![]() ![]() Therefore the solutions to this quadratic equation are □=-3 and □=-1. We find the values of □ that make each bracket equal zero. Solve the quadratic by setting each bracket equal to zero Therefore the quadratic equation can be factorised to. In step 1, the two numbers that add to make 4 and multiply to make 3 were 1 and 3. Factor the quadratic as (□+ m)(□+ n)=0, where m and n are the two numbers from step 1 The numbers 1 and 3 add to make 4 and multiply to make 3. Think of two numbers that add to make b and multiply to make c Solving Quadratic Equations by Factoring: Example 1įor example, solve the quadratic equation by factoring. ![]() Solve the quadratic by setting each bracket equal to zero.Factor the quadratic as (□+ m)(□+ n)=0, where m and n are the two numbers from step 1.Think of two numbers that add to make b and multiply to make c.How to Solve Quadratic Equations by Factoring To solve a quadratic equation ‘□ 2+ b□+c=0′ by factoring: The next step is to square root both sides of the equation so that □=±√5.Įvaluating ±√5 on a calculator, □≈-2.24 or □≈2.24. The first step is to add 5 to both sides of the equation so that □ 2=5. We still square root both sides of the equation to obtain the solution. In this next example, □ 2 is equal to a non square number. This simple type of quadratic equation can be identified as there is only an □ 2 and constant term in the equation. If a quadratic equation is of the form □ 2 =k, square root both sides. How to Solve Quadratic Equations using Square Roots Īll quadratic equations can be solved using the quadratic formula so this method will always work for solving quadratic equations. If the quadratic cannot be factorised, use the quadratic formula.If the quadratic cannot be factorised, complete the square and solve.If the quadratic contains an □ 2 coefficient greater than 1, try to split the □ term and factorise by grouping. ![]() Solve by setting each factor to equal zero.
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