Electrostatics and magnetostatics suspended over an infinite sheet of conducting material. The field is depicted by
electric field lines, lines which follow the direction of the electric field in space. The Maxwell equations simplify when the charge density at each point in space does not change over time and all electric currents likewise remain constant. All of the time derivatives vanish from the equations, leaving two expressions that involve the electric field, \nabla \cdot \mathbf{E} = \frac{\rho}{\epsilon_0} and \nabla\times\mathbf{E} = 0, along with two formulae that involve the magnetic field: \nabla \cdot \mathbf{B} = 0 and \nabla \times \mathbf{B} = \mu_0 \mathbf{J}. These expressions are the basic equations of
electrostatics, which focuses on situations where electrical charges do not move, and
magnetostatics, the corresponding area of magnetic phenomena.
Transformations of electromagnetic fields Whether a physical effect is attributable to an electric field or to a magnetic field is dependent upon the observer, in a way that
special relativity makes mathematically precise. For example, suppose that a laboratory contains a long straight wire that carries an electrical current. In the frame of reference where the laboratory is at rest, the wire is motionless and electrically neutral: the current, composed of negatively charged electrons, moves against a background of positively charged ions, and the densities of positive and negative charges cancel each other out. A test charge near the wire would feel no electrical force from the wire. However, if the test charge is in motion parallel to the current, the situation changes. In the rest frame of the test charge, the positive and negative charges in the wire are moving at different speeds, and so the positive and negative charge distributions are
Lorentz-contracted by different amounts. Consequently, the wire has a nonzero net charge density, and the test charge must experience a nonzero electric field and thus a nonzero force. In the rest frame of the laboratory, there is no electric field to explain the test charge being pulled towards or pushed away from the wire. So, an observer in the laboratory rest frame concludes that a field must be present. In general, a situation that one observer describes using only an electric field will be described by an observer in a different inertial frame using a combination of electric and magnetic fields. Analogously, a phenomenon that one observer describes using only a magnetic field will be, in a relatively moving reference frame, described by a combination of fields. The rules for relating the fields required in different reference frames are the
Lorentz transformations of the fields. Thus, electrostatics and magnetostatics are now seen as studies of the static EM field when a particular frame has been selected to suppress the other type of field, and since an EM field with both electric and magnetic will appear in any other frame, these "simpler" effects are merely a consequence of different frames of measurement. The fact that the two field variations can be reproduced just by changing the motion of the observer is further evidence that there is only a single actual field involved which is simply being observed differently.
Reciprocal behavior of electric and magnetic fields The two Maxwell equations, Faraday's Law and the Ampère–Maxwell Law, illustrate a very practical feature of the electromagnetic field. Faraday's Law may be stated roughly as "a changing magnetic field inside a loop creates an electric voltage around the loop". This is the principle behind the
electric generator. Ampere's Law roughly states that "an electrical current around a loop creates a magnetic field through the loop". Thus, this law can be applied to generate a magnetic field and run an
electric motor.
Behavior of the fields in the absence of charges or currents electromagnetic
plane wave propagating parallel to the z-axis is a possible solution for the
electromagnetic wave equations in
free space. The
electric field, , and the
magnetic field, , are perpendicular to each other and the direction of propagation.|400x200px
Maxwell's equations can be combined to derive
wave equations. The solutions of these equations take the form of an
electromagnetic wave. In a volume of space not containing charges or currents (
free space) – that is, where \rho and are zero, the electric and magnetic fields satisfy these
electromagnetic wave equations: : \left( \nabla^2 - { 1 \over {c}^2 } {\partial^2 \over \partial t^2} \right) \mathbf{E} \ \ = \ \ 0 : \left( \nabla^2 - { 1 \over {c}^2 } {\partial^2 \over \partial t^2} \right) \mathbf{B} \ \ = \ \ 0
James Clerk Maxwell was the first to obtain this relationship by his completion of Maxwell's equations with the addition of a
displacement current term to
Ampere's circuital law. This unified the physical understanding of electricity, magnetism, and light: visible light is but one portion of the full range of electromagnetic waves, the
electromagnetic spectrum.
Time-varying EM fields in Maxwell's equations An electromagnetic field very far from currents and charges (sources) is called
electromagnetic radiation (EMR) since it radiates from the charges and currents in the source. Such radiation can occur across a wide range of frequencies called the
electromagnetic spectrum, including
radio waves,
microwave,
infrared,
visible light,
ultraviolet light,
X-rays, and
gamma rays. The many commercial applications of these radiations are discussed in the named and linked articles. A notable application of visible light is that this type of energy from the Sun powers all life on Earth that either makes or uses oxygen. A changing electromagnetic field which is physically close to currents and charges (see
near and far field for a definition of "close") will have a
dipole characteristic that is dominated by either a changing
electric dipole, or a changing
magnetic dipole. This type of dipole field near sources is called an electromagnetic
near-field. Changing dipole fields, as such, are used commercially as near-fields mainly as a source of
dielectric heating. Otherwise, they appear parasitically around conductors which absorb EMR, and around antennas which have the purpose of generating EMR at greater distances. Changing dipole fields (i.e., magnetic near-fields) are used commercially for many types of
magnetic induction devices. These include motors and electrical transformers at low frequencies, and devices such as
RFID tags,
metal detectors, and
MRI scanner coils at higher frequencies. == Health and safety ==