Subtracting Mixed Fractions Examples
Example 1: Subtract 3(1/4) from 5(2/4).
Solution:
5(2/4) – 3(1/4)
= 5 – 3 + (2/4 – 1/4 )
= 2 + ( 2-1 /4)
= 2 + (1/4)
= 2 (1/4)
Example 2: Subtract 3(2/5) from 9(7/10).
Solution:
9(7/10) – 3(2/5)
= (9 – 3) + ( 7/10 – 2/5)
= 6 + ( 7/10 – 2 * 2/5* 2)
= 6 + (7/10 – 4/10)
= 6 + ( 7- 4/10)
= 6 + (3/10)
= 6(3/10)
Example 3: Subtract 5(2/3) from 8(11/12).
Solution:
8(11/12) – 5(2/3)
= (8 -5) + (11/12 – 2/3)
= 3 + ( 11/12 – 2*4/3*4)
= 3 + ( 11/12 – 8 / 12)
= 3 + ( 11-8/12)
= 3 + (3/12)
= 3 + (1/4) Simplify, 3/12
= 3(1/4)
Example 4: Subtract 1(3/4) from 3(1/2).
Solution:
1(3/4) – 3(1/2)
= (3 -1) + (3/4 – 1/2)
= 2 + 1/2 – 3/4
= 2 + 2/4 – 3/4
= 2 + 2-3/4
= 2 + (-1/4)
= 2 – 1/4
= 1 (3/4)
Subtracting Mixed Fractions
Subtracting Mixed Fractions is method of finding difference between two mixed fractions. Originally, these mixed fractions are improper fractions that expressed as a sum of whole number and a proper fraction. Suppose 5(2/6) – 3(1/6). Firstly, we have to convert them into improper fractions that will be 10/6 and 3/6. Now, we subtract 3/6 from 10/6, which gives 7/6, or in the mixed fraction, that will be 1(1/6).
In this article, we will learn about subtraction of mixed fractions along with basic introduction of mixed fraction.
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