Completing the Square Lessons

Often, we encounter equations which cannot be easily solved by addition, subtraction, multiplication, division, and factoring. One such equation is

When the highest exponent of an equation is 2, the method of “Completing the Square” gives us an alternative. This method will help us turn this unfactorable equation into an equation that can be factored.

The Strategy

Consider the equation

We can solve this equation by simply taking the square root of each side.

This technique also works when we replace y with an expression like (p – 1):

Solving each of the resulting equations gives p = -2, 4.

The strategy used in completing the square is to get the square of a quantity equal to a number as in

Once this is done, create two subproblems as we did above.

The Process

The completing the square process has five major steps. The summary below assumes that the equation being solved is in the variable x.

  1. Use addition and subtraction to move the constant term to the right and all other terms to the left.
  2. Divide each term in the equation by the coefficient of the x
    2 term, unless the coefficient is 1.
  3. Determine the coefficient of the x term, divide it by two, square it, and add to both sides.
  4. Factor the left side as a perfect square trinomial.
  5. Take the square root of each side, and create two subproblems from the result.

An Example

Let’s begin applying the process to our original example:

Step 1

First, we move the constant term to the right side by adding 1.5 to each side of the equation:

We may now proceed to Step 2 since all other terms are already on the left side of the equation.

Step 2

The coefficient of the x2 term is 1, so we may skip Step 2.

Step 3

We determine that is the coefficient of the x term. Now we divide this coefficient by two ,
and square it:
. So we now add to each side

Step 4

Now we factor the left side. Even though the left side has fractions, it will always be factorable as x plus half the coefficient of the x term in the original equation (in this case,
).

Step 5

Finally, we take the square root of each side, and make two subproblems.

Subproblem 1:

Subproblem 2:

As we do with factoring, we combine the solutions to the subproblems to determine the solution to the original problem:

Completing the Square: A Second Example

Step 1

The constant term, , is already on the right side. But, we must move to the left side. We do this by adding to each side:

Step 2

The coefficient of x2 is 2, so we divide each term in the equation by 2.

Step 3

The coefficient of the x term is . Dividing by two, and squaring the result gives . The next step is to add to each side.

Step 4

We must now factor the left side as a perfect square. As in the previous example, we can assume that the factored form is x plus one half the coefficient of x.

Step 5

Finally, we take the square root of each side.

Then create two subproblems:

Subproblem 1:

Subproblem 2:

And combine the solutions to the subproblems in the solution to the original problem:

Completing the Square Quiz

Question 1. In order to ‘complete the square’, what do you do to the ‘middle’ or non-squared x term? (choose 1)
(i.e. x2 + 6x = 15)

A. Multiply by 2 and then square the result
B. Divide by 2 and then square the result
C. Multiply by 2 and then add one to the result

The correct answer here would be B.

Question 2. What do you do with the result from Question #1? (choose 1)

A. Subtract it from the left side
B. Add it to the left side
C. Subtract it from BOTH sides
D. Add it to BOTH sides
E. Subtract it from the right side
F. Add it to the right side

The correct answer here would be D.

Question 3. When CAN’T you use ‘completing the square’ ? (choose 1)

A. To solve a quadratic equation
B. To convert the equation of a circle to standard form
C. To find the vertex of a parabola
D. To find the intersection of two lines
E. To avoid using the quadratic equation

The correct answer here would be D.

Completing the Square Resources

Completing the Square Calculator
Solves by completing the square whenever possible, and shows step-by-step work with instructions.

Practice Problems / Worksheet
Practice completing the square with 20 equation problems and an answer sheet.


Next Lesson:
Solving Using the Quadratic Formula

Solve second degree equations, without factoring or completing the square, by using the quadratic formula.

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