Magnetism Magnets and Magnetic Fields.  Magnets  The existence of magnets and magnetic fields has been known for more than 2000 years  Chinese sailors.

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Presentation transcript:

Magnetism Magnets and Magnetic Fields

 Magnets  The existence of magnets and magnetic fields has been known for more than 2000 years  Chinese sailors employed magnets as navigational compasses approximately 900 years ago  Throughout the world, early scientists studied magnetic rocks, called lodestones  Today, magnets play an increasingly important role in our everyday lives  Electric generators, simple electric motors, television sets, cathode-ray displays, tape recorders, and computer hard drives all depend on the magnetic effects of electric currents Magnets

 Magnetic Fields Around Permanent Magnets  When you experimented with two magnets, you noticed that the forces between them, both attraction and repulsion, occur not only when the magnets touch each other, but also when they are held apart Magnets

 Magnetic Fields Around Permanent Magnets  In the same way that long-range electric and gravitational forces can be described by electric and gravitational fields, magnetic forces can be described by the existence of fields around magnets  These magnetic fields are vector quantities that exist in a region in space where a magnetic force occurs Magnets

 Magnetic Fields Around Permanent Magnets  The presence of a magnetic field around a magnet can be shown using iron filings  Each long, thin, iron filing becomes a small magnet by induction. Just like a tiny compass needle, the iron filing rotates until it is parallel to the magnetic field  The three-dimensional shape of the field is visible Magnets

 Magnetic Fields Around Permanent Magnets  In the adjoining figure, the filings make up a two-dimensional plot of the field, which can help you visualize magnetic field lines Magnets

 Magnetic Fields Around Permanent Magnets  Note that magnetic field lines, like electric field lines, are imaginary  They are used to help us visualize a field, and they also provide a measure of the strength of the magnetic field  The number of magnetic field lines passing through a surface is called the magnetic flux  The flux per unit area is proportional to the strength of the magnetic field  The magnetic flux is most concentrated at the poles; thus, this is where the magnetic field strength is the greatest Magnets

 Magnetic Fields Around Permanent Magnets  The direction of a magnetic field line is defined as the direction in which the north pole of a compass points when it is placed in the magnetic field Magnets

 Magnetic Fields Around Permanent Magnets  Outside the magnet, the field lines emerge from the magnet at its north pole and enter the magnet at its south pole, as illustrated below Magnets

 Magnetic Fields Around Permanent Magnets  Inside the magnet, there are no isolated poles on which field lines can start or stop, so magnetic field lines always travel inside the magnet from the south pole to the north pole to form closed loops Magnets

 Magnetic Fields Around Permanent Magnets  Magnetic fields exert forces on other magnets  The field produced by the north pole of one magnet pushes the north pole of a second magnet away in the direction of the field line  The force exerted by the same field on the south pole of the second magnet is attractive in a direction opposite the field lines  The second magnet attempts to line up with the field, just like a compass needle Magnets

 Electromagnetism  In 1820, Danish physicist Hans Christian Oersted was experimenting with electric currents in wires  Oersted laid a wire across the top of a small compass and connected the ends of the wire to complete an electrical circuit, as shown Magnets

 Electromagnetism  He had expected the needle to point toward the wire or in the same direction as the current in the wire  Instead, Oersted was amazed to see that the needle rotated until it pointed perpendicular to the wire, as shown in the figure Magnets

 Electromagnetism  The forces on the compass magnet’s poles were perpendicular to the direction of current in the wire  Oersted also found that when there was no current in the wire, no magnetic forces existed Magnets

 Electromagnetism  If a compass needle turns when placed near a wire carrying an electric current, it must be the result of a magnetic field created by the current  The strength of the magnetic field around a long, straight wire is proportional to the current in the wire Magnets

 Electromagnetism  The strength of the field also varies inversely with the distance from the wire  A compass shows the direction of the field lines  If you reverse the direction of the current, the compass needle also reverses its direction, as shown in the figure Magnets

 Electromagnetism Magnets

 Forces on Currents in Magnetic Fields  Because a magnetic field exerts forces on permanent magnets, Ampère hypothesized that there is also a force on a current-carrying wire when it is placed in a magnetic field  The force on a wire in a magnetic field can be demonstrated using the arrangement shown Magnets

 Forces on Currents in Magnetic Fields  When there is a current in the wire, a force is exerted on the wire  Depending on the direction of the current, the force on the wire can push it down, as shown in the figure Magnets

 Forces on Currents in Magnetic Fields  The force on the wire can also pull it up, as shown in the figure  Michael Faraday discovered that the force on the wire is at right angles to both the direction of the magnetic field and the direction of the current Magnets

 Forces on Currents in Magnetic Fields Magnets

 Forces on Currents in Magnetic Fields  Soon after Oersted announced his discovery that the direction of the magnetic field in a wire is perpendicular to the flow of electric current in the wire, Ampère was able to demonstrate the forces that current- carrying wires exert on each other Magnets

 Forces on Currents in Magnetic Fields  By applying the third right-hand rule to either wire, you can show why the wires attract each other  When currents are in opposite directions, the wires have a repulsive force between them Magnets

 Forces on Currents in Magnetic Fields  It is possible to determine the force of magnetism exerted on a current- carrying wire passing through a magnetic field at right angles to the wire  Experiments show that the magnitude of the force, F, on the wire, is proportional to the strength of the field, B, the current, I, in the wire, and the length, L, of the wire in the magnetic field Magnets

 Forces on Currents in Magnetic Fields  The force on a current-carrying wire in a magnetic field is equal to the product of magnetic field strength, the current, and the length of the wire Magnets Force on a Current-Carrying Wire in a Magnetic Field F = ILB

 Forces on Currents in Magnetic Fields  The strength of a magnetic field, B, is measured in teslas, T. 1 T is equivalent to 1 N/A·m  Note that if the wire is not perpendicular to the magnetic field, a factor of sin θ is introduced in the above equation, resulting in F = ILB sin θ  As the wire becomes parallel to the magnetic field, the angle θ becomes zero, and the force is reduced to zero. When θ = 90°, the equation is again F = ILB Magnets

 The Force on a Single Charged Particle  Charged particles do not have to be confined to a wire, but can move across any region as long as the air has been removed to prevent collisions with air particles Magnets

 The Force on a Single Charged Particle  A picture tube, also called a cathode-ray tube, in a computer monitor or television set uses electrons deflected by magnetic fields to form the pictures on the screen Magnets

 The Force on a Single Charged Particle  Electric fields pull electrons off atoms in the negative electrode, or cathode  Other electric fields gather, accelerate, and focus the electrons into a narrow beam  Magnetic fields control the motion of the beam back-and-forth and up- and-down across the screen  The screen is coated with a phosphor that glows when it is struck by the electrons, thereby producing the picture Magnets

 The Force on a Single Charged Particle  The force produced by a magnetic field on a single electron depends on the velocity of the electron, the strength of the field, and the angle between directions of the velocity and the field  Consider a single electron moving in a wire of length L. The electron is moving perpendicular to the magnetic field Magnets

 The Force on a Single Charged Particle  The current, I, is equal to the charge per unit time entering the wire, I = q/t  In this case, q is the charge of the electron and t is the time it takes to move the distance, L Magnets

 The Force on a Single Charged Particle  The time required for a particle with speed v to travel distance L is found by using the equation of motion, d = vt, or, in this case, t = L/v  As a result, the equation for the current, I = q/t, can be replaced by I = qv/L Magnets

 The Force on a Single Charged Particle  Therefore, the force on a single electron moving perpendicular to a magnetic field of strength B can be found Magnets Force of a Magnetic Field on a Charged, Moving Particle F = qvB

 The Force on a Single Charged Particle  The force on a particle moving in a magnetic field is equal to the product of the field strength, the charge of the particle, and its velocity  The particle’s charge is measured in coulombs, C, its velocity in meters per second, m/s, and the strength of the magnetic field in teslas, T  The direction of the force is perpendicular to both the velocity of the particle and the magnetic field  The direction given by the third right-hand rule is for positively charged particles. For electrons, the force is in the opposite direction Magnets

 Forces on Currents in Magnetic Fields  A 1.20 cm wire carrying a current of 0.80 A is perpendicular to a 2.40 T magnetic field. What is the magnitude of the force on the wire?  A 24.0 cm length of wire carries a current and is perpendicular to a 0.75 T magnetic field. If the force on the wire is 1.80 N, what is the current in the wire?  An electron beam is perpendicular to a T magnetic field. What is the force experienced by one electron if the beam has a velocity of 9.8 x 10 3 m/s?  A proton experiences a force of 6.9 x N when it travels at a right angle to a 1.35 T magnetic field. What is the velocity of the proton? Magnets