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Lecture 12 Magnetism of Matter: Maxwell’s Equations Ch. 32 • Cartoon • Opening Demo • Topics • • • – Ferromagnetism – Maxwell equations – Displacement current Demos Elmo Polling Ferromagnetism Iron, cobalt, nickel, and rare earth alloys exhibit ferromagnetism. The so called exchange coupling causes electron magnetic moments of one atom to align with electrons of other atoms. This alignment produces magnetism. Whole groups of atoms align and form domains. (See Figure 32-12 on page 756) A material becomes a magnet when the domains line up adding all the magnetic moments.You can actually hear the domains shifting by bringing up an magnet and hear the induced currents in the coil. Barkhausen Effect Two other types of magnetic behavior are paramagnetism or diamagnetism. What is the atomic origin of magnetism? Electron spinning on its axis Electron orbiting around the nucleus Spin Magnetic Dipole Moment of the Electron e S m e 1.6 109 Coulombs m 9.111031 kg S is the angular momentum due to the electron’s spin. It has units kg.m2/s. has units of A.m2 - current times area Recall for a current loop, the magnetic dipole moment = current times area of loop In the quantum field theory of the electron, S can not be measured. Only it’s component along the z axis can be measured. In quantum physics, there are only two values of the z component of the electron spin. Therefore, only the z component of can be measured.Its two possible values are: eh z 4m Corresponding to the two values of the electron spin quantum number +1/2 and -1/2 The above quantity is called the Bohr magneton and is equal to: eh B z 9.27 1024 A.m 2 4m The magnetic moment of the electron is the prime origin of ferromagnetism in materials. 22. The dipole moment associated with an atom of iron in an iron bar is 2.1x10-23 J/T. Assume that all the atoms in the bar, which is 5.0 cm long and has a cross-sectional area of 1.0 cm2, have their dipole moments aligned. (a) What is the dipole moment of the bar? The number of iron atoms in the iron bar is 7.9 g cm 5.0cm 1.0cm N 4.3 10 55.847 g mol 6.022 10 mol 3 2 23 Thus, the dipole moment of the bar is 2.1 1023 J T 4.3 1023 9.03A m2 . 23 . (b) What torque must be exerted to hold this magnet perpendicular to an external field of 1.5 T? (The density of iron is 7.9 g/cm3) (b) Bsin90o 9.03A m2 1.5T 13.5N m (C) Use the dipole formula to find the magnitude and direction of the magnetic field 1cm from the end of the bar magnet on its central axis at P. 5 cm . A = 1 cm2 8.9A.m2 BT d dB AL 0 .01 dz 0 2 Adz L d z3 dz 0 2 BT ( )( 2 3 2 L .06 z 2 L z B P z B 0 2z 3 0 2 )=( )( ) 2 2 L (0.01) 0.06 0.01 4 107 AN2 8.9A.m 2 0.05m(.01m) 2 4 1078.9N / A.m B 5 106 B 0.71 T Maxwells Equations: In 1873 he wrote down 4 equations which govern all classical electromagnetic phenomena. You already know two of them. 1. E E .dA q enc /0 2. B B.dA 0 A magnetic field changing with time can produce an electric field: Faraday’s law 3. dB E .ds dt Line integral of the electric field around the wire equals the change of Magnetic flux through the area Bounded by the loop Electric lines curl around changing magnetic field lines Example New Question: Can a changing electric field with time produce an magnetic field? Yes it can and it is called Maxwell’s law of induction . dE B.ds 00 dt Maxwell’s law of induction dE B.ds 00 dt Consider the charging of our circular plate capacitor B field also induced at point 2. When capacitor stops charging B field disappears. current ever actually flows through the capacitor Find the expression for the induced magnetic field B that circulates around the electric field lines of a charging circular parallel plate capacitor r<R Flux within the loop of radius r dE B.ds 00 dt E B.ds (B)(2r) since B parallel ds B r R 2 dE (B)(2r) 00r dt dE d(AE) dE 00 00 00 A dt dt dt r< R r>R B 00r dE 2 dt B 00 R 2 dE 2r dt Ampere-Maxwell’s Law dE B.ds 00 dt This term has units of current 4. B.ds i 0 Maxwell combined the above two equations to form one equation dE B.ds 00 dt 0ienc How do we interpret this equation? What is the displacement current? dE B.ds 00 dt 0ienc dE 0 id dt B.ds i 0 d This is called the displacement current id 0ienc The term is really is a transfer of electric and magnetic energy from one plate to the other while the plates are being charged or discharged. When charging stops, this term goes to zero. Note it is time dependent. Show that the displacement current in the gap of the two capacitor plates is equal to the real current outside the gap dE 0 id dt dE B.ds 00 dt Can I detect the magnetic field associated with displacement current? Calculation of id First find the real current i q/A E 0 0 q 0 AE i dq dE 0 A dt dt For the field inside a parallel plate capacitor Solving for q This is the real current i charging the capacitor. Next find the displacement current dE id 0 dt d(AE) dE id 0 0 A dt dt displacement current = real current. No charge actually moves across the gap. Calculate Magnetic field due to displacement current Current is uniformly spread over the circular plates of the capacitor. Imagine it to be just a large wire of diameter R. Then use the formula for the magnetic field inside a wire. 0id B( )r Inside the capacitor 2 2R 0id B 2r Outside the capacitor Question 11: A circular capacitor of radius R is being charged through a wire of radius R0. Which of the points a, b, c, and d correspond to points 1, 2, and 3 on the graph Where is the radius R0 and R on the graph? Summary of Maxwell Equations Integral form 1. E 2. B 3. 4. E .dA q B.dA 0 enc /0 dB E .ds dt r r dE B.ds 00 dt 0ienc Chapter 32 Problem 61 In Figure 32-39, the capacitor with circular plates of radius R = 16.0 cm is connected to a source of emf script e = script em sin ωt, where script em = 220 V and ω = 120 rad/s. The maximum value of the displacement current is id = 7.60 µA. Neglect fringing of the electric field at the edges of the plates. (a) What is the maximum value of the current i in the circuit? (b) What is the maximum value of dE/dt, where E is the electric flux through the region between the plates? (c) What is the separation d between the plates? (d) Find the maximum value of the magnitude of B between the plates at a distance r = 11.0 cm from the center. Chapter 32 Problem 56 Suppose that 4 are the limits to the values of mc for an electron in an atom. (a) How many different values of the z component µorb,z of the electron’s orbital magnetic dipole moment are possible? (b) What is the greatest magnitude of those possible values? Next suppose that the atom is in a magnetic field of magnitude 0.250T, in the positive direction of the z axis. (c)What are the maximum potential energy (d)What are the minimum potential energy associated with those possible values of µorb,z?