Solving quadratics by completing the square worksheet

To solve quadratic equations using completing the square method, the given quadratic equation must be in the form of 

ax2 + bx + c  =  0

The following steps will be useful to solve a quadratic in the above form using completing the square method. 

Step 1 :

In the given quadratic equation ax2 + bx + c = 0, divide the complete equation by a (coefficient of x2). 

If the coefficient of x2 is 1 (a = 1), the above process is not required. 

Step 2 :

Move the number term (constant) to the right side of the equation.

Step 3 :

In the result of step 2, write the "x" term as a multiple of 2. 

Examples :

6x should be written as 2(3)(x).

5x should be written as 2(x)(5/2). 

Step 4 :

The result of step 3 will be in the form of 

x2 + 2(x)y  =  k

Step 4 :

Now add y2 to each side to complete the square on the left side of the equation.  

Then, 

x2 + 2(x)y + y2  =  k + y2

Step 5 :

In the result of step 4, if we use the algebraic identity

(a + b)2  =  a2 + 2ab + b2

on the left side of the equation, we get 

(x + y)2  =  k + y2

Step 6 :

Solve (x + y)2  =  k + y2 for x by taking square root on both sides. 

Example 1 :

Solve the following quadratic equation by completing the square method.

9x2 - 12x + 4  =  0

Solution :

Step 1 :

In the given quadratic equation 9x2 - 12x + 4 = 0, divide the complete equation by 9 (coefficient of x2). 

  x2 - (12/9)x + (4/9)  =  0

x2 - (4/3)x + (4/9)  =  0

Step 2 :

Subtract 4/9 from each side. 

x2 - (4/3)x  =  - 4/9

Step 3 :

In the result of step 2, write the "x" term as a multiple of 2. 

Then, 

x2 - (4/3)x  =  - 4/9

x2 - 2(x)(2/3)  =  - 4/9

Step 4 :

Now add (2/3)2 to each side to complete the square on the left side of the equation.  

Then, 

x2 - 2(x)(2/3) + (2/3)2  =  - 4/9 + (2/3)2

(x - 2/3)2  =  - 4/9 + 4/9

(x - 2/3)2  =  0

Take square root on both sides. 

√(x - 2/3)2  =  √0

x - 2/3  =  0

Add 2/3 to each side. 

x  =  2/3

So, the solution is 2/3. 

Example 2 :

Solve the following quadratic equation by completing the square method.

(5x + 7)/(x - 1)  =  3x + 2

Solution :

Write the given quadratic equation in the form :

ax2 + bx + c  =  0

Then, 

(5x + 7)/(x - 1)  =  3x + 2

Multiply each side by (x - 1). 

5x + 7  =  (3x + 2)(x - 1)

Simplify. 

5x + 7  =  3x2 - 3x + 2x - 2

5x + 7  =  3x2 - x - 2

0  =  3x2 - 6x - 9

or

3x2 - 6x - 9  =  0

Divide the entire equation by 3.

x2 - 2x - 3  =  0

Step 1 :

In the quadratic equation x2 - 2x - 3 = 0, the coefficient of x2 is 1. 

So, we have nothing to do in this step. 

Step 2 :

Add 3 to each side of the equation x2 - 2x - 3 = 0.

x2 - 2x  =  3

Step 3 :

In the result of step 2, write the "x" term as a multiple of 2. 

Then, 

x2 - 2x  =  3

x2 - 2(x)(1)  =  3

Step 4 :

Now add 12 to each side to complete the square on the left side of the equation.  

Then, 

x2 - 2(x)(1) + 12  =  3 + 12

(x - 1)2  =  3 + 1

(x - 1)2  =  4

Take square root on both sides. 

√(x - 1)2  =  √4

x - 1  =  ±2

x - 1  =  -2  or  x - 1  =  2

x  =  -1  or  x  =  3

So, the solution is {-1, 3}. 

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