In order to find leap years, why must the year be indivisible by 100 and divisible by 400? I understand why it must be divisible by 4. Please explain the algorithm.

In the Gregorian calendar 3 criteria must be taken into account to identify leap years:



this is enough to check if a year is a leap year.



You could just check if the Year number is divisible by both 4 and 400. You dont really need to check if it is indivisible by 100. The reason 400 comes into question is because according to the Gregorian Calendar, our "day length" is slightly off, and thus to compensate that, we have 303 regular years (365 days each) and 97 leap years (366 days each). The difference of those 3 extra years that are not leap years is to stay in cycle with the Gregorian calendar, which repeats every 400 years. Look up Christian Zeller's congruence equation. It will help understanding the real reason. Hope this helps :) 


Return true if the input year is a leap year Basic modern day code:
Todays rule started 1582 AD Julian calendar rule with every 4th year started 46BC but is not coherent before 10 AD as declared by Cesar. They did however add some leap years every 3rd year now and then in the years before: Leap years were therefore 45 BC, 42 BC, 39 BC, 36 BC, 33 BC, 30 BC, 27 BC, 24 BC, 21 BC, 18 BC, 15 BC, 12 BC, 9 BC, 8 AD, 12 AD Before year 45BC leap year was not added. http://www.wwu.edu/depts/skywise/leapyear.html The year 0 do not exist as it is ...2BC 1BC 1AD 2AD... for some calculation this can be an issue.



Here comes a rather obsqure idea. When every year dividable with 100 gets 365 days, what shall be done at this time? In the far future, when even years dividable with 400 only can get 365 days. Then there is a possibility or reason to make corrections in years dividable with 80. Normal years will have 365 day and those dividable with 400 can get 366 days. Or is this a looseloose situation. 


The length of a year is (more or less) 365.242196 days. So we have to subtract, more or less, a quarter of a day to make it fit : 365.242196  0.25 = 364.992196 (by adding 1 day in 4 years) : but oops, now it's too small!! lets add a hundreth of a day (by not adding that day once in a hundred year :)) 364.992196 + 0,01 = 365.002196 (oops, a bit too big, let's add that day anyway one time in about 400 years) 365.002196  1/400 = 364.999696 Almost there now, just play with leapseconds now and then, and you're set. (Note : the reason no more corrections are applied after this step is because a year also CHANGES IN LENGTH!!, that's why leapseconds are the most flexible solution, see for examlple here) That's why i guess 


Will it not be much better if we make one step further. Assuming every 3200 year as no leap year, the length of the year will come
and after this the adjustment will be required after around 120000 years. 


just wrote this in CoffeeScript:
of course, the validity checking done here goes a little further than what was asked for, but i find it a necessary thing to do in good programming. note that the return values of this function indicate leap years in the socalled proleptic gregorian calendar, so for the year 1400 it indicates 


There are on average, roughly 365.2425 days in a year at the moment (the Earth is slowing down but let's ignore that for now). The reason we have leap years every 4 years is because that gets us to 365.25 on average The reason we don't have leap years on the 100multiples is to get us to 365.24 `[(1461 x 25  1) / 100 = 365.24, 36,524 days in 100 years. Then the reason we once again have a leap year on 400multiples is to get us to 365.2425 I believe there may be another rule at 3600multiples but I've never coded for it (Y2K was one thing but planning for one and a half thousand years into the future is not necessary in my opinion  keep in mind I've been wrong before). So, the rules are, in decreasing priority:



If you're interested in the reasons for these rules, it's because the time it takes the earth to make exactly one orbit around the sun is a long imprecise decimal value. It's not exactly 365.25. It's slightly less than 365.25, so every 100 years, one leap day must be eliminated (365.25  0.01 = 365.24). But that's not exactly correct either. The value is slightly larger than 365.24. So only 3 out of 4 times will the 100 year rule apply (or in other words, add back in 1 day every 400 years; 365.25  0.01 + 0.0025 = 365.2425). 


Leap years are arbitrary, and the system used to describe them is a man made construct. There is no why. What I mean is there could have been a leap year every 28 years and we would have an extra week in those leap years ... but the powers that be decided to make it a day every 4 years to catch up. It also has to do with the earth taking a pesky 365.25 days to go round the sun etc. Of course it isn't really 365.25 is it slightly less (365.242222...), so to correct for this discrepancy they decided drop the leap years that are divisible by 100. 


A quick Google for "calculating leap years" came up with this page, which describes the problem clearly and gives an (admitedly VB) implementation, as the first hit. 


You really should try to google first. Wikipedia has a explanation of leap years. The algorithm your describing is for the Proleptic Gregorian calendar. More about the math around it can be found in the article Calendar Algorithms. 


I'm sure Wikipedia can explain it better than I can, but it is basically to do with the fact that if you added an extra day every four years we'd get ahead of the sun as its time to orbit the sun is less than 365.25 days so we compensate for this by not adding leap days on years that are not divisible by 400 eg 1900. Hope that helps 


There's an algorithm on wikipedia to determine leap years:
There's a lot of information about this topic on the wikipedia page about leap years, inclusive information about different calendars. 


In general terms the algorithm for calculating a leap year is as follows... A year will be a leap year if it is divisible by 4 but not by 100. If a year is divisible by 4 and by 100, it is not a leap year unless it is also divisible by 400. Thus years such as 1996, 1992, 1988 and so on are leap years because they are divisible by 4 but not by 100. For century years, the 400 rule is important. Thus, century years 1900, 1800 and 1700 while all still divisible by 4 are also exactly divisible by 100. As they are not further divisible by 400, they are not leap years 

