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Current The problem: Electrons (charge −e, mass m) and protons (charge e, mass M ) with equal number densities n are accelerated by the homogeneous constant electric field from the rest. There is a friction force of form F~e = −νe m~ve F~i = −νi M~vi (1) (2) where ~νi , ~νe are friction coefficients. Find the current density when the velocities do not change any longer . The solution: The second law: ~ − νe m~ve m~ae = −eE ~ − vi M~vi M~ai = eE (3) (4) If the velocities do not change the accelerations are zero. e ~ E νe m e ~ E νi M ~ve = − (5) ~vi = (6) The current density is J~ = en~vi + (−e)n~ve 1 1 ~ J~ = ne2 E + vi M ve m (7) (8) 1 Current Submitted by: I.D. 065944332 The problem: The space between two concentric spheres, r1 > r2 is filled with a conductor with the resistivity ρ. What is the resistance between the inner and outer surfaces. The solution: The solution is given also in e 38 2 167. Define the conductivity σ = 1/ρ. First way Suppose that there is a potential V . It gives rise to a radial current I, and then R = V /I by the Ohm’s law. Z R2 ~ · d~r V = − E (1) R1 ~ = E 1~ J σ (2) Then remembering that J = I/A for homogeneous current we get Z 1 R2 Jdr V = σ R1 Z 1 R2 I I R2 − R1 = dr = σ R1 4πr2 4πσ R1 R2 (3) (4) Therefore, R= V 1 R1 − R2 = I 4πσ R1 R2 (5) Second way L For a wire of a length L, area A and conductivity σ the resistance is R = σA . Since the current in our case is radial, we have many infinitecimal thin spheres in series. dr dr = σA σ4πr2 Z Z R2 R = dR = dR = R1 (6) dr 1 R1 − R2 = 2 σ4πr 4πσ R1 R2 1 (7) Current density The problem: t Current density is given by J~ = J cos2 θe− τ rb (spherical coordinates). Find the charge inside the sphere with the radius R as a function of time if the initial charge was Q0 . The solution: Z2π I= Z2π Zπ t 4πJR2 − t dϕ R sin θdθJ (θ, ϕ) = dϕ R2 sin θdθJ cos2 θe− τ = e τ 3 0 Zπ 2 0 0 (1) 0 The current is directed along the positive rb axis (away from the charge inside the sphere). Therefore, dQ = −I dt (2) From here Zt Q (t) = Q0 − 0 Zt Idt = Q0 + 0 4πJR2 − t0 e τ − 3 dt0 = Q0 − t 4πJR2 τ 1 − e− τ 3 (3) 0 Finally, Q (t) = Q0 − t 4πJR2 τ 1 − e− τ 3 (4) 1
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