| ||||
---|---|---|---|---|
Cardinal | one hundred sixty-eight | |||
Ordinal | 168th (one hundred sixty-eighth) | |||
Factorization | 23 × 3 × 7 | |||
Divisors | 1, 2, 3, 4, 6, 7, 8, 12, 14, 21, 24, 28, 42, 56, 84, 168 | |||
Greek numeral | ΡΞΗ´ | |||
Roman numeral | CLXVIII | |||
Binary | 101010002 | |||
Ternary | 200203 | |||
Senary | 4406 | |||
Octal | 2508 | |||
Duodecimal | 12012 | |||
Hexadecimal | A816 |
168 (one hundred [and] sixty-eight) is the natural number following 167 and preceding 169.
It is the number of hours in a week, or 7 x 24 hours.
168 is the of fourth Dedekind number, [1] and one of sixty-five idoneal numbers. [2] It is one less then a square (132), equal to the product of the first two perfect numbers [3]
There are 168 primes less than 1000. [a]
The 128th composite number is 168, [4] one of a few numbers in the list of composites whose indices are the product of strings of digits of in decimal representation.
The first nine with this property are the following: [4]
The next such number is 198 where 19 × 8 = 152. The median between twenty-one integers [48, 68] is 58, where 148 is the median of forty-one integers [168, 128].
For the Euler totient there is , [5] where is also equivalent to the number of divisors of 168; [6] only eleven numbers have a totient of 48:{ 65, 104, 105, 112, 130, 140, 144, 156, 168, 180, 210}. [5] [d]
408, [e] with a different permutation of the digits { 0, 4, 8} where 048 is 48, has an totient of 128. So does the sum-of-divisors of 168, [9]
as one of nine numbers total to have a totient of 128. [5]
Leonard Euler noted 65 idoneal numbers (the most known, of only a maximum possible of two more), such that for an integer , expressible in only one way, yields a prime power or twice a prime power. [2] [10]
Of these, 168 is the forty-fourth, where the smallest number to not be idoneal is the fifth prime number 11. [2] The largest such number 1848 (that is equivalent with the number of edges in the union of two cycle graphs of order 42) [11] contains a total of thirty-two divisors whose arithmetic mean is 180 [12] [13] (the second-largest number to have a totient of 48). [5] Preceding 1848 in the list of idoneal numbers is 1365, [f] whose arithmetic mean of divisors is equal to 168 [12] [13] (while 1365 has a totient of 576 = 242).
Where 48 is the 27th ideoneal number, 408 is the 58th. [2] [g] On the other hand, the total count of known idoneal numbers (65), that is also equal to the sum of ten integers [2, ..., 11], has a sum-of-divisors of 84 (or, one-half of 168). [9]
In base 10, 168 is the largest of ninety-two known such that does not contain all numerical digits from that base (i.e. 0, 1, 2, ..., 9). [15]
is the first number to have such an expression where between the next two is an interval of ten integers: [ 70, 79; [15] the median value between these is 74, the composite index of 100. [4] [h]
As a number of the form for positive integers , and not a perfect power, 168 is the thirty-second Cunningham number, [19] where it is one less than a square:
On the other hand, 168 is one more than the third member of the fourth chain of nearly doubled primes of the first kind { 41, 83, 167}, [20] [21] where 167 represents the thirty-ninth prime [22] (with 39 × 2 = 78). The smallest such chain is {2, 5, 11, 23, 47}.
168 is also coefficient four in the expansion of Eisenstein series , [23] which also includes 144 and 96 (or 48 × 2) as the fifth and third coefficients, respectively — these have a sum of 240, which follows 144 and 187 in the list of successive composites ;cf. [4] the latter holds a sum-of-divisors of 216 = 6 3, [9] which is the 168th composite number. [4]
168 is the number of maximal chains in the Bruhat order of symmetric group [24] which is the largest solvable symmetric group with a total of elements.
168 is the order of the second smallest nonabelian simple group From Hurwitz's automorphisms theorem, 168 is the maximum possible number of automorphisms of a genus 3 Riemann surface, this maximum being achieved by the Klein quartic, whose symmetry group is ; [25] the Fano plane, isomorphic to the Klein group, has 168 symmetries.
In the game of dominoes, tiles are marked with a number of spots, or pips. A Double 6 set of 28 tiles contains a total of 168 pips.
Some Chinese consider 168 a lucky number, because it is roughly homophonous with the phrase "一路發" which means "fortune all the way", or, as the United States Mint claims, "Prosperity Forever". [26]
| ||||
---|---|---|---|---|
Cardinal | one hundred sixty-eight | |||
Ordinal | 168th (one hundred sixty-eighth) | |||
Factorization | 23 × 3 × 7 | |||
Divisors | 1, 2, 3, 4, 6, 7, 8, 12, 14, 21, 24, 28, 42, 56, 84, 168 | |||
Greek numeral | ΡΞΗ´ | |||
Roman numeral | CLXVIII | |||
Binary | 101010002 | |||
Ternary | 200203 | |||
Senary | 4406 | |||
Octal | 2508 | |||
Duodecimal | 12012 | |||
Hexadecimal | A816 |
168 (one hundred [and] sixty-eight) is the natural number following 167 and preceding 169.
It is the number of hours in a week, or 7 x 24 hours.
168 is the of fourth Dedekind number, [1] and one of sixty-five idoneal numbers. [2] It is one less then a square (132), equal to the product of the first two perfect numbers [3]
There are 168 primes less than 1000. [a]
The 128th composite number is 168, [4] one of a few numbers in the list of composites whose indices are the product of strings of digits of in decimal representation.
The first nine with this property are the following: [4]
The next such number is 198 where 19 × 8 = 152. The median between twenty-one integers [48, 68] is 58, where 148 is the median of forty-one integers [168, 128].
For the Euler totient there is , [5] where is also equivalent to the number of divisors of 168; [6] only eleven numbers have a totient of 48:{ 65, 104, 105, 112, 130, 140, 144, 156, 168, 180, 210}. [5] [d]
408, [e] with a different permutation of the digits { 0, 4, 8} where 048 is 48, has an totient of 128. So does the sum-of-divisors of 168, [9]
as one of nine numbers total to have a totient of 128. [5]
Leonard Euler noted 65 idoneal numbers (the most known, of only a maximum possible of two more), such that for an integer , expressible in only one way, yields a prime power or twice a prime power. [2] [10]
Of these, 168 is the forty-fourth, where the smallest number to not be idoneal is the fifth prime number 11. [2] The largest such number 1848 (that is equivalent with the number of edges in the union of two cycle graphs of order 42) [11] contains a total of thirty-two divisors whose arithmetic mean is 180 [12] [13] (the second-largest number to have a totient of 48). [5] Preceding 1848 in the list of idoneal numbers is 1365, [f] whose arithmetic mean of divisors is equal to 168 [12] [13] (while 1365 has a totient of 576 = 242).
Where 48 is the 27th ideoneal number, 408 is the 58th. [2] [g] On the other hand, the total count of known idoneal numbers (65), that is also equal to the sum of ten integers [2, ..., 11], has a sum-of-divisors of 84 (or, one-half of 168). [9]
In base 10, 168 is the largest of ninety-two known such that does not contain all numerical digits from that base (i.e. 0, 1, 2, ..., 9). [15]
is the first number to have such an expression where between the next two is an interval of ten integers: [ 70, 79; [15] the median value between these is 74, the composite index of 100. [4] [h]
As a number of the form for positive integers , and not a perfect power, 168 is the thirty-second Cunningham number, [19] where it is one less than a square:
On the other hand, 168 is one more than the third member of the fourth chain of nearly doubled primes of the first kind { 41, 83, 167}, [20] [21] where 167 represents the thirty-ninth prime [22] (with 39 × 2 = 78). The smallest such chain is {2, 5, 11, 23, 47}.
168 is also coefficient four in the expansion of Eisenstein series , [23] which also includes 144 and 96 (or 48 × 2) as the fifth and third coefficients, respectively — these have a sum of 240, which follows 144 and 187 in the list of successive composites ;cf. [4] the latter holds a sum-of-divisors of 216 = 6 3, [9] which is the 168th composite number. [4]
168 is the number of maximal chains in the Bruhat order of symmetric group [24] which is the largest solvable symmetric group with a total of elements.
168 is the order of the second smallest nonabelian simple group From Hurwitz's automorphisms theorem, 168 is the maximum possible number of automorphisms of a genus 3 Riemann surface, this maximum being achieved by the Klein quartic, whose symmetry group is ; [25] the Fano plane, isomorphic to the Klein group, has 168 symmetries.
In the game of dominoes, tiles are marked with a number of spots, or pips. A Double 6 set of 28 tiles contains a total of 168 pips.
Some Chinese consider 168 a lucky number, because it is roughly homophonous with the phrase "一路發" which means "fortune all the way", or, as the United States Mint claims, "Prosperity Forever". [26]