What You Will Learn To Do Today
By the end of this lesson, you should be able to:
- Solve a linear equation step by step to a terminal form
- Identify the three terminal forms:
, , and - Classify an equation as one, infinitely many, or no solution
- Build your own equations of each solution type
- Explain why an identity or a contradiction behaves as it does
Solve One You Already Trust
- Subtract
from both sides: - Add
to both sides: - Divide by
:
We reached the form
Three Possible Destinations for Any Equation
Every linear equation lands on exactly one of these three.
An Equation That Cancels to True
- Distribute the left side:
- Subtract
from both sides:
The variable is gone, and
Why "Always True" Means Every Answer
When you reach
- The equation is true no matter what
is - So every value of
is a solution - This is called an identity
Test It — Does Every Value Work?
For
| Left side | Right side | |
|---|---|---|
Can you find any value that fails?
An Equation That Cancels to False
- Subtract
from both sides:
The variable is gone, and
"Did I Make a Mistake?" — No
Getting
- A false statement means no value of
works - This is called a contradiction
- The left side is always
more than the right
The Map From Form to Solutions
| Terminal form | Meaning | Solutions |
|---|---|---|
| One specific value | Exactly one | |
| True, no variable | Infinitely many | |
| False, no variable | None |
Your Turn: Classify These Two
Solve completely, then name the form and the count:
Distribute, combine, simplify. What's left when the dust settles?
Collapse Any Equation to One Form
After moving
- Is the coefficient
zero or not? - If
, is also zero?
Two questions decide everything.
The Three Cases of ax = b
- If
: divide by → one solution - If
and : → infinitely many - If
and : is false → none
Build a One-Solution and an Identity
One solution — start from
Identity — write one expression two ways:
Build a Contradiction on Purpose
Match the variable terms, mismatch the constants:
- Left distributes to
- Same
, but → no solution
Two Lines Tell Three Different Stories
Each side of the equation is a line — how they meet is the answer.
Both Sides Doesn't Mean Special
Predict the solution count for each:
All three have variables on both sides. Do they behave the same?
Quick Check: Predict, Don't Solve
On your own, write your prediction for each:
One word each: one, infinitely many, or none. Commit before the reveal.
Find the Error in This Solution
A student solves
, so
Where did the type flip from "none" to "one"? Find the step.
Build All Three Types Yourself Now
Write one equation for each type. Each must have:
- At least one set of parentheses
- A variable on both sides
One solution. Infinitely many. None. Then check each by solving.
Four Common Traps to Avoid Here
A false result like
Variables on both sides ≠ special — matching coefficients is the key
"Infinitely many" means every real number, not just many
What You Now Understand About Solutions
✓ Every linear equation lands on
✓ The terminal form is the count: one, all, or none
✓ A vanished variable is information, not an error
Coming Up Next: Solving Systems
You can now classify a single equation's solutions.
Next you'll graph two lines together and solve systems — where one solution, no solution, and infinitely many show up as crossing, parallel, and identical lines (8.EE.C.8).