10.2: Induced Emf and Magnetic Flux
Learning Objectives
By the end of this section, you will be able to:
- Calculate the flux of a uniform magnetic field through a loop of arbitrary orientation.
- Describe methods to produce an electromotive force (emf) with a magnetic field or magnet and a loop of wire.
The apparatus used by Faraday to demonstrate that magnetic fields can create currents is illustrated in Figure \(\PageIndex{1}\). When the switch is closed, a magnetic field is produced in the coil on the top part of the iron ring and transmitted to the coil on the bottom part of the ring. The galvanometer is used to detect any current induced in the coil on the bottom. It was found that each time the switch is closed, the galvanometer detects a current in one direction in the coil on the bottom. (You can also observe this in a physics lab.) Each time the switch is opened, the galvanometer detects a current in the opposite direction. Interestingly, if the switch remains closed or open for any length of time, there is no current through the galvanometer. Closing and opening the switch induces the current. It is the change in magnetic field that creates the current. More basic than the current that flows is the emf that causes it. The current is a result of an emf induced by a changing magnetic field , whether or not there is a path for current to flow.
An experiment easily performed and often done in physics labs is illustrated in Figure \(\PageIndex{2}\). An emf is induced in the coil when a bar magnet is pushed in and out of it. Emfs of opposite signs are produced by motion in opposite directions, and the emfs are also reversed by reversing poles. The same results are produced if the coil is moved rather than the magnet—it is the relative motion that is important. The faster the motion, the greater the emf, and there is no emf when the magnet is stationary relative to the coil.
The method of inducing an emf used in most electric generators is shown in Figure \(\PageIndex{3}\). A coil is rotated in a magnetic field, producing an alternating current emf, which depends on rotation rate and other factors that will be explored in later sections. Note that the generator is remarkably similar in construction to a motor (another symmetry).
So we see that changing the magnitude or direction of a magnetic field produces an emf. Experiments revealed that there is a crucial quantity called the magnetic flux , \(\Phi\), given by
\[\Phi = B{\perp}A,\label{23.2.1}\]
where \(B\) is the magnetic field strength over an area \(A\), at an angle \(\theta\) with the perpendicular to the area as shown in Figure \(\PageIndex{4}\).
Any change in magnetic flux \(\Phi\) induces an emf. This process is defined to be electromagnetic induction . Units of magnetic flux \(\Phi\) are \(T \cdot m^{2}\). As seen in Figure 4, B_{\perp}\) is the component of \(B\) perpendicular to the area \(A\). Thus magnetic flux is \(\Phi = B_{\perp}A\), the product of the area and the component of the magnetic field perpendicular to it.
All induction, including the examples given so far, arises from some change in magnetic flux \(\Phi\). For example, Faraday changed \(B\) and hence \(\Phi\) when opening and closing the switch in his apparatus (shown in Figure \(\PageIndex{1}\)). This is also true for the bar magnet and coil shown in Figure \(\PageIndex{2}\). When rotating the coil of a generator, the angle \(\theta\) and, hence, \(\Phi\) is changed. Just how great an emf and what direction it takes depend on the change in \(\Phi\) and how rapidly the change is made, as examined in the next section.
Summary
- The crucial quantity in induction is magnetic flux \(\Phi\), defined to be \(\Phi = B{\perp}A \), where \(B\) is the magnetic field strength over an area \(A\) at an angle \(\theta\) with the perpendicular to the area.
- Units of the magnetic flux \(\Phi\) are \(T \cdot m^{2}\).
- Any change in magnetic flux \(\Phi\) induces an emf—the process is defined to be electromagnetic induction.
Glossary
- magnetic flux
- the amount of magnetic field going through a particular area, calculated with \(Φ=BAcosθ\) where \(B\) is the magnetic field strength over an area \(A\) at an angle \(θ\) with the perpendicular to the area
- electromagnetic induction
- the process of inducing an emf (voltage) with a change in magnetic flux
Contributors and Attributions
-
Paul Peter Urone (Professor Emeritus at California State University, Sacramento) and Roger Hinrichs (State University of New York, College at Oswego) with Contributing Authors: Kim Dirks (University of Auckland) and Manjula Sharma (University of Sydney). This work is licensed by OpenStax University Physics under a Creative Commons Attribution License (by 4.0) .