User:Joedoggyuk

Scatchard Equation

The scatchard equation is used in calculating the dissociation constant (${\displaystyle K_{d}}$) of a ligand with a protein.

${\displaystyle {\frac {[LP]}{[L]}}={\frac {n[L_{o}]}{[K_{d}]}}-{\frac {[LP]}{K_{d}}}}$

[L]=Concentration of unbound ligand

[LP]=Concentration of AB

n=number of ligand binding sites

${\displaystyle K_{d}}$=Dissociation constant

${\displaystyle L_{0}}$=Total concentration of P at time=0, representing both bound & unbound P.

Sepearative methods --such as Frontal affinity chromatography, equilibrium dialysis and gel shift assay-- are used in determining free and bound ligand concentrations. The ligand concentration is varied, whilst the protein's concentration is maintained to a constant concentration

A simple reversible protein-ligand interaction can be shown as:

[Equation 1] P + L ${\displaystyle \Longleftrightarrow }$ PL

Where P=Protein, L=ligand, and PL=the protein-ligand complex.

At equilibrium the forward rate of reaction is equal to the reverse rate of reaction. It follows, then, that

[Equation 2] ${\displaystyle R_{1}}$[P][L]= ${\displaystyle R_{-1}}$[PL] Where ${\displaystyle R_{1}}$ =the forward rate constant, ${\displaystyle R_{-1}}$=the reverse rate constant, [P]=concentration of protein, [L]=concentration of ligand and [PL]=concentration of protein-ligand complex.

This can be re-arranged, giving the standard dissociation constant equation:

[Equation 3] ${\displaystyle {\frac {K_{1}}{K_{-1}}}={\frac {[P][L]}{[PL]}}}$

By the dissociation constant's definition, it follows that since

[Equation 4] ${\displaystyle {\frac {K_{1}}{K_{-1}}}=K_{d}}$

then

[Equation 5] ${\displaystyle K_{d}={\frac {[P][L]}{[PL]}}}$

At equilibrium the concentration of unbound ligand [L] is equal to it's initial concentration ${\displaystyle L_{0}}$, minus the concentration of bound ligand [LP]; Or, algebraically,

[Equation 6] [L]= [${\displaystyle L_{0}}$]-[LP]

Substituting equation 6 into equation 5 gives:

[Equation 7] ${\displaystyle K_{d}={\frac {[P][[L_{0}]-[PL]]}{[PL]}}}$

Multiplying both sides by [PL] gives:

[Equation 8] ${\displaystyle K_{d}[PL]=[P][[L_{0}]-[PL]]}$

Dividing both sides by ${\displaystyle K_{d}}$ gives:

[Equation 9] ${\displaystyle [PL]={\frac {[P][[L_{0}]-[PL]]}{K_{d}}}}$

Nultiplying out the numerator gives:

[Equation 10] ${\displaystyle [PL]={\frac {[P][L_{0}]-[P][PL]]}{K_{d}}}}$

Dividing both sides by [P], and spliting apart the numerator into two fractions gives the scatchard equation for a one-to-one interaction between ligand and protein:

[Equation 11] ${\displaystyle {\frac {[PL]}{[P]}}={\frac {[L_{0}]}{K_{d}}}-{\frac {[PL]}{K_{d}}}}$

It follows that for a many-to-one interaction, the stoichometric coefficent "n" is introduced: ${\displaystyle {\frac {[LP]}{[L]}}={\frac {n[L_{o}]}{[K_{d}]}}-{\frac {[LP]}{K_{d}}}}$

Multiplying out the numerator gives:

[Equation 8] ${\displaystyle K_{d}={\frac {[P][L_{0}]-[P][PL]]}{[PL]}}}$

Splitting the numerator into its two components gives:

[Equation 9] ${\displaystyle K_{d}={\frac {[P][L_{0}]}{[PL]}}-{\frac {[P][PL]}{[PL]}}}$

[PL] is present in both the numerator and denominator within the second fraction, so it can be similified further to:

[Equation 10] ${\displaystyle K_{d}={\frac {[P][L_{0}]}{[PL]}}-[P]}$

[P] is brought over to R.H.S

[Equation 11] ${\displaystyle K_{d}+[P]={\frac {[P][L_{0}]}{[PL]}}}$

Both sides are multiplied by [PL]

[Equation 12] ${\displaystyle [K_{d}+[P]][PL]=[P][L_{0}]}$

Both sides are divided by [${\displaystyle K_{d}}$ +[P]], giving

[Equation 13] ${\displaystyle {\frac {[K_{d}+[P]][PL]}{K_{d}+[P]}}={\frac {[P][L_{0}]}{K_{d}+[P]}}}$

Simplifing gives:

[Equation 14] ${\displaystyle [PL]={\frac {[P][L_{0}]}{K_{d}+[P]}}}$

Notice the similarity between Eq14 and the michellis menten equation.

At hight concentrations of ligand: At low concentrations of ligand: When the ligand concentration=${\displaystyle K_{d}}$

Scatchard plot http://www.graphpad.com/curvefit/scatchard_plots.htm