# Why is 27000 a magic number for video point/frame description in full numbers

One video processing software vendor i work with uses the multiplicator "27000" to describe in and out points of videos in full numbers. I never got out why...

One example: We want to describe the point [end of the first frame] of a video that has got those properties

• Frames per second: 23.976
• milliseconds per frame: 41,70837504170838
• fps numerator/denominator: 24000/1001

My question is: what makes the number 27000 magical for videos? Or what formula could i use to calculate it... When multiplying any of the following common video framerates with this magic number, we always get an a value without commas:

Outpoint = (1000/23,97602397602398) * 27000 = 1126125

In Words:

Outpoint= (MillisecondsInASecond/MilliSecondsPerFrame) * 27000

Here a list of common framerates: It's not really magic. It's about common demoninators... 27000 is just the product of the cubes of the first three prime numbers ...

``````27000 = 2^3 * 3^3 * 5^3
``````

That is, 27000 is evenly divisible by a whole slew of numbers...

`````` 2
3
4  (=2*2)
5
6  (=2*3)
8  (=2*2*2)
9  (=3*3)
10  (=2*5)
12  (=2*2*3)
15  (=3*5)
``````

(notably absent from the list of divisors are primes... `7`, `11`, `13`, ...)

So 27000 is an even multiple of the most common frame rates:

``````24   (=2*2*2*3)
25   (=5*5)
30   (=2*3*5)
50   (=2*5*5)
60   (=2*2*3*5)
120  (=2*2*2*3*5)
``````

1001 milliseconds / 24 frames

``````( 1001 / 24 ) * 27000
``````

can be refactored as

``````1001 * ( 27000 / 24 )
``````

the trick is that 27000 (`2^3*3^3*5^3`) is evenly divisible by 24 (`2^3*3`)

``````1001 * ( 2^3*3^3*5^3 ) / (2^3*3)
``````

or

``````1001 * (3^2*5^3)
``````

This trick with 27000 wouldn't work with bizarre frame rates. I don't think anyone does a framerate of 77 frames per second (77=7*11).