What You Will Be Able to Do
By the end of both lessons, you should be able to:
- Solve
by taking square roots - Complete the square to transform any quadratic into
- Derive the quadratic formula; apply it to any quadratic
- Factor quadratics and choose the best method
- Write complex solutions in
form
Recall: Square Roots and the ± Symbol
: principal (positive) root —- Squaring is two-to-one:
- Solving
: undo both directions →
Why does
Start with What You Already Know
Solve
✓ and ✓
Write both:
How many solutions does
Squaring Erases the Sign — So Write ±
Squaring maps both
Undoing a square means going back in both directions:
Solving the Form
Solve
Verify:
Two Special Cases to Know
Non-perfect square:
Double root:
When Is Negative: No Real Solution
In complex numbers:
Quick Check: How Many Solutions?
For each equation, state the number of real solutions:
Solve equation 1 completely.
Rewriting to the Form We Can Solve
We can solve
Most equations look like
Goal: rewrite
That's exactly what completing the square does.
Why Completes the Square
Balance: Add to Both Sides
Adding to the left but not the right changes the equation:
Left side becomes
Whatever you do to one side, do to the other.
Completing the Square: Full Example
Solve:
Step 1: Move constant:
Step 2: Half of 8 is 4;
Step 3: Factor left side:
Step 4: Take
Step 5: Solve:
Completing the Square: Negative Middle Term
Solve:
Move constant:
Half of
What Went Wrong? Find and Fix
A student solved
"No real solution" — Wrong!
What went wrong? What is the correct solution?
When Leading Coefficient Is Not One
Solve:
Step 0: Divide by 3:
Add
Odd Values Produce Fractions
On
The process is identical — fractions are normal.
Guided Practice: Completing the Square
Solve:
Step 1: Move constant: $x^2 - 6x = $ ___
Step 2: Half of ___ is ___. Squared: ___. Add to both sides.
Step 3: Factor left side as a perfect square: $(x - \square)^2 = $ ___
Step 4: Take
Complete each step, then check with a partner.
Your Turn: Completing the Square
Solve by completing the square:
Show all five steps. Check by substituting one solution back.
Full Process from Blank Slate
Without scaffolding:
-
Solve
-
Solve
For each: choose the approach, execute, state the solution set.
What You Can Do Now
✓ Solve
✓ Complete the square — five steps to reach
Always write
Add
Divide by
Coming Up: The Quadratic Formula
Lesson 2: Complete the square on
The result is a formula that solves every quadratic automatically.
What you built today is exactly what Lesson 2 uses.