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Electric force exists between charges, as described by Coulomb's Law. Worked example: a line of charge with q off the end.
Our study of electricity begins with electrostatics and the electrostatic force, one of the four fundamental forces of nature. Electrostatic force is described by Coulomb's Law. We use Coulomb's Law to solve the forces created by configurations of charge.
Electrostatics deals with forces between charges. Static means the charges are not moving, or at least are not moving very fast.
How fast is "not very fast"?
When a charge moves, it generates a magnetic field, which can lead to a magnetic force. As we begin our study of electricity, we want to minimize complexity and focus just on electric force. To keep things simple, we let charges stand still, or move very slowly. So "not very fast" means motion so slow the magnetic effects are insignificant compared to the electric forces.
Charge
How do we know there is such a thing as charge? The concept of charge arises from an observation of nature: We observe forces between objects. Electric charge is the property of objects that gives rise to this observed force. Like gravity, electric force "acts at a distance". The idea that a force can "act at a distance" is pretty mind-blowing, but it's what nature really does.
Electric forces are very large, far greater than the force of gravity. Unlike gravity, there are two types of electric charge, (whereas there is only one type of gravity; gravity only attracts).
Unlike charges attract,
Like charges repel,
Force between charges: Coulomb's Law of electric force
Coulomb's Law very nicely describes this natural phenomenon. The law has this form,
Where
is the electric force, directed on a line between the two charged bodies. is a constant of proportionality that relates the left side of the equation (newtons) to the right side (coulombs and meters). It is needed to make the answer come out right when we do a real experiment. and represent the amount of charge on each body, in units of coulombs (the SI unit for charge). is the distance between the charged bodies. is a variable unit vector that reminds us the force points along the line between the two charges. If the charges are alike, the force is repulsive; if the charges are unlike, the force is attractive.
The Electric Constant, , the permittivity of free space
This notation is motivated by a theory we come across later, Gauss's Flux Theorem. There, we discover the constant
and Coulomb's Law is written in this form,
The Greek letter
This value of
or for engineering purposes, we round
The dimensions of
Example: three point charges
For our first example we use Coulomb's Law to compute the force on a charge from two nearby charges. We set up three charges on the vertices of a
Now assign some values to the charges (coulombs) and spacing (meters),
Find the force (magnitude and direction) on , the charge.
Compute the force between each pair of charges. In this example there are two force vectors to think about, {
For simplicity, we'll use
We have solved the magnitudes of the pairwise forces.
The final step is to perform a vector sum to get the magnitude and direction of the final force vector.
The force vectors form the sides of a 3-4-5 right triangle.
The magnitude of the resultant force is,
Figure out angle
Interior angles of our two triangles,
The angles of the 3-4-5 triangle come from,
Merging the triangles together shows how the angles combine (blue arrows):
The
Combining the magnitude and angle, the force
Example: line of charge with a point charge off the end
A line of charge
Find the total force on a charge positioned off the end of a line of charge.
The line contains a total charge
We define the charge density in the line as
The idea of charge density lets us express the amount of charge,
The numerator multiples the two charges,
To find the total force, add up all the forces from each little
This equation includes both
Move everything that does not depend on
And solve the integral,
The indefinite integral of a power of
Apply the limits and solve the definite integral,
Multiply each term by an identity and combine fractions,
subtract the
Substitute this solution to the definite integral back into the force equation,
leaving us with the final force equation for a line of charge and a point charge off the end ...
Some things to notice about the solution:
- The numerator is the product of the test charge and the total charge on the line, which makes sense.
- The denominator has the form
, created by a combination of distance to the near end and far end of the line. The form of the denominator emerges from the particular geometry of this example. - If the point charge
moves very far away from the line, becomes insignificant compared to , and the denominator approaches . So at great distance, the line starts to resemble a far-off point charge, and as one would hope, the equation approaches Coulomb's Law for two point charges.
We'll do a few more electrostatics problems with simple charge geometries. After that, the math gets really involved, so the common strategy with complex geometries becomes: break down the geometry into simpler versions we already know how to do, then merge the answers.
Strategies for applying Coulomb's Law
Coulomb's Law is a good choice for situations with point charges and/or simple symmetric geometries like lines or spheres of charge.
Since Coulomb's Law is based on pairwise forces between charges, when faced with multiple (more than two) point charges,
- Work out the forces between each pair of charges.
- Finish with a vector addition to merge the pairwise forces into a single resultant force.
For a situation with distributed charge, creatively model the distributed charge as a collection of point charges,
- Invent a little
representing an infinitesimal charge within the region of distributed charge. - Work out the forces pairwise between the point charge and each little
. - Sum up the forces with an integral. This is a vector sum to get the resultant force.
Related
Adding vectors - Khan Academy video
References
Kip, A. H. (1969), Fundamentals of Electricity and Magnetism (2nd edition, McGraw-Hill)
This article is licensed under CC BY-NC-SA 4.0.
Log in dheyzma saravanan 9 years agoPosted 9 years ago. Direct link to dheyzma saravanan's post “i cannot understand 3 poi...” i cannot understand 3 point charge • (11 votes) Hussain Bharmal 9 years agoPosted 9 years ago. Direct link to Hussain Bharmal's post “in the first sum with thr...” in the first sum with three charged points where • (3 votes) Caleb Ko 7 years agoPosted 7 years ago. Direct link to Caleb Ko's post “First, draw a coordinate ...” First, draw a coordinate plane with q0, the body with charge +4 C, as the origin and the distance "line" between q0 and q1 as the x-axis. Then draw the line connecting q0 and q2 onto the plane, then you would see that the angle of that line, which would also represent the repulsive force between q0 and q2, is 30 degrees below the x-axis, or -30 degrees from the terminal ray +x-axis. Similarly, if you move the coordinate plane to now center over q2 (do NOT turn the graph, x-axis should still be parallel with the auxiliary line between q0 and q1) and draw the line that represents the attractive force between q2 and q1, then the attractive force "line" should be 36.9 degrees above the +x-axis, or (+)36.9 degrees from the terminal ray. From this point, we can assume that the direction of force F12 is 36.9 degrees from the terminal ray, and the direction of F02 is -30 degrees from the terminal ray. The direction of resultant force F2 should thus be the sum of the direction of the component vectors (a property of vectors) and direction of F2 = -30(of F02) + 36.9(ofF12) = (+)6.9 degrees. (6 votes) Riley 5 years agoPosted 5 years ago. Direct link to Riley's post “"Our study of electricity...” "Our study of electricity begins with electrostatics and the electrostatic force, one of the four fundamental forces of nature." That is the first line of this article. It's kinda wrong. The electrostatic force is NOT one of the four fundamental forces. Rather its a part of one of them: electromagnetism. Can one of the higher-ups change this, please? • (3 votes) Pallavi 6 years agoPosted 6 years ago. Direct link to Pallavi's post “how is dQ=Q/L*dx?” how is dQ=Q/L*dx? • (0 votes) Willy McAllister 6 years agoPosted 6 years ago. Direct link to Willy McAllister's post “The whole line contains a...” The whole line contains a charge of Q. What if you want to know how much charge there is in 1 cm of the line? How would you figure that out? You take the linear charge density and multiply it by the length you want to know about. Q(in 1 cm) = Q/L * .01m = .02 coulomb If you imagine a little short section of the line, dx long, the charge in that little section is, Q(in dx) = Q/L * dx We give this tiny bit of charge contained in a tiny bit of line a name: dQ. dQ = Q/L * dx (6 votes) Kỳ Nguyễn 8 years agoPosted 8 years ago. Direct link to Kỳ Nguyễn's post “In the equation:∠F->2=−3...” In the equation: • (2 votes) Willy McAllister 8 years agoPosted 8 years ago. Direct link to Willy McAllister's post “Right above that equation...” Right above that equation there is a link [Triangles]. Open that up to see where the angles come from. (2 votes) Priyanshu 6 years agoPosted 6 years ago. Direct link to Priyanshu's post “Why they are adding -30+3...” Why they are adding -30+36= 6.9 make no sense to me . • (2 votes) Willy McAllister 6 years agoPosted 6 years ago. Direct link to Willy McAllister's post “The geometry of this exam...” The geometry of this example problem can be a bit overwhelming. I rewrote the example with simpler triangles here: https://spinningnumbers.org/a/three-point-charges.html There are two triangles involved in a 3-charge problem. A charge triangle, and a force triangle. They are both shown right after the text "Interior angles of our two triangles,". The -30 angle comes from the line in the charge triangle sloping down from horizontal. The +36.9 degree angle is derived from the force triangle. It slopes up. The sum of -30 + 36.9 is +6.9 degrees. If this still gives you problems please check out the article at spinningnumbers.org. Then come back here. Let me know if I can help you out. (2 votes) Justacuriousstudent 6 years agoPosted 6 years ago. Direct link to Justacuriousstudent's post “In the question about the...” In the question about the three-point charge, why isn't the angle of the resultant charge taken as 36.9 °? Why 6.9°? • (2 votes) Willy McAllister 6 years agoPosted 6 years ago. Direct link to Willy McAllister's post “The 36.9 ° angle is measu...” The 36.9 ° angle is measured upward from the line between q0 and q2, which is tilted down at 30 ° . We want to know the angle of the resultant force with respect to horizontal (0 ° ), so we have to remove that 30 ° downward tilt. 36.9 ° - 30 ° = 6.9 ° (1 vote) Dipesh Chaudhary 8 years agoPosted 8 years ago. Direct link to Dipesh Chaudhary's post “What do you have to have ...” What do you have to have to be one of those people who make robots for space missions and stuff like that? • (1 vote) APDahlen 8 years agoPosted 8 years ago. Direct link to APDahlen's post “Hello Dipesh,Passion, d...” Hello Dipesh, Passion, dedication, and hard work to become a mechanical or electrical engineer. Check out this link for my favorite electronics celebrity from down under. He recently had a lunar rover on his blog. Regards, APD (3 votes) Lina333 7 years agoPosted 7 years ago. Direct link to Lina333's post “In the first example shou...” In the first example shouldn't the direction of F12 be from q2 to q1? Why have they shown it from q1 to q2? • (1 vote) Willy McAllister 7 years agoPosted 7 years ago. Direct link to Willy McAllister's post “Your question is about th...” Your question is about the subscript notation on Force vectors. The notation I use is the first subscript is the "from" charge and the second subscript is the "on" charge. So F_12 means the force ON q2 coming from q1. The force happens to be an attraction between the two charges, so it is pulling q2 towards q1. In this problem, I'm only interested on the forces on q2 because q2 was identified as the test charge in the example. (2 votes) dena escot a year agoPosted a year ago. Direct link to dena escot's post “what is meant by permitti...” what is meant by permittivity of free space, physically? • (1 vote) Willy McAllister a year agoPosted a year ago. Direct link to Willy McAllister's post “The name of epsilon_0 is ...” The name of epsilon_0 is "permittivity of free space". This is a made-up word for an important constant. epsilon_0 is a "matching constant", or a "fudge factor" whose job it is to make the units on either side of Coulomb's Law come out with the proper balance. If you create two charges of a known amount of coulombs and hold them a known distance apart then you will be able to measure an electric force in newtons. The value of epsilon_0 nas been adjusted by physicists so that the force you compute with the equation comes out the same as the actual force nature gives you when you do the experiment. The standard SI way to write Coulombs Law is with units of coulombs, meters, and newtons. If you use other units, like centimeters and dynes, then you would use a different value of epsilon_0 such that the computation came out right for the units you were using. The word "permittivity" is intended to convey the idea that free space somehow "permits" a certain amount of electric force to exist between two charges. (2 votes)Want to join the conversation?
∠F⃗2 =−30∘ +36.9∘=+6.9∘
over here i don't understand why 30 is given -ve sign and 36.9 given a +ve sign
The amount of charge in 1 meter of line is Q/L, where L is the length of the line in meters.
Q/L is called the linear charge density of the line. It could be a value like 2 coulomb/meter.
∠F->2=−30+36.9=+6.9∘
How did you get the number -30 and 36.9 degrees?
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