magnetic field
... encounters a magnetic field whose magnitude is 0.40 T and whose direction makes an angle of 30.0 degrees with respect to the proton’s velocity (see part (c) of the figure). Find (a) the magnitude and direction of the force on the proton and (b) the acceleration of the proton. (c) What would be the f ...
... encounters a magnetic field whose magnitude is 0.40 T and whose direction makes an angle of 30.0 degrees with respect to the proton’s velocity (see part (c) of the figure). Find (a) the magnitude and direction of the force on the proton and (b) the acceleration of the proton. (c) What would be the f ...
Exploring Magnetic Fields with a Compass
... For the magnetic field equation of a loop of wire, the current in the wire and the area of the loop are the only two intrinsic properties of the loop itself. Their product, IA, is defined as the magnetic dipole moment, m. By analogy, the magnetic field of a bar magnet can be expressed as: ...
... For the magnetic field equation of a loop of wire, the current in the wire and the area of the loop are the only two intrinsic properties of the loop itself. Their product, IA, is defined as the magnetic dipole moment, m. By analogy, the magnetic field of a bar magnet can be expressed as: ...
An introduction of the local displacements of mass and electric
... (ii) the vector of density of the mass displacement π m = 5m /ρ and the gradient of µ0π . These parameters are related to the local displacement of the mass. Such an extension of the state parameters space allows one to describe near-surface inhomogeneity of the stress-strained state and electrical ...
... (ii) the vector of density of the mass displacement π m = 5m /ρ and the gradient of µ0π . These parameters are related to the local displacement of the mass. Such an extension of the state parameters space allows one to describe near-surface inhomogeneity of the stress-strained state and electrical ...
Dielectric Materials and Polarization Chapter 6
... uniform, the number of atomic dipoles per unit volume is constant and, as can be seen in the sketch, the effects of all the charges cancel out (except at boundary, which we examine separately). ...
... uniform, the number of atomic dipoles per unit volume is constant and, as can be seen in the sketch, the effects of all the charges cancel out (except at boundary, which we examine separately). ...
Physics 1252 Exam #2B Instructions:
... formula sheet, any scientific calculator, and a ruler. Do not write on your formula sheet, except for your name: it must be handed in, signed but clean, with your exam. There is space after each question to show your work; if you need more space, you may use the back of the page, or request more pap ...
... formula sheet, any scientific calculator, and a ruler. Do not write on your formula sheet, except for your name: it must be handed in, signed but clean, with your exam. There is space after each question to show your work; if you need more space, you may use the back of the page, or request more pap ...
Electrical Energy, Potential and Capacitance
... constant associated with it. Here now you can reduce the AREA and use a LARGE dielectric to establish the capacitance at 1 F. ...
... constant associated with it. Here now you can reduce the AREA and use a LARGE dielectric to establish the capacitance at 1 F. ...
Chapter 29
... Earth’s Magnetic Poles More proper terminology would be that a magnet has “north-seeking” and “southseeking” poles. The north-seeking pole points to the north geographic pole. This would correspond to the Earth’s south magnetic pole. The south-seeking pole points to the south geographic pole. T ...
... Earth’s Magnetic Poles More proper terminology would be that a magnet has “north-seeking” and “southseeking” poles. The north-seeking pole points to the north geographic pole. This would correspond to the Earth’s south magnetic pole. The south-seeking pole points to the south geographic pole. T ...
Field (physics)
In physics, a field is a physical quantity that has a value for each point in space and time. For example, on a weather map, the surface wind velocity is described by assigning a vector to each point on a map. Each vector represents the speed and direction of the movement of air at that point. As another example, an electric field can be thought of as a ""condition in space"" emanating from an electric charge and extending throughout the whole of space. When a test electric charge is placed in this electric field, the particle accelerates due to a force. Physicists have found the notion of a field to be of such practical utility for the analysis of forces that they have come to think of a force as due to a field.In the modern framework of the quantum theory of fields, even without referring to a test particle, a field occupies space, contains energy, and its presence eliminates a true vacuum. This lead physicists to consider electromagnetic fields to be a physical entity, making the field concept a supporting paradigm of the edifice of modern physics. ""The fact that the electromagnetic field can possess momentum and energy makes it very real... a particle makes a field, and a field acts on another particle, and the field has such familiar properties as energy content and momentum, just as particles can have"". In practice, the strength of most fields has been found to diminish with distance to the point of being undetectable. For instance the strength of many relevant classical fields, such as the gravitational field in Newton's theory of gravity or the electrostatic field in classical electromagnetism, is inversely proportional to the square of the distance from the source (i.e. they follow the Gauss's law). One consequence is that the Earth's gravitational field quickly becomes undetectable on cosmic scales.A field can be classified as a scalar field, a vector field, a spinor field or a tensor field according to whether the represented physical quantity is a scalar, a vector, a spinor or a tensor, respectively. A field has a unique tensorial character in every point where it is defined: i.e. a field cannot be a scalar field somewhere and a vector field somewhere else. For example, the Newtonian gravitational field is a vector field: specifying its value at a point in spacetime requires three numbers, the components of the gravitational field vector at that point. Moreover, within each category (scalar, vector, tensor), a field can be either a classical field or a quantum field, depending on whether it is characterized by numbers or quantum operators respectively. In fact in this theory an equivalent representation of field is a field particle, namely a boson.