The vertex is either the maximum point or the minimum point of the equation. It is also easy to find the vertex of the equation. For example, when an object is touching the ground. That information is often The starting point or ending point for many equation. It is easier to find the zeros of the equation in this form. Why is Completing the Square Method Important?īy using completing the square method, a quadratic equation is in vertex form. The answers to these problems are on this worksheet that you can download and check your work. Here is a completing the square worksheet that you can download and practice solving a set of quadratic equations. Sometimes it’s useful when learning a new concept or set of operations to use a worksheet. Step #5 – Set the equation to 0 by using subtraction This is due to the fact that you are splitting that term into two parts. Step #4 – Your new perfect square, the h, is the b term divided by two. When adding the new c term to both sides, keep in mind that once more you need to multiply it by the factored a term. Look back at the original equation, the c term is 8. *You are not subtracting 4, but subtracting since the a term was factored out. Step #2 – Move the c term to the other side of the equation using subtraction. Step #1 – Start by factoring out the a term, divide each term by 2 Let’s start with the following equation: 2x 2 + 20x + 8 = 0 Now let’s solve a quadratic equal by completing the square when a is not equal to zero. Solving Quadratic Equations by Completing the Square Example Step #4 – Last step is to set the equation to zero by using subtraction 2x 2 + 20x + 8 = 0 Your new perfect square, the h, is the b term divided by two. What you do to one side, you do to the other side. This number gets added to both sides of the equation to maintain the balance of the equation. This is done by first dividing the b term by 2 and squaring the quotient. Step #2 – Use the b term in order to find a new c term that makes a perfect square. Step #1 – Move the c term to the other side of the equation using addition. The first example is going to be done with the equation from above since it has a coefficient of 1 so a = 1. Solve by Completing the Square Examples Example When you complete the square you can get the equation (x+3) 2 – 17 = 0. The maximum height of the ball or when the ball it’s the ground would be answers that could be found when the equation is in vertex form. The completing the square formula is calculated by converting the left side of a quadratic equation to a perfect square trinomial.įor example, if a ball is thrown and it follows the path of the completing the square equation x 2 + 6x – 8 = 0. Find your h, the b term divided by two, for the perfect square. This is done by first dividing the b term by 2 and squaring the quotient and add to both sides of the equation.
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