Name that LCD
Adding Fractions
Subtracting Fractions
Improper Fractions &
Mixed Numbers
Simplifying Fractions
100

Name the LCD for the following pair of fractions:

1/4 and 3/4

LCD: 4 ! 

100

Add the following fractions. Reduce to lowest terms if necessary:

3/7 + 2/7

3/7 + 2/7 = 5/7

(No LCD needed, denominators are already the same!)

100

Subtract the following fractions. Reduce to lowest terms if necessary:

9/10 - 6/10

9/10 - 6/10 = 3/10

(No LCD needed, denominators are already the same!)

100

Convert the following mixed number to improper fraction (reduce to lowest terms if necessary):

1 3/4

= 7/4 !

(4x1 = 4,

4 + 3 = 7)

100

Simplify the following fraction: 2/4

= 1/2

(divide both numerator and denominator by 2)

200

Name the LCD for the following pair of fractions:

1/2 and 3/8

LCD: 8 !

200

Add the following fractions. Reduce to lowest terms if necessary:

5/12 + 6/12

5/12 + 6/12 = 11/12

(No LCD needed, denominators are already the same!)

200

Subtract the following fractions. Reduce to lowest terms if necessary:

12/13 - 3/13

12/13 - 3/13 = 9/13

(No LCD needed, denominators are already the same!)

200

Convert the following improper fraction to mixed number (reduce to lowest terms if necessary):

11/2

= 5 1/2 !

(How many times does 2 go into 11 without going over? 2 x 5 = 10 with 1/2 left over!)

200

Simplify the following fraction: 5/30

= 1/6

(divide both numerator and denominator by 5)

300

Name the LCD for the following pair of fractions:

5/7 and 9/14

LCD: 14 !

300

Add the following fractions. Reduce to lowest terms if necessary:

3/4 + 1/8

3/4 + 1/8 = 

6/4 + 1/8 = 7/8

(LCD = 8, make equivalent fractions, add)

300

Subtract the following fractions. Reduce to lowest terms if necessary:

3/5 - 1/10

3/5 - 1/10 = 

6/10 - 1/10 = 5/10 = 1/5

(LCD = 10, make equivalent fractions, subtract, reduce!)

300

Convert the following mixed number to improper fraction (reduce to lowest terms if necessary):

4 3/7

= 31/7 !

(4x7 = 28,

28 + 3 = 31)

300

Simplify the following fraction: 7/49

= 1/7

(divide both numerator and denominator by 7)

400

Name the LCD for the following pair of fractions:

2/5 and 5/6

LCD: 30 !

400

Add the following fractions. Reduce to lowest terms if necessary:

7/10 + 1/20

7/10 + 1/20 =

14/20 + 1/20 = 15/20 = 3/4

(LCD = 20, make equivalent fractions, add, reduce!)

400

Subtract the following fractions. Reduce to lowest terms if necessary:

5/18 - 1/9

5/18 - 1/9 = 

5/18 - 2/18 = 3/18 = 1/6

(LCD = 18, make equivalent fractions, subtract, reduce!)

400

Convert the following improper fraction to mixed number (reduce to lowest terms if necessary):

19/3

= 6 1/3 !

(How many times does 3 go into 19 without going over? 3 x 6 = 18 with 1/3 left over!)

400

Simplify the following fraction: 20/100

= 1/5

(divide both numerator and denominator by 20)

500

Name the LCD for the following pair of fractions:

9/10 and 1/8

LCD: 40 !

500

Add the following fractions. Reduce to lowest terms if necessary:

1/4 + 3/5

1/4 + 3/5 = 

5/20 + 12/20 = 17/20

(LCD = 20, make equivalent fractions, add)

500

Subtract the following fractions. Reduce to lowest terms if necessary:

4/5 - 2/3


4/5 - 2/3 = 

12/15 - 10/15 = 2/15

(LCD = 15, make equivalent fractions, subtract)

500

Covert the following improper fraction to mixed number (reduce to lowest terms if necessary):

28/7

= 4 !

(How many times does 7 go into 28 without going over? 7 x 4 = 28 with nothing left over!)

500

Simplify the following fraction: 12/36

= 1/3

(divide both numerator and denominator by 12)

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