I was given formulas for general evaporation, for a spill calculator I am building.
These are formulas, that are supposed to approximate evaporation, are for a number of different chemicals. Molecular weight is pulled from the chemical itself, same with vapor pressure.
We have a number of different spills at this location. Some spills will go directly onto asphalt/gravel or soil. We do have a number of different areas that have secondary containment, which is referred to as a "Berm", so that is the reason we have two formulas below.
Here are some of them:
General Evaporation Rate Formula From Asphalt
$$E =\frac {0.284 v^{0.78} M^{0.667}AP}{82.05T}$$ Where:
- $E$ is Evaporation in pounds per minute
- $v$ is the average windspeed
- $M$ is the molecular weight in g/mol
- $A$ is the surface area in feet squared
- $P$ is the vapor pressure in mmHg
- $T$ is the temperature in Kelvin
Evaporation Rate from Berm
$$E =\frac {0.284 \cdot \text{MW}^{0.667}(\text{Average windspeed})^{0.78}(\text{Surface Area})(\text{vapor pressure})}{82.05 \cdot \text{temperature in K}}$$
Surface Area Equations:
Scenario 1:
$l$ = Length of the liquid spilled
$w$ = Width of liquid spilled
$l \cdot w = A$
$A - (\pi \cdot (\frac {\text{Diameter of tank in berm}}{2})^2 \cdot (\text{How many tanks in berm}))$
Scenario 2: If we have 3 tanks in the berm
$l$ = Length of the liquid spilled
$w$ = Width of liquid spilled
$l \cdot w = A$
$A - (\pi \cdot ((\frac {\text{Diameter of tank in berm}}{2})^2)) \cdot (\text{Number of tanks of that diameter in berm}))-\pi (\frac{(\text{Diameter of tank in berm})}{2})^2 \cdot (\text{Number of tanks of that diameter in berm}))- \pi(\frac{(\text{Diameter of tank in berm})}{2})^2 \cdot (\text{Number of tanks of that diameter in berm}))$
I don't trust the formulas given, because they were given by another student assigned to this task. These formulas are not found in any workbook, website, etc. I am always skeptical about using other people's work without documentation making sure they have proof to backup their claims that this stuff will work.
I am asking precisely this: are these formulas suitable to use as an approximation for evaporation? If not, what would be a better formula?
I am not an engineer, I am a computer science/mathematics major. This project has nothing to do with school though. It is a work project.
Research
The closest thing I can find to an equation I can use is from here, but I am unable to decipher the characteristics it is asking since it is extremely technical in that field. I'm willing to do some research but I still have yet to find an acceptable formula/equation I can implement in this program. Another example is here where equation #7 is the formula it says to use for spills but I have no idea how it works.
