times the first plus three times the second is 76.

Closure
What are the 3 possible scenarios when solving an equation? What makes them occur?
What dictates open and closed circles for graphing inequalities? How do you know which direction to shade?
What is the main difference between solving equations and solving inequalities?

There will be a mini quiz at the end of class today (starting @ the 8 minute bell).
For the quiz, you must know the following vocabulary words:

slope, x-intercept, rate of change, y-intercept, slope-intercept, linear function, horizontal, and vertical

In addition, you must be able to perform the following operations:
Determine if a set of data represents a linear function
Convert an equation into slope-intercept form
Graph lines (including horizontal and vertical ones)
Use the rest of this notes sheet as your guide to answer the questions on the next few pages. You may work in small groups. Use this time wisely to practice problems similar to those on the mini quiz.

A linear function can be written in the form (this is known as slope intercept form).

Note: Sometimes instead of y, we use the “fancy” function notation .

To determine if data is a linear function, check to see if the ratios are the same.

This is linear function because the rate of change

is always the same.

x always adds 2, and f(x) always adds 3

This means the slope is 3/2!

This is NOT a linear function because the rate of

change is NOT always the same.

x always adds 2, but f(x) always different

numbers!!!

To convert an equation to slope-intercept form, solve for y! Example:

With your partner, use the examples on the previous two pages to help you answer the following question. You, of course, may always ask your teacher for help as well.

Graph the following equations. Be sure to identify any information you used to graph the equations.

The first goal for today is to review how to find slope in the following situations:

a)From an equation in slope-intercept form

b)From an equation in a different form

c)From a graph

d)From a table

e)From a line parallel

f)From a line perpendicular

Next, we will review how to write the equation of a line – you must know two forms:

SLOPE-INTERCEPT FORM:POINT-SLOPE FORM:

Be able to write the equation of a line…

a)From a table

b)From two points

c)From a point and the slope

d)From a graph

e)Through a point and a parallel line

f)Through a point and a perpendicular line

Once you finish your mini quiz, you can start on tonight’s homework. The pages are copied here for you…

First we need to be able to solve for ____ in linear inequalities. Then we can ______them!

Example:

< or > / or
< or / > or

#2) #3)

Solid / DashedAbove / BelowSolid / DashedAbove / Below
Word Problem:

For a football game, student tickets cost $3 and adult tickets cost $5. The school is hoping to raise at least $400 in ticket sales. If x represents the number of student tickets and y represents the number of adult tickets, write an inequality to model this situation.

a) If 40 student tickets are sold and 20 adult tickets are sold, will the school raise enough money?

For each graph below, write an inequality that represents it. Use the clues below to help you.

m = ______m = ______m = ______

b = ______b = ______b = ______

Above or BelowAbove or BelowAbove or Below

Solid or DashedSolid or DashedSolid or Dashed

Inequality: ______Inequality: ______Inequality: ______

1) 2)

3) 4)

The review problems in class as well as the homework problems listed on day 10 of the syllabus will be the best way to prepare you for tomorrow’s tests.

The following topics will be covered:

Sets of Numbers: Make sure you know what Natural Numbers, Whole Numbers, Integers, Rational Numbers and Irrational numbers are.
Notation: Please know how to write answers in interval notation and set notation.
Properties of Numbers: Be familiar with Commutative, Associative, Distributive, Identity, and Inverse properties.
Solving Equations: Be able to solve (somewhat) complex equations.
Solving Inequalities: Be able to solve inequalities. Remember, when you multiply or divide by a negative number, you must flip the sign!
Slope: Know the definition of slope, and be able to find slope using the slope formula (you must memorize this!)
Writing Linear Equations: Be able to write an equation of a line when you know a) two points, b) a point and the slope, c) a point and a line parallel, d) a point and a line perpendicular
Graphing Lines: Be able to graph a line when given an equation (even if it is not given in slope-intercept form!)
Graphing Inequalities: Be able to graph inequalities – remember solid/dashed and above/below.
Word Problems: Be able to solve problems about the topics listed above!

Use the graphs when needed during the review game.