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Perimeter & Area
Solving Equations
Inequalities
One Step Inequalities
Multi-Step
100
Find the area of a triangle with a height of 10 cm and a base of 9 cm.
45 cm sq
100
9x + 12 = 3x
x = -2
100
Mark can have no more than 8 pieces of candy.
x <= 8
100
x + 8 <= -9
x <= -17
100
6b - 7 <= 9b + 1
b >= -2 2/3
200
Find the perimeter of a rectangle with the length of 30 cm and the width of 12 cm.
84 cm
200
14f + 7 = 7f
f = -1
200
Abby can eat at least 3 pints of ice cream.
x >= 3
200
h + 5 - 4 <= 14
h <= 13
200
6(2 + 5x) = 3(4 + 2x)
x = 0
300
Find the perimeter of an equilateral triangle whose base is 10 cm.
30 cm
300
25 v + 50 = 10v + 95
v = 3
300
The most amount of points you can get on the test is 60.
p <= 60
300
25 + x > -32
x > -57
300
Solve & identify the type of solution: 3(x + 1) +1 + 2x = 2(3x + 1) +2 - x
4 = 4 / Identity or Infinite solution
400
Find the perimeter and area of a square whose side is 15 inches.
Perimeter = 60 in Area = 225 sq in
400
2(3x - 5) = 5(2x - 3)
x = 5/4
400
Emily can have no more than 2 helpings of pasta before her swim meet.
s <= 2
400
31 - 2y >= -43
y < 37
400
3(2x + 4) = 6(5x +2)
x = 0
500
Find the area of a triangle with the base measuring 12 in and the 2 sides measuring 6 inches each and the height is 4 in.
24 sq in
500
36x + 12 = 7x + 10
x = - 2/29
500
Which two symbols are graphed with an open circle and which two are graphed with a closed circle?
< , > less than/greater than - Open circle <=, >= less than or equal to / greater than or equal to - closed circle
500
-26 <= 7 - x
x >= -33
500
Solve and identify the type of solution. 8x - 2(2 + 3x) = 2(x - 3)
-4 = -6 False / No solution or null set