Given an integer n and a positive real number s, how can I partition an interval [0..1] into n intervals such that L(i+1)=s L(i) where L(i) is length of i'th interval?
Looking for solution in Mathematica or selfcontained Clike pseudocode
Given an integer n and a positive real number s, how can I partition an interval [0..1] into n intervals such that L(i+1)=s L(i) where L(i) is length of i'th interval? Looking for solution in Mathematica or selfcontained Clike pseudocode 


Like this?
You just need to work out the length of the first interval L1 (very easy) and you're done. 


If first interval is a1, then sum of n intervals


