The compositorial of a number 
is equal to the product of composite numbers less than or equal to .
is equal to the product of composite numbers less than or equal to .
The compositorial of is thus equal to 
, where 
denotes the primorial of .
The first distinct compositorials are 1, 4, 24, 192, 1728, 17280, 207360, 2903040, 43545600, 696729600, 12541132800, 250822656000, 5267275776000, 115880067072000.
Pictorial representation of remainders (mod 2, 3, ...,11) frequency. For a table of values and more details click here
Compositorials can also be... (you may click on names or numbers)
ABA
24
192
aban
24
192
abundant
24
192
1728
17280
207360
2903040
43545600
Achilles
5267275776000
admirable
24
amenable
24
192
1728
17280
207360
2903040
43545600
696729600
apocalyptic
192
17280
congruent
24
17280
constructible
24
192
cube
1728
Cunningham
24
d-powerful
24
dig.balanced
2903040
droll
17280
economical
192
1728
17280
207360
2903040
equidigital
192
1728
17280
2903040
eRAP
24
evil
24
192
1728
17280
2903040
43545600
696729600
factorial
24
frugal
207360
696729600
gapful
192
1728
17280
207360
2903040
43545600
696729600
12541132800
happy
192
Harshad
24
192
1728
17280
207360
2903040
43545600
696729600
highly composite
24
iban
24
idoneal
24
interprime
192
1728
43545600
Jordan-Polya
24
192
1728
17280
207360
2903040
43545600
696729600
12541132800
250822656000
5267275776000
115880067072000
Lynch-Bell
24
metadrome
24
nonagonal
24
nude
24
odious
207360
panconsummate
24
pernicious
24
192
207360
plaindrome
24
power
1728
powerful
1728
5267275776000
practical
24
192
1728
17280
207360
2903040
pseudoperfect
24
192
1728
17280
207360
Ruth-Aaron
24
Saint-Exupery
12541132800
self
1728
super Niven
24
superabundant
24
tau
24
17280
696729600
tribonacci
24
trimorphic
24
unprimeable
17280
untouchable
1728
207360
wasteful
24
Zuckerman
24
Zumkeller
24
192
1728
17280