Monday, November 20, 2017

Number of the day: 10991

Benoit Mandelbrot was born on this day 93 years ago.

Properties of the number 10991:

10991 is a cyclic number.
10991 = 29 × 379 is semiprime and squarefree.
10991 has 2 distinct prime factors, 4 divisors, 15 antidivisors and 10584 totatives.
10991 has an oblong digit sum 20 in base 10.
Reversing the decimal digits of 10991 results in an emirpimes.
10991 = 223 + 73 is the sum of 2 positive cubes in 1 way.
10991 = 54962 - 54952 = 2042 - 1752 is the difference of 2 nonnegative squares in 2 ways.
10991 is the sum of 2 positive triangular numbers.
10991 is the difference of 2 positive pentagonal numbers in 2 ways.
10991 is not the sum of 3 positive squares.
109912 = 75802 + 79592 is the sum of 2 positive squares in 1 way.
109912 is the sum of 3 positive squares.
10991 is a proper divisor of 15673 - 1.
10991 is an emirpimes in (at least) the following bases: 2, 4, 8, 10, 11, 15, 17, 18, 19, 20, 22, 25, 27, 31, 32, 41, 43, 46, 47, 49, 54, 61, 65, 67, 68, 74, 76, 77, 80, 81, 82, 84, 85, 87, 90, 91, 97, 99, and 100.
10991 is palindromic in (at least) the following bases: 23, 34, -9, -67, and -99.
10991 in base 4 = 2223233 and consists of only the digits '2' and '3'.
10991 in base 23 = khk and consists of only the digits 'h' and 'k'.
10991 in base 27 = f22 and consists of only the digits '2' and 'f'.
10991 in base 34 = 9h9 and consists of only the digits '9' and 'h'.
10991 in base 60 = 33B and consists of only the digits '3' and 'B'.

The number 10991 belongs to the following On-Line Encyclopedia of Integer Sequences (OEIS) sequences (among others):

Sequence numbers and descriptions below are taken from OEIS.
A023192: Conjecturally, number of infinitely-recurring prime patterns on n consecutive integers.
A028948: An "extremely strange sequence": a(n+1) = [ A*a(n)+B ]/p^r, where p^r is the highest power of p diving [ A*a(n)+B ] and p=2, A=4.001, B=1.2.
A060354: The n-th n-gonal number.
A066831: Numbers n such that sigma(n) divides sigma(phi(n)).
A067383: Numbers n such that sigma(phi(n))/sigma(n) = 3.
A085366: Semiprimes that are the sum of two positive cubes. Common terms of A003325 and A046315.
A224483: Numbers which are the sum of two positive cubes and divisible by 29.
A252039: T(n,k)=Number of (n+2)X(k+2) 0..4 arrays with every 3X3 subblock row and column sum nonprime and every diagonal and antidiagonal sum prime
A255187: 29-gonal numbers: a(n) = n*(27*n-25)/2.
A262909: a(n) = greatest k such that A155043(k+A262509(n)) < A155043(A262509(n)).

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