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==History== | ==History== | ||
Johann Carl Friedrich Gauss (1777-1855), born in Germany, discovered Gauss's Law (Gauss's Flux Theorem) that relates to distribution of electric charge to the resulting electric field on closed surface in 1835 (published in 1867), which was discovered earlier by Lagrange in 1762. His equation is one of the four of Maxwell's Equation, and other are Faraday's Law of Induction and Ampere's Law. In addition, Gauss's Law can be used to derive Coulomb's Law which describes electrostatic interaction between electrically charged particles. | |||
== See also == | == See also == |
Revision as of 08:55, 1 December 2015
Claimed by Jinho Hah
Patterns of Field in Space
The two major components in Physics II are interactions between electric fields and magnetic fields. This broad subject focuses from a simple topic, electric fields to a much complex idea, electromagnetic radiation. Though this course is very broad in terms of materials that it covers, each topic is very important in understanding the phenomena of electric and magnetic interactions between particles (protons, electrons, dipoles, point charge, capacitor, and, etc), as omitting one concept out of hundreds of concept could lead one approaching the problem differently. This Wiki Page will discuss Chapter 21 of the Matters and Interactions Text Book, 4th edition (Patterns of Field in Space), specifically Gauss's Law and Electric Flux. In order to understand these concepts, one first need to understand the definition of electric field and know each component of Gauss's Law.
Electric Flux
"Electric Flux" is a quantitative measure of the amount and direction of electric field over an entire surface of a specified object. There are two components in electric flux: direction of the electric field and magnitude of the electric field. These two sums up and give us the value, electric flux, which has a unit of Vm. In order to determine the direction of the electric field of an object, one need to figure out the x,y,z coordinates of the faces of an object and then calculate the normal vector that comes out of the surface. Secondly, to determine the direction of the electric field of an object, one first need to know the number of dimensions of an object (i.e: 6 faces in a rectangular prism) and areas for each face of the object. Finally, one should be able to calculate the electric flux of an object by multiplying the electric field at a location on each surface of the box by corresponding normal vector and multiplying this value by the area of the surface that was just calculated. One must repeat this process the remaining surfaces (faces) and by adding up all electric flux, that will be the electric flux of the object one wanted to calculate. This value is essential because it will be useful for calculating total charged enclosed inside the object later on. The above written method of calculating electric flux may be confusing at first, but knowing the Gauss's Law, being able to apply this Law to the real problem, and by going through the example below should make sure understanding of this concept.
Gauss's Law
The Gauss's Law simplifies definition of "Electric Flux" into a one simple equation.
A Computational Model
How do we visualize or predict using this topic. Consider embedding some vpython code here Teach hands-on with GlowScript
Examples
Be sure to show all steps in your solution and include diagrams whenever possible
Simple
Electric flux on the disk, by using Gauss's Law, is the multiplication between Electric Field normal to the disk's surface and surface area of the disk.
Electric Field Normal to the Surface: E x sin(40) = 327 V/m x sin(40)
Surface Area of the disk: 3.14 x 0.02 x 0.02 m^2
Electric Flux on the Disk: 327 V/m x sin(40) x 3.14 x 0.02 x 0.02 m^2 = 0.264 Vm
Middling
The electric field has been measured to be vertically upward everywhere on the surface of a box 20 cm long, 4 cm high, and 3 cm deep, shown in the figure. All over the bottom of the box E1 = 1100 V/m, all over the sides E2 = 950 V/m, and all over the top E3 = 750 V/m.
Since E1, E2, and E3, are all measured to be vertically upward everywhere on the surface of a box, only the bottom surface and the top surface will be focused (multiplying the normal vector of other surfaces than the bottom and top surfaces will result in zero electric flux). The normal vector of the bottom surface is known to be <0,-1,0> and that of the top surface is known to be <0,1,0> assuming vertically upward is in +y direction.
E1 = <0, 1100, 0> V/m, E2 = <0, 950, 0> V/m, E3 = <0, 750, 0> V/m,
E1 corresponds to the bottom surface according to the diagram. Multiplying vector E1 with its normal vector of the bottom surface equals -1100 (dot product), and multiplying this vector by the area equals -1100 V/m x 0.20 m x 0.03 m = -6.6 Vm.
E3 corresponds to the top surface according to the diagram. Multiplying vector E3 with its normal vector of the top surface equals 750 (dot product) and multiplying this vector by the area equals 750 V/m x 0.20 m x 0.03 m = 4.5 Vm.
Therefore, the sum of the electric flux in this box equals -6.6 Vm + 4.5 Vm = -2.1 Vm
To determine the amount of charge enclosed by the box, we use Gauss's Law. Since we know the sum of the electric flux, in order to find q (inside the box) we just have to multiply summed electric flux and epsilon naught (8.85 e-12 unit)
Total Charge: -2.1 x 8.85 x 10 ^ (-12) = -1.8585 x 10 ^ (-11) C
Difficult
To calculate the electric flux you will have to know the normal vector or the electric field in normal direction of each side of the cube.
There are only two sides affecting the net electric flux on this cubical surface, bottom face and right-handed side face (rest will be zero).
Normal Electric Field (Bottom Face): E1 x sin(27) = 400 V/m x sin(27) x 0.35m x 0.35m = 22.2455 Vm
Normal Electric Field (Right-Handed Side Face): E1 x sin(27) = 400 V/m x sin(27) x 0.35m x 0.35m = 22.2455 Vm
Net Electric Field = 44.49 Vm
Net Charge inside the cubical surface = 44.19 Vm x 8.85 x 10 ^ (-12) = 3.94 x 10 ^ (-10) C
Connectedness
I am majoring in Materials Science and Engineering and going further on from Electric Flux, there is a way to calculate Electric Flux Density (D). To obtain D, you have to multiply epsilon (permittivity) of the material to the Electric Field, E. Of course, different materials will have different Electric Flux. For example there are three major types of materials: insulator, semi-conductor, and conductor. Depending on their uses, you would want to make sure that the material of the desired product does not contain electric flux due to excess charge on the surface. This is the reason that electric flux and total charge of the closed surfaced objects are useful when as an engineer you want to think what type of properties you would desire for your product.
History
Johann Carl Friedrich Gauss (1777-1855), born in Germany, discovered Gauss's Law (Gauss's Flux Theorem) that relates to distribution of electric charge to the resulting electric field on closed surface in 1835 (published in 1867), which was discovered earlier by Lagrange in 1762. His equation is one of the four of Maxwell's Equation, and other are Faraday's Law of Induction and Ampere's Law. In addition, Gauss's Law can be used to derive Coulomb's Law which describes electrostatic interaction between electrically charged particles.
See also
The related topic can be the derivation of electric field of a point charge using Gauss's Law -- by calculating electric flux for a 2-Dimensional circular surface.
Further reading
Books, Articles or other print media on this topic
Electric Field and Gauss's Law
External links
Internet resources on this topic
References
Chabay, Ruth W. Matter and Interactions Volume II: Electric and Magnetic Interactions. Hoboken, NJ: Wiley, 2015. Print.
"Electric Flux Density." SpringerReference (2011): n. pag. Web. 1 Dec. 2015. <http://www.colorado.edu/physics/phys1120/phys1120_sp08/notes/notes/Knight27_gauss_lect.pdf>.
"WebAssign." WebAssign. N.p., n.d. Web. 01 Dec. 2015. <http://webassign.net/>.