120 is • the
factorial of 5, i.e., 5!=5\cdot 4\cdot 3\cdot 2\cdot 1. • the fifteenth
triangular number, as well as the sum of the first eight triangular numbers, making it also a
tetrahedral number. 120 is the smallest number to appear six times in
Pascal's triangle (as all triangular and tetragonal numbers appear in it). Because 15 is also triangular, 120 is a
doubly triangular number. 120 is divisible by the first five triangular numbers and the first four tetrahedral numbers. It is the eighth
hexagonal number. • The 10th
highly composite, the 5th
superior highly composite,
superabundant, and the 5th
colossally abundant number. It is also a
sparsely totient number. 120 is also the smallest highly composite number with no adjacent prime number, being adjacent to 119=7\cdot 17 and 121=11^2. It is also the smallest positive multiple of six not adjacent to a prime. • 120 is the first
multiply perfect number of order three (
a 3-perfect or
triperfect number). The sum of its factors (including one and itself) sum to
360, exactly three times 120.
Perfect numbers are order two (
2-perfect) by the same definition. • 120 is the sum of a
twin prime pair (59 + 61) and the sum of four consecutive
prime numbers (23 + 29 + 31 + 37), four consecutive
powers of two (8 + 16 + 32 + 64), and four consecutive powers of three (3 + 9 + 27 + 81). • 120 is divisible by the number of primes below it (30). However, there is no integer that has 120 as the sum of its proper divisors, making 120 an
untouchable number. • The sum of
Euler's totient function \phi (x) over the first nineteen integers is 120. • As 120 is a factorial and one less than a square (5!=11^{2}-1), it—with 11—is one of the few
Brown number pairs. • 120 appears in
Pierre de Fermat's modified Diophantine problem as the largest known integer of the sequence 1, 3, 8, 120. Fermat wanted to find another positive integer that, when multiplied by any of the other numbers in the sequence, yields a number that is one less than a square.
Leonhard Euler also searched for this number. He failed to find an integer, but he did find a fraction that meets the other conditions: \frac {777,480}{2879^{2}}. • The internal angles of a regular
hexagon (one where all sides and angles are equal) are all 120
degrees. ==In science==