1. P01 - 1 Workshop: Using Visualization in Teaching Introductory E&M AAPT National Summer Meeting, Edmonton, Alberta, Canada. Organizers: John Belcher, Peter Dourmashkin, Carolann Koleci, Sahana Murthy

2. P01 - 2 MIT Class: Particle Interactions: Coulomb’s Law

3. P01 - 3 Gravitational Vector Field

4. P01 - 4 Example Of Vector Field: Gravitation Gravitational Force: Gravitational Field: M : Mass of Earth

5. P01 - 5 Example Of Vector Field: Gravitation Gravitational Field: M : Mass of Earth unit vector from M to m Created by MFelt by m USE THIS FORM! vector from M to m

6. P01 - 6 The Superposition Principle Net force/field is vector sum of forces/fields In general: Example: 1 2

7. P01 - 7 In Class Problem Find the gravitational field at point P Bonus: Where would you put another mass m to make the field become 0 at P? Use NOTE: Solutions will be posted within two days of class

8. P01 - 8 From Gravitational to Electric Fields

9. P01 - 9 Electric Charge (~Mass) Two types of electric charge: positive and negative Unit of charge is the coulomb [C] Charge of electron (negative) or proton (positive) is Charge is quantized Charge is conserved

10. P01 - 10 Electric Force (~Gravity) The electric force between charges q 1 and q 2 is (a) repulsive if charges have same signs (b) attractive if charges have opposite signs Like charges repel and opposites attract !!

11. P01 - 11 Coulomb's Law Coulomb’s Law: Force on q 2 due to interaction between q 1 and q 2 unit vector from q 1 to q 2 vector from q 1 to q 2

12. P01 - 12 Coulomb's Law: Example a = 1 m q 1 = 6 C q 3 = 3 C q 2 = 3 C

13. P01 - 13 The Superposition Principle Many Charges Present: Net force on any charge is vector sum of forces from other individual charges Example: In general:

14. P01 - 14 Electric Field (~g) The electric field at a point P due to a charge q is the force acting on a test charge q 0 at that point P, divided by the charge q 0 : For a point charge q: Units: N/C, also Volts/meter

15. P01 - 15 Superposition Principle The electric field due to a collection of N point charges is the vector sum of the individual electric fields due to each charge

16. P01 - 16 Gravitational & Electric Fields Mass M s Charge q s (±) This is easiest way to picture field CREATE: FEEL: SOURCE:

17. P01 - 17 PRS Question: Electric Field

18. P01 - 18 PRS: Electric Field Two opposite charges are placed on a line as shown below. The charge on the right is three times larger than the charge on the left. Other than at infinity, where is the electric field zero? 1.Between the two charges 2.To the right of the charge on the right 3.To the left of the charge on the left 4.The electric field is nowhere zero 5.Not enough info – need to know which is positive 6.I don’t know :20

19. P01 - 19 PRS Answer: Electric Field Answer: 3. To the left of the charge on the left Between: field goes from source to sink. On right: field dominated by q R (bigger & closer). On left: because q L is weaker, its “push” left will somewhere be balanced by q R ’s “pull” right

20. P01 - 20 Electric Field Lines 1.Join end-to-end infinitesimal vectors representing E…the curve that results is an electric field line (also known as line of force). 2.By construction then, the direction of the E field at any given point is tangent to the field line crossing that point. 3.Field lines point away from positive charges and terminate on negative charges. 4.Field lines never cross each other. 5.The strength of the field is encoded in the density of the field lines.

21. P01 - 21 PRS Questions: Electric Field

22. P01 - 22 PRS: Force The force between the two charges is: 1.Attractive 2.Repulsive 3.Can’t tell without more information 4.I don’t know

23. P01 - 23 PRS Answer: Force One way to tell is to notice that they both must be sources (or sinks). Hence, as like particles repel, the force is repulsive. You can also see this as tension in the field lines The force between the two charges is: 2) Repulsive

24. P01 - 24 PRS: Field Lines Electric field lines show: Remember: Don’t pick up until you are ready to answer 1.Directions of forces that exist in space at all times. 2.Directions in which charges on those lines will accelerate. 3.Paths that charges will follow. 4.More than one of the above.. 5.I don’t know.

25. P01 - 25 PRS Answer: Field Lines NOTE: This is different than flow lines (3). Particles do NOT move along field lines. Answer: 2. Directions charges accelerate.

26. P01 - 26 In-Class Problem Consider two point charges of equal magnitude but opposite signs, separated by a distance d. Point P lies along the perpendicular bisector of the line joining the charges, a distance s above that line. What is the E field at P?

27. P01 - 27 Two PRS Questions: E Field of Finite # of Point Charges

28. P01 - 28 PRS: Equal Charges Electric field at P is: 1. 1 2. 2 3. 3 4. 4 5. 5

29. P01 - 29 PRS Answer: Equal Charges Electric field at P is: There are a several ways to see this. For example, consider d  0. Then, which is what we want (sitting above a point charge with charge 2q)

30. P01 - 30 PRS: 5 Equal Charges Six equal positive charges q sit at the vertices of a regular hexagon with sides of length R. We remove the bottom charge. The electric field at the center of the hexagon (point P) is: 1. 1 2. 2 3. 3 4. 4 5. 5 6. 6 1. 1 2. 2 3. 3 4. 4 5. 5 6. 6

31. P01 - 31 PRS Answer: 5 Equal Charges E fields of the side pairs cancel (symmetry) E at center due only to top charge (R away) Field points downward Alternatively: “Added negative charge” at bottom R away, pulls field down

32. P01 - 32 Charging

33. P01 - 33 How Do You Get Charged? Friction Transfer (touching) Induction +q Neutral -------- ++++++++

34. P01 - 34 Demonstrations: Instruments for Charging

35. P01 - 35 Electric Dipoles A Special Charge Distribution

36. P01 - 36 Electric Dipole Two equal but opposite charges +q and –q, separated by a distance 2a points from negative to positive charge q -q 2a Dipole Moment

37. P01 - 37 Why Dipoles? Nature Likes To Make Dipoles! Animation

38. P01 - 38 Dipoles make Fields

39. P01 - 39 Electric Field Created by Dipole Thou shalt use components!

40. P01 - 40 PRS Question: Dipole Fall-Off

41. P01 - 41 PRS: Dipole Field As you move to large distances r away from a dipole, the electric field will fall-off as: 1.1/r 2, just like a point charge 2.More rapidly than 1/r 2 3.More slowly than 1/r 2 4.I Don’t Know

42. P01 - 42 PRS Answer: Dipole Field We know this must be a case by thinking about what a dipole looks like from a large distance. To first order, it isn’t there (net charge is 0), so the E-Field must decrease faster than if there were a point charge there. Answer: 2) More rapidly than 1/r 2

43. P01 - 43 Point Dipole Approximation Finite Dipole Point Dipole You can show…

44. P01 - 44 Shockwave for Dipole Dipole Visualization

45. P01 - 45 Dipoles feel Fields

46. P01 - 46 Demonstration: Dipole in Field

47. P01 - 47 Dipole in Uniform Field Total Net Force: Torque on Dipole: tends to align with the electric field

48. P01 - 48 Torque on Dipole Total Field (dipole + background) shows torque: Field lines transmit tension Connection between dipole field and constant field “pulls” dipole into alignment Animation

49. P01 - 49 PRS Question: Dipole in Non-Uniform Field

50. P01 - 50 PRS: Dipole in Non-Uniform Field A dipole sits in a non-uniform electric field E E Due to the electric field this dipole will feel: 1.force but no torque 2.no force but a torque 3.both a force and a torque 4.neither a force nor a torque

51. P01 - 51 PRS Answer: Non-Uniform Field Because the field is non-uniform, the forces on the two equal but opposite point charges do not cancel. As always, the dipole wants to rotate to align with the field – there is a torque on the dipole as well Answer: 3. both force and torque E

52. P01 - 52 Continuous Charge Distributions

53. P01 - 53 V Continuous Charge Distributions Break distribution into parts: E field at P due to  q Superposition:

54. P01 - 54 Continuous Sources: Charge Density

55. P01 - 55 Examples of Continuous Sources: Line of charge Link to applet

56. P01 - 56 Examples of Continuous Sources: Line of charge Link to applet

57. P01 - 57 Examples of Continuous Sources: Ring of Charge Link to applet

58. P01 - 58 Examples of Continuous Sources: Ring of Charge Link to applet

59. P01 - 59 Example: Ring of Charge P on axis of ring of charge, x from center Radius a, charge density. Find E at P

60. P01 - 60 Ring of Charge Symmetry! 1) Think about it Mental Picture… 2) Define Variables

61. P01 - 61 Ring of Charge 3) Write Equation

62. P01 - 62 Ring of Charge 4) Integrate Very special case: everything except dq is constant

63. P01 - 63 Ring of Charge 5) Clean Up 6) Check Limit

64. P01 - 64 In-Class: Line of Charge Point P lies on perpendicular bisector of uniformly charged line of length L, a distance s away. The charge on the line is Q. What is E at P?

65. P01 - 65 Hint: Line of ChargeLine of Charge Typically give the integration variable (x’) a “primed” variable name. ALSO: Difficult integral (trig. sub.)

66. P01 - 66 E Field from Line of Charge Limits: Point charge Infinite charged line

67. P01 - 67 In-Class: Uniformly Charged Disk P on axis of disk of charge, x from center Radius R, charge density . Find E at P

68. P01 - 68 Disk: Two Important Limits Limits: Point charge Infinite charged plane ***

69. P01 - 69 Scaling: E for Plane is Constant 1) Dipole: E falls off like 1/r 3 2) Point charge:E falls off like 1/r 2 3) Line of charge:E falls off like 1/r 4) Plane of charge: E constant