BackFundamental Quantities, Units, and Vectors in Mechanics
Study Guide - Smart Notes
Tailored notes based on your materials, expanded with key definitions, examples, and context.
Preliminaries
Course Introduction
This course, University Physics I - Mechanics, introduces the foundational concepts of classical mechanics, focusing on motion and the forces that cause or change motion. The course is taught by Assoc. Prof. Nicholas Matlis, Department of Physics.
Attendance: Mandatory; arriving late may result in being marked absent.
Participation: Mandatory; students are encouraged to take notes and ask questions.
Cheating: Strictly prohibited on homework and exams; may result in failing the class or expulsion.
What is Mechanics?
Definition and Key Concepts
Mechanics is a branch of physics that studies motion and the forces that cause or change motion. It is divided into several key areas:
Motion (Kinematics): Describes how objects move in 1D and 2D (e.g., free fall, projectile motion).
Position, displacement, velocity, and speed are fundamental terms.
Mass and Inertia: Explains why objects resist changes in motion.
Forces and Interactions (Dynamics): Explains why motion changes, including Newton's Laws, friction, and resistance.
Energy & Momentum: Powerful tools for analyzing motion, especially in interactions or collisions.
Types: Kinetic, potential, gravitational, elastic, work.
Rotational Motion: Extends mechanics to spinning objects, including angular position, velocity, and acceleration.
Equilibrium and Statics: Deals with objects at rest or moving at constant velocity, focusing on stability and balance.
Fundamental Quantities and Units
SI Units and Measurement
Physical quantities are measured using standardized units. The International System of Units (SI) is used in physics:
Fundamental Quantity | Base unit (SI) | Unit abbreviation |
|---|---|---|
length | meter | m |
time | second | s |
mass | kilogram | kg |
Quantities are described by a value and a unit of measurement, e.g., 2 m, 7.14 s, 3.5 kg.
Scalar & Vector Quantities
Definitions and Examples
Scalar quantity: Has only magnitude (numerical value with units).
Examples: Time (s), mass (kg), energy (J).
Vector quantity: Has both magnitude and direction in space.
Examples: Velocity (m/s, direction), acceleration (m/s2, direction), force (N, direction).
Vector Representation
Graphical Representation
A vector is represented by an arrow.
Magnitude: Length of the arrow (always positive).
Direction: Counterclockwise angle, , from the positive x-axis.
Vectors in Everyday Life
Applications
Vectors are used to describe directions and distances, such as giving directions for a flying car from an airport to a university.
Example: From PHX to ASU, distance = 2.5 miles, direction = E by SE.
Adding and Subtracting Vectors
Graphical Methods
Adding vectors: Place vectors head-to-tail or use the parallelogram method.
Subtracting vectors: Equivalent to adding the negative of a vector.
Multiplying a Vector by a Scalar
Effects of Scalar Multiplication
Positive scalar: Preserves direction, changes magnitude.
is twice as long as .
Negative scalar: Changes direction, changes magnitude.
is three times as long as and points in the opposite direction.
Unit Vectors
Definition and Use
A unit vector has magnitude 1 and no units, pointing in the positive direction of a given axis.
In Cartesian coordinates:
points in the +x direction
points in the +y direction
points in the +z direction
Components of Vectors
Vector and Scalar Components
Vector component: Projection of a vector along a chosen axis.
and are the vector components of .
Expressed in terms of unit vectors:
Scalar components: and (just the magnitudes).
Unit vector notation:
Vector Components in Everyday Life
Practical Example
Describing a route using vector components, e.g., from PHX to ASU: blocks block .
Components can be Positive or Negative
Quadrant Analysis
Depending on the direction, vector components can be positive or negative.
For example, in different quadrants, and may change sign.
Vector Addition by Components
Mathematical Approach
Vectors can be added by summing their components:
The magnitude and direction of the resultant vector can be found using:
Vector-Component Relationship
Right Triangle Relationship
In the xy-coordinate system, vector and its components form a right triangle.
Worked Example: Vector Addition
Hiker Problem
A hiker walks 2.50 km at 45.0° southeast, then 4.00 km at 60.0° north of east. Find the total displacement from the car.
Solution Steps:
Draw and find the x and y components of vector .
Draw and find the x and y components of vector .
Find the x and y components of .
Draw the vector in the coordinate system based on the components found in step 3.
Use Pythagorean theorem and trigonometry to find the magnitude and direction of .
Summary
This guide covers the foundational concepts of units, physical quantities, and vectors in mechanics, including their representation, addition, subtraction, and practical applications. These principles are essential for understanding motion and forces in physics.
