Algebra Honors
Name_
Review for Mid Term Exam
Date_
Operations with Sets and Set Notation
Let A = cfw_ 2, 4, 6, 8, 10 B = cfw_ 3, 4, 5, 6, 7 and C = cfw_ 6, 7, 8, 9, 10
Identify the following sets
Algebra 1 - Honors
Name _
Composite and Inverse Functions
Review
Date _
Given the following functions, find each value.
f(x) = 2x 6
h(x) = x2 3
g(x) = -3x + 1
Show all steps used to find your answer.
Algebra 1 Honors
Name _
Multiple Representations of Functions
Date _
Functions can be represented in multiple ways; table of values, list of ordered pairs,
mapping, graph, or equation. In each case
Algebra 1 - Honors
Review of Sets
Name_
Date_
Operations with Sets and Set Notation
Let A = cfw_ 2, 4, 6, 8, 10 B = cfw_ 3, 4, 5, 6, 7 and C = cfw_ 6, 7, 8, 9, 10
Identify the following sets
1.
AUB
Algebra 1 Honors
Class Notes
Terminology for Linear Equations
Define the following:
linear equation
x-intercept
y-intercept
slope
parallel lines
perpendicular lines
undefined slope
zero slope
point sl
Algebra 1 - Honors
Name _
Applications of Equations
Date _
WHAT DO YOU KNOW?
Write an algebraic equation and solve. Do NOT just guess and check. I am looking
for a systematic method of solving these e
Algebra Honors
Name _
Variation Class Notes
Date _
k is the constant of variation
Direct Variation:
y varies directly as x
or
y is directly proportional to x
or
y is inversely proportional to x
y = kx
Algebra I CP
Name _
Equation Solving Review
Date _
Solve each equation. Identify each as conditional, inconsistent, or an identity.
SHOW ALL WORK
1.
3x 5 = 28
2.
2(4x + 2) = 17
3.
1
21
x+ =
2
53
4.
3(
Algebra 1 CP
Name _
More Literal Equations
Date _
Solve each equation for the given variable:
1.
# + =
Solve for
2.
3x + y = 15
Solve for y
3.
2x + 5y = 3(x + 2) 5
Solve for x
4.
3(y 2) + 2y = x + y
Algebra 1 CP
Name _
Qualitative Graphs
Date _
1.
Choose the best graph to fit each of the situations described below. Be able to defend
your selection.
_ a. I really enjoy cold milk or hot milk, but I
Algebra I CP
Name _
Solving Equations with Fractions
Date _
Solve each equation. Show all work for full credit.
Example:
Step 1: Clear the fraction by multiplying each side by the denominator
(reduce
Algebra I -CP
Name_
Date _
12 Properties of Real Numbers
1.
a+b=b+a
Commutative Property of Multiplication
For any numbers a and b,
a b=ba
Associative Property of Addition
For any numbers a, b, and c,
Algebra 1 CP
Name _
Chapter 1 Exam Review
Date _
1.
Fill in the Venn diagram with the appropriate set of numbers and give examples
of the different types of numbers in each set. Choose from the follow
Algebra 1 CP
Class Notes
Combining Like Terms
Name _
Date _
Like Terms terms with the same variables, with the same exponents.
a. Identify the like terms in each of the following expressions
b. Rewrit
Algebra I CP
Name _
Clearing Fractions
Date _
Clear the fractions in each equation by first multiplying both sides by the common
denominator.
Example:
1
/2 x + 3 = 5/3 x 1
6(1/2 x + 3) = (5/3 x 1)6
3x
Algebra 1 CP
Class Notes
Solving by Combining Like Terms and VOBS
Name _
Date _
COMBINING LIKE TERMS
Solve each equation. Be sure to combine like terms on each side of the equation
before isolating th
Algebra 1 CP
Name _
Definition of Functions Dependent and Independent Variables
Date _
In each example, fill in each of the columns. I have done the first one for you.
Problem
1. Profit (p) made on th
Algebra I CP
Name _
Functions and Functional Notation
Date _
Find the value if
f(x) =
5
x+2
1.
f(3)
2.
f(-4)
3.
f(1/2)
4.
f(-2)
5.
f(0)
6.
f(m 2)
Find f(3) for each function f(x)
7.
f(x) = x2 6x + 2
8
Algebra 1 - CP
Name _
Graphing Sets of Numbers
Date _
Complete the missing information for each of the following sets of numbers
1.
Verbal: Integers less than 3
Set Builder Notation:
Roster/Interval N
ALGEBRAIf NAME I.
MEPEMEM and DEPENDENT VARIABLES DATE
Describe the relationship between the following: (Does one activity affect the second action?)
Identify the INDEPENDENT ACTION and the D
Algebra 1 CP
Name _
Relations & Functions
Date _
Relation
Expressed by Tables:
Expressed by Ordered Pairs:
Expressed by Mappings:
Expressed by Graphs:
Continuous Discrete -
Domain
Range Independent
Name
2 -6
Class
Date
Ratios, Rates, and Conversions
A unit rate is a rate with denominator 1. For example,
12 in.
is a unit rate. Unit rates
1 ft
can be used to compare quantities and convert units.
W
NAME 7 DATE
W7- .3'3 Refeaching Worksheet
Cramers Rule
A determinant is a square arrangement of numbers or variables
enclosed between vertical lines.
To nd the value of the determinant use the
Algebra Honors
Name_
Graphing Systems of Equations
Date_
3 s2m0j1t3a vKYu2tga3 8SIoRf9tXwAajryeZ lLHLfCt.3 c BAAlplt Br7iJgYhBtXsi Mr7e6sXezrTvpeMdV.H
Solve each system by graphing.
1) 3 x + 27 = 9 y
Algebra - Honors
Name _
Graphing Systems Activity
Date _
Put any linear equations in slope-intercept form and graph. Show a table of values for
the other equations and sketch each system. Describe the
Algebra Honors
Applications of Systems of Equations
Name_
Date_
Write a system of equations for each problem and solve.
1.
Three times one number equals twice a second number. Twice the first number
i
Algebra Honors
Name _
More Graphing Systems of Inequalities
Date _
Graph the following systems of inequalities and identify the solution area on the graph.
1.
x + 3y > 6
2x y < 3
3.
y<4
y > 2x + 6
y >