Cumulative Review Grade 9 Math Jeopardy Template

1 Square Roots and Surface Area

2 Powers and Exponents

3 Rational Numbers

4 Linear Relations

5/6 Polynomials/Linear Equations and Inequalities

100

√256

100

(3^0) x (3^2) x (3^3)

3^5

100

Write the fractions with the same denominator: 3/7 + 2/8

24/56 + 14/56

100

Determine the value of A when n = 2, A=3n + 4

A = 10

100

Simplify (3x^2 + 2x - 19) - (-5x + 4x^2 + 21)

-x^2 + 7x - 40

200

√(225/100)

15/10

200

[(2^2)^3]^4

2^24 or 16,777,216

200

Convert the mixed numbers to improper fractions: -3 1/2 and 9 2/3

-7/2 and 29/3

200

The first number in a pattern is 75. As the term number increases by 1, its value decreases by 4. Create a table of values for the pattern.

(term, value): (1, 75), (2, 71), (3, 67), (4, 63), etc.

200

Simplify 3m(-2m +7)

-6m^2 + 21m

300

The hypotenuse of a right angle triangle is 13 and one side is 5. What is the length of the other side?

300

(4x10^3) + (2x10^2) + (1x10^1) + (8x10^0)

4218

300

7/8 - (-3/6) =

11/8

300

Term numbers, starting at 1, and increasing by 1 have values of -5, -2, 1, 4, etc. Using the pattern described write an expression for the term value.

v = 3n - 8

300

7 less than 5 times a number is 38 subtract 4 times the same number. What is the number?

5x - 7 = 38 - 4x, x = 5

400

Surface area of a cylinder with height 12 and radius 2.

100.5 cm^2

400

[2 x ((-3)^3) -6]^2

3600

400

-5/9 ÷ 8/4 =

-5/18

400

Match the equations to the graphs provided.

a) i b) ii c) iv d) iii

400

1.25 + 0.75t ≤ 10.25

t ≤ 12

500

The surface area of a rectangular prism with dimensions (l, w, h) 5, 3, and 4cm, that can be painted if a cylinder with radius 1 is sat on top. (Include the base of the prism).

90.86 cm^2

500

complete the following: 5^4 + 5^6 x 5^7 - 5^2

1,220,703,725

500

[(5/6) - (1/3)^2] x (1/2)

13/36

500

This question is provided on a separate document.

(1, -6), (3, -10), (5, -14), (7, -18), (9, -22) y= -2x - 4

500

-5a +1.8 > 31.7

a < -5.98