Addition and subtraction of fractions

Numbers: Rational numbers

Addition and subtraction of fractions

Both the sum and the difference of two rational numbers is a rational number.

Addition of fractions

Let #a#, #b#, #m#, and #n# be integers with #m\ne0# and #n\ne0#.

A general formula for addition of the fractions #\frac{a}{m}# and #\frac{b}{n}# is\[\frac{a}{m}+\frac{b}{n} = \frac{a\cdot n+b\cdot m}{m\cdot n} \tiny.\]

In the case of common denominators, we have\[ \frac{a}{n}+\frac{b}{n}=\frac{a+b}{n}\tiny.\]

A common mistake is adding numerators without common denominators. For example: \[\frac{1}{2}+\frac{1}{3}\ne\frac{2}{5}\tiny.\]

A formula for the subtraction of fractions is obtained from the given formulas by replacing #c# by #-c# in the formula for addition of fractions:

\[\frac{a}{m}-\frac{b}{n} = \frac{a\cdot n-b\cdot m}{m\cdot n} \tiny.\]

Transform \(\frac{5}{14}\) and \(\frac{5}{26}\) into the most simplified fractions with common denominators.

\(\frac{5}{14}=\frac{65}{182}\) and \(\frac{5}{26}=\frac{35}{182}\)

The fastest method does this by

first determining the least common multiple of the two denominators: \(\mathrm{lcm}(14,26)=\frac{14\times 26}{\mathrm{gcd}(14,26)}=\frac{364}{2}=182\),
next adjusting the numerators accordingly: \(\frac{5}{14}=\frac{5\times 13}{14\times 13}=\frac{65}{182}\) and \(\frac{5}{26}=\frac{5\times 7}{26\times 7}=\frac{35}{182}\).

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