Order of Operations w/ Integers
Adding/Subtracting Expressions
Solving Equations Level 1
Solving Equations Level 2
Volume & Surface Area of 3D Shapes
100

42 ÷ -6 + 5 

-2

100

Simplify the following expresion by adding the expression: (4x + 8) + (3x - 9)

7x - 1

100
2x + 5 = 23
What is x = 9?
100
5(t+2) = 25 + 2t
What is t=5?
100

What is the volume of a rectangular prism with the dimension: l=3cm, w=3cm, h=4cm

84 cm3

200

Simplify. -64 ÷ 4(2 - 6)

-32

200

Simplify the expression by subtracting the expressions:  (-3x - 7) - (10x - 14)

-13x +7

200
m/-2 + 7 = 21
What is m= -28?
200
5(k-4) = 4- 3k
What is k = 3?
200

What is the surface area of a Cylinder with the Dimensions: r=5 cm, h=10 cm

471 cm2

300

Simplify. 12 ÷ 6 + 5× 3

77

300

(2x – 7 ) + (4x – 5) + 3

6x - 9

300
49 = 5y - 26
What is y = 15?
300

75 = 3(−6n − 5)

{−5}

300

What is the volume of a cylinder with the dimensions diameter: 30 cm, height: 12 cm

2,826 cm3

400

(-12)÷ 4 – 3 × 2

30

400

Simplify the expression by subtracting the expressions: 2(9p + 5) – 8(6p +2)

-30p – 6

400
-2w + 1 = -9
What is w= 5?
400

−11 + 10( p + 10) = 4 − 5(2p + 11)

{−7}

400

A triangular prism has a height of 11m. The base of the triangular face is 9m and the height of the triangular base is 7m. What is the volume of this prism?

346.5 m3

500

-4(1+ 5)÷ 6 – (42+5)

97

500

Simplify the expression by subtracting the expressions: (2x + 7) – (2x + 4) – 3

0

500
-5 + 10b = -75
What is b=-7?
500

10(x + 3) − (−9x − 4) = x − 5 + 3

{−2}

500

Mr. Rutherford's greenhouse has a volume of 90 m3. The base of the triangular face is 6 m and the height of the triangular base is 3 m. What is the height of the triangular prism?

10m

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