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Hull speed theory?
I have seen lots and lots of references to the formula "X times
square root of waterline length" as defining hull speed with X normally about 1.3 (speed in knots, length in Imperial feet.) However, I have never seen an explanation of this. Pictures of boats "trapped" between their bow and stern waves seem to make sense. But they do not explain why a long wave would travel faster than a short one. Surely there is a book with the theory? Thank you, Sakari Aaltonen |
Hull speed theory?
It is not uncommon in nature for waves of different wavelength to have
different speeds. Light waves in transparent media have slightly different wavelength dependent speeds, which leads to dispersion into the spectrum by prisms. The derivation of the dispersion relationship for gravitational surface waves on fluids is somewhat complex and not obvious. It is found in many fairly advanced mechanics texts. You will need to go to a college or university library to find it. The result: wave speed is 1.3 times sq rt of wavelength, where the 1.3 is a combination of the gravitational constant and water density. Brent www.bensonsails.com From: (Sakari Aaltonen) Organization: Helsinki University of Technology Newsgroups: rec.boats.building Date: 16 Jul 2003 05:54:55 GMT Subject: Hull speed theory? I have seen lots and lots of references to the formula "X times square root of waterline length" as defining hull speed with X normally about 1.3 (speed in knots, length in Imperial feet.) However, I have never seen an explanation of this. Pictures of boats "trapped" between their bow and stern waves seem to make sense. But they do not explain why a long wave would travel faster than a short one. Surely there is a book with the theory? Thank you, Sakari Aaltonen |
Hull speed theory?
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Hull speed theory?
Sakari, there is a Usenet group that discusses hydrodynamics but I can't
remember the exact name. The word "fluid" was part of it. -- Jacques http://www.bateau.com "Sakari Aaltonen" wrote in message ... In article , Brent Benson wrote: The derivation of the dispersion relationship for gravitational surface waves on fluids is somewhat complex and not obvious. It is found in many fairly advanced mechanics texts. You will need to go to a college or university library to find it. No problem - I work at a university. Can you name one book? Thank you, Sakari Aaltonen |
Hull speed theory?
sci.engr.marine.hydrodynamics - but this is not very active.
However, you might find what you need by doing a Google search in the "Groups" section for "hull speed". There was a large tread about hull speed in rec.boats.builder a couple years back. You'll find more opinions than you ever wanted... Regards, Don Donald M. MacPherson VP Technical Director HydroComp, Inc. email: http://www.hydrocompinc.com tel (603)868-3344 fax (603)868-3366 "Jacques Mertens" wrote in message .. . Sakari, there is a Usenet group that discusses hydrodynamics but I can't remember the exact name. The word "fluid" was part of it. -- Jacques http://www.bateau.com |
Hull speed theory?
In article ,
D MacPherson wrote: sci.engr.marine.hydrodynamics - but this is not very active. However, you might find what you need by doing a Google search in the "Groups" section for "hull speed". There was a large tread about hull speed in rec.boats.builder a couple years back. You'll find more opinions than you ever wanted... Thanks, but I'm not looking for _opinions_, really. I went to the library today and found quite a number of books on fluid dynamics. Some had sections on surface waves; the mathematical derivation shows, indeed, that the propagation speed of such a wave is directly proportional to the square root of the wavelength. I'll need some time to work through that derivation...:-) Sakari Aaltonen |
Hull speed theory?
Sakari Aaltonen ) writes: Thanks, but I'm not looking for _opinions_, really. I went to the library today and found quite a number of books on fluid dynamics. Some had sections on surface waves; the mathematical derivation shows, indeed, that the propagation speed of such a wave is directly proportional to the square root of the wavelength. I'll need some time to work through that derivation...:-) well, you start with V = N x L where V = wave velocity, N = frequency of vibration, and L = length of wave. that dosn't give you the square root of wavelength, but something about the boat sitting down into the wave trough gives an equation with boat length (water line length) as a factor but darned if I remember how. I've seen it in one or two library books but never wrote it down. you'll have to post the derivation so its preserved in the newsgroup archives for all time. -- ------------------------------------------------------------------------------ William R Watt National Capital FreeNet Ottawa's free community network homepage: www.ncf.ca/~ag384/top.htm warning: non-freenet email must have "notspam" in subject or its returned |
Hull speed theory?
"X times square root of waterline length" as defining hull speed with X
normally about 1.3 (speed in knots, length in Imperial feet.) However, I have never seen an explanation of this. What confuses me is the variability of the 1.3 value depending on the source. |
Hull speed theory?
How about the Pierre Gutelle book?
I have it in french but it is available in english, Wooden Boat sells it. I found all the math theory about wave resistance with formulas in the 2nd chapter then, it is applied in chapter 5. He also shows a good bibliography listing many papers and books about wave resistance. Gutelle may give you all the answers you are looking for. You'll see why that hull speed formula is very crude. The French title is "Architecture du Voilier", volume 1 of 3. -- Jacques http://www.bateau.com "Sakari Aaltonen" wrote in message ... In article , D MacPherson wrote: sci.engr.marine.hydrodynamics - but this is not very active. However, you might find what you need by doing a Google search in the "Groups" section for "hull speed". There was a large tread about hull speed in rec.boats.builder a couple years back. You'll find more opinions than you ever wanted... Thanks, but I'm not looking for _opinions_, really. I went to the library today and found quite a number of books on fluid dynamics. Some had sections on surface waves; the mathematical derivation shows, indeed, that the propagation speed of such a wave is directly proportional to the square root of the wavelength. I'll need some time to work through that derivation...:-) Sakari Aaltonen |
Hull speed theory?
Here's a quote from a reputable source (which I won't name since they may not
like it) that explains it - sort of. "THe energy associated with the transverse wave system travels at the "group velocity" of the waves, which equals one-half of the phase velocity in deep water. The propulsion system of the ship must therefore put additional energy into the wave syste, to replace that which "falls behind". A nominal relationship between ship speed and the length of the corresponding transverse wave may be found by equating the ship velocity with the _celerity_ (phase velocity) of a small-amplitude gravity wave in deep water, Vship = Cwave = sqrt( g.Lw/(2.pi)) = 2.26 sqrt(Lw) where Cwave = celerity or phase velocity of the wave in ft/sec and Lw = length of the transverse wave in feet. This can be converted into speeds in knots: Vs = 1.34.sqrt(Lw) (sorry, no workings shown - trust me) William Froude first pointed out the practical limiting speed for surface-displacement ships whe he observed that "the speed with which wave resistance is accumulating mosr rapidly, is the speed of an ocean wave the length of which, from crest to crest, is about that of the ship from end to end" (Froude 1955 p.280) This condition is found by substituting the length of the ship for the length of the wave, giving a relationship commonly referred to as the _hull speed_, or critical speed-length ratio: Vs/sqrt(Ls) = 1.34 end quote And there you have it. Steve |
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