With a rotary, you get ONE
suck, per ROTOR, per REV. With a 4 stroke, you get ONE
suck per PISTON, per (get this) TWO revs!!!
The same goes for Power
Pulses. A rotary gets ONE power pulse per REV, per ROTOR.
With a 4 stroke piston engine, you get ONE power pulse, per
PISTON, per TWO revs.
3. So, for a
6.5B, it sucks 654 cc, for a 13B, it sucks 1308 cc PER
REV, and for a 20B it sucks 1962 cc.
1. The rotary,
when ported, has the ability to easily run 125% to 130% volumetric
efficiency. So it has a slightly higher ability to draw air than a piston
engine. Runners, throttle bodies, and injectors must be sized
accordingly.
----- Original Message -----
Sent: Friday, February
11, 2005 8:18 AM
Subject: [FlyRotary]
Solved!!!! => Rotary AirFlow Equation? Help?
> Ed, I think you've blinded yourself with science 8*)
>
> Each face of the rotor will cycle 40cid of air on each revolution.
You
> can ignore the eshaft. Every time the rotor turns around, each face
> will have processed 40cid. If a rotor is turning at 2000 RPM, then three
> faces will each cycle 2000*40cid of air. You bring in referencing
off
> the eshaft, and all of a sudden only 4 faces are processing air. I
> think that is the mistake.
>
> You reference 720 degrees of eshaft rotation. But all that means is
> that the rotors haven't completed their cycle. You're just ignoring
> every third rotor face.
>
>
Ernest, I think you are making my
very point.
1. Each rotor has 3*40 = 120
cid of volume displace per 360 deg rotation and with two rotor that is 2*120 =
240 CID each revolution.
so we have 2000*240 cid/1728 =
277.77 CFM exactly what quantity the formula gives when treating the
rotary as a 160 CID 4 stroke engine with e shaft at 6000 rpm - but that is for
a FULL 360 deg
rotation of the rotor. See part 2 next
{:>).
160*6000/(2*1728) = 277.77
CFM which agrees with the above but if the 160 CID figure
is correct then that means that 160/4 = 4 , only 4 rotor faces worth of
displacement have been considered in the formula. Which if that is
correct then the rotor have only turned 240 degs and not 360 deg.
But if the rotor has only turned 240 deg (240*3 = 720Deg Checks!) then that
means that to make a valid comparison with 1 above, we need to reduce the
amount of rotation in statement 1 to 240 deg instead of 360 which means that we
only have 277.77*4/6 = 185 CFM which leaves me back where I started.
There is no question that if the two
rotors have completed their 360 deg rotation - then all six faces have completed the
cycle.
That gives 40*6*2000/1728 = 277.77
CFM, so lets not debate that point - we both agree! .
My problem has been the use of the
160 CID equivalent in the formula. I understand how it was arrived at ( I
believe) its simply the amount of displacement occurring in the rotary at 720
deg of e shaft rotation which is the standard of comparison with other
engines.
At 720 deg of e shaft rotation then
indeed 160 CID of displace has occurred. If I calculate using the
240 deg of rotor rotation I again get 240/360 * 6 = 4 rotor faces. But if
that is indeed the actually amount of displacement of the rotor then according
to our calculations in 1 above we need to use 240 deg not 360 and that gives
185 cfm not 277.77.
I mean I don't care if we use 240
CID (the total displacement across 1080) or 160 CID (the total
displacement across 720 deg - the standard for comparison) but there should be
some logical consistency between the two.
WAIT! Stop the presses I
Finally Understand! The key is the 240 CID total displacement for
360 rotor degrees or for 1080 deg of e shaft rotation.
It was not a math problem or logic
problem, my problem was a reference transformation problem!
Using the rotor representation we have Air flow = 240 * 2000/1728 = 277.77
this is rotary based on 360 deg of rotation. Now if
we take that formula (which I think we agree on), I then want to convert it into a
formula that conforms to the 720 deg standard.
So I can compare apples and apples.
1. First the e shaft rpm
is the e shaft rpm and is the standard reference point for rpm of
engines. So we can simply multiply our 2000 rpm rotor rpm by 3 to reference it to the eshaft. So
3* 2000 = 6000. That "transformation" gives us the rpm figure
in the "Standard" equation.
2. However, to
reference the 240 CID displacement to the 720 deg standard we must use
the ratio of the transformation from 1080 to the 720 reference system.
Because the amount of displacement IS affected by the choice
of reference. This gives 720/1080 * 240 = 160 CID referenced to the
standard.
So now the formula should migrate
from rotor reference of 240*2000/1728 = 277.77 to e shaft reference of
160*6000/1728 = 277.77 by reference system transformation. To do
that:
1. We multiply the
rotor rpm by 3 - the rpm does not care whether its 720 or 1080 referenced, one
revolution/min is one revolution/min.
2. The 720 deg standard
DOES affect the amount of displacement so 720/1080 *240 = 160 CID.
Taking the rotor reference formula
above we can directly transform it to the e shaft reference standard.
Doing so gives us
[720/1080*240]*[3*2000]/1728 = [0.666*240]*[6000]/1729, taking the first factor
0.6666* 240 = 159.9999 = 160 and we have
Airflow = 160CID*6000/1728 =
277.77 So the rotor reference is transformed to the e shaft reference of
720 deg.
Thanks all for helping me out of my
problem area. I just knew there had to be a connection someway. If
this is not correct - please refrain from informing me {:>).
Be heartened, Ernest, I
have been faithfully using the 160 formula - just wanted to understand what
appeared to me to be a difference when looking at it from two different
perspectives. If the "reference" transformation is applied to
the rotor equation then it translates into the 720 reference state.
Best Regards and thanks for
your input