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Richard Harrison wrote:
Cecil, W5DXP wrote: "Triactuatedmulticomplicator" or TAMC for short." I have a suggested update: "Triactuatedmultiuncomplicator", or TAMU for short. Richard, when I was there in the 50's, it was TAMC. My '59 graduation ring says "A&M College of Texas". Trivia note: At that time, Texas University was a branch of the Texas A&M system. Gig 'Um! -- 73, Cecil http://www.qsl.net/w5dxp -----= Posted via Newsfeeds.Com, Uncensored Usenet News =----- http://www.newsfeeds.com - The #1 Newsgroup Service in the World! -----== Over 100,000 Newsgroups - 19 Different Servers! =----- |
I find this most interesting. As a P.E. licensed by the state of Oregon
(since 1981), I'm aware that I'm subject to state laws governing the code of conduct of Professional Engineers, and all other applicable state laws. I didn't realize that I had legal obligations to NIST, or that any other federal agency has requirements for P.E.s of all states. Would you please provide some reference where I can further research this obligation and the rules it has imposed that I'm legally required to comply with? Roy Lewallen, W7EL, P.E. Richard Clark wrote: . . . Strictly speaking from the point of legality, it is demanded of Professional Engineers by the National Institutes of Science and Technology (what was called the National Bureau of Standards or NBS years ago). This means that ANY P.E. that describes a physical relation that does not conform to these scientific concepts, and damage results to that Professional Engineer's customer, then that P.E. is liable in a court of law. This form of legality is the whole point of being P.E.s and the government making the demand that P.E.s be part of describing engineering codes and performing design review. . . . |
On Tue, 19 Aug 2003 14:47:58 -0700, Roy Lewallen
wrote: I find this most interesting. As a P.E. licensed by the state of Oregon (since 1981), I'm aware that I'm subject to state laws governing the code of conduct of Professional Engineers, and all other applicable state laws. I didn't realize that I had legal obligations to NIST, or that any other federal agency has requirements for P.E.s of all states. Would you please provide some reference where I can further research this obligation and the rules it has imposed that I'm legally required to comply with? Roy Lewallen, W7EL, P.E. Hi Roy, I am wholly unaware of the full scope of your business and contracts and I have no interest, nor do I think you would volunteer that information. I cannot recall a single instance of your relating any experience of yours that revolved around the matters I have discussed, nor any matters that were professional beyond your product. I cannot imagine that your product enters into matters of traceability or authority when I have seen your disclosures that explicitly remove yourself from liability: Legal Disclaimer The licensee ("Licensee" or "User") acknowledges that the reliability of any and all results produced by this software are not precise and are subject to significant levels of variability. .... LICENSOR HEREBY DISCLAIMS ANY AND ALL WARRANTIES OF MERCHANTABILITY OR FITNESS FOR A PARTICULAR PURPOSE. 73's Richard Clark, KB7QHC |
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Good day Richard,
You have picked an example that simply has different representations for power. I do not believe there has been any dispute about whether conversions between different units of power are valid; they are. The general question is: if two things can be simplified to the same set of units are they the same thing. At least two counter examples have been offerred to demonstrate that just because two things have the same units, they are not the same. Torque is not work; though they both have N-m as their units. Modulus of elasticity is not stress; though they are both expressed as Pascals (after simplification). This seems sufficient to prove that two things with the same units are not necessarily the same. It leaves open the question as to how does one know whether two things with the same units are the same (or not); a much more challenging problem, I suspect. ....Keith Richard Clark wrote: On Tue, 19 Aug 2003 14:35:55 -0400, wrote: While I don't know whether they are the same or not (and opinion seems divided), it is clear that arguing that they are the same because the units (after simplification) are the same is quite falacious. On the other hand if the units were different, it would be clear that they are not the same. ...Keith Hi Keith, Lets just observe a simple, real situation that any Ham may be faced with during a power black-out, or during Field Day. Take for instance a generator. It can give you 1KW of power. You need a gas powered engine to turn the generator. How much horsepower do you need? The common exchange is 746W per HP for 100% efficient transformation. Thus you need at least 1.34 HP to obtain that kilowatt. What is a horsepower (certainly one of the most ancient of units) compared to these Watts (a relatively modern unit by comparison)? Is there a direct correlation between the power of a horse, and the power of a generator? Yes. First, a word about multiplication by identities. An identity may also be known in this forum as a conversion factor. One such simple example is time conversion from seconds to minutes and back through: (1 · minute) = (60 · second) the identity is a simple division by one side or the other to leave 1. A division by minute is a possibility for one identity: 1 = (60 · second) / (1 · minute) equally valid would be to divide both original sides by (60 · second): (1 · minute) / (60 · second) = 1 you can confirm there is no hanky-panky by observing the common expectation that both sides of the equation describe the same thing, thus the identity of (1) over (1) equals 1 --- both times. In other words, the identity describes the same thing by different terms, and those terms are combined to offer a value of 1 (dimensionless). The process of employing multiplication by 1 (performed below) through the use of identities with the time example described above (meaning you have converted to a form of x = 1 or 1 = x) allows for us to combine and clear terms in shifting from one basis of measurement to another. To return to our query about the generator and the engine, 1 Horsepower is 33,000 ft-lb/minute. In the old days, a horse had to pull against a known load for a know period of time over a known distance to arrive at this common reference. The popular definition will allow you to see these units already in place: 33,000 · foot · pound / minute We begin our trip towards the S of MKS through Units conversions, by casting out minutes with the time identity multiplying this value: 33,000 · (foot · pound / minute) · (1 · minute) / (60 · s) Clearing those terms leaves us with: 33,000 · foot · pound / (60 · s) or 550 · foot · pound / s when the minute terms are canceled and the equation has been corrected to using seconds. [I hope many recognize this alternative conversion factor. It proves that nothing is lost through these conversions.] Next we move toward the K of MKS by casting out pounds: 550 · (foot · pound / s) · (1 · kg / 2.205 · pound) This would be tempting to perform, but it would be absolutely wrong! As far as the expression of power in the original statement goes, the identity of pounds and kilograms is incorrect. This is because kilograms express mass and pounds express weight, which is the product of mass times the acceleration due to gravity. The pounds do cancel in the equation above, but the statement is incomplete and should be: 550 · (foot · pound / s) · (1 · kg / 2.205 · pound) · (9.807 · m / s²) Combining and casting out terms leaves us with: 2446 · foot · m · kg / s³ Finally, to complete the progress towards MKS, we move toward the M of MKS by casting out foot using the length identity: 2446 · foot · m · kg / s³ · (0.3048 · m) / (1 · foot) Combining and clearing terms leaves us with: 745.5 · m² · kg / s³ THIS is the NIST definition for power, but as such it may be unfamiliar to many (certainly given the angst and denial that attends this discussion). For the comfort of many, we draw in another identity that comes closer to expectations. That is the identity of Power (also in MKS terms) that reveals itself as joules per second, or newton-meters per second: (1 · Watt) = (1 · kg · m / s²) · (m) / (s) or (1 · Watt) = (1 · kg · m² / s³) whose identity becomes (1 · Watt) / (1 · kg · m² / s³) = 1 We apply this to the power equation above: 745.5 · (m² · kg / s³) · (Watt) / (kg · m² / s³) which (guess what?) reduces to: 745.5 Watts QED Rounding introduced 0.5 Watt error (the values provided by NIST to their complete precision would eliminate that). It also confirms what we already knew, but few could prove with a linear exercise like this. That's not uncommon however, because few deal with the Physics of the terms they are familiar with, this is the provence of the Metrologist and research scientists, not amateurs. It is enough to say Watts and Horse Power exhibit a constant of proportionality, but it is wholly wrong to say that electrical Watts are somehow different from an animal's work expended over time. It is equally in error to maintain that the resistance or Z of free space is somehow remote and different from the resistance of a carbon composition resistor or Radiation Resistance. ALL terms employed in the expression of permittivity and permeability conform to these same linear operations that prove they are congruent. 73's Richard Clark, KB7QHC |
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"Dr. Slick" wrote:
wrote in message ... Actually, you've done 2*pi*radius*force work. Moving one circumference times the force. Actually, thats 2*pi*radius*force*moment arm. Right. In my example, I intended the 'radius' to be the radius at which the force was applied so the 'moment arm' was already accounted for. When the radius is the radius at which the force is applied, 2*pi*radius is the distance through which the force has acted after one revolution so the expression is the same as the common force*distance used for linear work. More generally, it does not matter what the shape of the path is; the work is always the force times the distance along the path. ....Keith |
Richard Clark wrote in message . ..
It leaves open the question as to how does one know whether two things with the same units are the same (or not); a much more challenging problem, I suspect. ...Keith You will note that this bears no relation to ohms being different, because as you observed with the horsepower example, it is simply flipping through translations until you hit the units you want. 73's Richard Clark, KB7QHC I don't think anyone here is arguing that a wave traveling through a transmission line is the same as an EM wave traveling through free-space. But as Richard has shown, the units are always the same, as they should be. Just like a meter is still a meter, whether it is in torque or work. But it tells you something about what you are measuring, and the clue is that the E field is defined by the voltage potential field, and the H field by amps (turns). And if the permittivity (impedance) of the material surrounding an antenna will affect it's input impedance, i think it's something to consider. Slick |
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