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Completing the Square: A Step-by-Step Guide

Completing the Square: A Step-by-Step Guide

In the world of algebra, quadratic equations play a crucial role. These equations, characterized by their highest power of 2, often require specific techniques for solving. One such method, known as completing the square, provides a systematic approach to finding the solutions. This technique is especially valuable when dealing with equations that cannot be easily factored.

What is Completing the Square?

Completing the square is a process of manipulating a quadratic equation into a perfect square trinomial, which can then be easily solved by taking the square root of both sides. A perfect square trinomial is a trinomial that can be factored as the square of a binomial. For example, x² + 6x + 9 is a perfect square trinomial because it can be factored as (x + 3)².

Steps for Completing the Square

Let's break down the process of completing the square step-by-step:

  1. Isolate the x² and x terms: Begin by rearranging the equation so that the x² and x terms are on one side of the equation, and the constant term is on the other side.
  2. Calculate the constant term: Take half of the coefficient of the x term, square it, and add it to both sides of the equation. This ensures that the expression on the left-hand side becomes a perfect square trinomial.
  3. Factor the perfect square trinomial: Factor the expression on the left-hand side as the square of a binomial.
  4. Solve for x: Take the square root of both sides of the equation. Remember to consider both positive and negative roots.
  5. Isolate x: Simplify and solve for x.

Example

Let's illustrate the process with an example: Solve the quadratic equation x² + 8x - 9 = 0 using completing the square.

  1. Isolate x² and x terms: x² + 8x = 9
  2. Calculate the constant term: Half of 8 is 4, and 4² is 16. Add 16 to both sides: x² + 8x + 16 = 9 + 16
  3. Factor the perfect square trinomial: (x + 4)² = 25
  4. Solve for x: √(x + 4)² = ±√25
  5. Isolate x: x + 4 = ±5 => x = -4 ± 5

Therefore, the solutions to the equation x² + 8x - 9 = 0 are x = 1 and x = -9.

Key Points

Here are some important points to keep in mind about completing the square:

  • The coefficient of the x² term must be 1. If it's not, divide the entire equation by that coefficient before proceeding.
  • Completing the square is a versatile technique that can be used to solve quadratic equations, find the vertex of a parabola, and rewrite equations in standard form.
  • Practice is key! The more you practice, the more comfortable you'll become with this method.

Conclusion

Completing the square is a powerful tool in algebra, allowing you to solve quadratic equations and gain a deeper understanding of their properties. By following the steps outlined above, you can master this technique and apply it to various algebraic problems. Remember, practice makes perfect, so don't hesitate to work through numerous examples to solidify your understanding.