Vector Applications | Lesson 3 of 12: VM Cluster

Solve Problems with Vectors

Lesson 3 of 12: VM Cluster

In this lesson:

  • Represent velocity, force, and displacement as vectors
  • Find the resultant of two simultaneous velocity vectors
  • Distinguish displacement from total distance
Grade 9+ Pre-Calculus | HSN.VM.A.3
Vector Applications | Lesson 3 of 12: VM Cluster

What You Will Learn Today

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

  1. Represent velocity, force, and displacement as directed segments or component vectors
  2. Set up a vector diagram for velocity-combination problems
  3. Compute the resultant vector magnitude using the Pythagorean theorem
  4. Distinguish displacement (vector) from total distance (scalar)
Grade 9+ Pre-Calculus | HSN.VM.A.3
Vector Applications | Lesson 3 of 12: VM Cluster

Recall: Component Form from Lesson 2

  • Component vector: — horizontal and vertical displacement
  • Positive : rightward; negative : leftward
  • Positive : upward; negative : downward
  • Magnitude:

Can you read and describe the direction it points?

Grade 9+ Pre-Calculus | HSN.VM.A.3
Vector Applications | Lesson 3 of 12: VM Cluster

What Is the Ferry's Actual Velocity?

A ferry heads due east at 5 m/s.
A river current flows due south at 3 m/s.

Does the ferry actually travel due east — or somewhere else?

Think about this before you start drawing.

Grade 9+ Pre-Calculus | HSN.VM.A.3
Vector Applications | Lesson 3 of 12: VM Cluster

Drawing the Ferry and Current Vectors

Two vectors on a grid: one teal horizontal arrow labeled v = ⟨5, 0⟩ pointing right, one teal arrow labeled w = ⟨0, -3⟩ pointing down, from the same origin

  • Ferry velocity: m/s — 5 m/s east, no vertical movement
  • Current velocity: m/s — no horizontal movement, 3 m/s south
Grade 9+ Pre-Calculus | HSN.VM.A.3
Vector Applications | Lesson 3 of 12: VM Cluster

Reading Velocity into Component Form

Any velocity can be expressed as where:

  • = eastward speed (negative = westward)
  • = northward speed (negative = southward)

Example: "400 mph at 45° northeast" → mph, mph.

Grade 9+ Pre-Calculus | HSN.VM.A.3
Vector Applications | Lesson 3 of 12: VM Cluster

Ferry and Current: Labeling Each Vector

Ferry: m/s — 5 m/s east, no vertical component

Current: m/s — 3 m/s south, no horizontal component

Verify: m/s ✓; m/s ✓

Grade 9+ Pre-Calculus | HSN.VM.A.3
Vector Applications | Lesson 3 of 12: VM Cluster

Check-In: Express Velocity as Components

A plane flies 400 mph at 45° northeast.

Express the plane's velocity in component form .

Use .

Grade 9+ Pre-Calculus | HSN.VM.A.3
Vector Applications | Lesson 3 of 12: VM Cluster

Placing Vectors Head to Tail for Resultant

Tail-to-tip diagram: ferry vector v pointing east, then current vector w placed at the tip of v pointing south, then resultant r as a dashed arrow from the tail of v to the tip of w, forming a right triangle

Grade 9+ Pre-Calculus | HSN.VM.A.3
Vector Applications | Lesson 3 of 12: VM Cluster

What Happens If the Current Grows Stronger?

The current strengthens from 3 m/s to 6 m/s: m/s.

Predict: Does the resultant speed increase, decrease, or stay the same?

Commit to an answer before the next slide.

Grade 9+ Pre-Calculus | HSN.VM.A.3
Vector Applications | Lesson 3 of 12: VM Cluster

Resultant Magnitude from Perpendicular Vectors

When two velocity vectors are perpendicular, the resultant forms a right triangle:

This is the same magnitude formula from Lesson 2 — applied to velocities.

Grade 9+ Pre-Calculus | HSN.VM.A.3
Vector Applications | Lesson 3 of 12: VM Cluster

Resultant Speed Is Not the Sum of Speeds

Wrong approach: m/s ✗

Correct approach: m/s ✓

The sum of the legs (8) is always longer than the hypotenuse ().

Grade 9+ Pre-Calculus | HSN.VM.A.3
Vector Applications | Lesson 3 of 12: VM Cluster

Ferry Resultant: Full Worked Example

Given: ferry m/s; current m/s

Resultant speed:

Direction: south of east

Grade 9+ Pre-Calculus | HSN.VM.A.3
Vector Applications | Lesson 3 of 12: VM Cluster

Worked Example: Boat Crossing a River

Boat: 8 m/s due north. Current: 6 m/s due east.

Note: — the resultant is less than the scalar sum.

Grade 9+ Pre-Calculus | HSN.VM.A.3
Vector Applications | Lesson 3 of 12: VM Cluster

Check-In: Find the Resultant Speed

A swimmer crosses a river at 2 m/s perpendicular to the banks.
The current runs parallel to the banks at 1.5 m/s.

Find the swimmer's actual speed.

Draw the right triangle before applying the formula.

Grade 9+ Pre-Calculus | HSN.VM.A.3
Vector Applications | Lesson 3 of 12: VM Cluster

Force and Displacement Are Vectors Too

Beyond velocity, two more physical quantities are vectors:

  • Force — has magnitude (Newtons) and direction (angle of application)
  • Displacement — straight-line vector from start to finish; distinct from total distance traveled

Both use component form and the magnitude formula.

Grade 9+ Pre-Calculus | HSN.VM.A.3
Vector Applications | Lesson 3 of 12: VM Cluster

Force Components at an Angle

Force vector diagram: an arrow labeled 50 N at 30° above horizontal, with a dashed horizontal component labeled Fx = F·cos 30° and a dashed vertical component labeled Fy = F·sin 30°, right-angle box at corner

  • N — horizontal push
  • N — vertical lift
Grade 9+ Pre-Calculus | HSN.VM.A.3
Vector Applications | Lesson 3 of 12: VM Cluster

Displacement and Distance Are Not the Same

Path diagram: two-leg walk 4 km east then 3 km north shown as a zigzag path, with a straight diagonal arrow from start to finish labeled 'displacement = 5 km', total path labeled '4 + 3 = 7 km'

  • Distance: 4 + 3 = 7 km (how far you walked)
  • Displacement: km (how far from start)
Grade 9+ Pre-Calculus | HSN.VM.A.3
Vector Applications | Lesson 3 of 12: VM Cluster

Finding Displacement in a Three-Leg Journey

Journey: 3 km east → 4 km north → 2 km west

  • Total distance: km (scalar)
  • Net displacement: km (net x = ; net y = )
  • Magnitude: km
Grade 9+ Pre-Calculus | HSN.VM.A.3
Vector Applications | Lesson 3 of 12: VM Cluster

Find and Fix the Resultant Error

A student computed the following:

"Boat goes 8 m/s north; current is 6 m/s east. Resultant speed = 8 + 6 = 14 m/s."

What did this student do wrong?

Write the correct resultant speed and explain.

Grade 9+ Pre-Calculus | HSN.VM.A.3
Vector Applications | Lesson 3 of 12: VM Cluster

End-to-End Practice: Plane in a Crosswind

A plane flies 300 mph due north.
A crosswind blows 40 mph due west.

  1. Draw the vector diagram
  2. Find the resultant speed (to the nearest mph)
  3. Estimate the direction angle
Grade 9+ Pre-Calculus | HSN.VM.A.3
Vector Applications | Lesson 3 of 12: VM Cluster

Key Takeaways: Vectors in the Real World

Velocity, force, displacement are all vector quantities — magnitude + direction

Resultant: place vectors tail-to-tip; resultant runs from first tail to last tip

Perpendicular resultant: — not

Displacement ≠ distance: displacement is the straight-line start-to-end vector

Grade 9+ Pre-Calculus | HSN.VM.A.3
Vector Applications | Lesson 3 of 12: VM Cluster

Next Lesson: Adding Vectors Algebraically

You combined velocity vectors geometrically (tail-to-tip) and computed resultants.

Next (VM.B.4): Add vectors algebraically — component by component:

The geometry you built today is the foundation for the algebra ahead.

Grade 9+ Pre-Calculus | HSN.VM.A.3

Click to begin the narrated lesson

Solve problems with vectors