User:WilfriedC/Playground/Girolami method

The Girolami method^[1] is a predictive method for estimating densities of pure liquid components at room temperature. The objective of this method is the simple prediction of the density and not the high precision.

Procedure[edit]

The method uses purely additive volume contributions for single atoms and additional correction factors for components with special functional groups which cause a volume contraction and therefore a higher density. The Girolami method can be described as a mixture of an atom and group contribution method.

Atom contributions[edit]

The method uses the following contributions for the different atoms:

Element	Relative volume V_i
Hydrogen	1
Lithium to Fluorine	2
Sodium to Chlorine	4
Potassium to Bromine	5
Rubidium to Iodine	7.5
Cesium to Bismut	9

A scaled molecular volume is calculated by

$V_{S}\,=\,\sum _{i}V_{i}$

and the density is derived by

$d\,=\,{\frac {M}{5\cdot V_{S}}}$

with the molecular weight M. The scaling factor 5 is used to obtain the density in g·cm^-3.

Group contribution[edit]

For some components Girolami found smaller volumes and higher densities than calculated solely by the atom contributions. For components with

a hydroxylic function (Alcohols)
a carboxylic function (Carboxylic acids)
a primary or secondary amine function
an amide group (incl. amides substituted at the nitrogen)
a sulfoxide group
a sulfone group
a ring (non-condensed)

it is sufficient to add 10 % to the density obtained by the main equation. For sulfone groups it is necessary to use this factor twice (20 %).

Another specific case are condensed ring systems like Naphthalene. The density has to increased by 7.5 % for every ring; for Naphthalene the resulting factor would be 15 %.

If multiple corrections are needed their factors have to be added but not over 130 % in total.

Example calculation[edit]

Component	M [^g/_mol]	Volume V_S	Corrections	Calculated density [g·cm^-3]	Exp. density [g·cm^-3]
Cyclohexanol	100	(6×2)+(13×1)+(1×2)=26	One ring and a hydroxylic group = 120 %	d=^1.2*100/_5×26=0.92	0.962
Dimethylethylphosphine	90	(4×2)+(11×1)+(1×4)=23	No corrections	d=⁹⁰/_5×23=0.78	0.76
Ethylenediamine	60	(2×2)+(8×1)+(2×2)=16	Two primary amine groups = 120 %	d=^1.2×60/_5×16=0.90	0.899
Sulfolane	120	(4×2)+(8×1)+(2×2)+(1×4)=24	One ring and two S=O bonds = 130 %	d=^1.3×120/_5×24=1.30	1.262
1-Bromonaphthalene	207	(10×2)+(7×1)+(1×5)=32	Two condensed rings = 115 %	d=^1,15×207/_5×32=1.49	1.483

Quality[edit]

The author has given a mean quadratic error (RMS) of 0.049 g·cm^-3 for 166 checked components. Only for two components (Acetonitrile und Dibromochloromethane) an error greater than 0.1 g·cm ^-3 has been found.

Reference[edit]

^ Gregory S. Girolami, A Simple "Back of the Envelope" Method for Estimating the Densities and Molecular Volume of Liquids and Volumes, J. of Chemical Education, 71(11), 962-964 (1994)

External link[edit]

Online calculator for the Girolami model

[1] Gregory S. Girolami, A Simple "Back of the Envelope" Method for Estimating the Densities and Molecular Volume of Liquids and Volumes, J. of Chemical Education, 71(11), 962-964 (1994)

[1]