Fraction Rules Review

Fraction Rules Review Yes, you need to write it all down, including the examples. You will be graded on your notes.

Why not just use decimals??? • Because you are doing Algebra. Converting every fraction to decimals makes working with variables REALLY, REALLY difficult…. • Especially when you start working with exponents (powers)…. • Or multiple variables…. • So learn to love fractions!

Adding Fractions • Check for a common denominator (the bottom #). If the denominators are the same, just add the top numbers across. 1/6+4/6=5/6

2. If the denominators are different, find the least common denominator (LCD).

Least Common Denominator • First find the Least Common Multiple of the two denominators. 1/6+3/4 LCM of 6 and 4 is 12, so the LCD of 1/6 and ¼ is 12

b. Then multiply BOTH the top AND the bottom numbers of the fraction (the numerator and the denominator) by whatever number is needed to make the denominator the LCD 1/6 * 2/2=2/12 ¾*3/3=9/12

Finally, you can… 3. Add the top numbers (the numerators) across; leave the bottom numbers alone. 2/12+9/12=11/12 4. Simplify if possible.

Subtracting Fractions • Follow the same process as adding fractions. Remember that once the denominators are the same, you only need to subtract the top numbers (the numerators).

Multiplying Fractions • Line them up next to each other. • Multiply top AND bottom (numerator and denominator) straight across. 1/6*3/4=3/24 3. Simplify. 3/24=1/8

***Simplify Before Multiplying • A good idea; it saves time. • Look for common factors to reduce by. 1/6*3/4 The six and the three have 3 as common factor, so you can reduce them: ½*1/4=1/8 same answer as before! 

Dividing Fractions • Reverse the second fraction (the divisor) top-to-bottom (use the reciprocal), and reverse the operation (multiply instead of divide). 1/6 1/6 ¾ = * 4/3

2. Remember to simplify wherever you can before multiplying. Reduce first: 1/3*2/3 Then multiply: 1/3*2/3=2/9

Whole & Mixed Numbers

Adding Whole/Mixed Numbers • Check for LCD. If they already have a common denominator, you can add the whole numbers together and add the fractions together. Remember to convert improper fractions into whole or mixed numbers before you stop. 2 2/3 +3 2/3= 2+3= 5, and 2/3 + 2/3=4/3 Add the results: 5+4/3= 6 1/3

2. If there is no LCD, convert BOTH numbers into improper fractions: 2 2/3 + 1 4/5 Multiply the denominator times the whole number; add the result to the top (numerator). 2 2/3: 2*3 +2=8, so 2 2/3=8/3 1 4/5: 5*1 +4=9, so 1 4/5=9/5

3. Find the LCD of the improper fractions. 8/3 and 9/5 LCD of 3, 5=15 4. Convert each fraction into an equivalent fraction, using the LCD. 8/3*5/5=40/15 9/5*3/3=27/15

5. Add the top numbers (the numerators) only. 40/15+27/15=67/15 6. Simplify the result. 67 divided by 15=4 7/15

Subtracting Whole/Mixed #’s Follow the same process as for adding them. IF there is a common denominator already, you may need to “borrow” from the whole numbers first. Sometimes, it’s easier to just use improper fractions anyway!

“borrowing” to subtract mixed numbers 10 1/6-2 3/6 The first fraction is smaller than the second, so you need to “borrow” from 10 (the whole number): 9 7/6-2 3/6 now you can subtract: 9-2=7 and 7/6-3/6=4/6 7+4/6=7 4/6 Simplify: 7 2/3

Multiplying Whole/Mixed #’s ***Remember that a whole # can be written as a fraction by writing itself over 1 (because any number divided by itself is still…itself.) 2=2/1 27=27/1 234=234/1

Convert both #’s to fractions. 3 1/3*4= 10/3*4/1 2. Multiply the top and bottom (numerator and denominator) straight across. 10/3*4/1=40/3

3. Simplify. 40/3=13 1/3 4. THINK. If you estimate, will you be close to the same answer? 3*4=12…which is close to 13 1/3

Dividing Whole/Mixed #’s 9 1/3 2/6 becomes 28/3 2/6 Use the reciprocal: 28/3*6/2 Simplify first: 14/1*2/1= 28/1 =28 Follow all the same steps as for multiplying, but reverse the second fraction (use the reciprocal) and the operation (multiply).

Fraction Rules Review