Download Rules for fractions

Survey
yes no Was this document useful for you?
   Thank you for your participation!

* Your assessment is very important for improving the workof artificial intelligence, which forms the content of this project

Document related concepts

History of logarithms wikipedia , lookup

Mathematics of radio engineering wikipedia , lookup

Elementary arithmetic wikipedia , lookup

Positional notation wikipedia , lookup

Addition wikipedia , lookup

Arithmetic wikipedia , lookup

Location arithmetic wikipedia , lookup

Continued fraction wikipedia , lookup

Elementary mathematics wikipedia , lookup

Transcript
Student
Learningentre
C
Rules for fractions
ADDITION AND SUBTRACTION
To add or subtract fractions they must have the same denominator (the bottom value).
Addition and Subtraction with the same denominators
If the denominators are already the same then it is just a matter of either adding or subtracting the numerators (the top
value).
𝐴𝐴
𝐡𝐡
Addition
𝐴𝐴
𝐡𝐡
Subtraction
+
βˆ’
𝐢𝐢
𝐡𝐡
𝐢𝐢
𝐡𝐡
=
=
𝐴𝐴+𝐢𝐢
𝐡𝐡
3
4
Example
π΄π΄βˆ’πΆπΆ
𝐡𝐡
3
4
Example
Addition and Subtraction with different denominators
2
3+2
4
2
3βˆ’2
4
+4=
βˆ’4=
5
=4
1
=4
If the denominators are different then a common denominator needs to be found. This is most easily done by creating a
common denominator that is the product of the two differing denominators. To achieve this multiply the denominator and
the numerator of each fraction by the opposite denominator. This is actually the same as multiplying 1 and so we aren’t
really changing anything.
Addition
𝐴𝐴
𝐡𝐡
Subtraction
MULTIPLICATION
+
𝐴𝐴
𝐡𝐡
𝐢𝐢
𝐷𝐷
βˆ’
=
𝐢𝐢
𝐷𝐷
𝐴𝐴𝐴𝐴
𝐡𝐡𝐡𝐡
=
+
𝐴𝐴𝐴𝐴
𝐡𝐡𝐡𝐡
𝐡𝐡𝐡𝐡
𝐡𝐡𝐡𝐡
βˆ’
=
𝐡𝐡𝐡𝐡
𝐡𝐡𝐡𝐡
𝐴𝐴𝐴𝐴+𝐡𝐡𝐡𝐡
𝐡𝐡𝐡𝐡
=
Example
π΄π΄π΄π΄βˆ’π΅π΅π΅π΅
𝐡𝐡𝐡𝐡
Example
To multiply fractions simply multiply the nominators
and multiply the denominators:
a
𝐴𝐴
𝐡𝐡
×
𝐢𝐢
𝐷𝐷
=
𝐴𝐴𝐴𝐴
𝐡𝐡𝐷𝐷
𝐴𝐴
𝐡𝐡
÷
𝐢𝐢
𝐷𝐷
=
𝐴𝐴
𝐡𝐡
DIVISION
To divide one fraction by another we must flip the
second fraction and then multiply with the first:
×
3
5
2
3
+ =
2
3
βˆ’
3
5
=
3(3)
5(3)
2 5
3 5
+
βˆ’
2(5)
3(5)
3 3
5 3
Example:
𝐷𝐷
𝐢𝐢
=
𝐴𝐴𝐷𝐷
𝐡𝐡𝐢𝐢
Example:
=
=
9+10
15
=
10βˆ’9
15
=
2
8
19
15
1
15
4
7
× 6 = 42 = 21
2
3
÷ 7 = 3 × 4 = 12 = 6
4
2
4
7
14
7
PRACTICE
1)
3)
2
7
4
3
+ =
7
2
÷
12
3
Rules of Fractions
=
2)
4)
5/2013 @ SLC
3
4
5
6
× =
7
3
βˆ’
12
8
=
Check your answers on the back.
1 of 2
Student
Learningentre
C
Rules for fractions
#
Explanation
Workings
1.
Before you can add or subtract, the fractions should have the
same bottom number – a Common Denominator.
2
7
2.
Multiply the bottom numbers and multiply the top numbers.
Then simplify the fraction by cancelling by 3
3.
Turn the second fraction upside down and multiply. 21 and 24
have a common factor of 3, so divide top and bottom by 3.
4.
Before you can add or subtract, the fractions should have the
same bottom number – a Common Denominator.
4
2 3
7(3)
+3=
5
6
Answer
+
4 7
3(7)
3×5
=
3
4
×
15
7
12
÷
2
3
=
7
12
×
3
2
7
12
βˆ’
3
8
=
14
24
βˆ’
9
24
= 4×6 = 24
=
=
7×3
12×2
21
24
=
5
24
TEL: 61-8-8201 2518
E-MAIL: [email protected]
INTERNET: http://www.flinders.edu.au/SLC
POSTAL: PO BOX 2100, ADELAIDE, SA 5001
5/2013 @ SLC
5
8
=
STUDENT LEARNING CENTRE
REGISTRY BUILDING ANNEXE
Rules of Fractions
34
21
2 of 2