What You Will Be Able to Do
By the end of this lesson, you should be able to:
- Explain
: - Compute
for matrices using the formula - Test invertibility: check
- Solve
via ; verify - Use technology for
and larger systems
The Scalar Analogy for
Scalar:
Matrix:
The identity matrix
The matrix analog of division — when
The Inverse:
The identity matrix:
The inverse
Not every matrix has an inverse — we'll see when one exists.
Verifying That a Matrix Inverse Is Correct
Verify
The Determinant: Check Invertibility First
Invertible vs. Singular: Two Examples
Row 2 is
The 2×2 Inverse Formula: Swap-Negate-Divide
For
Mnemonic: ① Swap
Worked Example 1: Computing
Verify:
Worked Example 2: Singular Matrix
Find
Singular matrix — no inverse. Stop here.
No unique solution exists for any system with this coefficient matrix.
Worked Example 3: Fractional Inverse
Verify:
What a Singular Matrix Means for the System
When
- Inconsistent: no solution (lines are parallel — never meet)
- Dependent: infinitely many solutions (lines are identical)
Singular ≠ automatically "no solution." Check the specific system.
Common Error: Multiplying on the Wrong Side
Derivation — why
Wrong:
Matrix multiplication is not commutative —
Solving a System with
Solve:
Verify:
One Solves Many Systems
Check-In: Compute and Solve
Find
- Compute
- Apply the formula to find
- Compute
- Verify in both original equations
Technology for and Larger
The 2×2 formula doesn't extend to 3×3. Use technology:
TI-84: MATRIX menu → enter
Desmos: matrix([[a,b,c],[d,e,f],[g,h,i]])^(-1)
The key skill is setup — entering
Unscaffolded: Full Matrix Inverse Solution
Solve algebraically:
Full process: system → matrix form → determinant →
No hints. Show every step.
What You Can Do Now
✓ Compute
✓ Swap-negate-divide; verify
✓ Solve
Determinant FIRST — zero means stop
Singular ≠ no solution — could be infinitely many
Matrix Inverses Appear Throughout Applied Mathematics
The method you learned today is foundational across fields:
- Statistics: regression uses
- Graphics: transformation inverses restore original positions
- Physics: coupled equations in circuits and wave models
- AI: large matrix equations at every training step
Click to begin the narrated lesson
Use matrix inverses to solve systems