You are ignoring the rise in temperature of the air due to the shock front pressure rise. The speed of sound in hot air is greater than in ambient air. So the average speed of the molecules in the shock front is supersonic, >M1.Squizzie said:
But isn't it the drop in temperature to below the dew point (and below ambient) in the negative phase that causes the condensation?Baluncore said:
That does not happen at, nor in, the shock front.Squizzie said:
Correct, and I am not suggesting that it does. Recall fig 6-32 from Kinney:Baluncore said:
That is a truism. I wonder what you really mean there by Mach 1.Squizzie said:
I am using Mach 1 in its standard physics context: the speed of sound in the medium that is under discussion. In air at STP, the speed is around 340 m/s. At different temp's and pressures, and in different gases, it's different. And, for the purpose of this thread, I would like the discussion to address gases in particular, not fluids in general.Baluncore said:
Every pressure disturbance must propagate at Mach 1, so why do you need to use the dimensionless term "Mach" anywhere in this discussion.Squizzie said:
Does the shock front ever become subsonic? If yes, how?Baluncore said:
Not only pressure disturbance, but density and conduction temperature disturbances as well.Baluncore said:
As we have discussed on this thread, when the observer is close to an lightning strike, the sound is a crack. Further away, it becomes a rumble. I suspect the abrupt energy increase at the shock front becomes less and less sharp as the wave propagates outwards.snorkack said:
The explosion generates the heat and pressure. But once propagating outside the fireball, the shock front heat comes only from the pressure step. The shock front "self maintains" a step function until the temperature is attenuated sufficiently to approach the ambient speed of sound. The shock step then ceases to exist, as it becomes a gentle ramp.snorkack said:
As the shock front propagates outwards, the energy density is falling continuously, and the step is reduced in amplitude over time. The virtually instant rise time of the step however, is maintained by the positive temperature step, so long as the wave remains a shock front.Squizzie said:
But my point is that it should be impossible for the step to collapse, ever. Because so long as there is any wave at all, as long as there is any nonzero ΔP, then the wave crest should be travelling faster than the wave foot. When the sound gets weak and ΔP is small compared to total P then the speed of wave crest should approach that of wave foot, but not become lower. Since the wave starts as a steep step, it should remain a steep step. Collapsing a step into ramp would require the crest to travel slower than foot.Baluncore said:
Attenuation view gets an opposite result, yes. Since a steep step can be expressed as a sum of high frequency components, attenuating away these high frequency components should collapse step into ramp. The paradox here is that this model, reasonable taken alone, clashes with the model of speed/amplitude relations, which predicts no collapse. So how can a broken wave collapse?Baluncore said:
We do not concern ourselves with the distortion of low energy audio waves in the atmosphere. An audio wave is different to a shock front. We assume an audio wave does not significantly change the air temperature as it passes. The shock front is assumed to have a temperature step sufficient to maintain that step. There will come a point where you must change your assumptions and terminology, where the shock front becomes an acoustic wave. You cannot extrapolate wave profile or behaviour across that transition.snorkack said:
The step collapses and begins to transform into a ramp, when the temperature step becomes insufficient to maintain that step. Based on our assumptions, that is when the shock front ceases, and the audio sound wave begins.snorkack said:
But the thing is, wave profile and behaviour must be continuous across the transition, at least the lower derivatives. Both effects - self-sharpening due to amplitude dependent velocity and spreading due to preferential attenuation of high frequency - must be present on both sides of transition. So how do you analyze the balance of the two effects to predict exactly when the step collapses. What is the minimum temperature step for the shockwave to stay a step?Baluncore said:
You do not have to be exact. One model ends, another begins, wherever.snorkack said:
No. Self-sharpening due to temperature step dependent velocity is assumed to be absent in audio sound waves.snorkack said:
I think you have that backwards.Squizzie said:
Yes, I stand corrected. I had the terms backwards. The waves in water and a taut string are indeed transverse waves.berkeman said:
Do you mean molecule velocity?Frabjous said:
Baluncore said:
A "particle" of a fluid refers to a small volume, or parcel of the fluid, not to the statistical molecules that make up the fluid.Squizzie said:
Yes, a sound wave moves at velocity c, and that velocity is relative to an inertial frame of reference in which the medium is stationary.Frabjous said:
Yes I agree, but it was not me, but Dr. Rigby who appears to have mixed the fields by including "particle velocity" and "pressure" in the explanation.Baluncore said:
Squizzie said:
I believe you misinterpreted the term "particle" in the reply to mean "molecule", rather than "parcel". In doing that, you were confused by the answer, as it then mixed the models.Squizzie said:
Nope, Dr Rigby used "particle" four times in his response. Here's a marked-up image of his email:Baluncore said:
I do not see him use the term "molecule" anywhere in his reply. I think you are imagining it. That suggests that you have fixated in your head, that the term "particle" must, and can only mean, "molecule".Squizzie said:
I have just noticed the error in my final sentence of post #160:Squizzie said:
He didn't mention molecule. I didn't request clarification from him about the use of molecule - see my post #40:
Instead of a chemical explosion, imagine a spherical 'piston' that expands a short distance very rapidly, say at mach 5, pushing air out of the way and creating a spherical blast wave. There MUST be some way for this volume of displaced air to move outwards and dissipate into the rest of the air. This requires that some net molecular displacement occur. In other words, the average molecule MUST move some distance, perhaps a significant amount, away from the origin of the blast wave. This must occur not only near the piston's surface, but also much further away if the entire volume is to return to ambient pressure.Squizzie said:
Whilst there clearly are similarities between explosions and other methods of creating pressure waves, discussions about the differences can often lead to endless debates that do not apply to the subject at hand: explosive blast waves. At the risk of introducing one, the elephant in the room for me is that an explosion converts a very small volume of solid explosive into a massive volume of gas.Drakkith said:
It is on topic. The topic of this thread is not about the initiation of the blast wave, but how it propagates. It matters not whether it is generated mechanically, chemically, or thermally. I chose a slightly simpler example to minimize the number of factors to consider when illustrating my point.Squizzie said:
What about it?Squizzie said:
You may be right, you may be wrong, but don't you see that a discussion on this opens a further detour from the present subject which is the source of the negative phase of a blastwave, which is generally accepted to have been generated by a chemical or nuclear reaction?Drakkith said:
And that gas is very hot and expanded like a fireball. At first, it pushes air away from the site of the explosion, then the combustion products of the explosive cool and condense, and the air comes flowing back in.Squizzie said: