Because of leap years you need to pass the year too.
Thirty days hath September,
Loved James' answer. Reformatted slightly for those interested.
Everyone knows that counting Chuck's knuckle sandwich beats mere poetry any day of the
If you can't get that to compile and run (like the poetry), then read on.
Without regex and minus 2
So I wrote a simple and above all, small algorithm (easily beating James' answer) to calculate the correct (Proleptic Gregorian / Astronomical / ISO 8601:2004 (clause 184.108.40.206), so year
Note that in
Note, months must be 1-based (as the question asked for)!
to the ternary and removed the now un-needed outer parenthesis (good call, TrueBlueAussie):
After severe testing this turned out to be the fastest algo (thanks TrueBlueAussie for the tests to which I chipped in for the caching jsperf setup). We guess the reason that this is faster then my (shorter and seemingly faster) algo 3 (the magic number bitwise lookup below), is that modern browsers can probably pre-optimise the constant bitshift in
I figured.. well.. "and why again didn't I just do?:"
It uses a a 'magic number' to do a simple bit-wise lookup of offsets:
DNOSAJJMAMFJ* = Months (right to left) CBA9876543210 = Month === bit position in hex (we never use pos 0: January is 1) 1010110101010 = offset from 30 = binary === 5546 decimal
13 bits is less than 31 bits, so we can safely save another character on the bitshift instead of
That eliminates one memory-call (var
One would think that: obviously these 3 extra optimizations beat my first/second algo (which as TrueBlueAussie commented, was already the fastest)...
As it turned out my algo 2 was the fastest after-all (except TrueBlueAussie's full 2D array of-course, although that takes quite some more memory and still requires a fast algo to build it client-side), I followed TrueBlueAussie's advice to revert my answer to using my algo 2.
Still I had a blast collaborating and am grateful for the incentive to revisit my answer !
In computer terms,
The only real competition for speed is from @GitaarLab, so I have created a head-to-head JSPerf for us to test on: http://jsperf.com/days-in-month-head-to-head/5
I keep trying different code changes to get the best performance.
After looking at this related question Leap year check using bitwise operators (amazing speed) and discovering what the 25 & 15 magic number represented, I have come up with this optimized hybrid of answers:
JSPerf results: http://jsperf.com/days-in-month-head-to-head/5
For some reason,
This one removed a single
This one removed any the unnecessary brackets:
This one was down to
This was my original stab at it:
A quick lesson in binary months:
If you interpret the index of the desired months (Jan = 1) in binary you will notice that months with 31 days either have bit 3 clear and bit 0 set, or bit 3 set and bit 0 clear.
That means you can shift the value 3 places with
JSPerf results: http://jsperf.com/days-in-month-perf-test/6 (23 times faster than the accepted answer).
Update: I ran a comparison of the top two answers + latest (@James, @Caleb & @GitaarLAB) against this one to ensure they gave consistent results and all 4 return the same values for all months in all years from year 1 to year 4000: http://jsfiddle.net/TrueBlueAussie/8Lmpnpz4/6/. Year 0 is the same for all except @Caleb.
If absolute speed were the only goal, and you do not mind wasting memory, then storing the results for a given span of years, in a 2-dimensional table is probably the fastest possible way:
In the spirit of not doing your homework for you, I present a version in POVRay (sorry, not JS) I did many years ago.
In POVRay, there are no boolean variables. The method I came up with was to create a polynomial in 'm' which gave an answer > 0 for months with 31 days and < 0 for months with 30 days.
The tricky part is to decide when the year is a leap year. This is the full test for leap years. Most people are aware of the 4-year rule, and since 2000, some know about the 100 and 400 year rules, there is no 4000 year rule.
Loved James' answer as well as Bruno's explanation of it. However, got annoyed at the overly cryptic nature of the solution. So here is the same solution but cleaned of any unnecessary over encryption.
Standing on the shoulders of GitaarLAB, TrueBlueAussie, et al, I propose: