What Does Doubling a Payoff Matrix Mean?
A tournament's payoff matrix is:
The prize money doubles. What is the new payoff matrix?
Can you write the new matrix before seeing the formula?
From Vector to Matrix: Same Rule
The Rule: Multiply Every Entry by
For matrix
Every entry is multiplied. The result is still
Each Entry Gets Its Own Multiplication Arrow
Each arrow shows one multiplication — there are four total for a 2×2 matrix.
Applying the Rule to a 2×3 Matrix
- Six entries multiplied — result still
- Negative scalar flips all signs:
,
Dimensions Never Change Under Scalar Multiplication
- Scalar multiplies the entries — not the shape
- Doubling prize money doesn't add new players or strategies
- A
matrix times any scalar is still
Three Special Values of the Scalar
: — the zero matrix; all entries become 0 : — unchanged; multiplicative identity : — additive inverse;
Check-In: Compute and State Dimensions
Compute
- Write the entries of
- State the dimensions of
Prize Money Doubled: Meaning in Context
Original payoff matrix:
- Every entry doubled — but the sign pattern is unchanged
- Best strategy is the same — ratios between entries preserved
What Changes and What Stays the Same
| What changes | What stays the same |
|---|---|
| Absolute entry values | Sign pattern of entries |
| Magnitude of each entry | Relative ratios between entries |
| — | Matrix dimensions and shape |
Payoff Matrix: Three Scalar Computations
Payoff matrix
: prize doubles → : flip perspective → : prizes halved →
Unit Conversion Using Scalar Matrix Multiplication
Multiply by 1.609: every distance converts from miles to kilometers.
Properties Bridge: What Would You Predict?
Predict before the rule is stated:
For matrices
- Does
? (Distributive?) - Does
? (Associative?)
Check numerically with any specific 2×2 example.
Five Properties of Scalar Multiplication
| Property | Rule |
|---|---|
| Distributive (matrix addition) | |
| Distributive (scalar addition) | |
| Associative | |
| Identity | |
| Zero |
All hold for any matrices
Verifying the Distributive Property Numerically
Let
Left:
Right:
Find and Fix the Dimension Error
A student computed
"The result is a
matrix."
What is wrong? What is the correct result and its dimensions?
Full Practice: Four Scalings of One Matrix
Compute:
- Which computations preserve the sign pattern of
? - What game-theory interpretation does
have?
Key Takeaways from Scalar Multiplication
✓ Rule:
✓ Dimensions:
✓ Context: preserves sign pattern and ratios; changes magnitude
✓
✓ Properties: distributive, associative, identity, zero matrix hold
Next Lesson: Adding Two Matrices
You can now scale any matrix by any scalar.
Next (VM.C.8): Add two matrices entry by entry:
And matrix subtraction uses today's rule:
Click to begin the narrated lesson
Multiply matrices by scalars