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1
Name ________________________ Date _________
1. 2.
3. 4.
5.
6.
7.
9. 10.
e and rA
B
C
none ofthe above
D
both A and BC
none ofthe above
D
42q48A
6e15B
90C
all ofthe above
D
commutativeA
associativeB
identityC
none ofthe above
D
10:1A
12:1B
11:1C
none ofthe above
D
The identity property that uses 1 applies to ÁÁÁÁÁ.
In the order of operations, if there are no parentheses,ÁÁÁÁÁ first.
The value of 6e[7q8] is ÁÁÁÁÁ.
In 52, the 2is the ÁÁÁÁÁ.
In 4wx=4, the ÁÁÁÁÁ property applies.
Complete the table. Use the table to answer questions 6-8.
10 nickels = ÁÁÁÁÁ quarters.
Each soccer team has 11 players. What is the ratio of players to teams?
There are 9 soccer teamsat the tournament. How many players are there?
q and ww and r
q or wA
B e or r
base numberA
orderB
exponentC
none ofthe above
D
3 quarters = ÁÁÁÁÁ nickels.
The ratio of nickels to quartersis ÁÁÁÁÁ.
8.
quarters
nickels
1
5
3
10
1:5A 5:1B 5w1C none ofthe above
D
2A 5B none ofthe above
D3C
5A 10B none ofthe above
D15C
20A
2B
100C
none ofthe above
D
© 2015 UGU10M1 Pre-Algebra Pretest
3
Name ________________________ Date _________
21. 22.
24.
27. 28.0A
1B
10C
none ofthe above
D
What is the value of x when x2=100?
The distance between (1,6) and (–1,6) on a coordinate graph is ÁÁÁÁÁ units.
12A
6B
0C
none ofthe above
D
25.
Complete the tables. Use them to answer problems 21–23.
a
aq213
Table A
always oddA
always evenB
odd and evenC
none of the aboveD
b
2b12
Table B
always oddA
always evenB
odd and evenC
none of the aboveD
x-axisA
y-axisB
originC
none of the aboveD
In Table A, the values for aq2 are ÁÁÁÁÁ numbers.
23.In Table B, the values for 2b are ÁÁÁÁÁ numbers.
The values of a and b are located on the ÁÁÁÁÁ of a coordinate graph.
3, –4, 4A –4, –5, –6B 3, 4, 5C none of theseD
11Á12, 10Á
11, 9Á10A none of theseD10Á
11, 8Á9 , 6Á
7B 13Á14, 15Á
16, 17Á18C
ÁÁÁÁÁÁ,ÁÁÁÁÁÁ,ÁÁÁÁÁÁ,ÁÁÁÁÁÁ,ÁÁÁÁÁÁ,ÁÁÁÁÁÁ,ÁÁÁÁÁÁ.2 .4 .6 .8 1.0
2.0, 3.0A 10, 20B 1.3, 1.5C none of theseD
ÁÁÁÁÁ,ÁÁÁÁÁ,ÁÁÁÁÁ,ÁÁÁÁÁ,ÁÁÁÁÁ,ÁÁÁÁÁ,ÁÁÁÁÁ,ÁÁÁÁÁ-1 1 -2 2 -3
ÁÁÁÁÁ,ÁÁÁÁÁ,ÁÁÁÁÁ,ÁÁÁÁÁ,ÁÁÁÁÁ,ÁÁÁÁÁ,ÁÁÁÁÁ,ÁÁÁÁÁ20Á21
18Á19
16Á17
14Á15
12Á13
26.
© 2015 UGU10M1 Pre-Algebra Pretest
6
Name ________________________ Date _________
© 2015 UGU10M1 Operations Pretest
exponentA
orderB
base numberC
none of the aboveD
multipliedA
subtractedB
addedC
none of the aboveD
place valueA
squaresB
rootsC
none of the aboveD
number of 0sA
number of 1sB
number of 5sC
all of the aboveD
TrueA
FalseB
9.
10.
11.
12.
13.
15.
17.
19.
In 53, the 5 is the ÁÁÁÁÁÁ.
An exponent is the number of times the base number is ÁÁÁÁÁÁ.
Powers of 10, exponents with 10 as the base number, show ÁÁÁÁÁÁ.
The exponent with a base number of 10 is the ÁÁÁÁÁÁ in the place value.
The identity factor for subtraction is 2.
nr3=n is an example of the associative property.
[7q3]q4=7q[3q4] is an example of the associative property.
Properties of operations are laws that apply to them.
TrueA
FalseB
TrueA
FalseB
TrueA
FalseB
TrueA
FalseB
TrueA
FalseB
TrueA
FalseB
TrueA
FalseB
14.
16.
In a list of different operations, perform the same operation from right to left.
18.
20.
The associative property uses order and parentheses to define equal expressions.
20r10=[10r10]q[10r10] is an example of the distributive property.
The identity factor for multiplication is 0.
Name ________________________ Date _________
17© 2015 UGU10M1 Exponents
Exponents
4
4
4
7
7 7 is the base number.ÁÁÁÁÁÁ
2 is the exponent for the number of times the base number is multiplied.
ÁÁÁÁÁÁ
72=7 squared
43=4 cubed
7e7=ÁÁÁÁÁÁ
is the base number.ÁÁÁÁÁÁ
is the exponent for the number of times the base number is multiplied.
ÁÁÁÁÁÁ
4e4e4=ÁÁÁÁÁÁ
Name ________________________ Date _________
27© 2015 UGU10M1 Review Operations
11.
12.
13.
14.
15.
16.
17.
19.
9q[3e2]q[10r5]=ÁÁÁÁÁÁ
18.
20.Exponents are used in writing ÁÁÁÁÁÁ.
15A
16B
17C
18D
In 54, the 4 is the ÁÁÁÁÁÁ.productA
exponentB
factorC
divisorD
In 73, the 7 is the ÁÁÁÁÁÁ.productA
sumB
differenceC
base numberD
63= ÁÁÁÁÁÁ18A
216B
9C
108D
42 is ÁÁÁÁÁÁ 52.9 less thanA
9 greater thanB
2 less thanC
2 greater thanD
103= ÁÁÁÁÁÁ1,000A
100B
30C
13D
34 is ÁÁÁÁÁÁ 3e4.
70,000= ÁÁÁÁÁÁ7e105A
7e104B
70e10C
700e1D
106A
101B104C
105D102e103= ÁÁÁÁÁÁ
large numbersA
scientific notation
B
both A and BC
none of the above
D
equal toA
69 greater thanB
69 less thanC
24 greater thanD
Name ________________________ Date _________
49© 2015 UGU10M2 Word Problems
1.
2.
A cake recipe calls for 3 cups of flour and 2 cups of oil. Show the ratio of oil to flour. ÁÁÁÁÁÁÁ:
How many cups of oil are needed for 4 cakes?
How many cakes can be made with 6 cups of flour?
ÁÁÁÁÁÁÁ
ÁÁÁÁÁÁÁ
A motorcycle travels 300 miles on 4 gallons of gasoline.A car travels 300 miles on 10 gallons of gasoline.Show both ratios.
How far does the motorcycle travel on10 gallons of gasoline?
How far does the car travel on4 gallons of gasoline? ÁÁÁÁÁÁÁ
ÁÁÁÁÁÁÁ
motorcycle = ÁÁÁÁÁÁÁ: car = ÁÁÁÁÁÁÁ:
A.
B.
A.
B.
Name ________________________ Date _________
51© 2015 UGU10M2 Review Ratio
n3Weeks
Days
217 21
1.
2.
3.
4.
5.
6.
7.
8.
nPencils
Pens
1053 96
Quarters
Nickels
n125
3Bottles
Dollars
n5 15
A ratio compares ÁÁÁÁÁÁ quantitiesor amounts.
2A
3B
4C
none of the aboveD
A ratio can be expressed as ÁÁÁÁÁÁ.
2:3A
2 to 3B
C
all of the aboveD
2y3
A rate is a ÁÁÁÁÁÁ.
raceA
type of ratioB
rankC
none of the aboveD
11A
12B
13C
none of the aboveD
14A
4B
28C
none of the aboveD
60A
120B
180C
none of the aboveD
24A
25B
26C
none of the aboveD
10A
5B
4C
none of the aboveD
n =
n =
n =
n =
n =
nMinutes
Hours 3
Name ________________________ Date _________
69© 2015 UGU10M3 Coordinate Axes
x-axisorigin
y-axis
Post Office
Bank
City Map of Elizabeth(Use with activity sheet 70)
1. Label each quadrant as a direction.
2. Label the x-axis as Main Street.
3. Label the y-axis as Central Avenue.
4. From the origin on the x-axis, the numbers to the right are east, The numbers to the left are west.
5. From the origin on the y-axis, the numbers at the top are north, the numbers at the bottom are south.
6. Each number is 1 block.
School
PoliceStation
Name ________________________ Date _________
90© 2015 UGU10M4 Variables
p5.75x
Write an example of how each expression might be used.
2.
3.
1.
4.
[640-a]
1 1__2 qn
pr 1__3
How are each pair of expressions different?
ÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁ
ÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁ
ÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁ
ÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁ
ÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁ
ÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁ
ÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁ
ÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁ
ÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁ
ÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁ
ÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁ
84-y and y-84
tqtqt and 3t
5.
6. ÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁ
ÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁ
ÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁ
Name ________________________ Date _________
90© 2015 UGU10M4 Variables
p5.75x
Write an example of how each expression might be used.
2.
3.
1.
4.
[640-a]
1 1__2 qn
pr 1__3
How are each pair of expressions different?
ÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁ
ÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁ
ÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁ
ÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁ
ÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁ
ÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁ
ÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁ
ÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁ
ÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁ
ÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁ
ÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁ
84-y and y-84
tqtqt and 3t
5.
6. ÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁ
ÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁ
ÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁ
Name ________________________ Date _________
121© 2015 UGU10M5 Equality
4yq1
When y=1, 4yq1=ÁÁÁÁÁÁ.
When y=2, 4yq1=ÁÁÁÁÁÁ.
When y=3, 4yq1=ÁÁÁÁÁÁ.
When y=4, 4yq1=ÁÁÁÁÁÁ.
1Á2cq5
When c=0, 1Á2cq5=ÁÁÁÁÁÁ.
When c=2, 1Á2cq5=ÁÁÁÁÁÁ.
When c=4, 1Á2cq5=ÁÁÁÁÁÁ.
When c=6, 1Á2cq5=ÁÁÁÁÁÁ.
7xw2
For which value of x does
7xw2=12?
x=0A
x=1B
x=2C
30w3w
For which value of w does
30w3w=15?
.25pq1
What value of x makes
.25pq1=2.25?
2bw.5
What value of b makes
2bw.5=11.5?
p=3A
p=4B
p=5C
b=2A
b=4B
b=6C
w=0A
w=5B
w=10C
Name ________________________ Date _________
156© 2015 UGU10M6 Patterns
1.
2.
3.
ÁÁÁÁÁÁwÁÁÁÁÁÁqÁÁÁÁÁÁwÁÁÁÁÁÁqÁÁÁÁÁÁwÁÁÁÁÁÁqÁÁÁÁÁÁp5 p1.25 p4 p1.50 p3
Describe the pattern using words.I had $5. I spent $1.25. I earned $4. I bought some stamps for $1.50. I received $3 from my grandmother. I gave ÁÁÁÁÁÁÁÁ to my brother for lunch money.
ÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁ
ÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁ
The pattern is
ÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁ
Complete this pattern on the number line. Start at 0.Describe the pattern on the number line. Use "right" and "left" in your description.
ÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁ
ÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁ
0 1 2 3 4 5 6-6 -5 -4 -3 -2 -1
Describe the pattern.
ÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁ
ÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁÁ
ÁÁÁÁÁ,ÁÁÁÁÁ,ÁÁÁÁÁ,ÁÁÁÁÁ,ÁÁÁÁÁ,ÁÁÁÁÁ,ÁÁÁÁÁ,ÁÁÁÁÁ,ÁÁÁÁÁ,ÁÁÁÁÁ1Á5 2 2Á
5 4 3Á5