Consider the addition $2+3$2+3. This is the same as $2$2 wholes plus $3$3 wholes.
We can see from the diagram above that $2+3=5$2+3=5. That is, $2$2 wholes plus $3$3 wholes equals $5$5 wholes.
If we wanted to find $3-2$3−2 we would take $2$2 wholes away from $3$3 wholes and get $1$1 whole.
The important thing when adding and subtracting is that we are adding and subtracting quantities of the same amount.
Suppose we want to find $\frac{2}{7}+\frac{3}{7}$27+37. Here we have a circle with two sevenths shaded and a circle with three sevenths shaded.
Notice that the parts of each circle are the same size. We can place one circle on top of the other.
Now five sevenths of the circle are shaded in. So we can conclude that $\frac{2}{7}+\frac{3}{7}=\frac{5}{7}$27+37=57, or $2$2 sevenths plus $3$3 sevenths equals $5$5 sevenths.
When the denominators are the same, we are adding quantities of the same amount. So we can add the numerators and keep the same denominator.
Suppose we want to find $\frac{3}{7}-\frac{2}{7}$37−27. Using the same circles as above, we can take two sevenths away from three sevenths.
The part that remains is one seventh of the circle. So we can conclude that $\frac{3}{7}-\frac{2}{7}=\frac{1}{7}$37−27=17, or $3$3 sevenths minus $2$2 sevenths equals $1$1 seventh.
When the denominators are the same, we are subtracting quantities of the same amount. So we can subtract the numerators and keep the same denominator.
If the denominators are different then we are not adding quantities of the same amount. Consider $\frac{2}{9}+\frac{3}{4}$29+34. These two fractions look like this.
Before we can add these two fractions we rewrite them with the same denominator. Since we can change the denominator by multiplying the numerator and denominator by the same number, we want to first find a common multiple of the two denominators.
The denominators here are $9$9 and $4$4, so a common multiple of the denominators is $4\times9=36$4×9=36.
In this case, the denominators, $4$4 and $9$9 have no common factors. This means that $36$36 is the lowest common multiple of the denominators. This is sometimes called the lowest common denominator.
If the denominators were $4$4 and $6$6 instead, then we could find a common multiple the same way. That is, $4\times6=24$4×6=24. However, $24$24 is not the lowest common multiple of $4$4 and $6$6, because the lowest common multiple is $12$12.
In such a case, we could use either number, because they are both multiples.
This gives us two methods for adding fractions with different denominators. We can always find a common multiple by multiplying the two denominators. However, this will also mean that we will need to simplify the fraction resulting from the addition. Which method is better is a matter of preference.
Now we can rewrite the fractions. Multiplying the numerator and denominator of $\frac{2}{9}$29 gives $\frac{2\times4}{9\times4}=\frac{8}{36}$2×49×4=836. Multiplying the numerator and denominator of $\frac{3}{4}$34 gives $\frac{3\times9}{4\times9}=\frac{27}{36}$3×94×9=2736. Now these fractions look like this.
And now that the denominators are the same, we can add the fractions together.
We can see that $\frac{2}{9}+\frac{3}{4}=\frac{8}{36}+\frac{27}{36}=\frac{35}{36}$29+34=836+2736=3536.
So when the denominators are different, we rewrite the fractions with the same denominator, and then we can follow the procedure for fractions with the same denominator.
Suppose we want to find $\frac{3}{4}-\frac{2}{9}$34−29. Since the denominators are different, we rewrite the fractions with the same denominator before we subtract them. From the previous example we know that $\frac{3}{4}=\frac{27}{36}$34=2736 and $\frac{2}{9}=\frac{8}{36}$29=836.
When we take $\frac{8}{36}$836 away from $\frac{27}{36}$2736 we are left with $\frac{19}{26}$1926. So $\frac{3}{4}-\frac{2}{9}=\frac{27}{36}-\frac{8}{26}=\frac{19}{36}$34−29=2736−826=1936.
So when the denominators are different, we rewrite the fractions with the same denominator, and then we can follow the procedure for fractions with the same denominator.
Mixed numbers have a whole number part and a fraction part. The best way to add or subtract mixed numbers is to convert the mixed numbers into improper fractions. Then we can rewrite the improper fractions with the same denominator and add or subtract the fractions.
For example, to find the value of $2\frac{3}{4}-1\frac{5}{6}$234−156 we can start by rewriting both mixed numbers as improper fractions:
$2\frac{3}{4}=\frac{8}{4}+\frac{3}{4}=\frac{11}{4}$234=84+34=114 and $1\frac{5}{6}=\frac{6}{6}+\frac{5}{6}=\frac{11}{6}$156=66+56=116.
Rewriting these improper fractions with the same denominator gives:
$\frac{11}{4}=\frac{11\times3}{4\times3}=\frac{33}{12}$114=11×34×3=3312 and $\frac{11}{6}=\frac{11\times2}{6\times2}=\frac{22}{12}$116=11×26×2=2212.
So then $2\frac{3}{4}-1\frac{5}{6}=\frac{33}{12}-\frac{22}{12}=\frac{11}{12}$234−156=3312−2212=1112.
When two fractions have the same denominator we can add or subtract them by adding or subtracting the numerators over the same denominator.
When two fractions have different denominators we first rewrite the fractions with the same denominator. Then we can add or subtract the numerators over the same denominator.
To add or subtract mixed numbers, we first write them as improper fractions and then we can use the same process.
Evaluate $\frac{2}{6}+\frac{2}{6}$26+26 and simplify your answer.
Evaluate $2\frac{3}{11}+4\frac{7}{11}$2311+4711.
Evaluate $\frac{3}{4}-\frac{1}{8}$34−18.