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Quadratic expressions - Intermediate & Higher tier – WJECFactorising the difference between two squares

Quadratics in algebra have many and varied uses, most notable of which is to describe projectile motion. Form and manipulate quadratic equations and solve them by a variety of means.

Part of MathsAlgebra

Factorising the difference between two squares

Sometimes we have quadratic equations of the form \({x^2}\) - a, in other words there is no term in \({x}\). Factorising these expressions is very straightforward if we recall that the expansion of (\({x}\) + \({y}\))(\({x}\) - \({y}\)) = \({x^2}\) - \({y^2}\)

Example

Factorise \({x^2}\) - 64

Solution

Recalling (\({x}\) + \({y}\))(\({x}\) - \({y}\)) = \({x^2}\) - \({y^2}\) in our expression \({y^2}\) = 64 and therefore \({y}\) is the square root of 64 which is 8. Similarly we square root \({x^2}\) to obtain \({x}\).

It should hopefully be easy to see that \({x^2}\) - 64 = (\({x}\) + 8)(\({x}\) - 8).

Question

Factorise 9\({x^2}\) - 100