Intrinsic viscosity

\left \eta \right /math> is a measure of a solute's contribution to the

viscosity The viscosity of a fluid is a measure of its resistance to deformation at a given rate. For liquids, it corresponds to the informal concept of "thickness": for example, syrup has a higher viscosity than water. Viscosity quantifies the inte ...

\eta

of a solution. It should not be confused with inherent viscosity, which is the ratio of the natural logarithm of the relative viscosity to the mass concentration of the polymer. Intrinsic viscosity is defined as :

= \lim_ \frac

where

\eta_0

is the viscosity in the absence of the solute,

\eta

is (dynamic or kinematic) viscosity of the solution and

\phi

is the volume fraction of the solute in the solution. As defined here, the intrinsic viscosity

\left \eta \right /math> is a dimensionless number.  When the solute particles are rigid

sphere A sphere () is a geometrical object that is a three-dimensional analogue to a two-dimensional circle. A sphere is the set of points that are all at the same distance from a given point in three-dimensional space.. That given point is th ...

s at infinite dilution, the intrinsic viscosity equals

\frac

, as shown first by

Albert Einstein Albert Einstein ( ; ; 14 March 1879 – 18 April 1955) was a German-born theoretical physicist, widely acknowledged to be one of the greatest and most influential physicists of all time. Einstein is best known for developing the theory ...

. In practical settings,

\phi

is usually solute mass concentration (c, g/dL), and the units of intrinsic viscosity

\left \eta \right /math> are deciliters per gram (dL/g), otherwise known as inverse concentration.

Formulae for rigid spheroids

Generalizing from spheres to

spheroid A spheroid, also known as an ellipsoid of revolution or rotational ellipsoid, is a quadric surface obtained by rotating an ellipse about one of its principal axes; in other words, an ellipsoid with two equal semi-diameters. A spheroid has ...

s with an axial semiaxis

a

(i.e., the semiaxis of revolution) and equatorial semiaxes

b

, the intrinsic viscosity can be written :

= \left( \frac \right) (J + K - L) + \left( \frac \right) L + \left( \frac \right) M + \left( \frac \right) N

where the constants are defined :

M \ \stackrel\  \frac \frac

K \ \stackrel\  \frac

J \ \stackrel\  K \frac

L \ \stackrel\  \frac
\frac

N \ \stackrel\  \frac
\frac

The

J

coefficients are the Jeffery functions :

J_ = 
\int_^  \frac

J_ = 
\int_^  \frac

J_^ = 
\int_^  \frac

J_^ = 
\int_^  \frac

J_^ = 
\int_^  \frac

J_^ = 
\int_^  \frac

General ellipsoidal formulae

It is possible to generalize the intrinsic viscosity formula from

s to arbitrary ellipsoids with semiaxes

a

b

and

c

Frequency dependence

The intrinsic viscosity formula may also be generalized to include a frequency dependence.

Applications

The intrinsic viscosity is very sensitive to the

axial ratio Axial ratio, for any structure or shape with two or more axes, is the ratio of the length (or magnitude) of those axes to each other - the longer axis divided by the shorter. In ''chemistry'' or ''materials science'', the axial ratio (symbol P) i ...

of spheroids, especially of prolate spheroids. For example, the intrinsic viscosity can provide rough estimates of the number of subunits in a

protein Proteins are large biomolecules and macromolecules that comprise one or more long chains of amino acid residues. Proteins perform a vast array of functions within organisms, including catalysing metabolic reactions, DNA replication, res ...

fiber composed of a helical array of proteins such as

tubulin Tubulin in molecular biology can refer either to the tubulin protein superfamily of globular proteins, or one of the member proteins of that superfamily. α- and β-tubulins polymerize into microtubules, a major component of the eukaryotic cytoske ...

. More generally, intrinsic viscosity can be used to assay

quaternary structure Protein quaternary structure is the fourth (and highest) classification level of protein structure. Protein quaternary structure refers to the structure of proteins which are themselves composed of two or more smaller protein chains (also refe ...

. In

polymer chemistry Polymer chemistry is a sub-discipline of chemistry that focuses on the structures of chemicals, chemical synthesis, and chemical and physical properties of polymers and macromolecules. The principles and methods used within polymer chemistry are a ...

intrinsic viscosity is related to

molar mass In chemistry, the molar mass of a chemical compound is defined as the mass of a sample of that compound divided by the amount of substance which is the number of moles in that sample, measured in moles. The molar mass is a bulk, not molecular, ...

through the

Mark–Houwink equation The Mark–Houwink equation, also known as the Mark–Houwink–Sakurada equation or the Kuhn–Mark–Houwink–Sakurada equation or the Landau–Kuhn–Mark–Houwink–Sakurada equation or the Mark-Chrystian equation gives a relation between intr ...

. A practical method for the determination of intrinsic viscosity is with a

Ubbelohde viscometer An Ubbelohde type viscometer or suspended-level viscometer is a measuring instrument which uses a capillary based method of measuring viscosity. It is recommended for higher viscosity cellulosic polymer solutions. The advantage of this instrumen ...

References

* * * * * {{cite journal , last=Scheraga , first=Harold A. , title=Non‐Newtonian Viscosity of Solutions of Ellipsoidal Particles , journal=The Journal of Chemical Physics , publisher=AIP Publishing , volume=23 , issue=8 , year=1955 , issn=0021-9606 , doi=10.1063/1.1742341 , pages=1526–1532, bibcode=1955JChPh..23.1526S Fluid dynamics Viscosity