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Simplifying rational expressions

Simplifying expressions or algebraic fractions works in the same way as simplifying normal fractions. A common must be found and divided throughout. For example, to simplify the fraction \(\frac{12}{16}\), look for a common factor between 12 and 16. This is 4 as \(4 \times 3 = 12\) and \(4 \times 4 = 16\).

Divide 4 throughout the fraction, which gives \(\frac{12 \div 4}{16 \div 4} = \frac{3}{4}\).

Example 1

Simplify \(\frac{6m^2}{3m}\).

To simplify this, look for the of \(6m^2\) and \(3m\). This is \(3m\). Take this common factor out of each part of the fraction.

This gives \(\frac{6m^2 \div 3m}{3m \div 3m} = \frac{2m}{1} = 2m\).

This fraction cannot be simplified any further so this is the final answer.

Question

Simplify \(\frac{4(p + 7)}{(p + 7)^2}\).

Question

Simplify \(\frac{(m - 7)(m + 3)}{6(m + 3)}\).