Numerical solutions of the Lamm equation. II. Equilibrium sedimentation

We have generated solutions to the Lamm equation to examine the effects of concentration dependence on velocity experiments. Two forms of c dependence are considered: s/so = 1kc and S / S O = (I + kc)-'. Features of these solutions are discussed. The magnitude of the errors resulting from the usual

This paper presents t8he resiilts of a iuimerical sohition of the Lamm eqiiat,ion for rob1 slowing specified by w 2 = wo2 exp { -A T ] , for paramekrs relevant, t.o equilibririrn experiments. It is showii that in the two-c!)mponent4 system it is t,heoret,ically possible to dedrice s / D from meitsir

## Abstract A very general approach to the chemical equilibria between many interacting molecules during sedimentation (boundary, band, or active enzyme) taking into account boundary conditions, cell geometry, equilibrium constants, diffusion, enzyme kinetics, etc., is presented. Through a Fortran

## Synopsis Relations describing sedimentation equilibrium in solutions containing two macromolecular solute components are derived for the following cases: (1) two nonassociating proteins at arbitrary concentration, (2) one dilute self-associating protein in the presence of a second inert protein