Table of Contents
Course Overview
The Static Fields Paradigm uses the contexts of electrostatics and magnetostatics to teach a variety of fundamental physics principles.
Course Goals
These are the combined goals from the Symmetries and Vector Fields 3-week Paradigms
- For students to develop conceptual and geometric understandings of gravitational and electrostatic potentials and fields, including geometric understanding of vector and scalar fields.
- For students to compute potentials and fields from distributions of sources, to calculate fields from potentials, and to calculate changes in potential from a field using vector calculus.
- For students to be able to move between algebraic and diagrammatic representations of these fields, including the use of computer visualization tools (e.g., Mathematica).
- For students to learn how to calculate potentials and fields due to both discrete and continuous distributions, and to be able to handle non-uniform densities.
- For students to consider symmetry in making calculations and as part of sense-making activities.
- To develop the mathematical tools needed to make these computations, including vector algebra, dot products, cross products, gradient, line integrals, and power series expansions (especially using power series expansions to make approximations).
- For students to develop skills for communicating their physics ideas with verbal and mathematical language (group work, class presentations, writing assignments).
- For students to build conceptual and geometric understanding of current density, magnetic field, and magnetic vector potential and a formal understanding of the relationships between them (using vector calculus)
- For students to understand divergence and curl - formally and geometrically - and the Divergence Theorem and Stoke's Theorem formally and geometrically
- To derive the differential form of Maxwell's equations from the integral form and for students to have link their conceptual understanding with the formalism of Maxwell's equations
- For students to understand Gauss' Law and Ampere's Law and how to make explicit symmetry arguments.
- For students to understand the continuity of electric and magnetic fields across charge/current boundaries.
- For students to understand how energy is stored in electric and magnetic fields, and be able to calculate the energy from sources, fields and potentials.
- For students to come to understand that sources, fields, and potentials are different constructs that address the same phenomena, but are useful in different ways.
Sample Syllabus
Course Content
Unit: Potentials from Discrete Sources
Some nice review tutorials from Harvey Mudd College
- Hour 1: Electric Potential
- QUIZ
- Coulomb's Law
- Hours 2-3: Potential Due to Point Charges
- Superposition
- Small Group Activity: Visualizing Equipotential Surfaces
- Equipotential surfaces
- Hour 4: Power Series This hour is likely to move to Energy and Entropy in the future.
- Power Series Approximations
- Small Group Activity: Calculating Coefficients for a Power Series
- Properties of Power Series
- Hour 5: The Distance between Two Points
- Vectors
- Kinesthetic Activity: Star Trek
- Dot Products
- Hour 6: Two Point Charges
- Dipoles
- Small Group Activity: Electric Potential for 2 Point Charges (with Power Series)
- Hour 7: Differential Vector Elements Math Bits??
- The Position Vector
- The dr Vector
- Small Group Activity: Vector Differentials
Unit: Continuous Charge Distributions
- Hour 8: Line Integrals Math Bits??
- QUIZ
- Line Integrals
- Small Group Activity: Boysenberry Patch
- Hours 9-10: Integrating Charge Densities Math Bits??
- Charge Density
- Kinesthetic Activity: Acting Out Charge Densities
- Cross Product
- Small Group Activity: Finding dA and dV
- Total Charge
- Small Group Activity: Total Charge
Unit: Potentials Due to Continuous Distributions
- Hours 11-12: Calculating Potentials
- Find the surface area of a cone
- SQBQ write $d\vec r$ in 3 different coordinate systems
- —— Old ——
- Potential Integrals
- Small Group Activity: The Ring 1 (V)
- Approximating Integrals with Power Series
- Potential Due to Finite and Infinite Lines
- Hours 13-14: Superposition of Electric Fields
- Electric Field Vectors
- Small Group Activity: The Ring 2 (E)
Unit: Derivatives of Fields
- Hour 15-16: Gradient Math Bits??
- QUIZ
- The Gradient
- Surfaces Activity: The Hillside
- Small Group Activity: Navigating a Hill
- Kinesthetic Activity: Acting out the Gradient
- Directional Derivatives (Optional)
- Electric Field as Gradient
- Hour 17: Flux
- Electric Flux
- Kinesthetic Activity: The Concept of Flux
- Small Group Activity: Calculating Flux
- Mathematica Activity: Visualizing Electric Flux
- Hour 18: Divergence Math Bits??
- The Divergence
- Small Group Activity: Visualizing Divergence
- The Divergence Theorem
- Gauss's Law (Differential Form)
- Hours 19-20: Gauss's Law
- Gauss's Law (Integral Form)
- Small Group Activity: Using Gauss's Law
- Hours 21-22: Conservative Fields
- What Fields Are Conservative?
- Small Group Activity: Counting Paths
- Vector line integrals
- QUIZ
- Relating Work to Potential
- Small Group Activity: Work
- Finding Potentials from Fields
- Small Group Activity: The Murder Mystery Method
Unit: Laplace's Equation
- Hours 23-25: Solving Laplace's Equation
- Second Derivatives
- The Laplacian
- Conductors
- Separation of Variables
- Small Group Activity: Boundary Value Problem (New activity)
- Computer Activity: Relaxation Technique (Optional/Computation course)
Unit: Electrostatic Energy
- Hour 26: Energy
- Electrostatic Energy
- Kinesthetic Activity: Energy of Discrete Charges
Unit: Current, Magnetic Vector Potential, and Magnetic Field
- Hour 27: Curl Math Bits??
- The Curl as Circulation
- Small Group Activity: Visualizing Curl
- The Curl in Curvilinear Coordinates
- Hour 28: Current
- Electric Current
- Current Density
- Kinesthetic Activity: Acting Out Current Density
- Hours 29-30: Vector Potentials
- QUIZ
- What Is Vector Potential?
- Small Group Activity: The Ring 3 (A)
- Hours 31-32: Magnetic Fields
- The Biot-Savart Law
- Small Group Activity: The Ring 4 (B)
Unit: Ampère's Law
- Hour 33: Ampère's Law
- Symmetry Arguments
- Small Group Activity: Ampère's Law
- Hour 34: Stokes' Theorem
- Curl Revisited
- Stokes' Theorem
- Small Group Activity: Where Is the Current? We need a new activity
- Hour 35: Review
Related Topics Not Currently Included
Unit: Conductors
Step & Delta Functions (1 hr)
Note that this is now covered in Waves and Oscillations, and also in Periodic Systems
- Reading: GVC § Step Functions–The Dirac Delta Function and Densities
- Step Functions
- Delta Functions
Boundary Conditions
These feel like they go really well early in the Capstone to set up E and B fields in matter.
Product Rules
- Reading: GVC § Product Rules–Integration by Parts
- Product Rules (lecture)
- Integration by Parts (lecture)
Energy for Continuous Distributions
- Energy for Continuous Distributions (lecture)
