--- title: Completing the Square --- ## Completing the Square The completing the square method is one of the many methods for solving a quadratic eduation. It involves changing the form of the equation so that the left side becomes a perfect square. A quadratic equation generally takes the form: ax² + bx + c = 0. In solving the above, follow the following steps: 1. Move the constant value to the Right Hand Side of the equation so it becomes:

ax² + bx = -c

2. Make the coefficient of x² equal to 1 by dividing both sides of the equation by a so that we now have:

x² + (^b/_a)x = - (^c/_a)

3. Next, add the square of half of the coefficient of the x-term to both sides of the equation:

x² + (^b/_a)x  + (^b/_2a)² = (^b/_2a)² - (^c/_a)

4. Completing the square on the Left Hand Side and simplifying the Right Hand Side of the above equation, we have:

(x + ^b/_2a)² = (^b²/_4a²) - (^c/_a)

5. Further simplpfying the Right Hand Side,

(x + ^b/_2a)² = (b² - 4ac)/4a²

6. Finding the square root of both sides of the equation,

x + ^b/_2a = √(b² - 4ac) ÷ 2a

7. By making x the subject of our formula, we are able to solve for its value completely:

x = -b ± √(b² - 4ac) ÷ 2a

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