For example, multiply 3 4  ·  1 6 . 3 4  ·  1 6 .

3 4  ·  1 6 = 3 · 1 4 · 6 = 3 24 Now reduce. = 3 · 1 2 · 2 · 2 · 3 = 3  · 1 2 · 2 · 2 ·  3 3 is the only common factor. = 1 8 3 4  ·  1 6 = 3 · 1 4 · 6 = 3 24 Now reduce. = 3 · 1 2 · 2 · 2 · 3 = 3  · 1 2 · 2 · 2 ·  3 3 is the only common factor. = 1 8
Notice that we since had to reduce, we nearly started over again with the original two fractions. If we factor first, then cancel, then multiply, we will save time and energy and still obtain the correct product.

1 4  ·  8 9 = 1 2 · 2  ·  2 · 2 · 2 3 · 3 = 1 2  ·  2  ·  2  ·  2  · 2 3 · 3 2 is a common factor. = 1 1  ·  2 3 · 3 = 1 · 2 1 · 3 · 3 = 2 9 1 4  ·  8 9 = 1 2 · 2  ·  2 · 2 · 2 3 · 3 = 1 2  ·  2  ·  2  ·  2  · 2 3 · 3 2 is a common factor. = 1 1  ·  2 3 · 3 = 1 · 2 1 · 3 · 3 = 2 9

3 4  ·  8 9  ·  5 12 = 3 2 · 2  ·  2 · 2 · 2 3 · 3  ·  5 2 · 2 · 3 = 3 2  ·  2  ·  2  ·  2  ·  2 3  · 3  ·  5 2  · 2 · 3 2 and 3 are common factors. = 1 · 1 · 5 3 · 2 · 3 = 5 18 3 4  ·  8 9  ·  5 12 = 3 2 · 2  ·  2 · 2 · 2 3 · 3  ·  5 2 · 2 · 3 = 3 2  ·  2  ·  2  ·  2  ·  2 3  · 3  ·  5 2  · 2 · 3 2 and 3 are common factors. = 1 · 1 · 5 3 · 2 · 3 = 5 18

1 3 ÷ 3 4 . The divisor is  3 4 . Its reciprocal is  4 3 . 1 3 ÷ 3 4 = 1 3  ·  4 3 = 1 · 4 3 · 3 = 4 9 1 3 ÷ 3 4 . The divisor is  3 4 . Its reciprocal is  4 3 . 1 3 ÷ 3 4 = 1 3  ·  4 3 = 1 · 4 3 · 3 = 4 9

3 8 ÷ 5 4 . The divisor is  5 4 . Its reciprocal is  4 5 . 3 8 ÷ 5 4 = 3 8  ·  4 5 = 3 2 · 2 · 2  ·  2 · 2 5 = 3 2  ·  2  · 2  ·  2  ·  2 5 2 is a common factor. = 3 · 1 2 · 5 = 3 10 3 8 ÷ 5 4 . The divisor is  5 4 . Its reciprocal is  4 5 . 3 8 ÷ 5 4 = 3 8  ·  4 5 = 3 2 · 2 · 2  ·  2 · 2 5 = 3 2  ·  2  · 2  ·  2  ·  2 5 2 is a common factor. = 3 · 1 2 · 5 = 3 10

5 6 ÷ 5 12 . The divisor is  5 12 . Its reciprocal is  12 5 . 5 6 ÷ 5 12 = 5 6  ·  12 5 = 5 2 · 3  ·  2 · 2 · 3 5 = 5 2  ·  3  ·  2  · 2 ·  3 5 = 1 · 2 1 = 2 5 6 ÷ 5 12 . The divisor is  5 12 . Its reciprocal is  12 5 . 5 6 ÷ 5 12 = 5 6  ·  12 5 = 5 2 · 3  ·  2 · 2 · 3 5 = 5 2  ·  3  ·  2  · 2 ·  3 5 = 1 · 2 1 = 2

3 7 + 2 7 . The denominators are the same. Add the numerators and place the sum over 7. 3 7 + 2 7 = 3+2 7 = 5 7 3 7 + 2 7 . The denominators are the same. Add the numerators and place the sum over 7. 3 7 + 2 7 = 3+2 7 = 5 7

7 9 − 4 9 . The denominators are the same. Subtract 4 from 7 and place the difference over 9. 7 9 − 4 9 = 7−4 9 = 3 9 = 1 3 7 9 − 4 9 . The denominators are the same. Subtract 4 from 7 and place the difference over 9. 7 9 − 4 9 = 7−4 9 = 3 9 = 1 3

1 6 + 3 4 . The denominators are not alike. Find the LCD of 6 and 4. { 6=2 · 3 4= 2 2 The LCD is  2 2  · 3=4 · 3=12. Convert each of the original fractions to equivalent fractions having the common denominator 12. 1 6 = 1 · 2 6 · 2 = 2 12 3 4 = 3 · 3 4 · 3 = 9 12 Now we can proceed with the addition. 1 6 + 3 4 = 2 12 + 9 12 = 2+9 12 = 11 12 1 6 + 3 4 . The denominators are not alike. Find the LCD of 6 and 4. { 6=2 · 3 4= 2 2 The LCD is  2 2  · 3=4 · 3=12. Convert each of the original fractions to equivalent fractions having the common denominator 12. 1 6 = 1 · 2 6 · 2 = 2 12 3 4 = 3 · 3 4 · 3 = 9 12 Now we can proceed with the addition. 1 6 + 3 4 = 2 12 + 9 12 = 2+9 12 = 11 12

5 9 − 5 12 . The denominators are not alike. Find the LCD of 9 and 12. { 9= 3 2 12= 2 2  · 3 The LCD is  2 2  ·  3 2 =4 · 9=36. Convert each of the original fractions to equivalent fractions having the common denominator 36. 5 9 = 5 · 4 9 · 4 = 20 36 5 12 = 5 · 3 12 · 3 = 15 36 Now we can proceed with the subtraction. 5 9 − 5 12 = 20 36 − 15 36 = 20−15 36 = 5 36 5 9 − 5 12 . The denominators are not alike. Find the LCD of 9 and 12. { 9= 3 2 12= 2 2  · 3 The LCD is  2 2  ·  3 2 =4 · 9=36. Convert each of the original fractions to equivalent fractions having the common denominator 36. 5 9 = 5 · 4 9 · 4 = 20 36 5 12 = 5 · 3 12 · 3 = 15 36 Now we can proceed with the subtraction. 5 9 − 5 12 = 20 36 − 15 36 = 20−15 36 = 5 36