大象传媒

Surds - Higher - EduqasMultiplying and dividing surds

Surds are numbers left in square root form that are used when detailed accuracy is required in a calculation. They are numbers which, when written in decimal form, would go on forever.

Part of MathsNumber

Multiplying and dividing surds

Multiplying surds with the same number inside the square root

We know that:

\(\sqrt{2} \times \sqrt{2} = 2\)

\(\sqrt{5} \times \sqrt{5} = 5\)

So multiplying surds that have the same number inside the gives a whole, .

\((\sqrt{3})^2 = \sqrt{3} \times \sqrt{3} = \sqrt{9} = 3\)

Question

Simplify the following surds:

  1. \((\sqrt{7})^2\)
  2. \((\sqrt{11})^2\)
  3. \((\sqrt{15})^2\)

Multiplying surds with different numbers inside the square root

First, multiply the numbers inside the square roots, then simplify if possible.

\(\sqrt{8} \times \sqrt{10} = \sqrt{80}\)

\(\sqrt{80} = \sqrt{(16 \times 5)} = 4 \times \sqrt{5} = 4 \sqrt{5}\)

Example

\(2 \sqrt{3} \times 3 \sqrt{2}\)

Multiply the whole numbers:

\(2 \times 3 = 6\)

Multiply the surds:

\(\sqrt{3} \times \sqrt{2} = \sqrt{6}\)

This makes: \(6 \sqrt{6}\)

Dividing surds

Just like the method used to multiply, the quicker way of dividing is by dividing the component parts:

\(\frac{8 \sqrt{6}}{2 \sqrt{3}}\)

Divide the whole numbers:

\(8 \div 2 = 4\)

Divide the square roots:

\(\sqrt{6} \div \sqrt{3} = \sqrt{2}\)

\(4 \sqrt{2}\)

Question

Simplify the following surds:

  1. \(\sqrt{18} \times \sqrt{2}\)
  2. \(\frac{\sqrt{88}}{2}\)
  3. \(\frac{14\sqrt{30}}{16\sqrt{3}}\)