In computer terms, `new Date()`

and `regular expression`

solutions are *slow!* If you want a super-fast (and super-cryptic) one-liner, try this one (assuming `m`

is in `Jan=1`

format). I keep trying different code changes to get the best performance.

**My current ***fastest* version:

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 (note the parameters `m`

& `y`

must obviously be integers for this to work):

```
function getDaysInMonth(m, y) {
return m===2 ? y & 3 || !(y%25) && y & 15 ? 28 : 29 : 30 + (m+(m>>3)&1);
}
```

Given the bit-shifting this obviously assumes that your `m`

& `y`

parameters are both integers, as passing numbers as strings would result in weird results.

**JSFiddle:** http://jsfiddle.net/TrueBlueAussie/H89X3/22/

**JSPerf results:** http://jsperf.com/days-in-month-head-to-head/5

For some reason, `(m+(m>>3)&1)`

is more efficient than `(5546>>m&1)`

on *almost* all browsers.

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

It works based on my leap year answer here: javascript to find leap year this answer here Leap year check using bitwise operators (amazing speed) as well as the following binary logic.

**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.

```
Jan = 1 = 0001 : 31 days
Feb = 2 = 0010
Mar = 3 = 0011 : 31 days
Apr = 4 = 0100
May = 5 = 0101 : 31 days
Jun = 6 = 0110
Jul = 7 = 0111 : 31 days
Aug = 8 = 1000 : 31 days
Sep = 9 = 1001
Oct = 10 = 1010 : 31 days
Nov = 11 = 1011
Dec = 12 = 1100 : 31 days
```

That means you can shift the value 3 places with `>> 3`

, XOR the bits with the original `^ m`

and see if the result is `1`

or `0`

*in bit position 0* using `& 1`

. Note: It turns out `+`

is slightly faster than XOR (`^`

) and `(m >> 3) + m`

gives the same result in bit 0.

**JSPerf results**: http://jsperf.com/days-in-month-perf-test/6