Unit 1 Packet PDF

Summary

This document is a collection of exercises and problems on basic algebra concepts, like real numbers, rational and irrational numbers, and square roots, suitable for secondary school math students. The document has questions to practice and learn.

Full Transcript

Unit 1
The Foundations of Algebra

Name: ______________________________________
 1.1: Real Numbers and the Number Line

Square Root Expressions

Perfect Squares

____________________ ____________________: the product of an integer and itself

Perfect Squares
1
4
9

Simplifying Square Root Expressions

1. 2.

3. 4.
Classifying & Comparing Real Numbers

For each of the following, determine which subset(s) of real numbers the number
belongs to. Place a check mark in each column that applies.

Number Irrational Rational Integers Whole Natural
Numbers Numbers Numbers Numbers
 Number Irrational Rational Integers Whole Natural
Numbers Numbers Numbers Numbers

Comparing Real Numbers

____________________: a mathematical sentence that compares the values of two
expressions using an inequality symbol

To compare real numbers, we use inequality symbols:
: ____________________________
: ____________________________
: ____________________________
: ____________________________

For each of the following, compare the
numbers using an inequality.

5.

6.

7. 9.

8. 10.
For each of the following, graph the given numbers on the number line. Then, list the
numbers from least to greatest.

11.

12.

13.

14.
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 Name _____________________________________________________________
Directions: In each of the columns, you must find ALL of the values that are either
Rational Numbers or Irrational Numbers.

Choose the values which are Choose the values which are
Rational Numbers: Irrational Numbers:
Check ALL that apply. Check ALL that apply.

1. -13.3 a. 6.8282
2. 3 b. 25
4 1
3. c.
7 18
4. 3.63 d.
2 5
5. 6 e.
3 3
6. f. 17
81 5
7. g.
3 2

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 1.2: Properties of Real Numbers

In math, properties are statements that are true for any real numbers. They justify steps when
simplifying expressions and solving equations.

Properties of Real Numbers

Property Main Idea Algebraic Example Numeric Example

Commutative _____________
Property of
Addition does not matter!

Commutative _____________
Property of
Multiplication does not matter

Associative _____________
Property of
Addition does not matter!

Associative _____________
Property of
Multiplication does not matter!

Identity _____________
Property of
Addition _____________

(Additive Identity) _____________

Identity _____________
Property of
Multiplication _____________

(Multiplicative _____________
Identity)

_____________

Property of Zero by zero always
equals zero.
 Property Main Idea Algebraic Example Numeric Example

Inverse Using the
Property of ________________
Multiplication
to cancel a value.

Inverse Using the
Property of ________________
Addition
to cancel a value.

________________
Distributive
Property a value to an
expression inside
parenthesis.
 Name_____________________________________

Match the property in Column 1 with its example in Column 2. Place the letter in front of the property.

Distributive Property A. (x + 2) + 1 = 1 + (x + 2)

Additive Identity
B. (7 + x) + 1 = 7 + (x + 1)
Property
Commutative Property
C. x (1/x) = 1
of Addition
Associative Property
D. (ab) c = c (ab)
of Multiplication
Multiplicative Inverse
E. 2(6 + x) = 12 + 2x
Property
Commutative Property
F. (3x - 7) 0 = 0
of Multiplication
Associative Property
G. (-4 + (-a)) + (4 + a) = 0
of Addition
Multiplicative Identity
H. (x + 8) + 0 = (x + 8)
Property
Zero Property
I. (2ab) 1 = (2ab)
of Multiplication
Additive Inverse
J. (3 x) 4 = 3 (x 4)
Property

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 1.3 - Variables and Expressions

Algebra uses symbols to represent quantities that are unknown or that vary. You can represent
mathematical phrases and real-world relationships using symbols and operations.

____________________: a symbol, usually a letter, that represents the value(s) of a variable
quantity

____________________ ____________________: a mathematical phrase that includes one or
more variables

____________________ ____________________: a mathematical phrase involving numbers
and operation symbols, but no variables

Phrases for Translating Verbal Algebraic Expressions

Operation Key Words
sum, plus, and, total of, altogether, make, increased by, combined, add,
together, more than, added to, in all
difference, subtract, less than, decrease by, take away, gave, fewer
than, minus
product, times, double, triple, multiplied by, twice, multiple, increased
by a factor of
quotient, per, half, a third, a fourth, ratio of, divided by, divisor,
percent, divided into, split
is, are, were, was, sold for, will be, altogether, totals, yields
times the sum of, the quantity of, twice the sum, plus the difference of,
times the difference of

Flipping Words:
Addition & Subtraction Examples

Translate the following phrases to algebraic expressions:

Phrase Algebraic Expression
1. The sum of 5 and a number

2. 32 more than a number.
3. 58 less than a number.

4. 8 minus a number.

5. The difference of a number
and 5.
6. 9 plus a number.

7. Subtract 15 from a number.
8. 23 added to a number.

Multiplication & Division Examples

Translate the following phrases to algebraic expressions:

Phrase Algebraic Expression
9. The product of 4 and a
number

10. 32 times a number.

11. The quotient of a number
and 6.
12. 8 divided by a number.

13. Twice a number

14. One-third of a number.
Writing Expressions with Two Operations Examples

Translate the following phrases to algebraic expressions:

Phrase Algebraic Expression
15. Twice a number plus 5.

16. 3 more than twice a number

17. 9 less than the quotient of 6
and a number

18. The product of 4 and the sum
of a number and 7.
19. 8 less than the product of a
number and 4.

20. Twice the sum of a number
and 8.

Using Words for an Algebraic Expression

In Examples #1-20, you were given the phrase and asked to translate it to an algebraic
expression. You can also translate algebraic expressions into word phrases.

For examples #21-25, translate the algebraic expression into a word phrase.

Phrase Algebraic Expression
21.

22.

23.

24.

25.
Create Your Own

Now that we have done some examples together, try to create some phrases on your own. Be
prepared to share at least one with the class.

Phrase Algebraic Expression
Algebraic Expressions Name_______________________________

Directions: Match the algebraic expressions with their mathematical counterparts to find
the answer to the question below. When you find a match, write the appropriate letter
(or number) in the blank beside each problem. Use your answers to decode the message.

What is the startling math fact about the letter “A” ?

___ ___ ___ ___ ___ ___ ___ ___ ___
15 11 5 2 5 6 1 4 14

___ ___ ___ ___ ___ ___ “ ___” ___ ___ ___ ___ ___
13 5 15 15 5 2 9 6 4 9 4 3

___ ___ ___ ___ ___ ___ ___ ___ ___ ___ ___ ___ ___ ___ ___ ___.
4 7 10 19 5 2 8 2 14 10 16 15 14 12 16 16

____ 1. 6 more than a number
Answer Bank
A 3/x
____ 2. 8 decreased by twice a number P x-5
B 10 + x
____ 3. the difference of 7 and a number R 8 - 2x
D 9-x
____ 4. 1 less than 6 times a number S 6+x
E 2x – 4
____ 5. twice a number diminished by 4 T 3 / (x – 5)
F 4x - 2
____ 6. 8 less than twice a number U 2(x + 4)
H 4/x-3
____ 7. the product of 2, and a number increased by 4 V 1 - 6x
I 2x - 8
____ 8. 2 less than four times a number W 5-x
L 3 + 3x
____ 9. the quotient of 3 and a number Y 7-x
M 4x - 3
____ 10. 3 less than the product of 4 and a number Number Answers
1 4 / (x – 3)
N 6x - 1
____ 11. 3 less than the quotient of 4 and a number
0 x–9
O 3/x-5
____ 12. 4 divided by the difference of a number and 3

____ 13. 3 more than triple a number _____17. 9 minus a number

____ 14. the quotient of 3 and a number, decreased by 5 _____18. 5 decreased by a number

_____15. the quotient of 3, and a number decreased by 5 _____19. 10 plus a number

_____16. 9 less than a number _____20. 1 minus 6 times a number

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“Ah-Bach” Series
 1.4: Exponents, Absolute Value, & Order of Operations

Exponents

____________________: used to shorten how you represent repeated multiplication such as

____________________: the number that is being multiplied repeatedly by itself

____________________: tells you how many times to multiply the base by itself

For each of the following, simplify.

1. 3.

2. 4.

Absolute Value

____________________ ____________________: distance away from zero on a number line

For each of the following, simplify.

5. 8.

6. 9.

7. 10.
Order of Operations

P

E

MD

AS

For each of the following, simplify.

11. 16.

12.
17.

13. 18.

14. 19.

15.
20.
 1.5: Evaluating Expressions

____________________: a mathematical phrase made up of numbers and/or variables that
does NOT contain an equal sign

____________________: replacing a variable with another variable or value

____________________: determine the numerical value of an expression

Steps to Evaluating Algebraic Expressions

1. Substitute/plug in the given values for each variable. Make sure to use parenthesis.
2. Follow the correct order of operations (PEMDAS) to simplify.
3. Go back and check over your work to make sure you did not make a silly mistake.

For each of the following, evaluate.

1. Evaluate if.

2. Evaluate if.

3. Evaluate if

4. Evaluate if.
5. Evaluate if.

6. Evaluate if

7. Evaluate if.

8. Evaluate if.
 Kuta Software - Infinite Algebra 1 Name___________________________________

Evaluating Expressions Date________________ Period____

Evaluate each using the values given.

1) y ÷ 2 + x; use x = 1, and y = 2 2) a − 5 − b; use a = 10, and b = 4

3) p 2 + m; use m = 1, and p = 5 4) y + 9 − x; use x = 1, and y = 3

5) m + p ÷ 5; use m = 1, and p = 5 6) y 2 − x; use x = 7, and y = 7

7) z( x + y); use x = 6, y = 8, and z = 6 8) x + y + y; use x = 9, and y = 10

3 10) 6q + m − m; use m = 8, and q = 3
9) p + 10 + m; use m = 9, and p = 3

11) p 2 m ÷ 4; use m = 4, and p = 7 12) y − (z + z ); use y = 10, and z = 2
2

13) z − ( y ÷ 3 − 1); use y = 3, and z = 7 14) ( y + x) ÷ 2 + x; use x = 1, and y = 1

©O h280x1a2W OKBuIt1aK ySSoMfbt0w0a7rmes ILDL8CV.k d BArlolN Qrli3gAhZtEsN Yrwe7sPeVrSv3eFdV.x h 0M8a7d3ee mwEi8tnhc vIrnzfLiLnPiHtUeA vANlkgeeXb1rzaj d1y.v -1- Worksheet by Kuta Software LLC
 1.6 - Simplifying Expressions

____________________: rewrite an algebraic expression in its simplest form (distribute,
combine like terms; no like terms or parenthesis)

____________________: a number, a variable, or the product of a number and a variable (i.e.,
)

____________________: the number in front of the variable

____________________: just a number; no variable

____________________ ____________________: have the same variable and exponent

Identifying Parts of an Expression

Expression Term(s) Coefficient(s) Constant(s)
1.
2.
3.

4.

Combining Like Terms

For each of the following, simplify by combining like terms.

1. 4.

5.
2.

6.
3.

Examples with Exponents

Terms with the same exponents are considered like terms. When adding like terms with
exponents, do not change their exponents.

7. 8.
 9. 11.

10. 12.

Geometric Applications - Perimeter

Write the perimeter of the following shapes as a simplified expression.

(Perimeter = plus the rim)

1.

2.

3.

4.
Combining Like Terms Name________________________________

Directions: Find the solutions to the following problems in the Answer Table at the end. When you
find a match, write the appropriate letter in the hidden message below above the question number.
Be on guard as there are more answers than are needed.

__ __ __ __ __ __ __ __ __ __ __ __ __ __ __ __ __ __
19 9 19 6 6 13 19 16 9 12 13 9 13 5 1 15 13 11

__ __ __ __ __ __ __ __ __ __ __ __ __ __ __ __ __ __ __ __ __
10 3 13 11 7 19 15 15 17 13 2 1 21 8 15 13 4 3 19 9 6

__ __ __ __ __ __ __ __ __ __ __ __ __ __ __ __ __ __ __ __
10 15 13 17 20 14 1 6 3 7 19 9 12 19 9 6 5 13 7 6

__ __ __ __ __ __ __ __ __ __ __ __ __ __ __.
7 12 3 14 12 21 14 9 19 14 4 5 11 3 18

Combine like terms: Find the missing value if each statement is true.
1. 7 x 3 y 5 x 9. 6 x ( 3 ) 9x

2. 4 x ( 8 x) 10. 5 x xy 2 x 7 xy 3x 10 xy

3. 6 x 7 y 9 x 11 y 11. 4x x 6x

4. 2 x 8 3 x 2 7 x 8
12. 8 x xy 4 x 7 xy 4 x 11xy

5. 2( x y ) 5( x y )
13. 6( x 2) 6x

6. 1.5 x 7.6 y 2.5 x 4.6 y
14. 3 8 4 7

7. 5( x 4) 3( x 2)
15. 5(8 13) 1

6x 3 4x 4
8.
7 x 8 3 x 15 16. 42 (3 7) 23

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“Ah-Bach” Series
Express the perimeter for each of these figures:

17. 18.

19. 20.

21.
Hint. Find the missing side first!

ANSWER TABLE:

A 12 B3 C 12x D 4 E 3x 4 y

F1 G 12 x 2 H -18 I 5 x 10 J 2 x 14

K 6x 4 y L -24 M 12x N -8 O 2x 3 y

P 7x 7 y Q 7x 8y R -2 S 4x 3y T x

U 10 x 8y V 10 x 7 W 2x 26 Y 8x 12 Z 4x

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“Ah-Bach” Series
 1.7 - The Distributive Property

The Distributive Property

Algebraic Examples Numeric Examples

Simplify each expression using the distributive property.

1. 4.

2. 5.

3. 6.

Distribute and Combine!

Remember, to simplify an expression means to ensure there are no parentheses and no like
terms. In order to do this, distribute first (if there are parentheses), then combine like terms.

9. 12.

10. 13.

11. 14.
Geometric Applications Area

Write the area of the following shapes as a simplified expression.

15. Hint:.

16.

17. Hint:.

18.
 1.8 - Adding & Subtracting Polynomials

____________________: a mathematical expression with two or more terms

____________________ ____________________: writing an expression with exponents in
order from least to greatest and the variables in alphabetical order

Standard Form

For each of the following, write the polynomial in standard form.

1. 4.

2. 5.

3. 6.

Adding Polynomials

Steps to Add Polynomials:

1. Drop the parenthesis.
2. Combine like terms.
3. Write the simplified expression in standard form.

For each of the following, simplify.

7. 10.

8. 11.

9. 12.
Subtracting Polynomials

Steps to Subtract Polynomials

1. Change the subtraction symbol to a.
2. Distribute the.
3. Combine like terms.
4. Write the simplified expression in standard form.

For each of the following, simplify.

13. 16.

14. 17.

15. 18.
Adding & Subtracting Polynomials “MATH LIB”!
Directions: Simplify the expression at each station.
Identify your answer and fill in the blanks at the bottom to complete the story.

1 2

3 4

5 6

7 8

9 10

© Gina Wilson (All Things Algebra), 2014
 WRITE YOUR MATH LIB BELOW!

(1) __________________________________ was (2) ____________________________

to be (3) _____________________________________________ with

(4)
(4) _______________________________ on (5)
(5) _________________________________ at

(6)
(6) ____________________________ in (7)
(7) _____________________________ wearing

(8)
(8) _____________________________ while (9)
(9) ____________________________ because

they wanted (10)
(10) _______________________________________________!

© Gina Wilson (All Things Algebra), 2014
Extra Notes
Extra Notes
Extra Notes
Extra Notes