1. Chapter 7 Magnetic Fields

2. 7.1 THE CREATION OF MAGNETIC FIELDS

3. Creation of magnetic fields All moving electric charges create magnetic fields This magnetic field is separate from, and in addition to, the electric field associated with these charges Stationary electric charges have no magnetic field, only an electric field

4. Creation of magnetic fields

5. 7.2 PICTORIAL REPRESENTATION OF MAGNETIC FIELDS

6. The field of a Bar Magnet The direction of a magnetic field is from the North pole of the magnet to the South pole, as indicated by arrows on the field lines Magnetic field lines always form closed loops

7. The field of a Bar Magnet The direction of the field at any point is in a direction that is at a tangent to the field line at any point The magnitude of a magnetic field at any point is represented by the density of the magnetic field lines at that point

8. General representation of Magnetic Fields The magnetic field is a vector, it has magnitude and direction In the case of bar magnets and other magnetostatic examples (unchanging magnets) there is a North and South pole However magnetic fields created by electric currents do not have this property

9. General representation of Magnetic Fields In both gravitational and electric fields, the filed lines are lines of force: –The direction of field lines for a gravitational field is the direction of force on a mass at that point in the field –The direction of field lines for an electric field is the direction of force on a positive charge at that point in the field

10. General representation of Magnetic Fields The direction of the magnetic field is the direction of force on the North pole of a magnetic dipole placed at that point

11. General representation of Magnetic Fields

12. Class problems Conceptual questions: 1-6

13. 7.3 SOME SPECIFIC MAGNETIC FIELDS

14. The Earth’s magnetic field The direction of magnetic field lines is the direction of force on the North pole of a compass This means that the North pole of the Earth is actually the South pole of the Earth's magnetic field

15. Conventional Current When electric currents were first investigated, it wasn’t known that current flow was movement of positive or negative charge It was assumed that electric current was the flow of positive charge

16. Conventional Current Rather than change all electrical theory when electrons were discovered, the term conventional current was created as the flow of positive charge Whenever the term current is used, it refers to conventional current – the flow of positive charge – unless specifically stated as electron current flow

17. The Magnetic Field of a Straight Current Carrying Conductor The magnetic field of a straight wire carrying an electric current is circular as shown below

18. The Magnetic Field of a Straight Current Carrying Conductor A current directed into the page is represented by a cross, a current out of the page is represented by a distinct dot

19. The Magnetic Field of a Straight Current Carrying Conductor The magnetic field lines become more widely spaced as they move away from the wire, this shows the field getting weaker

20. Direction of Magnetic Fields – The Right Hand Curl Rule The direction of magnetic field around a current carrying wire can be found using the right hand (curl) rule Hold the wire with the right hand, with your thumb pointing in the direction of the conventional current The direction of your fingers wrapped around the wire indicate the direction of the magnetic field

21. Direction of Magnetic Fields – The Right Hand Curl Rule

22. Magnetic Field of a Current Loop If the wire forms a loop, we can still apply the right hand rule as shown below

23. Magnetic Field of a Current Loop It can be seen from the diagram that the magnetic field vector is always pointing in the same direction, in this case it is directed upwards through the loop

24. Magnetic Field of a Current Loop The magnetic field lines join up to form closed loops, and the magnetic field within the wire loop is approximately uniform

25. Magnetic Field of a Solenoid A solenoid is a continuous wire wound around a cylindrical core It can be considered to be many loops stacked together

26. Magnetic Field of a Solenoid The current in all of the loops is travelling in the same direction This means the resultant magnetic field of all the loops link up to produce the resultant field shown

27. Magnetic Field of a Solenoid For a solenoid with a very large number of coils, the magnetic field inside the solenoid is considered to be almost uniform

28. Magnetic Field of a Solenoid Solenoids are used to create powerful electromagnets, a soft iron core is used to greatly amplify the magnetic field

29. Magnetic Field of a Solenoid When the current is switched off, the field disappears, and the iron core loses its magnetism

30. Right hand solenoid rule Hold the solenoid in the right hand with the fingers wrapped around it in the direction of the current The outstretched thumb gives the directions of the North pole of the solenoid

31. Class problems Conceptual questions: 9-12 Descriptive questions: 2-3, 5

32. 7.4 MAGNETIC FIELD STRENGTH

33. Magnetic Interactions When two magnetic fields come into contact, they interact and forces of attraction and repulsion can occur

34. Magnetic Interactions We can determine the strength of the fields by the magnitude of force they exert on objects placed in them

35. Forces & field strengths

36. If a current carrying wire is placed in a magnetic field, the force depends on four separate quantities, not just two like gravitational and electric fields: –The strength of the magnetic field –The magnitude of the electric current –The length of the current (wire) in the field –The orientation (direction) of the current with respect to the magnetic field

37. Forces & field strengths

38. The Magnetic Field Vector B

39. Class problems Conceptual questions: 14, 16-17 Descriptive questions: 6, 8, 9

40. 7.5 MAGNETIC FORCE ON A CURRENT CARRYING CONDUCTOR

41. Magnetic force on an electric current When considering the magnetic force on an electric current placed in a magnetic field we need to consider 3 different situations: –When the current is perpendicular to the magnetic field –When the current is parallel to the magnetic field –When the current is flowing at some angle θ to the magnetic field (0<θ<90°)

42. Force on a Current Perpendicular to the Magnetic field Magnitude of magnetic field strength was defined using a current element perpendicular to the magnetic field Rearranging the relation for Force gives: F = IΔl B

43. Force on a Current Perpendicular to the Magnetic field In the diagram below, the left hand shows a wire with no current in a uniform magnetic field It doesn’t interact with the field and therefore doesn’t experience a force

44. Force on a Current Perpendicular to the Magnetic field On the right side, the wire is carrying a current which generates a magnetic field Since magnetic field lines cannot cross, they get compressed, which results in a force on the wire

45. Force on a Current Perpendicular to the Magnetic field If the direction of the magnetic field is reversed, the direction of the force is reversed If the direction of the current is reversed, the direction of the force is reversed

46. Force on a Current Perpendicular to the Magnetic field The direction of the force can be found using the right hand palm rule as illustrated below:

47. Force on a Current Parallel to the Magnetic field When the current is parallel to the field as in the diagram below, the two magnetic field create perpendicular field lines The perpendicular fields do not interact, therefore no force is generated

48. Force on a Current at an Angle θ to the Magnetic field The current in the wire can be considered as a vector IΔl, with its direction being in the direction of the current I Thus it can be resolved into two components, one perpendicular and one parallel to the magnetic field

49. Force on a Current at an Angle θ to the Magnetic field The parallel component does not interact with the uniform field, only the perpendicular component is subject to a force This can be given by: F = IΔl B sinθ

50. Force on a Current at an Angle θ to the Magnetic field This is the general formula for currents in a magnetic field since: –When the current is parallel to the field, θ = 0 ° or 180 °, hence sinθ = 0 and hence F = 0 –When the current is perpendicular to the field, θ = 90 °, hence sinθ = 1 and hence F = IΔl B

51. Class problems Conceptual questions: 17 Descriptive questions: 9 Computational questions: 1-6

52. 7.6 APPLICATION: THE MOVING COIL LOUDSPEAKER

53. How sound is produced Sound waves are periodic sequences of: –Compressions (regions of high density compressed air) –Rarefactions (regions of low density rarefied air)

54. How sound is produced The number of vibrations per second determines the frequency of the sound, higher frequencies give a higher pitch sound Low Frequency High Frequency

55. Construction of a moving coil loudspeaker The diagram below shows the parts of a moving coil loudspeaker

56. Construction of a moving coil loudspeaker Frame: Supports the cone and magnet structure, usually an open metal frame

57. Construction of a moving coil loudspeaker Magnet structure: A fixed permanent ring magnet provides the magnetic field, magnetic poles are induced in the soft iron pole pieces

58. Construction of a moving coil loudspeaker Cone: A conical surface made from light but rigid material (paper pulp, plastic, Kevlar, etc) that vibrates, generating sound waves

59. Construction of a moving coil loudspeaker Coil: A coil of wire (often aluminium) that passes through the gap in the magnet structure, and is attached to the cone

60. Construction of a moving coil loudspeaker Inner suspension: A ring of flat springy material attached to the frame that holds the cone and coil central

61. Construction of a moving coil loudspeaker Outer suspension: performs a similar function to the inner suspension at the outer edge of the cone

62. Construction of a moving coil loudspeaker Centre cap & dust dome: Molded plastic or aluminium covering the centre of the cone to add rigidity and keep dust out of the magnet assembly

63. Woofers and tweeters The cone loudspeaker is good for a large range of frequencies, but does not produce higher frequencies as well due to the inertia and internal vibrations of the cone This is overcome in high quality systems by using a dome driver, which doesn’t have a cone, to produce higher frequencies

64. Action of a moving coil loudspeaker When a potential difference is applied to the coil, it generates a constant current, given by I = ΔV/R, since the resistance (R) is also constant

65. Action of a moving coil loudspeaker This current generates a magnetic force on the coil in the field given by F = Il B

66. Action of a moving coil loudspeaker I is the current in the coil, l is the length of the coil (circumference multiplied by the number of turns, and B is the magnetic field strength (constant)

67. Class problems Conceptual questions: 18 Descriptive questions: 10, 12, 14 Computational questions: 9, 12, 14, 16-17