|
You asked for it!
Basically, so far as we know now, the acoustically important parameters are the lengthwise and crosswise Young's modulus of the wood, the associated damping factors, and the density. It's possible that one or more shear moduli are also important, as they have been found to be so on violin top wood, but that's open for debate on guitars.
Daniel Haines did a rather good study of wood properties some years ago, and published an update of it in the Catgut 'Journal' a few years back. Much of Dave Hurd's book is involved with testing the stiffness of tops, and he does go into the methods used, which Haines did not. Fortuneately, I learned the method that Haines used from Mort Hutchins. There are other ways of getting the information, but this works well for what we want.
One problem in measuring the Young's modulus of wood is cold creep: when you laod a sample it deforms continuously. Thus the easy method, of loading a beam and measuring its deflection, is not as useful on wood samples as one would like. The deflection increases over time, and you usually end up geting lower values for the Youngs modulus than you 'should'.
If you know the length and thickness of a beam and the density of the material you can use the frequencies of the vibration modes to calculate the Young's modulus. The restoring force when the beam is bent comes primarily from tension and compression of the surfaces. This eliminates any 'cold creep' problems, and also gives the opportunity to find the damping factor, by observing the 'half power bandwidth'.
All you _really_ need to do is support the piece at the points where the node lines for the lowest bendig modes cross, tap it, and record the sound. This can be Fourier transformed to find the pitches of the lowest modes, and the bandwidth can be read directly from the FFT plot. Knowing the size and mass of the piece you can plug into the appropriate equations. All you need, then, is a computer with a sound card, a microphone, an accurate scale, and some software.
Using a signal generator might be a bit more accurate. You need some means of driving the plate and a way to detect the vibration, neither of which adds mass or stiffness to the plate or interferes with the other. I stick a little rare earth magnet to the plate and drive it with a coil from an old relay, 'pushed' by my signal generator. I 'listen' to it with my RadShack dB meter, which makes it easy to get the 3dB down points. Even Davis drives his plates with a speaker, and uses an electric guitar pickup to sense a little bit of steel string stuck to the end of the plate. He just plugs into a DVM and reads out the AC voltage of the pickup.
The relevant equations are:
Young's Modulus (E) = 0.946 *rho*(fo^2)*(l^4)/h^2
Q=fo/(fh-fl)
C=sqrt(E/rho)
R=C/rho
Where:
rho= density
fo= peak resonance frequency
fh= frequency above resonance where the amplitude is 3dB down (70.7%) from max
fl= the low -3dB frequency
C= the speed of a compression wave through the material
R= the 'radiation ratio', proposed as a figure of merit by Schelling for violin wood.
(from an article by Mort Hutchins in the CAS 'Newsletter' #40, Nov. '83)
All units in mks system!
There has been a lot of discussion about that whole 'figure of merit' thing. Most makers and researchers agree that what we'd like to make is the lightest possible top plate that will hold up under the string load. This gives you the loudest guitar, all else equal and, as has been said:"Give 'em volume and they'll hear tone!". Schelling's 'radiation ratio' makes a lot of sense on violins, where the structural demands are different. For guitars I think any FM wil have to include, at very least, the lengthwise Young's modulus. We're going to have to figure out how much of a _structural_ contribution the crosswise Young's modulus makes, aside from it's obvious _acoustic_ role. There is also room for debate about the importance of damping. Burns has proposed Q*E/D (Q times an average Young's modulus, over density) as a FM. However, Wright found _no_ perceptible difference in his computer model beween synthesized guitar sounds with widely varying Q factors. Even though I don't totally agree with him it does rather place the burden of proof on those of us who think of Q as important.
Suppose you want to make two tops that weigh the same and have the same _stiffness_, starting with woods of different E and rho values. For purposes of discussion we'll say you have a 'light' European top with a density of about 330 kg/m^3 and lengthwise E of 7500 megaPascals, and a redwood top with a density of 500 kg/m^3 and E of 15000mPa. (these are values very close to those of some tops I've got) The Euro top has 2/3 the density of the Redwood, so if (for whatever reason) we decide that the Euro top will work at 3mm thick, then the Redwood can only be 2mm thick to have the same weight. However, the stiffness will be proportional to the Young's modulus times the _cube_ of the thickness, so the Euro top will have a stiffness proportional to (3*3*3*7500)=202,500, while the redwood top of the same weight will be (2*2*2*15000)=120,000! Despite having much lower 'stiffness' the Euro top comes out lighter because of it's lower density. In fact, to achieve the same weight the ratio of Es has to go as the cube of the ratio of densities, and I think that wil have to be a factor in any figure of merit for guitar top wood. Note that Schelling's 'radiation ratio' has at least got rho squared in it, so that's a start.
A couple of caveats:
These calculations assume 'pure' lengthwise and crosswise bending. If the aspect ratio of the plate is such that the lengthwise and crosswise modes come in at somewhat similar frequencies this will no longer be the case, and the properties you calculate will be 'mixed' to the degree that the bending is 'mixed'. This can also happen if there is somefeature of the wood, such as a knot or other 'wave' in the grain that causes the node lines to bend. This is one reason Haines and Hutchins liked to test long, narrow strips.
Another confusing factor is radiation loss, which adds to damping. Something as wide as a guitar top half can put out a certain amount of sound even at very low frequencies, and this is a 'loss' as far as the test is concerned. We're really looking for _internal_ losses, and sound output is hard to take into account. Once again, this is an argument for using narrow strips.
For that matter, there are likely to be losses to supports, such as foam pads, particularly if those are not carefully placed. I have noticed that simply moving my hand near the plate as it vibrates can cut the amplitude, and it would be wise, if possible, to work out some way of mounting them so that they are at least 1/2 plate length away from any support, such as a table top. (note that I did not do that on my tests)
In short, it's hard to get really accurate data. I'm figuring in my case that anything within 5% is 'identical' for all practical lutherie purposes. As always, just because your calculator runs things out to six decimal places, don't assume those last three or four mean anything.
Some useful articles are:
Schelling, "Wood for Violins" CAS NL#37
McIntyre and Woodhouse, "On Measuring Wood Properties" Pt I, II and III
CAS 'Journals' 11/84, 5/85 and 5/86
Haines, "The essential mechanical properties of wood prepared for musical instruments"
CASJ 11/00
Rodgers, "The effect of elements of wood stiffness on violin plate vibration" CASJ 1.1 pp2-8 May88
|
Login
Register
FAQ
