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Gauss’s Law. Alan Murray. a. a. q. b. b. a. a. b. Revision : Vector Dot (Scalar) Product. a . b = ab cos(90) = 0. a . b = ab cos q. a . a = aa cos(0) = a². a . b = ab cos(0) = ab. In Cartesian co-ordinates, a . b = (a x ,a y ,a z ).(b x .b y ,b z )
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Gauss’s Law Alan Murray
a a q b b a a b Revision : Vector Dot (Scalar) Product a.b = ab cos(90) = 0 a.b = ab cos q a.a = aa cos(0) = a² a.b = ab cos(0) = ab In Cartesian co-ordinates, a.b = (ax,ay,az).(bx.by,bz) = axbx + ayby + azbz Alan Murray – University of Edinburgh
2a -2a a Revision : Vector x Scalar In Cartesian co-ordinates, for example, 2a = 2(ax,ay,az) = (2ax,2ay,2az) Alan Murray – University of Edinburgh
Gauss’s Law : Crude Analogy • Try to “measure” the rain on a rainy day • Method 1 : count the raindrops as they fall, and add them up • cf Coulomb’s Law • Method 2 : Hold up an umbrella (a “surface”) and see how wet it gets. • cf Gauss’s Law • Method 1 is a “divide –and-conquer” or “microscopic” approach • Method 2 is a more “gross” or “macroscopic” approach • They must give the same answer. Alan Murray – University of Edinburgh
1C 1C 1C Electric Field Lines These are all “correct” as E-field lines are simply cartoons For now, adopt a drawing scheme such that 1C = 1 E-line. Alan Murray – University of Edinburgh
8C 16C 32C Lines of Electric Field How many field lines cross out of the circle? 8C Þ 8 lines 16C Þ 16 lines 32C Þ 32 lines Alan Murray – University of Edinburgh
8C 16C 32C Lines of Electric Field How many field lines cross out of the surface? 8C Þ 8 lines 16C Þ 16 lines 32C Þ 32 lines Alan Murray – University of Edinburgh
Gauss’s Law : Cartoon Version • The number of electric field lines leaving a closed surface is equal to the charge enclosed by that surface • S(E-field-lines) a Charge Enclosed N Coulombs ÞaN lines Alan Murray – University of Edinburgh
8C 16C 32C Lines of Electric Field How many field lines cross out of the surface? 8C Þ 0 lines 16C Þ 0 lines 32C Þ 0 lines i.e. charge enclosed = 0 Alan Murray – University of Edinburgh
Gauss’s Law Proper (L) • S(E-lines) proportional to (Charge Enclosed) • D = εE • òòD.ds = òòòr(r)dv = òòòr(r)dxdydz • òòD.ds = charge enclosed • ε= ε0 = 8.85 x 10-12 in a vacuum Alan Murray – University of Edinburgh
Digression/RevisionArea Integrals This area gets wetter! Alan Murray – University of Edinburgh
Rainfall Rainfall ds ds Area Integrals – what’s happening? This area gets wetter! Alan Murray – University of Edinburgh
Rainfall Rainfall ds ds Area Integrals – what’s happening? Clearly, as the areas are the same, the angle between thearea and the rainfall matters … Alan Murray – University of Edinburgh
Rainfall, R Rainfall, R Area Integrals – what’s happening? ds ds Extreme casesat 180° - maximum rainfallat 90°, no rainfall Alan Murray – University of Edinburgh
Flux of rain (rainfall) through an area ds • Fluxrain = R.ds • |R|´|ds|´cos(q) • Rds cos(q) • Fluxrain = 0 for 90° … cos(q) = 0 • Fluxrain = -Rds for 180° … cos(q) = -1 • Generally, Fluxrain = Rds cos(q) • -1 < cos(q) < +1 Alan Murray – University of Edinburgh
Area Integrals : Take-home message • Area is a vector, perpendicular to the surface • Calculating flux of rain, E-field or anything else thus involves a scalar or “dot” product a.b = abcos(q) • This is what appears in a surface integral of the form òòD.ds, or òòR.ds, which would yield the total rainfall on whatever surface is being used for integration (here, the hills!) Alan Murray – University of Edinburgh
ds ds r L ds Gauss’s law – Worked ExampleLong straight “rod” of charge Construct a “Gaussian Surface” that reflects the symmetryof the charge - cylindrical in this case, then evaluate òòD.ds E, D E, D rlCoulombs/m Alan Murray – University of Edinburgh
E, D ds r Evaluate òòD.ds • òòD.ds = òò D.dscurved surface +òò D.dsflat end faces • End faces, D & ds are perpendicular • D.ds on end faces = 0 • òò D.dsflat end faces = 0 • Flat end faces do not contribute! Alan Murray – University of Edinburgh
D & ds parallel, D.ds= |D|´|ds| = Dds E, D ds rlCoulombs/m L ds Evaluate òòD.ds • òòD.ds = òò D.dscurved surface only Alan Murray – University of Edinburgh
D has the same strengthD(r) everywhere on thissurface. E, D rlCoulombs/m L Evaluate òòD.ds • òò D.dscurved surface only = òò Dds Alan Murray – University of Edinburgh
2pr rlCoulombs/m r L Evaluate òòD.ds D • òò D.dscurved surface only = òò ds • = Dòò ds = D ´ area of curved surface • = D ´ 2 p rL • So 2Dp rL = charge enclosed • Charge enclosed? • Charge/length ´ length L = rl ´L Alan Murray – University of Edinburgh
x x Evaluate òòD.ds • òò D.ds = charge enclosed • 2pDr´L = rl ´L • D(r) = rl2pr • D(r) =rl âr2pr Alan Murray – University of Edinburgh
Discussion • |D| is proportional to 1/r • Gets weaker with distance • Intuitively correct • D points radially outwards (âr) • |D| is proportional to rl • More charge density = more field • Intuitively correct Alan Murray – University of Edinburgh
Spherical charge distribution ra r-2, r-3, e –r … Choose a spherical surface for integration Then D and ds will once again be parallel on the surface Check it out! r Other forms of charge distribution? Alan Murray – University of Edinburgh
Solid sphere of 4C, uniformly distributed r>R R Spherical charge distribution- worked example Alan Murray – University of Edinburgh
Sheet of charge Mirror symmetry Choose a surface that is symmetric about the sheet Then D and ds will once again be parallel or perpendicular on the surfaces Check it out! D, ds ` ds D Other forms of charge distribution? ` Alan Murray – University of Edinburgh
Gauss’s Law This is Maxwell’s first equation And we can have Maxwell’s second equation for free! As there is not such thing as an isolated “magnetic charge”, no Gaussian surface can ever contain a net “magnetic charge” – they come in pairs (North and South poles). Alan Murray – University of Edinburgh
