The author asserted that the probability of the event in question was approximately

(1 - 10^-21)¹⁰²⁵

How small is this number?

Basic limit (1-1/n)^n -> 1/e is right, but it generalizes to (1-x/n)^n -> exp(-x).

It is more convincing, however, to take the natural logarithm, as then you can use the series log(1-x) = -x -(x^2)/2 -(x^3)/3 - ... which shows that log(1-10^(-21)) is really very close to -(10^(-21)) so that the log sought is close to -(10^4). Thus, the number is close to exp(-(10^4)) which is about 10^(-4343) -- indeed small.

Posted by Richard on 2006-08-09 13:01:30