Hill equation: Definition from Answers.com

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The Hill equation is an equation used in biochemical characterization, which should not be confused with the Hill differential equation that is also sometimes referred to as simply the Hill equation or Hill's equation.

In biochemistry, the binding of a ligand to a macromolecule is often enhanced if there are already other ligands present on the same macromolecule (this is known as Cooperative binding). The Hill coefficient, named for Archibald Vivian Hill, provides a way to quantify this effect.

It describes the fraction of the macromolecule saturated by ligand as a function of the ligand concentration; it is used in determining the degree of cooperativity of the ligand binding to the enzyme or receptor. It was originally formulated by Archibald Hill in 1910 to describe the sigmoidal O₂ binding curve of hemoglobin.^[1]

A coefficient of 1 indicates completely independent binding, regardless of how many additional ligands are already bound. Numbers greater than one indicate positive cooperativity, while numbers less than one indicate negative cooperativity. The Hill coefficient was originally devised to explain the cooperative binding of oxygen to Hemoglobin (a system which has a Hill coefficient of 2.8-3).

Hill equation:

$\theta = {[L]^n \over K_d + [L]^n} = {[L]^n \over (K_A)^n + [L]^n}$

$θ$ - fraction of ligand binding sites filled

$[L]$ - ligand concentration

$K d$ - Apparent dissociation constant derived from the law of mass action (equilibrium constant for dissociation)

$K A$ - ligand concentration producing half occupation (ligand concentration occupying half of the binding sites), that is also the microscopic dissociation constant.

$n$ - Hill coefficient, describing cooperativity (and many more, depending on the system, in the case of which the Hill equation is used)

Taking the logarithm on both sides of the equation leads to an alternative formulation of the Hill equation:

$\log\left( {\theta\over 1-\theta} \right) = n\log{[L]} - \log{K_d}.$

When appropriate, the value of the Hill constant describes the cooperativity of ligand binding in the following way:

$n > 1$ - Positively cooperative reaction: Once one ligand molecule is bound to the enzyme, its affinity for other ligand molecules increases.

$n < 1$ - Negatively cooperative reaction: Once one ligand molecule is bound to the enzyme, its affinity for other ligand molecules decreases.

$n = 1$ - Noncooperative reaction: The affinity of the enzyme for a ligand molecule is not dependent on whether or not other ligand molecules are already bound.

The Hill equation (as a relationship between the concentration of a compound adsorbing to binding sites and the fractional occupancy of the binding sites) is equivalent to the Langmuir equation.

References

^ Hill, A. V. (1910-01-22). "The possible effects of the aggregation of the molecules of hæmoglobin on its dissociation curves" (PDF). J. Physiol. 40: iv-vii. http://jp.physoc.org/cgi/reprint/40/Suppl/i. Retrieved on 2009-03-18.

Dorland's Illustrated Medical Dictionary
Lehninger Principles of Biochemistry, 4th edition, David L. Nelson & Michael M. Cox
Coval ML (December 1970). "Analysis of Hill interaction coefficients and the invalidity of the Kwon and Brown equation". J. Biol. Chem. 245 (23): 6335–6. PMID 5484812. http://www.jbc.org/cgi/pmidlookup?view=long&pmid=5484812. Retrieved on 2009-03-18.
Biochemistry, Donald Voet and Judith G. Voet

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Hill equation

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