Chapter 19: Magnetism 19.1Magnets, Magnetic Poles, and Magnetic Field Direction 19.2 Magnetic Field Strength and Magnetic Force 19.3Electromagnetism The Source of Magnetic Fields 19.4 Omitted 19.5 Magnetic Forces on Current-Carrying Wires 19.6 Applications of Electromagnetism 19.7 Omitted
19.1 Magnets, Magnetic Poles, and Magnetic Field Direction
static cling bar magnet electromagnet electric generator
poleforce law or law of poles - like magnetic poles repel each other, and unlike magnetic poles attract each other. The north pole of a compass is the north-seeking end. dipole - poles always occur in pairs, never singly (monopole). If you break a magnet in half, you end up with two smaller dipole magnets. magnetic field (B) - The direction of a magnetic field (or B field) at any location is the direction that the north pole of a compass at that location would point. Magnetic field lines always point from north to south. Magnetism and electricity are two aspects of a fundamental force, the electromagnetic force.
19.2 Magnetic Field Strength and Magnetic Force
A magnetic field can exert forces only on moving charges. When a charged particle enters a magnetic field, the particle experiences a force that is evident because the charge is deflected from its original path. The electron beam in a cathode ray tube (made visible by fluorescent paper) is normally horizontal between the end electrodes but is deflected here because of the magnet. We will use the convention: X X X X is into the page and is out of the page.
Right Hand Force Rule: For a positively charged particle the force is in the direction your palm is facing; for a negatively charged particle, the force is in the direction of the back of your hand. On Gold Sheet
Example 19.1: An electron moves with a speed of 4.0 x 10 6 m/s along the +x-axis. It enters a region where there is a uniform magnetic field of 2.5 T, directed at an angle of 60 to the x axis and lying in the xy plane. Calculate the initial force and acceleration of the electron.
F c = ma c qvB = mv 2 r A larger mass will have a larger radius.
Example 19.2: A proton has a speed of 4.5 x 10 6 m/s in a direction perpendicular to a uniform magnetic field, and the proton moves in a circle of radius 0.20 m. What is the magnitude of the magnetic field?
Check for Understanding 1.When the ends of two bar magnets are near each other, they attract one another. The ends must be a)one north, the other south b)one south, the other north c)both north d)both south e)either a or b Answer: e 2. If you look directly down on the S pole of a bar magnet, the magnetic field points a) to the right b) to the left c) away from you d) toward you Answer: c
Check for Understanding 3.A proton moves vertically upward in a uniform magnetic field and deflects to the right as you watch it. What is the magnetic field direction? a)directly away from you b)directly toward you c)to the right d)to the left Answer: b, according to the right hand rule
Check for Understanding
19.3Electromagnetism The Source of Magnetic Fields
Although a bit unlikely, the idea is that by jarring the domains in the presence of the earths magnetic field, they will align with it.
On Gold Sheet Right-Hand Source Rule: If a current- carrying wire is grasped with the right hand with the extended thumb pointing in the direction of the current (I), the curled fingers indicate the circular sense of the magnetic field direction.
Since magnetic field is a vector, you must use vector addition to find the net field if there are contributions from two or more sources.
Example 19.3: What current is required for a long straight wire to produce a magnetic field of magnitude equal to the strength of the Earths magnetic field of about 5.0 x 10 -5 T at a location 2.5 cm from the wire?
Example 19.5: Two long parallel wires carry currents of 20 A and 5.0 A in opposite directions. The wires are separated by 0.20 m. a)What is the magnetic field midway between the two wires? b)At what point between the wires are the magnetic fields from the two wires the same?
Check for Understanding 1.A long, straight wire is parallel to the ground and carries a steady current to the east. At a point directly below the wire, what is the direction of the magnetic field the wire produces? a)north b)east c)south d)west Answer: a, according to the right hand source rule. 2. A long, straight current-carrying wire is oriented vertically. On its east side, the field it creates points south. What is the current direction? a) up b) down Answer: b, according to the right hand source rule.
Homework for Chapter 19 HW 19.A: p.626-627: 6,9-13,15,24,25,28,29.
19.5 Magnetic Forces on Current-Carrying Wires
X X X no current in the wire
On Gold Sheet
a) Use the right hand force rule to determine the direction of force. Point the thumb in the direction of the conventional current I and the fingers in the direction of the B-field. The force F is the direction of the palm. b) Here the current is flowing in the opposite direction. Point the thumb in the direction of the current I and the fingers in the direction of B. F is the direction of the palm.
Forces exist between two parallel current-carrying wires. This is because the magnetic field produced by the current in one wire exerts a force on the other wire. If the currents are in the same direction, the forces attract. If the currents are in opposite directions, the forces repel. Use the right hand rule for
Example 19.6: A wire carries a current of 6.0 A in a direction 60 with respect to the direction of a magnetic field of 0.75 T. Find the magnitude of the magnetic force on a 0.50 length of the wire.
Torque on a Current-Carrying Loop A magnetic field can exert torque on a current-carrying loop. Suppose that the loop in figure a is free to rotate about an axis passing through opposite sides. There are no net forces or torques on the pivot sides of the loop. When these sides are parallel to the B field, the force on them is zero. At any other angle to the field, the forces on them are equal and opposite in the plane of the loop and so produce no net force or net torque. The other two sides of the loop do produce a net torque, which tends to rotate the loop.
Torque on a Current Carrying Coil = NIAB sin (not on gold sheet) Where is the torque N is the number of loops in the coil I is the current A is the area of the loop. It can be any shape. B is the magnetic field is the angle between the normal to the plane of the loop and the B-field.
Example 19.7: A circular loop of wire radius 0.50 m is in a uniform magnetic field of 0.30 T. The current in the loop is 2.0 A. Find the magnitude of the torque when a)the plane of the loop is parallel to the magnetic field, b)the plane of the loop is perpendicular to the magnetic field, c)the plane of the loop is at 30 to the magnetic field.
Example 19.8: Two long, straight wires separated by a distance of 0.30 m carry currents in the same direction. If the current in one wire is 10 A and the current in the other 8.0 A, find the magnitude and direction of the forces per unit length (per meter) between the wires. What if the currents are in opposite directions?
Check for Understanding 1.A long, straight, horizontal wire is located on the equator and carries a current directed toward the east. What is the direction of the force on it due to the Earths magnetic field? a)east b)west c)south d)upward Answer: d, according to the right hand force rule
Check for Understanding
19.6Applications of Electromagnetism
no current in the wire electron is not moving X X
The dc Motor An electrical motor is a device that converts electrical energy into mechanical energy. A pivoted, current carrying coil with N loops in a magnetic field will rotate freely, but for only a half-cycle, or through a maximum angle of 180. Recall that = NAIB sin , and when the magnetic field is perpendicular to the p