estimated (indicated) power = D squared x WP x S x R/ (r+2) x 140000
where
D is L.P. cylinder dia. (inch)
WP is working boiler pressure (P.S.I. gauge)
S is stroke (inch)
R is R.P.M.
r is ratio of L.P. to H.P. cylinder VOLUME
Trying a comparison to the above listed 5 x 8 x 6 compound engine example:
D = 8 inches
WP = 150 PSIG
S = 6 inches
R = 400 RPM
R = 2.55, (r+2) = 4.55
According to this formula:
D squared = 8 x 8 = 64
Power = D squared x WP x S x R/ (r+2) x 140000
Power = 64 x 150 x 6 x 400/4.55 x 140000
Power = 64 x 150 x 6 x 87.9 x 140000
Power = A very VERY Big Number, much bigger than the horsepower of any engine ever built
Assuming the 140,000 should have been in the denominator:
Power = D squared x WP x S x R / [ (r+2) x 140000 ]
Power = 64 x 150 x 6 x 400 / [4.55 x 140000]
Power = 64 x 150 x 6 x 400 / 637000
Power = 36.17
This number is almost exactly what is calculated above, so both are in agreement.
It should be noted that some boundary conditions apply to the formula:
estimated (indicated) power = D squared x WP x S x R/ [ (r+2) x 140000 ]
This formula is applicable only to double acting engines, with atmospheric pressure exhaust. Running with a single acting compound, (such as the Westinghouse type engine) only half the power would be available. Running with a Vacuum Exhaust, more power would be available.
