Completing the Square (2024)

For those of you in a hurry, I can tell you that: d = b2a

and:e = c − b²4a

Example: try to fit x² + 6x + 7 into x² + 2dx + d² + e

Now we can "force" an answer:

• We know that 6x must end up as 2dx, so d must be 3
• Next we see that 7 must become d² + e = 9 + e, so e must be −2

And we get the same result (x+3)² − 2 as above!

• 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.

We now have something that looks like (x + p)² = q, which can be solved this way:

• Step 4 Take the square root on both sides of the equation.

• Step 5 Subtract the number that remains on the left side of the equation to find x.

Example 1: Solve x² + 4x + 1 = 0

Step 1 can be skipped in this example since the coefficient of x² is 1

Step 2 Move the number term to the right side of the equation:

x² + 4x = -1

Step 3 Complete the square on the left side of the equation and balance this by adding the same number to the right side of the equation.

(b/2)² = (4/2)² = 2² = 4

x² + 4x + 4 = -1 + 4

(x + 2)² = 3

Step 4 Take the square root on both sides of the equation:

x + 2 = ±√3 = ±1.73 (to 2 decimals)

Step 5 Subtract 2 from both sides:

x = ±1.73 – 2 = -3.73 or -0.27

Example 2: Solve 5x² – 4x – 2 = 0

Step 1 Divide all terms by 5

x² – 0.8x – 0.4 = 0

Step 2 Move the number term to the right side of the equation:

x² – 0.8x = 0.4

Step 3 Complete the square on the left side of the equation and balance this by adding the same number to the right side of the equation:

(b/2)² = (0.8/2)² = 0.4² = 0.16

x² – 0.8x + 0.16 = 0.4 + 0.16

(x – 0.4)² = 0.56

Step 4 Take the square root on both sides of the equation:

x – 0.4 = ±√0.56 = ±0.748 (to 3 decimals)

Step 5 Subtract (-0.4) from both sides (in other words, add 0.4):

x = ±0.748 + 0.4 = -0.348 or 1.148

Well, one reason is given above, where the new form not only shows us the vertex, but makes it easier to solve.

There are also times when the form ax² + bx + c may be part of a larger question and rearranging it as a(x+d)² + e makes the solution easier, because x only appears once.

For example "x" may itself be a function (like cos(z)) and rearranging it may open up a path to a better solution.

Also Completing the Square is the first step in the Derivation of the Quadratic Formula

Footnote: Values of "d" and "e"

How did I get the values of d and e from the top of the page?

Start with
Divide the equation by a
Put c/a on other side
Add (b/2a)2 to both sides
"Complete the Square"
Now bring everything back...
... to the left side
... to the original multiple a of x2

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