now let´s see where we go with our spring rate and preload discussion:
"Just like if you added 200 psi to the front shocks on your car, the front end would raise a small amount due to the added spring rate from the shocks. You would then, I hope, re-adjust your spring perches to get your ride height back to where you wanted it."
IMHO, never had to, not even once on some 60+ cars I've worked with...this statement is also incorrect. It does change slightly, but not enough to have to move a perch......coil over or rocker suspension....
and
So in summary, the shock has a spring rate, but only when stationary, and is the only time it "could" effectively change the ride height on a car or add to the spring rate. Just add velocity, and there's isn't a spring rate to be concerned with.
O.K. first I thing we need to agree on some terminology (wording)
perfect/ideal damper = a device which generates force in relation/dependent from
it´s velocity.
This force is position independent, wich means at zero velocity the ideal damper will produce zero force. And it will be zeo force at any position of his stroke.
spring = a device which produces force in relation to it´s position/displacement.
More displacement equals more force (F=k*s) k=springstiffness s=displacement
Now, if we are clear with this (and I hope we are), then we can conclude, that a conventional pressuriezed racing damper is a combination of the two.
The gas spring in the damper has a spring rate (they is small in most cases).
Don´t believe me? It´s only preload not springrate. O.K. - let´s make a test
Take your damper (without a spring) of choice, with whatever damping setting&gaspressure you see fit and put it into a "SPRINGTESTER".
Start to compress it. What will happen?
It will not compress, but the rading for the force will increase. - Good
Now comes a point where it starts to move. - Good
Pause here and zero your loadcell, buy doing so, you have taken the preload component out.
Now, all things beeing perfect, we have a good loadcell with no drift, and jumping between digits. We should read 0 N/lbs force, because our damper doesn´t move and has zeo velocity. Makes all perfect sense.
Now, let´s compress our damper 1 or 2" (or whatever stroke you like, more make the calculation more accurate) and pause again.
What happen?
Our damper has zero speed now --> zero damping force, we have taken the preload force value (nose pressure) off.
Why do we have a reading on the loadcell? Does not makes sense, if we have a "perfect/ideal" damper.
Take the reading from your loadcell and divide it by the amount you have compressed your damper.
Voila -> it´s a spring stiffness value (for a 5/8" shaft and 200 psi it should be ~ 0,4 N/mm or 2,3 lbs/in - the actual value will depend on the volume ratio of your shaft vs. canister/reservoir)
So in my world, it´s a spring and it will add force to whatever damping force the damper produces in relation to the stroke(position).
Do I care for an additional 2,3 lb/in in my car spring rate?
That´s not up to me to decide.
It´s less of an variation if I use a 1000 lbs/in spring in my car, but if I use a 80 lbs/in spring it may is worth a consideration.
If you look in the second table I have posted before, you can choose your shaft diameter, and your pressure. It will give you a average springrate for 100 mm (4") stroke. And you can see how much this is a percentual change for your main spring depending from the value of your main spring.
The influence get´s less with higher main spring rates.
Hope it makes some sense.
I will come to the temperature issue at another time.
Need to put some values together, as I prefer to talk "numbers".
....
