Vector Components | Lesson 2 of 12: VM Cluster

Find Components of a Vector

Lesson 2 of 12: VM Cluster

In this lesson:

  • Compute components by subtracting initial from terminal coordinates
  • Express vectors in angle-bracket notation
  • Compute magnitude from components
Grade 9+ Pre-Calculus | HSN.VM.A.2
Vector Components | Lesson 2 of 12: VM Cluster

What You Will Learn Today

By the end of this lesson, you should be able to:

  1. Find components by subtracting initial-point coordinates from terminal-point coordinates
  2. Express a vector in angle-bracket notation
  3. Interpret components as signed horizontal and vertical displacements
  4. Compute magnitude using
Grade 9+ Pre-Calculus | HSN.VM.A.2
Vector Components | Lesson 2 of 12: VM Cluster

Recall: Directed Line Segments from Lesson 1

  • Initial point: the tail of the arrow — where the vector starts
  • Terminal point: the arrowhead — where the vector ends
  • Direction: the arrow points from initial → terminal
  • Equal vectors: same length and direction, regardless of position

Can you locate the initial point, terminal point, and direction of a drawn arrow?

Grade 9+ Pre-Calculus | HSN.VM.A.2
Vector Components | Lesson 2 of 12: VM Cluster

What Two Numbers Describe This Move?

A warehouse robot receives a movement command:

"Move from shelf A(1, 3) to shelf B(4, 7)."

To program this move, the computer needs numbers — not a picture.

What two numbers describe this movement completely?

Grade 9+ Pre-Calculus | HSN.VM.A.2
Vector Components | Lesson 2 of 12: VM Cluster

Count Grid Squares, Then Use Subtraction

Coordinate grid showing arrow from A(1,3) to B(4,7) with dashed horizontal segment labeled 3 and dashed vertical segment labeled 4, showing the right-triangle decomposition of the displacement

Grade 9+ Pre-Calculus | HSN.VM.A.2
Vector Components | Lesson 2 of 12: VM Cluster

Component Formula: Terminal Minus Initial

  • — terminal minus initial
  • — terminal minus initial

Memory cue: terminal minus initial — the vector points toward terminal.

Grade 9+ Pre-Calculus | HSN.VM.A.2
Vector Components | Lesson 2 of 12: VM Cluster

Components Don't Depend on Starting Position

Two equal arrows: one from (1,3) to (4,7) and another from (2,5) to (5,9), both labeled with component <3,4>

  • From to :
  • From to :
Grade 9+ Pre-Calculus | HSN.VM.A.2
Vector Components | Lesson 2 of 12: VM Cluster

Worked Examples: Two Component Computations

Example 1: From to

Example 2: From to

Check: example 2 moved right (+) and down (−) — signs match.

Grade 9+ Pre-Calculus | HSN.VM.A.2
Vector Components | Lesson 2 of 12: VM Cluster

Check-In: Apply the Formula Yourself

Vector from to :

Apply the formula:

Check the sign of each component against the direction of travel.

Grade 9+ Pre-Calculus | HSN.VM.A.2
Vector Components | Lesson 2 of 12: VM Cluster

From Number Pair to Angle-Bracket Notation

  • Angle brackets signal: this is a displacement (vector)
  • Parentheses signal: this is a position (point)

— similar notation, completely different meanings.

Grade 9+ Pre-Calculus | HSN.VM.A.2
Vector Components | Lesson 2 of 12: VM Cluster

Reading Direction from Component Signs

  • Positive : moves right — Negative : moves left
  • Positive : moves up — Negative : moves down
  • Zero component: no movement along that axis

→ right+up; → left+down.

Grade 9+ Pre-Calculus | HSN.VM.A.2
Vector Components | Lesson 2 of 12: VM Cluster

Four Displacement Directions from Sign Patterns

Four arrows labeled with sign combinations: (+,+) northeast, (-,+) northwest, (+,-) southeast, (-,-) southwest — each with component labels

Every component pair maps to one of four displacement quadrants.

Grade 9+ Pre-Calculus | HSN.VM.A.2
Vector Components | Lesson 2 of 12: VM Cluster

When One Component Is Zero

  • : no horizontal movement — straight up, magnitude 5
  • : no vertical movement — straight left, magnitude 4
  • : no movement at all — the zero vector

When one component is zero, the vector lies along an axis.

Grade 9+ Pre-Calculus | HSN.VM.A.2
Vector Components | Lesson 2 of 12: VM Cluster

Check-In: Sketch a Component Vector

Sketch on a coordinate grid.

Describe its direction in plain words.

What quadrant of displacement does it fall in?

Grade 9+ Pre-Calculus | HSN.VM.A.2
Vector Components | Lesson 2 of 12: VM Cluster

Predict: What Happens When You Reverse Direction?

Consider the vector .

Now reverse the direction — the arrow points the opposite way.

Predict: What are the components of the reversed vector?

Commit to an answer before the next slide.

Grade 9+ Pre-Calculus | HSN.VM.A.2
Vector Components | Lesson 2 of 12: VM Cluster

Components Form a Right Triangle for Magnitude

  • Move 3 right (horizontal leg)
  • Move 4 up (vertical leg)
  • The arrow is the hypotenuse

Right triangle with horizontal leg labeled 3, vertical leg labeled 4, hypotenuse labeled |v|=5, with the vector arrow along the hypotenuse

Grade 9+ Pre-Calculus | HSN.VM.A.2
Vector Components | Lesson 2 of 12: VM Cluster

Magnitude Formula: Pythagorean Theorem Applied

By the Pythagorean theorem on the component right triangle:

Key fact: Squaring removes the sign — .

Magnitude is always — it's a length, not a displacement.

Grade 9+ Pre-Calculus | HSN.VM.A.2
Vector Components | Lesson 2 of 12: VM Cluster

Computing Magnitude: Three Worked Examples

1: (3-4-5 triple)

2: (5-12-13 triple)

3: (irrational — leave in radical form)

Grade 9+ Pre-Calculus | HSN.VM.A.2
Vector Components | Lesson 2 of 12: VM Cluster

Guided Practice: Magnitude of

Fill in the magnitude formula:

Does the negative component affect the final magnitude?

Grade 9+ Pre-Calculus | HSN.VM.A.2
Vector Components | Lesson 2 of 12: VM Cluster

Find the Displacement vs. Position Error

A student computed the following:

"Vector from to : the component form is ."

What did this student do wrong?

Write the correct component form and explain the difference.

Grade 9+ Pre-Calculus | HSN.VM.A.2
Vector Components | Lesson 2 of 12: VM Cluster

End-to-End Practice: No Scaffold Given

From to . Complete all three tasks:

  1. Write the component form
  2. State which quadrant of displacement this falls in
  3. Compute the magnitude — leave in simplified form if needed
Grade 9+ Pre-Calculus | HSN.VM.A.2
Vector Components | Lesson 2 of 12: VM Cluster

Key Takeaways: Components and Magnitude

Component formula: — terminal minus initial

Signs encode direction: positive = right/up; negative = left/down

Magnitude formula: — Pythagorean theorem on components

Position-independence: same displacement = same vector, any starting point

Grade 9+ Pre-Calculus | HSN.VM.A.2
Vector Components | Lesson 2 of 12: VM Cluster

Watch Out: Four Errors to Avoid

⚠️ Subtract terminal minus initial — reversed order flips the direction

⚠️ — angle brackets signal displacement, not position

⚠️ Hypotenuse, not sum: , not

⚠️ Squaring removes sign: has the same magnitude as

Grade 9+ Pre-Calculus | HSN.VM.A.2
Vector Components | Lesson 2 of 12: VM Cluster

Next Lesson: Adding Vectors by Components

You can now express any vector as and find its magnitude.

Next (VM.B.4): Add two vectors by adding their components:

The component form you built today is the engine for all vector arithmetic.

Grade 9+ Pre-Calculus | HSN.VM.A.2

Click to begin the narrated lesson

Find components of a vector