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Step 1 Divide all terms by a (the coefficient of x2 ). Step 2 Move the number term ( c/a) to the right side of the equation. Step 3 Complete the square on the left side of the equation and balance this by adding the same value to the right side of the equation.
May 15, 2024 · Completing the square is a helpful technique that allows you to rearrange a quadratic equation into a neat form that makes it easier to visualize or even solve. It’s used to determine the vertex of a parabola and to find the roots of a quadratic equation.
Completing the square method is one of the methods to find the roots of the given quadratic equation. In this method, we have to convert the given equation into a perfect square. We can also evaluate the roots of the quadratic equation by using the quadratic formula .
Solving quadratic equations by completing the square. Consider the equation x 2 + 6 x = − 2 . The square root and factoring methods are not applicable here. Why is that so? x 2 + 6 x + 2. But hope is not lost! We can use a method called completing the square. Let's start with the solution and then review it more closely.
To complete the square, first, you want to get the constant (c) on one side of the equation, and the variable (s) on the other side. To do this, you will subtract 8 from both sides to get 3x^2-6x=15. Next, you want to get rid of the coefficient before x^2 (a) because it won´t always be a perfect square.
Completing the square is a way to solve a quadratic equation if the equation will not factorise. It is often convenient to write an algebraic expression as a square plus...
Completing the square is a method that is used for converting a quadratic expression of the form ax 2 + bx + c to the vertex form a (x - h) 2 + k. The most common application of completing the square is in solving a quadratic equation.
