This document provides a review for Algebra I midterm covering chapters 1 through 6. It includes the following: - Chapter 1 covers properties of real numbers such as identity, inverse, distributive, commutative, and associative properties. - Chapter 2 covers rational numbers, adding/subtracting/multiplying rational numbers, and dividing rational numbers. - Chapter 3 covers writing and solving one-variable equations, ratios and proportions, percent of change, and weighted averages. - Chapter 4 covers the coordinate plane, relations and functions, equations as relations, and graphing linear equations. - Chapter 5 covers slope, direct variation, writing equations in slope-intercept and point-intercept form.

1. Algebra I Midterm Review
Chapters 1 - 6
Name: Ms. Psillos
Chapter 1: §1.4 - §1.6 (pg. 21 - 36)
§1.4 Identity and Equality Properties
Identity/Property Meaning Examples
Additive Identity The sum of any number and 0 is equal to the
number. (0 is the additive identity)
Multiplicative Identity The product of any number and 1 is equal to
the number. (1 is the multiplicative identity)
Additive Inverse Two numbers whose sum is 0.
Multiplicative Inverse Two numbers whose product is 1.
Multiplicative Property The product of any number and 0 is equal to 0.
of Zero
Reflexive Property Transitive Property
Symmetric Property Substitution Property
§1.5 The Distributive Property
Using the Distributive Property Simplify or Combine Like Terms.
 1 
1. (9 – p)3 2. 28 y − x  3. 4 y 3 + 3 y 3 + y 4
 7 
§1.6 Commutative and Associative Properties:
Property Meaning Examples
Commutative Property The order in which you add or multiply numbers
does not change their sum or product.
Associative Property The way you group three or more numbers
when adding or multiplying numbers does not
change their sum or product.

2. Chapter 2: §2.1 - §2.4 (pg. 68 - 87)
§2.1 Rational Numbers on the Number Line
Rational Numbers Sets
Natural Numbers {1, 2, 3, 4, …}
Whole Numbers {0, 1, 2, 3, 4, …}
Integers {…, -3, -2, -1, 0, 1, 2, 3, …}
Rational Numbers a
Numbers that can be expressed in the form , where a and b are integers and b ≠ 0
b
1. Graph the set of numbers { -9, -7, -4, -1, 0, 3, 6, 8}
0
2. Identify the Coordinates on the Numbers Line.
0
Absolute Value: the absolute value of any number n is its distance from zero on a number line.
3. If a = 8 and z = - 5 evaluate the expression 3 + | z – 17 + a2|
§2.2 Adding and Subtracting Rational Numbers
Find the Sum or the Difference of each example.
6 2 7  3
4. -12 + (-15) 5. -38.9 + 24.2 6. − + 7. − − − 
7 3 8  16 
§2.3 Multiplying Rational Numbers
Find the Product of each example.
 4  1  5 4
8. -9(-12) 9. (3.8)(-4.1) 10.  − 1  2  11. −  
 5  2  12  9 
12. Simplify: 7m(-3n) + 3s(-4t) 13. Simplify: 6(-2x) – 14x

3. §2.4 Dividing Rational Numbers
Find the Quotient of each example.
1 16 4 7 h + 35
14. -78 ÷ (-4) 15. − ÷ 4 16. ÷− 17. Simplify:
3 36 12 −7
Chapter 3: §3.1 - §3.9 (pg. 119 - 87)
§3.1 Writing Equations
Translate verbal sentences into equations, then solve.
1. Nine times y subtracted from 95 equals 37.
2. Two times a number t decreased by eight equals seventy.
3. Half of the sum of nine and p is the same as p minus three.
Translate equations into verbal sentences, then solve.
4. 2f + 6 = 19 5. 7(m + n) = 10n +17
§3.2 Solving Equations by Using Addition and Subtraction
Solve each equation.
1 5 2 4
6. s – 19 = - 34 7. -25 = -150 + q 8. − +p= 9. =v+
2 8 3 8
§3.3 Solving Equations by Using Multiplication and Division
v v 2 z 2
10. –5r = 55 11. − = −9 12. =1 13. =−
7 3 7 45 5

4. §3.4 Solving Multi-Step Equations
c − 3 j − ( − 4) m
14. 7 + 3c = -11 15. − +5= 7 16. = 12 17. + 6 = 31
7 −6 −5
§3.5 Solving Equations with the Variable on Each Side
1 3 1
18. 5t – 9 = -3t +7 19. 5 − ( x − 6 ) = 4 20. y− y = 4+ y 21. 3(1 + d ) − 5 = 3d − 2
2 2 2
§3.6 Ratios and Proportions
Ratio: is a comparison of two numbers by division expressed in the following ways:
Proportion: is an equation stating that two ratios are equal.
Rate: the ratio of two measurements having different units of measure.
Scale: a rate or a ratio that is used when making a model or a drawing of something that is too large or too
small to be drawn at actual size.
Use Cross Multiplication to determine if each pairs of ratios form a proportion.
3 21 8 16
22. , 23. ,
2 14 9 17
Solve each proportion.
6 x 9 16 5 6 6 7
24. = 25. = 26. = 27. =
5 15 b 7 3 x+2 14 x − 3

5. Solve Word Problems Involving Rates and Scales.
28. Sam runs 15-miles every Saturday. She runs this distance in 4 hours. At this rate, how far can she run in 6
hours?
29. The scale of a map of NYC is 2 inches per every 1.8 miles. The distance between Xavier High School and
Rockefeller Center on the map is 7 inches. What is the distance between these two places?
§3.7 Percent of Change
Find Percent of Increase or Decrease.
30. Original: 66 31. Original: 40 32. Original: 15.6 33. Original: 85
New: 30 New: 32.5 New: 11.4 New: 90
Find Amount After Sales Tax.
34. Candle: $7.50 35. Original: $35.00
Tax: 5.75% Tax: 7%
Find Amount After Discount.
36. Watch: $37.55 37. Shirt: $45.00
Discount: 35% Discount: 40%
§3.8 Solving Equations and Formulas
Solve an equation for a specific variable.
38. v = r + at, for a 39. 9a – 2b = c + 4a, for a
3ax − n
40. 2g – m = 5 – gh, for g 41. = −4 , for x
5

6. §3.9 Weighted Average
Solve a Mixture Problem with Prices
42. Anthony wants to create a special blend using two coffees, one priced at $8.40 per pound and the other at
$7.28 per pound. How many pounds of the $7.28 coffee should he mix with 9 pounds of the $8.40 coffee to sell
the mixture for $7.95 per pound?
Solve a Mixture Problem with Percents
43. John has 35 milliliters of 30% solution of copper sulfate. How much of a 20% solution of copper sulfate
should she add to obtain a 22% solution?
Travel
44. A railroad switching operator has discovered that two trains are heading toward each other on the same
track. Currently, the trains are 53 miles apart. One train is traveling at 75 miles per hour and the other train is
traveling at 40 miles per hour. The faster train will require 5 miles to stop safely, and the slower train will
require 3 miles to stop safely. About how many minutes does the operator have to warn the train engineers to
stop their trains?

7. Chapter 4: §4.1 - §4.6 (pg. 192 - 231)
§4.1 The Coordinate Plane
1. Write the ordered pairs for points A, B, C, and D. Name the quadrant in which each point is located.
§4.3 Relations
Relation: a set of ordered pairs represented as a set, a table, a graph or a mapping.
Domain: the set of the first numbers of the ordered pairs (set of x values).
Range: the set of the second numbers of the ordered pairs (set of all y values).
Inverse: switching the coordinates in each ordered pair.
1. Given the relation, {(-2, 4), (5, -1), (8, 9), (0, -5), (8, -1)}:
a. Express the relation as a table and a mapping.
b. State Domain:
c. State Range:
d. Write the Inverse of the Relation:
e. Is this relation a function? Explain why.
§4.4 Equations as Relations
Find the solution set for y = 2x + 3, given the replacement set {(-2, -1), (-1, 3), (3, 9), (0, 4)}.
x y y = 2x + 3 True or False

8. Solve 6x – y = -3 if the domain is {-2, -1, 1, 3, 4}.
x 6x – y = -3 y (x, y)
§4.5 Graphing Linear Equations
Linear Equations in Standard Form: Ax + By = C, where A is greater than or equal to 0, A and B are not both
zero, and A, B, and C are integers whose greatest common factor is 1.
Intercepts: the point at which is crosses a particular axis.
To find x-intercepts: To find y-intercepts:
Find the x and y intercepts for each equation.
x 2y
3. 2x = 6 - y 4. = 10 + 5. 4x + 6y = 8 6. 3x - 2y = 15
2 3
§4.6 Functions
Functions: a relation in which each element of the domain is paired with exactly one element of the range.
Vertical Line Test: if a vertical line can be drawn so that it intersects the graph more than once, then the graph
is not a function.
By using the Vertical Line Test, determine which graphs are functions.
7. 8. 9. 10.
Determine whether each relation is a function.
11. 12. 13. 14.

9. Equations that are functions can be written in function notation.
y = 2x + 3  f(x) = 2x + 3
If f(x) = 2x - 6 and g(x) = x – 2x2, find each value.
 1
15. f  −  16. g ( − 1) 17. f ( h + 9 )
 2
18. 2[ g ( b ) + 1] 19. f ( 3 y ) 20. g ( − 3) + 13
Chapter 5: §5.1 - §5.6 (pg. 256 - 297)
§5.1 Slope
y 2 − y1
Formula: m =
x 2 − x1
Find the slope of the line that passes through the given points and identify what type of slope it is:
1. (-1, 2) & (3, 4) 2. (1, 2) & (1, 3) 3. (-1, -2) & (-4, 1) 4. (1, 2) & (-1, 2)
Find the coordinates given the slope of the line: (Find the value of r)
3 4
5. (r, 6) & (10, -3), m = − 6. (-2, 7) & (r, 3), m = 7. (4, -5) & (3, r), m = 8
2 3

10. §5.2 Slope and Direct Variation
Direct Variation equation: In words: “y varies directly with x.”
Graph the following Equations:
1
8. y = x 9. y = −3x
2
Write and Solve a Direct Variation Equation:
10. Suppose y varies directly with x, and y = 28 when x = 7. Write a direct variation equation that relates x and
y. Then use the equation to find x when y = 52.
11. Suppose y varies directly with x, and y = -7 when x = -14. Write a direct variation equation that relates x and
y. Then use the equation to find x when x = 20.
§5.3 Slope-Intercept Form
Slope-Intercept Form:
Identify the slope and y-intercept in each equation.
12. -2y = 6x - 4 13. 4 x − y = −3 14. 5x - 3y = 15 15. 3x - 2y = 6

11. §5.4 Writing Equations in Slope-Intercept Form
Write an equation given slope and one point, in slope-intercept form.
Steps:
1. Substitute the values of m, x, and y into the slope-intercept form and solve for b.
2. Write the slope-intercept form using the values of m and b.
1 2
16. (1, 5), m = 2 17. (4, -5), m = − 18. (1, -4), m = -6 19. (-3, -1), m = −
2 3
Write an equation given two points.
Steps:
1. Find the slope.
2. Choose one of the points to use.
3. Substitute the values of m, x, and y into the slope-intercept form and solve for b.
4. Write the slope-intercept form using the values of m and b.
20. (-3, -1) & (6, -4) 21. (2, -2) & (3, 2)
22. (1, 1) & (7, 4) 23. (7, -2) & (-4, -2)
§5.5 Writing Equations in Point-Intercept Form
Point-Slope Form:
Write an equation in point-slope form given the slope and one point.
2 5
24. (-6, 1), m = -4 25. (9, 1), m = 26. (-4, -3), m = 1 27. (1, -3), m = −
3 8

12. Write each equation in slope-intercept form.
2 1 3
28. y + 2 = -2(x + 6) 29. y - 1 = (x + 9) 30. y + 3 = − (x + 2) 31. y - 5 = (x + 4)
3 4 2
§5.6 Geometry: Parallel and Perpendicular Lines
Parallel Lines:
Write the slope-intercept form of an equation of the line that passes through the given point and is parallel to
the graph of each equation.
2
32. (-3, 2), y = x – 6 33. (3, 3), y = x – 1
3
1
34. (-5, -4), y = x+1 35. (2, -1), y = 2x + 2
2
Perpendicular Lines:
Write the slope-intercept form of an equation of the line that passes through the given point and is
perpendicular to the graph of each equation.
1
36. (1, -3), y = x + 4 37. (-3, 1), y = -3x + 7
2

13. 38. (-2, 7), 2x - 5y = 3 39. (2, 4), x – 6y = 2
Chapter 6: §65.1 - §6.6 (pg. 318 - 358)
§6.1 Solving Inequalities by Addition and Subtraction
Page 359 #’s (9 – 15) ODD ONLY
§6.2 Solving Inequalities by Multiplication and Division
Page 360 #’s (19 – 25) ODD ONLY
§6.3 Solving Multi-Step Inequalities
Page 361 #’s (27 – 33) ODD ONLY
§6.4 Solving Compound Inequalities
Page 361 #’s (37 – 41) ODD ONLY
§6.5 Solving Open Sentences Involving Absolute Value
Page 362 #’s (43 – 49) ODD ONLY
§6.6 Graphing Inequalities in Two Variables
Page 362 #’s (51 – 57) ODD ONLY
Check your answers in the back of the book.