Integration Techniques for Magnetic Field: Difference between revisions

In the study of magnetic fields, many formulas for the magnetic field of different objects are derived by integrating the magnetic field of a small portion of the object over the entire area of the object. Often times, you will also be expected to derive your own formulas for less common shapes.

The Main Idea

All integration for magnetic fields is based on the Biot-Savart Law for currents, which is . First, you will take a small portion of the object and call its position Δl. Then find the unit vector from this point to the observation location. Then, take the cross-product of these two vectors and you should end up with a vector that only exists in one dimension (x, y, or z). Now set up your integral by first taking out all the constants from the equation and putting them outside the integral. This should be your mu(naught)/4(pi) and your current. Inside the integral, keep the cross product of the two vectors over r^2, as those are the values that can change during integration. Then set up your limits of integration by going over the full area/length of the object. For example, if you have a rod, integrate over the length of the rod. If you have a loop, integrate from 0 to 2(pi) for the full area of the loop.

Mathematical Model

and then

Example

Simple

Connection

Calculus was invented to do physics. By integrating over an object to find its magnetic field, you are performing one of the basic operations on which physics is founded on, which is used to derive other formulas. Additionally, using this method should allow you to find the magnetic field of any object, no matter its shape or size.