Physics17GaussLaw.pptx

1、Chapter 17 Gauss LawMain Points of Chapter 17 Electric flux Gauss law Using Gauss law to determine electric fields17-1 What Does Gauss Law Do?Consider the electric field lines associated with a point charge QHow many field lines pass through the tissue forming a sphere？All the lines(12).All the line

2、s(12).If the sphere is displaced?Suppose the tissue is some shape other than spherical,but still surrounds the charge.All the field lines still go through.Now,imagine the paper is crinkled and overlaps itself;how shall we deal with the lines that pierce the tissue three times?Notice that they go out

3、 twice and in once if we subtract the“ins”from the“outs”we are left with one line going out,which is consistent with the other situations.The number of field lines penetrating a surface is proportional to the surface area,the orientation,and the field strength.In the electric field,the number of ele

4、ctric field lines through a curved surface A is defined as electric flux.Like how many hairs passing through your scalp.1.Electric flux for uniform electric field En ifthenis normal to the surfaceWe can define the electric flux through an infinitesimal area:A finite plane uniform electric field2.Gen

5、eral definition of electric flux3.Electric flux through a closed surfaceThe direction ofunclosed surface:choose one side Outward:positiveClosed surface:Inward:negativeThe electric flux through a closed surface is the sum of the electric field lines penetrating the surface.If the electric flux is pos

6、itive,there are net electric field lines “out of”the closed surface.If the electric flux is negative,there are net electric field lines “into”the closed surface.The closed surface does not have to be made of real matter.The imaginary surface is a Gaussian surface n Act Imagine a cube of side a posit

7、ioned in a region of constant electric field as shown below.Which of the following statements about the net electric flux F Fe through the surface of this cube is true?(a)F FE =0 0(b)F FE 2a2 2(c)F FE 6a2 2aaR2Rn Act Consider 2 spheres(of radius R and 2R)drawn around a single charge as shown.Which o

8、f the following statements about the net electric flux through the 2 surfaces(F F2R and F FR)is true?(a)F FR F F2RLook at the lines going out through each circle-each circle has the same number of lines.RExample:Calculate the electric flux of a constant electric field through a hemispherical surface

9、 of radius R whose circular base is perpendicular to the direction of the field.dlrSolution Consider an infinitesimal strip at latitude RA1Alternative Solution A2Consider a closed surface that consists of the hemisphere and the planar circlenAct A nonuniform electric field given by What is the elect

10、ric flux through the surface of the Gaussian cube shown in figure below?RrqS Sn Act a point charge q is placed at the center of a sphere of radius of R.Calculate the electric flux through a circular plane of radius r as shown below.the electric flux of the closed spherethe electric flux of any close

11、d surface t surrounding the q?1.for a point charge+qqSuppose a point charge q is at the center of a sphere，the electric flux of a spherical surfacer17-2 Gauss Law But the result would be the same if the surface was not spherical,or if the charge was anywhere inside it!+qSuppose a point charge q is o

12、ut of an arbitrary closed surfaceFor the field of point charge,the total electric flux through a closed surface is only related to the total(net)electric charge inside the surface.2 for multiple point chargesq1q2qiqnqj e of an arbitrary closed surface 3 for continuous charge distributionsGauss lawTh

13、e total electric flux through a closed surface is equal to the total(net)electric charge inside the surface,divided by .Gausss law provides a relationship between the electric field on a closed surface and the charge distribution within that surface.We can quickly generalize this to any surface and

14、any charge distribution;DiscussionElectric field Lines leave(+)charges Electric field Lines return to(-)charges Electric field Lines never discontinue in empty space is the electric field at each point on the surface produced by the total electric charge，eis connected to the algebraic sum of charges

15、 enclosed by the surface.with sourcewith sinkwithout source or sinkn ACT If a closed surface surrounds a dipole,the net flux through the surface is zero.TRUE n ACT If the net flux through a closed surface is zero,then there can be no charge or charges within that surface.FALSE n Act A full Gaussian

16、surface encloses two of the four positively charged particles.a)Which of the particles contribute to the electric field at point P on the surface.b)Determine the electric flux through the surface.c)If I change the position of q4 outside the surface,Does Ep change?How about the electric flux?+q1+q2+q

17、4+q3Pa)The four particlesc)Ep changesdoesnt changen Act Consider a point charge q placed in the center of a cube.Determine the electric flux through each face of the cube.qSqIf the charge is placed at a corner of the cube,what is the electric flux through surface SPut the charge in the middle of a l

18、arger cuben Example There is an electric field near Earths surface of about 100N/C that points vertically down.Assume this field is constant around Earth and that it is due to charge evenly spread on Earths surface.What is the total charge on the Earth?Solution the total chargechoose a concentric sp

19、here ofradius R for Gaussian surface4.Coulombs Law and Gauss LawCoulombs Law+Superposition of electric fieldGauss LawNow we use Gauss Law to get the distributionof electric field for a point charge.qAlthough E varies radially with distance from q,it has the same value everywhere on the spherical sur

20、face Draw a concentric spherical Gaussian surface of radius rGauss law and Coulombs law,although expressed in different forms,are equivalent ways of describing the relation between electric charge and electric field in static situation.Gauss law is more general in that it is always valid.It is one o

21、f the fundamental laws of electromagnetism.17-3 Using Gauss Law to determine Electric Fields Gausss law is valid for any distribution of charges and for any closed surface.However,we can only calculate the field for several highly symmetric distributions of charge.The steps of calculating the magnit

22、ude of the electric field using Gauss law(1)Identify the symmetry of the charge distribution and the electric field it produces.*(2)Choose a Gaussian surface that is matched to the symmetry that is,the electric field is either parallel to the surface or constant and perpendicular to it.(3)Calculate

23、the algebraic sum of the charge enclosed by the Gaussian surface.(4)Find the electric field using Gausss law.nExample:Determine the electric field of an infinite uniformly charged line.The charge density per unit length:+SolutionSolution we use as our Gaussian surface a coaxial cylinder surface with

24、 height l rrEl Could we use Gauss law to find the field of a finite line of charge?What is the electric field of an infinite uniformly charged thin cylindrical shell?What is the electric field of an infinite uniformly charged cylinder?nAct Two long thin cylindrical shells of radius r1 and r2 are ori

25、ented coaxially.The charge density are .What is the electric field?SolutionnExample:Determine the electric field both inside and outside a thin uniformly charged spherical shell of radius R that has a total charge Q.RSolutionFrom Gauss law+outside the sphere(r R)inside the sphere(r 0.C)is zero.D)is

26、half of what it would be if only the point charge were present.E)cannot be determined q q1 1q q2 2r r1 1r r2 2OOnAct:A nonconducting spherical shell of radius R is uniformly charged with total charge of Q.We put point charges q1and q2 inside and outside spherical shell respectively.Determine the ele

27、ctric forces on the point charges.right outside the sphere(r R)inside the sphere(r R)r inside the sphere(r R)REOr+rnExample:Find the electric field outside and inside a solid,nonconducting sphere of radius R that contains a total charge Q uniformly distributed throughout its volume.Solutiontake a co

28、ncentric sphere of radius r for Gaussian surface nACT Figure below shows four spheres,each with charge Q uniformly distributed through its volume.(a)Rank the spheres according to their volume charge density,greatest first.The figure also shows a point P for each sphere,all at the same distance from

29、the center of the sphere.(b)Rank the spheres according to the magnitude of the electric field they produce at point P,greatest first.a,b,c,da and b tie,c,dP PProof:+Consider a point P in the cavityThe e-Field produced by+r r sphere at p The e-Field produced by-r r sphere at p -nExample:A uniformly c

30、harged nonconducting sphere has volume charge density .Material is removed from the sphere leaving a spherical cavity.Show that the electric field through the cavity is uniform and is given by where a is the distance of the centers of the two spheresReplace the sphere-with-cavity with two uniform sp

31、heres of equal positive and negative charge densities.(a)Replace the spherical shell-with-hole with a perfect spherical shell and a circle with equal negative surface charge densities.n ACT A thin nonconducting uniformly charged spherical shell of radius R has a total charge of Q.A small circular pl

32、ug is removed from the surface.(a)What is the magnitude and direction of the electric field at the center of the hole.(b)The plug is put back in the hole.Using the result of part(a),calculate the force acting on the plug.RQSolutionRQdq(b)The“electrostatic pressure”(force per unit area)tending to exp

33、and the sphereSolution To take advantage of the symmetry properties,we use as our Gaussian surface a cylinder with its axis perpendicular to the sheet of charge,with ends of area S.The charged sheet passes through the middle of the cylinders length,so the cylinder ends are equidistant from the sheet

34、.xOExnExample:Find the electric field outside an infinite,nonconducting plane of charge with uniform charge density s sn ACT Nowhere inside(between the planes)an odd number of parallel planes of the same nonzero charge density is the electric field zero.TRUE n Act Consider two infinite parallel char

35、ged plates with surface charge density of s s1and s s2respectively.What is the electric field in the three regions.IIIIIIxOutside the slabInside the slabSolution The Gaussian surface is shown in the figure dSSdxxOExnExample:Find the electric field of a slab of nonconducting material forming an infin

36、ite plane.It has thickness d and carries a uniform positive charge density *Find the distribution of charge according to the electric field（Differential form of Gauss Law）Gauss lawWe now apply Gauss divergence theorem If a closed surface S encloses a volume V then the surface integral of any vector

37、over S is equal to the volume integral of the divergence of over V This is Gauss law for electric fields in differential form.It is the first of Maxwells equations.As this is true for any closed surface the result requires that at every point in space The formulas for the divergence of a vectorCarte

38、sian coordinatesSpherical coordinatesCylindrical coordinatesn Example The electric field of an atom is Find the distribution of charge of this atomSolutionAtom is neutralr r r rr+drr+drr+drr+drAlternative Solution The charge density should be r r(r).We take a concentric spheres for Gaussian surface Summary of Chapter 17 Electric flux due to field intersecting a surface S:Gauss law relates flux through a closed surface to charge enclosed:Can use Gauss law to find electric field in situations with a high degree of symmetry