b'@techreport{Burnikel98-1-023,'b'\nTITLE = {Rational points on circles},\nAUTHOR = {Burnikel, Christoph},\nLANGUAGE = {eng},\nURL = {http://domino.mpi-inf.mpg.de/internet/reports.nsf/NumberView/1998-1-023},\nNUMBER = {MPI-I-1998-1-023},\nINSTITUTION = {Max-Planck-Institut f{\\"u}r Informatik},\nADDRESS = {Saarbr{\\"u}cken},\nYEAR = {1998},\nDATE = {1998},\nABSTRACT = {We solve the following problem. For a given rational circle $C$ passing through the rational points $p$, $q$, $r$ and a given angle $\\alpha$, compute a rational point on $C$ whose angle at $C$ differs from $\\alpha$ by a value of at most $\\epsilon$. In addition, try to minimize the bit length of the computed point. This document contains the C++ program |rational_points_on_circle.c|. We use the literate programming tool |noweb| by Norman Ramsey.},\nTYPE = {Research Report / Max-Planck-Institut f\xc3\xbcr Informatik},\n}\n'