Electrostatics

Electrostatics

Point Charges • As we did for masses in mechanics, we consider charges to be single points in space • Charges can be single protons, electrons, or ions, as well as larger clumps of them, or even larger surfaces that have a net positive or negative charge • Charges are measured in Coulombs (unit denoted by C). 1 C=6.242×1018 protons

Interactions Between Point Charges • Recall the gravitational force between two bodies is expressed as • Likewise the electrostatic force between two point charges is the analogous • This relation is referred to as Coulomb’s Law • The point masses in the Law of Universal Gravitation above are analogous to the point charges in Coulomb’s law

But what is k? • Lets look at Coulomb’s Law again • Since both q’s are measured in Coulomb’s, denoted by C, and the units of Force are in Newtons, the unit analysis yields • Solving for k we find that k’s units are in • Infact

Electric Fields • Near the end of his life British experimental physicist Michael Faraday suggested the idea that electric forces extend into all regions of space around a conductor or point charge • This idea was rejected by most of his contemporaries, but well accepted by the late 19th century. The work of James Clerk Maxwell, mathematically finalized these ideas.

So what are Electric Fields? • The notion is any point charge in space induces a field into the surrounding area. • A field assigns a vector to every point in space • The Electric field on its own does nothing to affect surrounding matter unless there is a net charge on said objects. • If there is a net charge on surrounding objects, then

What does it look like?

Electric Field • Electric Fields are radial, and are a function of the distance away from the charge, just like Coulomb’s Law • Electric Fields are a property of space, and don’t imply that any forces are present in a system only the potential for Forces

Superposition • Electric fields in space are the additive sum of all electric fields caused by point charges • In other words, with vector addition • Also when two point charges exist in space near each other they exert a force equal to

What does this look like?

Field Factualism • The force immediately between the two positive charges interacting for any sign charge is 0. • The field at any point in space is the sum of all fields generated by however many point charges exist in local space • Electric fields are conservative, that is , like the gravitational field they obey

Fundamental Theorem • Conservative Force fields possess a unique potential energy function U(r) such that • Remember when change in potential energy is positive, work is negative and visa versa • Lets examine some examples

The integral and you • In order to do anything in electromagnetism we need to be able to integrate, or at least know • Remember with a conservative field the special function U(r) determines potential energy, independent of path– if you know it you will go far!

Potential Changes • Remember total energy is constant • Two positive charges moving away from each other like so Experience a potential change of

Signs • This negative change in potential indicates a decrease in potential energy as the negative charges move away form each other and an increase in kinetic energy • Think of a ball rolling down a hill– it becomes faster the farther it falls in height, but it has less potential to continue rolling, as it is approaching the bottom of the hill

Potential Changes • Remember total energy is constant • One positive and one negative charge moving away from each other like so Experience a potential change of

Signs • This positive change in potential energy is because we are forcing apart positive and negative charges– the system stores energy much like a spring • As the charges are allowed to come together due to their attraction, potential energy is changed to kinetic energy

Potential Energy and Work • Two positive charges coming together • Two positive charges moving apart • One positive and one negative charge moving apart • One positive and one negative charge moving together

The Potential Function • Remember, all conservative fields have a “magic” function U(r) which induces path independence • U(r) however is dependent on the point charge being analyzed • We wish to generalize a function that is applicable to all charges • This function exists at all points in space due to a point charge and is called the Potential Function

The Mathematics • The mathematics are similar to what we have done before– • The conclusion we have basically arrived at is

Potent Potentials • So the potential function, that exists at all points in space r distance from a point charge is • Notice that for a negative charge we have negative potential values, for a positive charge we have positive ones • By CONVENTION we dictate that • This is convention because we could have chosen another integration constant which would have changed

Breaking It down

Problem Solving Particulars • Observe the following fixed charge arrangement • In the middle

Problem Solving Particulars • This means that if one of the charges were released they would be pushed to a point very far away eventually reaching speeds of

Problem Solving Particulars • Now lets look at the electric field • By superposition, • Observe that the force vectors oppose each other for Diagonal Q charges, so E=0 In the middle.

Problem Solving Particulars • More mathematically speaking

What does it mean? • This means that any charge -q placed at the middle of the square would experience 0 force but have a potential energy of • Think of a ball sitting on top of a hill any push will cause it to fall • It will lose potential energy and gain kinetic

What does it mean? • This means that any charge q placed at the middle of the square would experience 0 force but have a potential energy of • Think of a ball resting in a hole • A push will cause it to oscillate in the hole unless its enough to allow it to escape

Class problem solving • Draw the potential function in the middle of the two charges here versus the Y axis, and mathematically create the potential function U(x,y) in terms of x and y. Also find E(y).

Answers Aplenty • So each charge contributes exactly to the potential function • Remember the • In this case each charge has a distance of to the y axis at any point y. Then by superposition You can see that as y becomes larger the potential gets smaller. Therefore minimum potential occurs at V(y=0)

Answers Aplenty • This Potential function then looks a lot like a hole • The potential energy function however for a particle with charge +Q or –Q however depends on the charge of Q. After all • So for a positive Q, placed in the middle, the potential energy function is like a hole in the ground • For a –Q charge, the potential energy function is like a hill

More Answers Aplenty • We can easily find the electric field along the y axis with the potential function we have created– after all • This only talks about the electric field as a function of y (along the y axis only) • Notice E=0 at the origin since y =0. (the charges field contributions cancel each other out)

More Answers Aplenty • We can also easily determine where the electric field is pointing. Since fields point toward negative charges, in the +y values it points down, and in the –y values it points up

More Classwork • Explain what occurs if I were to release a negative charge of –q at the origin, with velocity of 2m/s in the +y direction. What speed in terms of a would it reach when it is very far away?

More Answers • A –q charge released at the origin with velocity 0 would not move– since we have velocity of however, the negative charge will feel a net upward force, and

So we have that the total energy change as the negative charge moves from the origin to infinity is • Since total energy is constant under only conservative forces then

Yet More Classwork • For the fixed charge arrangement below take the middle of the arrangement to be the origin • Find the following -The electric field at the origin -The potential at the origin -The behavior of a +1C charge Placed at the origin -The acceleration of such a charge at the Origin.

Vector Sums • First find the E field from each charge individually. Recall that • The angles in a square are all 45 degrees so

Potential at the Origin • The potential function also obeys superposition so • Remember this is NOT a vector. Electric field IS a vector.

Point Charge Behavior • The force on a 1C point charge placed at the origin would be the following • The magnitude of this force is or • The acceleration is just a=F/m, for whatever mass we have • The charge will simply collide with the -1.1 C charge

AP Problems • We will now work on some simple AP problems regarding the above material

Electrostatics

Electrostatics

Presentation Transcript

Electrostatics

Electrostatics

Electrostatics

Electrostatics

Electrostatics

Electrostatics

Electrostatics

Electrostatics

Electrostatics

Electrostatics

Electrostatics

Electrostatics

Electrostatics

Electrostatics

Electrostatics

Electrostatics

Electrostatics

Electrostatics

Electrostatics

Electrostatics

Electrostatics