Mica said:
When you say small, what is the ratio for it? In the last case, d is constant.
As for the ratio, I'd guess L/d > 100:1 or so for air or low-value dielectrics, but that's just a SWAG. I understand that in the last example you are just shrinking one plate, while d remains constant. But sketch what happens to the fringe field to see what I mean when I say that shrinking one plate begins to invalidate the simple equation that you were using. Sketch it from the side view, with a top and bottom plate (each with length L = \sqrt{A}, separated by distance d. Draw the E field lines from the + to - plates. The E field lines are straight for the area between the plates that is near the center of the plates, and near the edges of the plates, the E field bows outward as it goes from the + plate to the - plate. At the very edge of the plates, there is even a little fringe field that bows way out to the side.
Now draw the case that you mentioned, where you shrink the top plate, say, by a factor of two horizontally. Now draw the new E-field lines. You see that there is a lot more fringe field bowing from the edges of the shorter top plate down to the wider bottom plate. Since a lot more of the E field is now not contained directly between the two plates, your original equation for C is definitely not valid.
What kind of material is with a dielectric high as 1000 to 10,000? The material with the highest dielectric constant is 10 that I know. I don't quite understand that the fringe field out in the aire is tiny? What do you mean by this?
First, you can look up typical dielectric materials used in caps to see what their dielectric constant is. I was amazed just like you when I saw the 1000-10,000 numbers. Wow. They must be some special materials, that's for sure. Just google X7R dielectric or something similar.
When I say that the external field will be tiny, it's because the field strength ratios with the dielectric constant. That means that as the dielectric constant of the material between the plates increases, the percentage of the electric field in the fringe air E-field lines versus the total decreases. The increasing of the dielectric constant between the plates effectively "focuses" more and more of the available E field in there, so less is out in the fringe field in the air. Think about the diagrams you've seen in your textbook that show how E field lines are "attracted" to a dielectric body that is placed in the air. It's the same kind of effect with magnetic field lines being bent toward ferrous metal objects placed in the air.
So, we can not amplify the voltage with variable capacitor? Right?
Actually, your original scenario works for the initial part of the increase in separation distance d. You will get an increas in V as you pull the plates apart, because Q=CV, and you are decreasing C while holding Q constant (assuming you've disconnected any external path between the plates). You just don't get a linear increase in V (or a linear decrease in C) as you keep pulling the plates apart. The change becomes less than linear with increasing d, about the time that d is not << the length of a side of the capacitor.
Make sense?
