Scalar and Vector Quantities | Physics

📖 In-Depth Theory

Scalars and Vectors

SCALAR quantities have MAGNITUDE (size) only.

VECTOR quantities have both MAGNITUDE and DIRECTION.

SCALARS:

Distance, speed, mass, time, temperature, energy, power, pressure.

VECTORS:

Displacement, velocity, force, acceleration, momentum, weight.

Why direction matters:

A force of 10 N to the right and 10 N to the left cancel out — net force is zero.

If force were scalar (no direction), you couldn't distinguish these.

VECTOR REPRESENTATION:

An arrow represents a vector.

Length of arrow ∝ magnitude.

Direction of arrow = direction of the quantity.

Distinguishing Common Pairs

Several pairs are commonly confused:

DISTANCE vs DISPLACEMENT:

Distance: total path length travelled — scalar.

Displacement: straight-line distance from start to finish, with direction — vector.

Example: walking 3 m east then 3 m west → distance = 6 m; displacement = 0 m.

SPEED vs VELOCITY:

Speed: how fast — scalar (magnitude only).

Velocity: speed in a specified direction — vector.

Example: car at 30 m/s — speed = 30 m/s. Velocity = 30 m/s north.

MASS vs WEIGHT:

Mass: amount of matter — scalar (kg).

Weight: gravitational force — vector (N, acts downward).

Adding Vectors

When adding SCALAR quantities: simple arithmetic.

3 kg + 5 kg = 8 kg (always).

When adding VECTOR quantities: direction matters.

Two forces in the SAME direction: add magnitudes.

10 N + 5 N (both right) = 15 N right.

Two forces in OPPOSITE directions: subtract smaller from larger.

10 N right + 5 N left = 5 N right (resultant).

Two forces at RIGHT ANGLES: use Pythagoras.

Resultant² = F₁² + F₂²

3 N up + 4 N right → resultant = √(9 + 16) = 5 N (at an angle).

Scale drawings can also be used to find the resultant of vectors at any angle.

⚠️ Common Mistake

SPEED is scalar, VELOCITY is vector. DISTANCE is scalar, DISPLACEMENT is vector. The most common error is treating velocity and speed as the same thing. A car travelling in a circle at constant SPEED has changing VELOCITY (direction changes).

📐 Key Equations

Resultant² = F₁² + F₂² (for perpendicular vectors)

📌 Key Note

Scalar: magnitude only (distance, speed, mass, energy). Vector: magnitude + direction (displacement, velocity, force, acceleration, weight). Arrow length = magnitude; direction = vector direction. Adding vectors: same direction = add; opposite = subtract; right angles = Pythagoras.

🎯 Matching Activity — Scalar or Vector?

Sort each quantity into scalar or vector. — drag the symbols on the right to match the component names on the left.

Scalar

Drop here

Vector

Drop here

Scalar

Drop here

Vector

Drop here

Vector

Drop here

Displacement — straight-line distance from start, with direction

Velocity — speed in a specified direction

Distance — total path length, no direction

Speed — magnitude of motion with no direction

Force — magnitude and direction (e.g. 10 N downward)

🎯 Test Yourself

Question 1 of 2

1. A runner completes one full lap of a 400 m circular track. What is the runner's distance and displacement?

2. Two forces act on a box: 8 N to the right and 3 N to the left. What is the resultant force?

⭐ How Well Do You Understand This Topic?

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⚡ Scalar and Vector Quantities

Scalars and Vectors

Distinguishing Common Pairs

Adding Vectors

Mr. Badmus AI