Chapter 1 Review Guided Notes

NAME______Jacoby

Fall Semester 2013

- 1 -

Chapter 7: Integers.

Galileo lived in Italy in the 1500s. He studied how to measure temperature. Galileo found that a liquid would rise or fall in a glass tube, depending on the temperature. He liquid rose or dropped, and the temperature as marked on the glass. Sounds familiar? Glass and alcohol or mercury thermometers are really number lines, just like you use in math. They’re marked by degrees of temperature. Alcohol or mercury expands up into the positive numbers when heated and shrinks into the negative numbers when cooled. Those positive and negative numbers are called integers. In math, integers can be a real hot topic.

Goals for learning:

To identify the absolute value of integers

To compare the values of negative and positive

To add, subtract, multiply, and divide integers.

Watch Movie:

Lesson 1: The Real Number Line and Integers

In arithmetic, you learned to add, subtract, multiply, and divide whole numbers greater than zero. In algebra, you will also use whole numbers less than zero.

Warm-Up:

What are some numbers less than zero? Where do you see these numbers?

You can use a number line to show the relation between positive and negative whole numbers, also called integers.

Vocab for Understanding:

Integer:

Real Number:

Negative Integer:

Positive Integer:

Every point on the number line corresponds to a specific real number. The arrows at the ends of the number line show that the line continues.

Numbers to the left of zero are negative integers. They are read as ‘negative one’, ‘negative two’… and so on.

Zero is neither negative nor positive.

Numbers to the right of the zero are positive integers. They are read as ‘positive one,’ positive two,’ and so on….

A negative number is always indicated by the______.

A positive sign is always indicated by ______or

______.

The absolute value of an integer is the distance ______

______.

The integer can be either to the left or to the right of zero. The symbol for absolute value is ___.

Vocab:

Opposites:

Example #1: |4| = 44 is 4 units from 0.

The absolute value of |4| is ______.

|-4| = 4-4 is ______units from 0.

The absolute value of |-4| is _____.

Every number other than 0 has an opposite number. Opposites are the same distance from zero.

Example #2

9 is the opposite of ______.

-9 is the opposite of ______.

9 is 9 units from 0.

Both -9 and 9 are ______units from 0.

5 is the ______of -5.

-5 is the opposite of ______.

5 is ______from 0.

Both 5 and -5 ______.

Let’s Try Some Out!

Use the number line below to find the values.

1. You earn $6 from mowing the grass.

2. The wind chill is 12 below zero.

3. The Bears took a ten yard gain on the play.

4. We realized we lost five dollars.

5. A mailbox post rises 4 feet above the ground; it is set 2 feet into the ground.

In Class:

Find the absolute value:

1. |3|2. |-12|3. |-3|

Name the opposite of each integer:

4. 45. 86. -7

Solve these problems using the number line.

7. Which letters represent positive real numbers?

8. Which letters represent negative real numbers?

9. Which letter is the greatest distance from zero?

10. Which letter represents the greatest absolute value?

Give an integer that describes each situation.

11. A gain of 3 yards in football.

12. A loss of 15 yards in football.

13. A withdrawal of $40 from a bank account.

14. A deposit of $100 in a bank account.

15. A temperature of 13˚ F below zero.

Watch the first couple minutes of

c

Lesson 2: Comparing Integers- Greater Than

To compare 2 numbers and determine which is greater.

To use the symbol > to identify the larger of two integers.

Warm-Up: Here is a list of basketball scores.

10254

4256

1259

8476

Lesson:

Integers can be arranged in an increasing or decreasing order. Consecutive integers are integers arranged from least or greatest or greatest to least without any missing integers. The integers on a number line are consecutive integers.

You can use a number line to compare two integers. On a number line, the greater of two numbers is the number to the right.

Example 1: Compare 2 and -3

______is to the ______of ______on the number line.

______is greater than -3.

Example 2: Compare -1 and -5.

Remember: The symbol >, read “is greater than,” is used to show that one integer is greater than another.

2 > -3-1 > -5

Example #3: Compare |-5| and |-3|

-5 is ______, so |-5| = 5.

-3 is 3 units from zero, so ______.

______is farther to the right than ____, so | | > | -3 |.

Let’s try it out!

Compare each pair. Use > or =.

1. 5 22. |-2| 2

3. |8| -34. |-8| |-3|

All Class:Each student will get a note card with an integer. Try to arrange yourselves from least on the left and the greatest on the right.

Lesson 3: Less Than

Objective:

To compare two numbers and decide which is smaller.

To use the symbol < to identify the smaller of two numbers.

Warm-Up:

What does this mean?

Try writing a true number sentence using that sign.

What do you think this means?

You can use a number line to compare to integers. On a number line, the lesser of two numbers is the number farthest to the left.

Example #1: Compare -3 and 1.

Example #2: Compare -5 and -3

Remember the symbol ‘<’ means less than. It is used to show that one integer is less than another.

Example #3: Compare -5 and |-3|

In Class: Compare each pair. Use < or =.

1. 2 52. -2 1

3. 12 |-12|4. |-1| 10

5. A student lists these five numbers and says that they are consecutive integers:

-2, -1, 0, 1, 2, 3.

Is she right?

6. The temperature was 0˚ F on Saturday and -11 ˚F today. Which temperature is higher? Explain.

All Class: Get into pairs. Try to come up with a word problem comparing two different temperatures from the data given below. You have 3 minutes.

January Temperatures

Monday / 5˚ F
Tuesday / 2˚ F
Wednesday / -3˚ F
Thursday / 0˚ F

Homework:

Lesson 4: Even and Odd Integers

Objectives:

To identify integers as odd or even

To add, subtract, and multiply integers

To notes the pattern of answers obtained by operations on odd and even numbers.

Warm-Up:

1. Count by 2s up to 20.

EvenOdd

Lesson:

Zero is an ______because it is situated between -1 and 1 on the number line.

Also, any number ending with a zero is a ______of 2.

Integers that have a factor of 2 without leaving a remainder are even integers. -6, -4, -2, 0, +2, +4, and +6 are examples of even integers.

Integers that do not have a factor of 2 are odd integers. -5, -3, -1, +1, +3, and +5 are examples of odd integers.

You can tell whether a number is even or odd by ______.

If the digit in the ones position is odd ______.

If the digit in the ones position is even ______.

Example #1: Even or odd?

2,478,563

3,556,430

Consecutive even integers are:

Consecutive odd integers are:

When you add or subtract integers, you can predict whether the sum or difference will be odd or even.

Adding Integers / Subtracting Integers
Even + even = even / Even – even = even
Even + odd = odd / Even – odd = odd
Odd + odd = even / Odd – odd = even

You can also predict whether or not a product will be even:

Multiplying Integers
Even · even = even
Even · odd = even
Odd · odd = odd

Example #2: Tell whether the following numbers are odd or even:

a. 24,004b. 35,793c. 12,457,753,456,899

Tell whether the answer will be even or odd without solving the problem.

d. 432 + 444e. 669 – 571f. 24 x 36g. 22 x 43

Tell which operation will give the desired even or off integer. Then solve the problem. There may be more than one correct answer.

h. 4 5 = (even)i. 9 3 = (even)

j. 6 3 = (odd)

Make a table for division:

See if there are rules for division.

Homework:

Lesson 5: Adding Positive Integers

Objectives:

To visualize sums of integers on the number line.

To add positive integers to positive or to negative integers.

Warm- Up:

The temperature of the fluid is -4 degrees. Mark this on a number line.

If you add heat to the fluid and raise it by 3 degrees. What is the new temperature of the fluid?

You can use the number line to help you find and understand how to add positive integers to other positive and negative integers.

Example 1: Find the sum of 3 + 5

Begin at 3.

Move to the right 5 units.

3 + 5 =

Rule: Adding a positive to a positive gives a result farther to the right on the number line.

Example 2: Find the sum of -3 + 5

Begin at -3.

Then move ______.

-3 + ______= ______.

Rule: Adding a positive to a negative gives a result farther to the right on the number line.

Examples:

Find each sum.

1. -12 + 42. -7 + 73. -6 + 8

Calculator practice:

1. 652 + 9782. -57 + 7843. -441 + 239

Further Understanding:

Lesson 6: Adding Negative Numbers

Objectives:

To move left along the number line to represent the sum of a positive or negative integer and a negative integer.

To add negative integers to positive or negative integers.

Warm-Up:

“When could you add two numbers and get a sum with a value smaller than wither addend? “

Lesson:

You can use the number line to help you find and understand how to add negative integers to other positive or negative integers.

RULE: Adding a negative to a positive gives a result farther to the left on the number line.

- +

Example 1: Find the sum of 3 + (-5).

Begin at 3. Then move to the left 5 units.

Example 2: Find the sum of -3 + (-5)

Begin at ______.

Then move ______5 units.

1. -2 + (-7)

which number is the biggest?

What will our sign be for our answer?

2. -4 + (-5)

3. 2 + (-3)

4. 5 + (-2)

Try some out!

1. -2 + (-5)2. 12 + (-32)3. 28 + (-32)

4. -6 + (-6)5. 6 + (-6)6. 6 + 6

Try these harder ones with a calculator.

1. -359 + (-243)2. 233 + (-873)3. -649 + (-573)

Word Problems:

1. An airplane flying at 25,000 feet climbs an additional 2,000 feet. What is the final altitude of the airplane?

2. At midnight, the temperature was 29˚C. During the day the temperature fell 4 degrees. What is the final temperature?

Homework:

Lesson 7: Subtracting Positive & Negative Integers

Objectives:

To model subtraction of positive and negative integers on the number line.

To convert subtraction expressions to addition expression

To subtract positive and negative integers from positive and negative integers.

Warm-Up: white board, +++ --- 3 5 2

Lesson:

A number line can be used to show that subtracting a number gives the same result as adding the opposite of the number.

Example #1

Find the difference of 3 – (+5)

Begin at 3.

Then move to the ______3 units.

RULE: ______

Example #2

Find the difference of -3 – (-5)

Begin at -3.

Then move to the right _____ units.

RULE: ______

______.

Example #3

Find the difference of 3 – (-5)

Begin at 3.

Then move to the ______5 units.

RULE: ______

Example#4

Find the difference of -3 – (+5)

Begin at ______

Then move to the left ______.

RULE: ______

Look again at addition of positive and negative integers. Compare the results with subtraction of integers

Subtraction Addition
3 – (+5) = -2 is the same as
is the same as -3 + 5 = 2
3 – (-5) = 8 is the same as
is the same as -3 + (-5) = -8
Subtraction is the same as

RULE:______

Try some out!

1. 4 – (+5)2. -6-43. 8 – 4

4. -2 – (+4)5. 10 – (+7)8. -9 – (-11)

Mental Math In-Class Work 10-9, 10-8, 10- (-1), 10- (-2)…

Word Problems:

9. The highest point on Earth is Mt.Everest, 29,028 feet above sea level. The shore of the Dead Sea is the lowest place on Earth’s surface at 1,312 feel below sea level. What I the vertical distance from the shore of the Dead Sea to the top of Mount Everest?

10. What is the difference between Alaska’s record low temperature of -80˚F and Utah’s record low of -69˚F?

Homework:

Lesson 8 & 9: Multiplying by Positive and Negative Numbers

Objectives: To identify the sign of a product as positive or negative.

To multiply positive and negative integers.

Example #1 Find the product of (+4) and (+3).

Rule:______

Example #2

Find the product of (-4) (3).

Rule: ______

Try some out!

1. (4)(5)2. (4)(-5)3. (-6)(3)4. (6)(3)

Example #3

Find the product of (-4)(-3)

Rule:______

To be successful in Algebra, you will need to memorize these rules.

Try some more out; look at your rules for help.

5. (-2)(6)6. (-10)(-11)7. (23)(30)8. (-2)(-6)

Word Problems:

Every year for the past five years; the forest preserve has lost 16 trees due to disease or weather. How many trees have been lost in the past five years?

At a local movie theater, senior citizens receive a $2.00 discount. How much less will a senior pay to attend 15 movies in a year?

Homework:

Lesson 10: Dividing Positive and Negative Integers

Objectives: To model division of negative and positive integers on the number line.

To divide negative and positive integers and identify the sign of a quotient.

Warm-Up:

(-8)(4)(4)(3)(-2)(-3)

Because multiplication and division are opposite operations, the rules for multiplying positive and negative integers are similar to those of division.

Complete the table below:

Multiplication / Division
(3)(4) =
Rule: / and / 12 ÷ 4 =
Rule:
(3)(-4) =
Rule: / and / 12 ÷ (-4) =
Rule:
(-3)(4)=
Rule: / and / (-12) ÷ (4) =
Rule:
(-3)(-4)
Rule: / and / (-12) ÷ (-4) =
Rule:

A general statement can be made that covers all the multiplication and division rules:

Try some out! Use the rules to help you out:

1. 4 ÷ 22. 32 ÷ (-4)3. (-24) ÷ (4)

4. (30) ÷ (-5)5. (-20) ÷ (-4) 6. (-28) ÷ (-4)

7. The theater complex has 1,440 seats in six theaters. All theaters have the same number of seats. How many seats does each theater have?

8. A submarine moving underwater at -390/meters. It dives to that level in 13 minutes. How many meters does it dive per minute?

Homework: