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Re: looking for inductance formulae that include resistance effects
Original poster: "Jim Lux" <jimlux-at-earthlink-dot-net>
----- Original Message -----
From: "Tesla list" <tesla-at-pupman-dot-com>
To: <tesla-at-pupman-dot-com>
Sent: Sunday, October 03, 2004 11:47 AM
Subject: Re: looking for inductance formulae that include resistance effects
> Original poster: "Jan Wagner" <jwagner-at-cc.hut.fi>
>
>
> On Sat, 2 Oct 2004, Tesla list wrote:
> >Original poster: "Jim Lux" <jimlux-at-earthlink-dot-net> I'm looking for
> >"handbook" type formulas (that I can put into a spreadsheet
> >fairly easily) that can calculate not only the inductance of a flat or
> >helical coil, but also the resistive loss (which, of course, will vary
with
> >frequency). Preferably not something that uses a big table of constants
> >(like Medhurst for capacitance) and not that requires running a numerical
> >integration (like INCA).
>
> If you know the tube material, dimensions, and freq, you could get a good
> estimate of the AC resistance by using the formula for skin depth. As
> derived in, for example:
>
http://www.physics.uq.edu.au/people/ficek/ph348/sols/sol12/node2.html#SECTIO
N00011000000000000000
> (and asserting that the assumptions made in the derivation are valid in
> your case too, e.g. diameter of the conductor is large compared to the
skin
> depth, etc)
Several classic assumptions in the standard formulas aren't met:
1) The diameter of the conductor is not << 1 skin depth, so the assumption
of an annular ring carrying the current isn't valid.
2) This doesn't take into account the proximity effect (current in adjacent
turns results in a current density that is not uniform around the conductor.
For instance, calculating the Q of an inductor that's, say, 10 cm in
diameter, 10cm long, with 20 turns wound with 1mm radius Copper wire, for
3.5 or 7MHz using the "tubular conductor" approximation, you get a Q of
several thousand. Since "real" coils of this dimension have Q's in the
several hundred range, there's something that's not quite right (and, it
could, in fact, be my calculations..)
>
> Is this what you were looking for? Or a more "precise" formula?
>
> cheers,
> - Jan