How would you determine the percentage of each isomer in the mixture?

An attempt at synthesizing a certain optically active compound resulted in a mixture of its enantiomers. The mixture has an observed specific rotation of +11.2'. If it is known that the specific rotation of the R enantiomer is -39.839, determine the percentage of each isomer in the mixture.

R enantiomer = %
S enantiomer=
%?

1 Answer
Apr 25, 2016

The mixture contains #64 % S# and #36 % R#.

Explanation:

I assume that the specific rotation of the mixture is +11.2 ° and that of the #R# enantiomer is -39.8 °.

The rotations of the two enantiomers cancel each other, so the rotation of the mixture will be that of the excess enantiomer.

The mixture has a positive sign of rotation, so the #S# isomer is in excess.

The formula for enantiomeric excess is

#color(blue)(|bar(ul(color(white)(a/a) ee = "observed specific rotation"/"maximum specific rotation" × 100 %color(white)(a/a)|)))" "#

# ee = ("11.2" color(red)(cancel(color(black)(°))))/("39.8" color(red)(cancel(color(black)(°)))) × 100 % = 28 %#

We can calculate the percent of each enantiomer as described in this Socratic question.

If we have a mixture of (+) and (-) isomers and (+) is in excess,

#% ("+") = (ee)/2 +50 %#

We have a 28 % enantiomeric excess of (+).

#% ("+") = (28 %)/2 +50 % = (14+50) % = 64 %#

So, the mixture contains 64 % (#S#) and 36 % (#R#).