Completing the Square Must be a perfect Square
Completing the Square Must be a perfect Square Solving Quadratics By Completing the Square Part 2
Perfect Square On One side Take Square Root of BOTH SIDES When you take the square root, You MUST consider the Positive and Negative answers.
Perfect Square On One side Take Square Root of BOTH SIDES But what happens if you DON’T have a perfect square on one side……. You make it a Perfect Square Use the relations on next slide…
To expand a perfect square binomial: We can use these relations to find the missing term…. To make it a perfect square trinomial that can be factored into a perfect square binomial.
Ø Take ½ middle term Ø Then square it ØThe resulting trinomial is called a perfect square trinomial, Øwhich can be factored into a perfect square binomial.
1. Make one side a perfect square 1. 2. Add a blank to both sides 3. Divide “b” by 2 4. Square that answer. 5. Add it to both sides 6. Factor 1 st side 7. Square root both sides 8. Solve for x
Factor this Perfect square trinomial What is the Square root of 36 Bring down sign What is the Square root of x 2
1. Move constant to other side. 2. Add a blank to both sides 3. Divide “b” by 2 4. Square that answer. 5. Add it to both sides 6. Factor 1 st side 7. Square root both sides 8. Solve for x
Factor this Perfect square trinomial What is the Square root of 9 Bring down sign What is the Square root of x 2
1. Move constant to other side. 3. 2. Add a blank to both sides 3. Divide “b” by 2 4. Square that answer. 5. Add it to both sides 6. Factor 1 st side 7. Square root both sides 8. Solve for x
Factor this Perfect square trinomial What is the Square root of 9 Bring down sign What is the Square root of x 2
1. Move constant to other side. 4. 2. Add a blank to both sides 3. Divide “b” by 2 4. Square that answer. 5. Add it to both sides 6. Factor 1 st side 7. Square root both sides 8. Solve for x
Factor this Perfect square trinomial What is the Square root of 9 Bring down sign What is the Square root of x 2
Steps to solve Quadratics by completing the square: l l l Move the constant to side by itself. Make the side (w/variables) a perfect square by adding a certain number to both sides. To calculate this number – Divide “b” (middle term) by 2 – Then square that answer Take the square root of both sides of eq Then solve for x
In a perfect square, there is a relationship between the coefficient of the middle term and the constant term.
- Slides: 15