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Resaonance and minimum SWR
On Sun, 20 Sep 2009 17:48:51 +0200, "Antonio Vernucci"
wrote: I wonder whether you could indicate us a reference where all those trade-offs are mathematically discussed. This should help: http://www.microwaves101.com/encyclopedia/why50ohms.cfm -- Jeff Liebermann 150 Felker St #D http://www.LearnByDestroying.com Santa Cruz CA 95060 http://802.11junk.com Skype: JeffLiebermann AE6KS 831-336-2558 |
Resaonance and minimum SWR
This should help:
http://www.microwaves101.com/encyclopedia/why50ohms.cfm Yes, very helpful. Thanks Tony I0JX |
Resaonance and minimum SWR
"Jeff Liebermann" wrote in message ... On Sun, 20 Sep 2009 17:48:51 +0200, "Antonio Vernucci" wrote: I wonder whether you could indicate us a reference where all those trade-offs are mathematically discussed. This should help: http://www.microwaves101.com/encyclopedia/why50ohms.cfm -- Jeff Liebermann 150 Felker St #D http://www.LearnByDestroying.com Santa Cruz CA 95060 http://802.11junk.com Skype: JeffLiebermann AE6KS 831-336-2558 Thanks Jeff, that reference does help but it gets a bit confused over matters of relative permittivity, Er. Some time ago (2005), in my work, I derived the whole lot from almost first principles. It turns out that the series conductor loss (as opposed to the shunt dielectric loss) is proportional to (1+p)/ln(p), where p is the ratio of the inside diameter of the outer conductor (D) to the outside diameter of the inner conductor, and to SQRT(Er). The minimum value of this loss is found by differentiating the function of p with respect to p and that's what gives the 76.7 ohms value for Er = 1 (it also involves a constant for copper conductors, the root frequency and 1/D). The result scales with SQRT(Er) for polythene. I should have stated the _peak_ power handling because the 30 ohms (air) value results from combination of the expression for the electric field strength and the expression for the characteristic impedance (along the lines of P = V^2/R). Minimising the field strength gives the greatest resistance to dielectric breakdown, but a different value of p results when the impedance is taken into account at the same time. Again, the result scales with SQRT(Er). The application for all this was analogue to digital terrestrial television switch over - the digital signals have much greater peak-to-mean ratios than the analogue ones, so flashover in air-spaced feeders is a potential power limitation. Chris |
Resaonance and minimum SWR
Antonio Vernucci wrote:
. . . Another interesting observation is that, at 29 MHz (i.e. where the antenna impedance is 76 + j32 ohm and the SWR on a 75-ohm cable shows the minimum value of 1.95) one can find a cable length at which the impedance appears to be purely resistive and equal to 1.95*75 = 146 ohm (or 75/1.95 = 38.5 ohm). This fact is deceiving as, seeing a purely resistive impedance, one could be led to concluding that the real antenna resonant frequency is 29 MHz, whilst in reality it resonates at 27 MHz (although knowing what is the real antenna resonant frequency may not be so important). . . . No one with a basic understanding of transmission lines would think that the frequency at which resonance occurs (X = 0) at the input end is the same frequency at which the load is resonant, except for two special cases -- if the line Z0 equals the load resistance at the load's resonant frequency, or the line is an integral number of quarter wavelengths long at the load's resonant frequency. And, as you imply, the resonant frequency of the antenna itself has no significance. Transmission lines have been used for over a hundred years for impedance matching, transforming a load of complex impedance into a purely resistive impedance of a desired value. I raised the above arguments just as a confirmation of the fact that understanding what to do before attempting to adjust antennas is not that easy. The way to begin is to gain a basic understanding of how transmission lines transform impedances. The ARRL Antenna Book is a good resource. If a person's knowledge is limited to only vague understandings of SWR and resonance, antennas and transmission lines will be a constant source of mysterious and unexpected results. Roy Lewallen, W7EL |
Resaonance and minimum SWR
Antonio Vernucci wrote:
. . . Under the assumption that dielectric loss is negligible, a permittivity 2.26 time higher than that of air results in a lower inner conductor diameter, for a given outer diameter cable and a given impedance. . . Yes, and this is why foamed dielectric cable has lower loss than solid dielectric cable. Not because of lower dielectric loss (at least below a few GHz), but because it has a larger center conductor for the same impedance and outside diameter. Roy Lewallen, W7EL |
Resaonance and minimum SWR
"Roy Lewallen" wrote in message ... Antonio Vernucci wrote: . . . Under the assumption that dielectric loss is negligible, a permittivity 2.26 time higher than that of air results in a lower inner conductor diameter, for a given outer diameter cable and a given impedance. . . Yes, and this is why foamed dielectric cable has lower loss than solid dielectric cable. Not because of lower dielectric loss (at least below a few GHz), but because it has a larger center conductor for the same impedance and outside diameter. Roy Lewallen, W7EL You've got it ... spread the word to all those amateurs who are hung up on (negligible) dielectric loss! Chris |
Resaonance and minimum SWR
"Antonio Vernucci" wrote in
: .... I raised the above arguments just as a confirmation of the fact that understanding what to do before attempting to adjust antennas is not that easy. Well, it was easier until people that don't understand the fundamentals of transmission lines got access to instruments that measure R and X, and used their new found capability to prop up the "resonant antennas work better" myth. For many common ham antenna *systems* (eg a length coax feed to a centre fed, approximately half wave dipole using an effective balun), system efficiency is best when transmission line losses are least, and minimising line VSWR is a good first cut for best efficiency. Having done that, an ATU at the tx to transform the load to that required by the tx so that it can deliver its rated power with specification linearity may be needed. If you drill down on the resonance myth, its greatest validity is that for some types of antenna systems (including the one described above), resonance delivers a low VSWR, approximately the minimum VSWR, and in those systems leads to approximately lowest line loss, resulting in best efficiency. Nothing to do with the 'technical' explanation that I heard the other day that a "resonance antenna fairly sucks the energy out of the transmitter". It is a course a fallacy that resonant antennas naturally "work better", or that resonance is a necessary condition for high efficiency. It is pointed out to me from time to time that the article that I referred you to earlier is way above the head of the average MFJ259B user, but it is my contention that you cannot realise much of the potential of the MFJ259B or the like without understanding transmission lines. VNAs are the new wave of instruments with potential exceeding typical user's desire for understanding. Owen |
Resaonance and minimum SWR
christofire wrote:
You've got it ... spread the word to all those amateurs who are hung up on (negligible) dielectric loss! Chris I've been doing what I can. I pointed it out on this newsgroup on Sept. 12, 1998, and repeat it whenever the opportunity arises. Roy Lewallen, W7EL |
Resaonance and minimum SWR
christofire wrote:
"Cecil Moore" wrote in message Moral: There is nothing magic about 50 ohms. Actually, there is something 'magic' about 50 ohms. It appears that you are using a different definition of magic from the one I was using soI'll say the same thing in different words: There is nothing supernatural about 50 ohms. -- 73, Cecil, IEEE, OOTC, http://www.w5dxp.com |
Resaonance and minimum SWR
My post below is not exactly on target for the thread, but I believe
useful. It's Sec 11.3 from Chapter 11 of Reflections, the whole of which is available on my web page at www. w2du.com. The title of the Sec is "A Reader Self-test and Minimum-SWR Resistance." Sec 11.3 A Reader Self-Test and Minimum-SWR Resistance " Everyone knows that when a 50-ohm transmission line is terminated with a pure resistance of 50 ohms, the magnitude of the reflection coefficient,, rho , is 0, and the SWR is 1:1. Right? Of course! With that in mind, here is a little exercise to test your intuitive skill. If we insert a reactance of 50 ohm in series with the 50-ohm resistance, the load becomes Z = 50 + j50. The SWR will be 2.618:1. Now for the question. With this 50-ohm reactance in the load, is the SWR already at its minimum value with the 50-ohm resistance, or will some other value of resistance in the load reduce the SWR below 2.618:1? You say the SWR is already the lowest with the 50-ohm resistance, because, after all, the line impedance, ZC, is 50 ohms? Sorry, wrong. With reactance in the load, the minimum SWR always occurs when the resistance component of the load is greater than ZC. In fact, the more the reactance, the higher the resistance required for to obtain minimum SWR. For any specific value of reactance in the load there is one specific value of resistance that produces the lowest SWR. I call this resistance the "minimum-SWR resistance." Finding the value of this resistance is easy. First you normalize the reactance, X, by dividing it by the line impedance, ZC. The normalized value of X is represented by the lower case x. Thus x = XC / ZC. Then we solve for the normalized value of resistance r, from Eq 5-1, which is repeated here. r = sqrt (x^2 - 1) Eq 5-1 Let's try it on the example above. The normalized value of 50 ohms of reactance X, is x = 1. Substituting in Eq 5-1, r = sqrt 2 = 1.414. So the true value of the minimum-SWR resistance is 1.414 x 50 = 70.7ohms. While the 50-ohm resistance yields a 2.618:1 SWR, the 70.7-ohm resistance in series with the 50-ohm reactance yields an SWR of 2.414:1. Not a great deal smaller, but still smaller than with the 50-ohm resistance. So let's try a more dramatic example, this time with a 100-ohm reactance, which has a normalized value x = 2.0. With a 50-ohm resistance, the SWR is now 5.828:1. However, with the normalized minimum-SWR resistance, r = sqrt 5 = 2.236. Multiplying by 50, we get R = 111.8 ohms. With this larger resistance in series with the 100-ohm reactance, the SWR is reduced from 5.828:1 to 4.236:1. The results of this exercise didn't turn out quite the way you expected, did it?" For further proof of this concept I suggest reviewing the remainder of this Sec using the Smith Chart, available from my web page. Walt, W2DU |
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