Example: Vector from A(1,2) to B(4,6)
Step 1: Plot A(1,2) and B(4,6); draw arrow from A to B
Step 2: Compute magnitude:
Magnitude = 5 units
Guided Practice: Vector from P(0,0) to Q(3,4)
Step 1: Draw the arrow from P to Q
Step 2: Fill in the distance formula:
This is a 3-4-5 Pythagorean triple — do you recognize the magnitude?
Free Vector: Position Does Not Matter
Same run, same rise, same direction — same vector.
Position is not part of a vector's identity.
Three Ways to Write the Same Arrow
Three equivalent notation forms — all name the same vector:
- Bold face:
— used in printed textbooks - Arrow over letter:
— used in handwriting - Segment notation:
— names the specific endpoints
All three are interchangeable.
Notation Reference: One Arrow, Three Names
One physical arrow — three ways to write it. All equivalent.
Magnitude Notation: Three Equivalent Symbols
| Symbol | Reads as |
|---|---|
| $ | \mathbf{v} |
| "norm of v" | |
| "length of v" |
All three are scalars — always
Parallel: just as
Vector or Scalar? Classify These Expressions
Vector or scalar (magnitude)?
(a plain number)
Classify each before advancing.
Five Notation Forms for One Arrow
Arrow from A(1,2) to B(4,6) — magnitude 5:
| Symbol | Type |
|---|---|
| vector (bold) | |
| vector (arrow) | |
| vector (endpoints) | |
| $ | \mathbf{v} |
| magnitude (italic) |
Identify and Correct the Notation Error
A student wrote:
"Vector
points left, so ."
What's wrong? Write the correction in one sentence.
Full Procedure: From Points to Notation
Given: initial point
- Draw the directed line segment; label both points
- Write the vector in all three notation forms
- Compute the magnitude (show all steps)
- Is
a vector or a scalar? Explain.
Key Takeaways: Vectors and Scalars
✓ Vector = magnitude + direction; scalar = magnitude only
✓ Vectors drawn as arrows: tail = initial point, tip = terminal point
✓ Equal vectors: same length AND same direction — position irrelevant (free vectors)
✓ Magnitude
Watch Out: Four Common Errors
Speed ≠ velocity: speed is scalar; velocity requires direction
Position doesn't change equality: same length + direction = same vector
Vectors don't start at the origin: any starting point is valid
Next Lesson: Extracting Vector Components
Next lesson (VM.A.2): Extract a vector's direction and magnitude as two numbers — the components
Components let you:
- Add vectors algebraically
- Find direction angles precisely
- Scale vectors by any factor
Click to begin the narrated lesson
Recognize and represent vector quantities