Exponents and Expressions
Equations & Inequalities
Area
Volume and Surface Area
INTEGERS
100
Using exponents, rewrite the following expression:
2 x 2 x 2 x 2 x 2
25
100
Solve the equation.
a - 5 = 9
a = 14
100
Find area of the following rectangle.
24 yards2
100
Find volume.
72 cm3
100
(-1) + 1 =
0
200
Identify the coefficient and variable in the following expressions:
Expression 1: 5x
Expression 2: 7d
Expression 1:
Coefficient: 5
Variable: x
Expression 2:
Coefficient: 7
Variable: d
200
Solve the following equation:
m/18 = 3
m = 54
200
Find area of the parallelogram.
135 in2
200
A sandbox is 4 inches long, 7 inches wide and 3 inches tall. What is the volume of the sandbox?
84 in3
200
5 x (-4)=
-20
300
Translate the following phrase into an algebraic expression:
Five less than the product of m and 6.
6m - 5
300
Samuel paid $30 for food and boba. Her food costs $15 and she bought boba for $3 each. Define a variable, write and solve and equation to represent the amount of boba Samuel purchased.
b = # boba drinks purchased
Equation: 30 = 3b + 15
b = 5
300
Find area of the triangle, given that units are in inches.
24 in2
300
Find surface area of the following.
684 in2
300
(-4) + (-5) =
-9
400
Create an equivalent expression for:
4(d + 32 + 2b)
4d + 36 + 8b
400
Solve and graph the following inequality:
x + 12 ≤ 16
400
Find area of the following.
27 in2
400
Find surface area.
217 units2
400
(-11) - 8 =
-19
500
Create an equivalent SIMPLIFIED expression for the following:
53(2p + f + 24) - 15p
235p + 125f + 2000
500
A cookie jar starts off with 32 cookies in it, and each day 2 cookies are eaten. After a certain number of days, there are 14 cookies in the jar. Define a variable, write and solve an equation to determine the number of cookies that were eaten each day.
Let c = # cookies eaten per day
Equation: 14 = 32 - 2c
c = 9
500
Find area.
42.5 units2
500
Find surface area of the following.
96 units2
500
11 - (-8) + 5 =
24