Allow me to give a couple of key sources for Zeller's algorithm to find the day of the week: nr = (k + floor((13*m-1)/5) + D + floor(D/4) + floor(C/4) - 2*C) mod 7 k: day of the month. m: month number shifted by -2; March = 1, April = 2, January = 11 of year-1, February = 12 of year-1. D: year mod 100, or the last two digits of the year. C: year div 100, or the century; at the moment C = 20. nr is an integer from 0 to 6. 0 corresponds to Sunday, 1 to Monday etcetera. Source: Ask Dr. Math: FAQ, 'The Calendar and the Days of the Week' http://forum.swarthmore.edu/dr.math/faq/faq.calendar.html Other source: 'Weekday -- from Eric Weisstein's Treasure Trove of Astronomy', Eric W. Weisstein and Wolfram Research http://www.treasure-troves.com/astro/Weekday.html Zeller's formula works only for Gregorian dates. Astronomers first convert any date (Julian, Gregorian) to the Julian date number. This number mod 7 gives the day of the week; 0 = Sunday, 1 = Monday, etc. Source: Astronomical algorithms, J. Meeus, Willmann-Bell, Chapter 7. Oscar van Vlijmen 2000-10-04