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Solving simultaneous equations - EdexcelSimultaneous equations with linear and quadratic

Simultaneous equations require algebraic skills to find the values of letters within two or more equations. They are called simultaneous equations because the equations are solved at the same time.

Part of MathsAlgebra

Simultaneous equations with one linear and one quadratic - Higher

A does not contain any powers higher than 1. A contains a variable that's highest power is 2. For example:

\(y = x + 3\) is a linear equation and \(y = x^2 + 3x\) is a quadratic equation.

Solving simultaneous equations with one linear and one quadratic

Algebraic skills of substitution and factorising are required to solve these equations.

\(y = x + 3\)

\(y = x^2 + 3x\)

Substitute \(y = x + 3\) into the quadratic equation to create an equation which can be factorised and solved.

\(y = x^2 + 3x\)

Substitute \(y = x + 3\):

\(\mathbf{x~+~3} = x^2 + 3x\)

Rearrange the equation to get all terms on one side, so subtract \(x\) and \(-3\) from both sides:

\(-x - 3 - x - 3\)

\(0 = x^2 + 2x - 3\)

Factorise this equation:

\((x + 3)(x - 1) = 0\)

If the product of two numbers is zero, then one or both numbers must also be equal to zero. To solve, put each bracket equal to zero.

\(\begin{array}{rcl} x + 3 & = & 0 \\ -3 && -3 \\ x & = & -3 \end{array}\)

\(\begin{array}{rcl} x - 1 & = & 0 \\ +1 && +1 \\ x & = & 1 \end{array}\)

To find the values for \(y\), substitute the two values for \(x\) into the original linear equation.

\(y = x + 3\) when \(x = -3\)

\(y = \mathbf{-3} + 3\)

\(y = 0\)

\(y = x + 3\) when \(x = 1\)

\(y = \mathbf{1} + 3\)

\(y = 4\)

The answers are now in pairs: when \(x = -3\), \(y = 0\) and when \(x = 1\), \(y = 4\)