Problem:
For every real number x, let βxβ denote the greatest integer not exceeding x, and let
f(x)=βxβ(2014xββxββ1).
The set of all numbers x such that 1β€x<2014 and f(x)β€1 is a union of disjoint intervals. What is the sum of the lengths of those intervals?
Answer Choices:
A. 1
B. log2014log2015β
C. log2013log2014β
D. 20132014β
E. 201420141β
Solution:
If x=n+r, where n is an integer, 1β€nβ€2013, and 0β€r<1, then f(x)=n(2014rβ1). The condition f(x)β€1 is equivalent to 2014rβ€1+n1β, or 0β€rβ€log2014β(nn+1β). Thus the required sum is
log2014β12β+log2014β23β+log2014β34β+β―+log2014β20132014β=log2014β(12ββ
23ββ
34ββ―20132014β)=log2014β(2014)=1ββ
The problems on this page are the property of the MAA's American Mathematics Competitions