I'm sorry, Mark, I did not show that
step. You are correct the weight (mass) of water(or any other
cooling medium) is an important factor as is its specific
heat.
In the example you used - where
we have a static 2 gallons capacity of water, It would actually only take
8*2 = 16 lbms *10 = 160 BTU to raise the temp of the water 1 degree
F. The difference is in one case we are talking about raising the
temperature of a fixed static amount of water which can not readily get
rid of the heat, in the other (our radiator engine case) we are talking
about how much heat the coolant can transfer from engine to radiator. Here
the flow rate is the key factor.
But lets take your typical 2 gallon cooling
system capacity and see what we can determine.
If we take our 2 gallons and start moving it
from engine to radiator and back we find that each times the 2 gallons
circulates it transfers 160 BTU (in our specific example!!). So at our
flow rate of 30 gpm we find it will move that 160 BTU 15 times/minute (at
30 gallons/minute the 2 gallons would be transferred 15 times). So
taking our 160 BTU that it took to raise the temp of our 2 gallons of
static water 10F that we now have being moved from engine to radiator
15 times a minute = 160*15 = 2400 BTU/Min. Amazing isn't it?
So no magic, just math {:>). So that is how our 2 gallons
of water can transfer 2400 BTU/min from engine to radiator. It also
shows why the old wives tale about "slow water" cooling better is just
that (another story about how that got started)
In the equation Q = W*deltaT*cp that
specifies how much heat is transferred ,we are not
talking about capacity such as 2 gallons capacity of
a cooling system but instead are talking about mass
flow. As long as we reach that flow rate 1 gallon at
30 gpm or 1/ gallon at 60 gpm or 1/4 gallon at 120 gpm all will remove the
same amount of heat. However if you keep increasing the
flow rate and reducing the volume you can run into other problems -
like simply not enough water to keep your coolant galleys filled {:>),
so there are limits.
Our 2 gallon capacity is, of
course, simply recirculated at the rate of 30 gpm through our engine
(picking up heat- approx 2400 BTU/min in this specific example) and then
through our radiator (giving up heat of 2400 BTU/Min to the air
flow through the radiators) assuming everything works as planned.
IF the coolant does not give up as much heat in the radiators (to
the air stream) as it picks up in the engine then you will eventually
(actually quite quickly) over heat your engine.
The 240 lb figure I used in the previous
example comes from using 8 lb/gal (a common approximation, but not precise
as you point out) to calculate the mass flow.
The mass flow = mass of the medium (8
lbs/gallon for water) * Flow rate(30 gpm) =240 lbs/min mass flow. Looking
at the units we have
(8 lbs/gallon)*(30 Gallon/minute) canceling
out the like units (gallons) leaves us with 240 lb/minute which is our
mass flow in this case.
Then using the definition of the BTU we have
240 lbs of water that must be raised 10F. Using our heat transfer
equation
Q = W*deltaT*cp, we have Q = 240*10*1 = 2400
BTU/minute is required to increase the temperature of this mass flow by
10F
Using the more accurate weight of water we
would have 8.34*30 = 250.2 lbm/minute so the actual BTU
required is closer to 2502 BTU/min instead of my original 2400 BTU/Min, so
there is apporx a 4% error in using 8 lbs/gallon. If we could ever
get accurate enough where this 4% was an appreciable part of the total
errors in doing our back of the envelope thermodynamics then it would pay
to use 8.34 vice 8, but I don't think we are there, yet
{:>).
Now the same basic equation applies to the
amount of heat that the air transfers away from out radiators. But
here the mass of air is much lower than the mass of water so therefore it
takes a much higher flow rate to equal the same mass flow. What
makes it even worse is that the specific heat of air is only 0.25
compared to water's 1.0. So a lb of air will only carry approx 25%
the heat of a lb of water, so again for this reason you need more air
flow.
if 30 gpm of water will transfer 2400 bTu of
engine heat (using Tracy's fuel burn of 7 gallon/hour), how much air does
it require to remove that heat from the radiators?
Well again we turn to our equation and
with a little algebra we have W = Q/(DeltaT*Cp) = 2400/(10*1) = 240
lbm/min. Not a surprise as that is what we started with.
But now taking the 240 lbm/min mass flow and
translating that into Cubic feet/minute of air flow. We know that
a cubic foot of air at sea level weighs approx 0.076 lbs. So
240 lbm/(0.076 lbm/Cubic foot) = 3157 cubic feet/min to equal the
same mass as the coolant. But since the specific heat of air is lower
(0.25) that water, we actually need 75% more air mass or 1.75 * 3157 =
5524.75 CFM air flow at sea level. Now I know this sounds like a
tremendous amount of air but stay with me through the next
step.
Taking two GM evaporator cores with a total
frontal area of 2*95 = 190 sq inches and turning that in to square feet =
1.32 sq ft we take our
5524.75 cubic feet minute and divide by 1.32
sq ft = 4185 ft/min for the required air velocity to move that much air
volume through our two evaporator cores. To get the
air velocity in ft/sec divide 4185/60 = 69.75 ft/sec airflow
velocity through our radiators or 47.56 Mph. Now that sounds
more reasonable doesn't it??
Now all of this is simply a first order
estimate. There are lots of factors such as the density of the air
which unlike water changes with altitude, the temperature of the air, etc.
that can change the numbers a bit. But, then there is really not
much point in trying to be more accurate given the limitations of our
experimentation accuracy {:>).
Also do not confuse the BTUs required to
raise the temperature of 1 lb of water 1 degree F with that required to
turn water in to vapor - that requires orders of magnitude more BTU.
Hope this helped clarify the
matter.
Ed
Ed Anderson
RV-6A N494BW Rotary Powered
Matthews, NC
-----
Original Message -----
Sent:
Friday, August 13, 2004 8:32 AM
Subject:
[FlyRotary] Re: DeltaT Coolant was : [FlyRotary] Re: coolant temps
Ed,
Please humor me (a non-engineer)
while I ask a dumb question. If it takes 1BTU to raise 1lb of
water 1 degree, and you factor in 30 gpm flow to come up with a 2400 BTU
requirement for a 10 degree rise for 1 lb of water, where does the
number of pounds of water figure into the equation, or do we just ignore
that issue? Water is 8.34 lbs/gal, and say you have 2 gallons of
coolant, that would be 16.68 lbs. Seems that we would need to
multiply the 2400 figure by 16.68 to arrive at a total system
requirement of 40,032 BTU/min. What am I missing here?
Mark
S.
At 09:58 PM 8/12/2004 -0400, you
wrote:
Right you are, Dave
Below is one semi-official definition of BTU in English
units. 1 BTU is amount of heat to raise 1 lb of water 1 degree
Fahrenheit.
So with Tracy's 30 gpm flow of water = 240 lbs/min. Since
its temperature is raised 10 degree F we
have
BTU = 240 * 10 * 1 =
2400 BTU/min
I know I'm
ancient and I should move into the new metric world, but at
least I didn't do it in Stones and Furlongs
{:>)
Ed
The Columbia Encyclopedia, Sixth
Edition. 2001.
British
thermal unit
abbr. Btu,
unit for measuring heat quantity in the customary system of English units of
measurement, equal to the amount of heat required to raise the
temperature of one pound of water at its maximum density [which occurs
at a temperature of 39.1 degrees Fahrenheit (°F) ] by 1°F. The Btu may
also be defined for the temperature difference between 59°F and 60°F.
One Btu is approximately equivalent to the following: 251.9 calories;
778.26 foot-pounds; 1055 joules; 107.5 kilogram-meters; 0.0002928
kilowatt-hours. A pound (0.454 kilogram) of good coal when burned
should yield 14,000 to 15,000 Btu; a pound of gasoline or other
Ed
Anderson
RV-6A N494BW Rotary Powered
Matthews, NC
- ----- Original Message -----
- From: DaveLeonard
- To: Rotary motors in
aircraft
- Sent: Thursday, August 12, 2004 8:12 PM
- Subject: [FlyRotary] Re: DeltaT Coolant was : [FlyRotary] Re:
coolant temps
- Ed, are those units right. I know
that the specific heat of water is 1.0 cal/(deg Celsius*gram).
Does that also work out to 1.0 BTU/(deg. Farhengight * Lb.) ?
-
- Dave Leonard
- Tracy my calculations shows your coolant
temp drop is where it should be:
-
- My calculations show that at 7 gph fuel
burn you need to get rid of 2369 BTU/Min through your
coolant/radiators. I rounded it off to 2400 BTU/min.
-
- Q = W*DeltaT*Cp Basic Heat/Mass
Flow equation With water as the mass with a weight of 8 lbs/
gallon and a specific heat of 1.0
-
- Q = BTU/min of heat removed by coolant
mass flow
-
- Assuming 30 GPM coolant flow =
30*8 = 240 lb/min mass flow. specific heat of water Cp =
1.0
-
-
- Solving for DeltaT = Q/(W*Cp) =
2400/(240*1) = 2400/240 = 10 or your delta T for
the parameters specified should be around 10F
-
- Assuming a 50/50 coolant mix with a
Cp of 0.7 you would have approx 2400/(240 *0.7) = 2400/168 =
14.2F so I would say you do not fly with
-
- a 50/50 coolant mix but something
closer to pure water. But in any case, certainly in the ball
park.
-
- You reported 10-12F under those
conditions, so I would say condition is 4. Normal operation
-
- Ed
-
- Ed Anderson
- RV-6A N494BW Rotary Powered
- Matthews, NC