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PHY 102: Lecture 6 6.1 Magnetic Field 6.2 Magnetic Force on Moving Charges 6.3 Magnetic Force on Currents 6.4 Magnetic Field Produced by Current.

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Presentation on theme: "PHY 102: Lecture 6 6.1 Magnetic Field 6.2 Magnetic Force on Moving Charges 6.3 Magnetic Force on Currents 6.4 Magnetic Field Produced by Current."— Presentation transcript:

1 PHY 102: Lecture 6 6.1 Magnetic Field 6.2 Magnetic Force on Moving Charges 6.3 Magnetic Force on Currents 6.4 Magnetic Field Produced by Current

2 PHY 102: Lecture 6 Magnetic Force Magnetic Fields 6.1 Magnetic Field

3 Basics of This Chapter Charge moving in a magnetic field feels a force Moving charge creates a magnetic field

4 Magnetic Field Into and Out of Page

5 Magnetic Poles North magnetic pole –The end of the needle that points north South magnetic pole –The opposite end No one has been able to separate magnetic poles Electric charges can be separated

6 Magnetic Force Direction of the magnetic force –Like poles repel each other –Unlike poles attract each other

7 Magnetic Field A magnetic field is created at all points in space surrounding a magnet The magnetic field at each point is a vector. It has both a magnitude called the magnetic field strength B, and a direction The magnetic field exerts forces on magnetic poles. The force on a north magnetic pole is parallel to B; the force on a south magnetic pole is opposite to B Magnetic forces cause a compass needle to become aligned parallel to a magnetic field, with the north pole of the compass showing the direction of the magnetic field at that point

8 Magnetic Field Lines Magnetic field lines –To visualize the electric field, we introduced electric field lines –It is possible to draw magnetic field lines –The lines originate from north pole, and end on the south pole –They do not end in midspace –The strength of the field is proportional to the number of lines per unit area that passes through a surface oriented perpendicular to the lines

9 Magnetic Pole Force Directions - 1

10 Magnetic Pole Force Directions - 2 At any location in the vicinity of a magnet, the north pole of a small compass needle points in the direction of the magnetic field at that location

11 Magnetic Field Lines

12 Earth’s North Magnetic Pole The compass and field lines point to the earth’s north magnetic pole Therefore, the earth’s north magnetic pole is actually a south pole

13 PHY 102: Lecture 6 Magnetic Force Magnetic Fields 6.2 Magnetic Force on Moving Charge

14 Magnetic Field Force on Moving Charge Two conditions must be met for a charge to experience a magnetic force when placed in a magnetic field –The charge must be moving –The velocity of the moving charge must have a component that is perpendicular to the direction of the magnetic field

15 No Force – Velocity Parallel to Magnetic Field

16 Max Force – Velocity Perpendicular to Magnetic Field

17 Some Force – Velocity at Angle to Magnetic Field

18 Direction of Magnetic Force Right-Hand Rule No. 1 Extend the right hand so the fingers point along the direction of the magnetic field B The thumb points along the velocity v of the charge The palm of the hand then faces in the direction of the magnetic force F that acts on a positive charge If the moving charge is negative, the direction of the magnetic force is opposite to that predicted by RHR-1

19 Illustration of Right-Hand Rule No. 1

20 Definition of Magnetic Field The magnitude B of the magnetic field at any point in space is defined as F is the magnitude of magnetic force on a test charge |q 0 | is the magnitude of the test charge v is the magnitude of the charge’s velocity v makes an angle  (0 <=  <= 180 0 ) with the direction of the magnetic field The magnetic field B is a vector, and its direction can be determined by using a small compass needle SI Unit of Magnetic Field = 1 tesla (T)

21 Problem 1 - 1 A proton in a particle accelerator has a speed of 5.0 x 10 6 m/s The proton encounters a magnetic field whose magnitude is 0.40 T Direction of the field makes and angle of  = 30.0 0 with respect to the protons velocity (a) Find the magnitude and direction of the magnetic force on the proton (b) The acceleration of the proton

22 Problem 1 - 2 (a) Positive charge on proton is 1.60 x 10 -19 C Magnitude of force is F = |q 0 |vB sin  The direction of the magnetic force is given by RHR-1 and is directed upward

23 Problem 1 - 3 (b) Acceleration if from Newton’s second law a = F/m = 1.6 x 10 -13 / 9.11 x 10- 31 = 1.8 x 10 17 m/s 2

24 Compare Particle Motion in Electric and Magnetic Field Positive charge moving between the plates of a parallel plate capacitor Initially, the charge is moving perpendicular to the electric field Direction of the electric force is in the same direction as the electric field Particle is deflected sideways

25 Compare Particle Motion in Electric and Magnetic Field Initially, positive charge is moving at right angles to a magnetic field When the charge enters the field it is deflected upwards by magnetic force As charge moves upward, the direction of the magnetic force changes Force always remains perpendicular to the magnetic field and velocity Charge moves in circle

26 Velocity Selector Force of the electric field on particle is qE in downward direction Force of the magnetic field on the moving particle is qvB in the upward direction The forces are balanced when qE = qvB v = E/B This is the velocity of the particle that will pass straight through the velocity filter from one end to the other

27 Work Done on a Charged Particle Moving Through Magnetic Field The force is perpendicular to the direction of motion Therefore, the work done by the magnetic field is zero

28 Circular Trajectory - 1 Velocity of positively charged particle is perpendicular to a constant magnetic field The magnetic force moves the particle in a circular path At point 1, the magnetic force F points upward This force causes the parth to bend upward

29 Circular Trajectory - 2 At point 2, the magnetic force is directed to the left The magnetic force always remains perpendicular to the velocity Force is directed toward the center of the circular path

30 Circular Trajectory - 3 Centripetal force equals magnetic force

31 Problem 2 - 1 Proton is released from rest at point A next to positive plate of parallel plate capacitor Proton accelerates towards the negative plate Proton leaves capacitor at point B through a small hole Electric potential of positive plate is 2100 V greater than the negative plate V A – V B = 2100 V

32 Problem 2 - 2 Outside the capacitor, the proton travels at a constant velocity until it enters a region of constant magnetic field Field is directed out of the page B = 0.10 T Velocity is perpendicular to the magnetic field

33 Problem 2 - 3 (a) Find the speed v B of the proton when it leaves the negative plate of the capacitor (b) Find the radius r of the circular path on which the proton moves in a magnetic field

34 Problem 2 - 4 (a) Electric force is conservative Energy is conserved while in capacitor

35 Problem 2 - 5 (b) The radius of curvature of the circular path in the magnetic field is

36 Problem 3 - 1 Bubble-chamber tracks resulting from event at point A A gamma ray traveling from the left spontaneously transforms into two charged particles No track from gamma ray Particles move away from point A producing two spiral tracks A third charged particle is knocked out of a hydrogen atom and moves forward producing the long track with the slight upward curvature

37 Problem 3 - 2 Each particle has the same mass and a charge of the same magnitude A uniform magnetic field is directed out of the page Based on RHR-1 and formula for radius of curved track in magnetic field, we know: Particles 1 and 3 are – Particle 2 is + Particles 1 and 2 are losing energy to hydrogen collisions because tracks spiral inward Particle 3 has greatest speed

38 Mass Spectrometer - 1

39 Mass Spectrometer - 2 Conservation of energy in electric field Radius of curvature in magnetic field

40 Mass Spectrometer Output

41 Dr. Molof Thesis Rb 85, 87 Special Spectrometer Scan

42 PHY 102: Lecture 6 Magnetic Force Magnetic Fields 6.3 Magnetic Force on Currents

43 Force on Current in Magnetic Field

44 Problem 4 - 2 Rail Gun Two conducting rails are 1.6 m apart Rails are parallel to the ground at the same height A 0.20-kg aluminum rod is lying on top of the rails A 0.050-T magnetic field points upward The field is perpendicular to the ground There is a current in the rod The coefficient of static between rod and rails is  s = 0.45

45 Problem 4 - 2 Rail Gun How much current is needed to make the rod begin to move? In what direction will it move?

46 Problem 4 - 3 Rail Gun Friction force = f =  s N =  s mg f = 0.45 x 0.20 x 9.8 = 0.882 N Magnetic force = ILB = I(1.6)(0.050) Magnetic force = (0.08)I N 0.882 = 0.08I I = 0.882 / 0.08 = 11.0 A If current is positive RHR-1 give motion to left, negative to the right

47 PHY 102: Lecture 6 Magnetic Force Magnetic Fields 6.4 Magnetic Field Produced by Current

48 Right Hand Rule No. 2 Curl the fingers of the right hand into the shape of a half-circle Point the thumb in the direction of the conventional current I The tips of the fingers will point in the direction of the magnetic field B

49 Magnetic Field Long Straight Wire  0 = 4  x 10 -7 Tm/A This is permeability of free space r is distance from wire

50 Problem 5 - 1 Long straight wire carries current of 3.0 A Particle charge of +6.5 x 10 -6 C Particle moving parallel to wire at distance of 0.050 m Particle speed is 280 m/s Find magnitude and direction of the magnetic force exerted on the charged particle by the current in the wire.

51 Problem 5 - 2 Magnetic field produced by wire Force on charge Direction magnetic force is radially inward toward wire (RHR-1) F =

52 Problem 6 - 1 Two long, parallel, straight wires Wires separated by 0.065 m Current is I 1 = 15 A and I 2 = 7.0 A Find the magnitude and direction of force that magnetic field of wire 1 applies to a 1.5 m section of wire 2

53 Problem 6 - 2 Magnetic force on part of wire 2 Magnetic field produced by wire 1 Combined

54 Problem 6 - 3 Using RHR-1 the force on wire 2 is away from wire 1 Using Newton’s Third Law, the force on wire 1 is away from wire 2 If the current in wire 2 is reversed, the direction of the forces is reversed

55 Magnetic Field Loop of Wire Field at center of loop N is number of coils in loop R is the radius of the loop

56 Loop of Wire acts like Bar Magnet Current-carrying loop acts like a bar magnet

57 Two Loop of Wire acts like Repel/Attract Bar Magnets When the currents are in the same direction the loops attract When the currents are in opposite directions the loops repel Used RHR-1

58 Magnetic Field Long Solenoid Field inside of solenoid N is number of coils in loop

59 Ampere’s Law Constant magnetic field   l is a small segment of length along a closed path of arbitrary shape round the current B || is the component of the magnetic field parallel to  l, I is the net current passing through the surface bounded by the path   0 is the permeability of free space Symbol  indicates that the sum of all terms must be taken around the closed path

60 Problem 7 - 1 Use Ampere’s law to obtain the magnetic field produced by the current in an infinitely long, straight wire Along the circular path the magnetic field is parallel to  l and has constant magnitude

61 Problem 7 - 2


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