99000

Appears in sequences

• Theta series of A*_10 lattice.at n=49A023922
• Number of paths on the surface of the n-dimensional lattice [0..2]^n; i.e., the lattice paths that do not pass through the point (1,1,...,1).at n=4A071798
• a(n) is the largest number such that all of a(n)'s length-n substrings are distinct and divisible by 15.at n=2A093215
• a(n) is the largest number such that all of a(n)'s length-n substrings are distinct and divisible by 18.at n=2A093218
• a(n) is the largest number such that all of a(n)'s length-n substrings are distinct and divisible by 30.at n=2A093230
• a(n) is the largest number such that all of a(n)'s length-n substrings are distinct and divisible by 45.at n=2A093798
• Numbers whose set of base 10 digits is {0,9}.at n=24A097256
• 10^n-10^(n-2).at n=5A105694
• Numbers n where either n or n+1 is divisible by the numbers from 1 to 12.at n=28A131662
• a(n) = n^5 - n^3.at n=10A133754
• Numbers n that raised to the powers from 1 to k (with k>=1) are multiple of the sum of their digits (n raised to k+1 must not be a multiple). Case k=11.at n=18A135196
• Numbers k such that k and k^2 use only the digits 0, 1, 4, 8 and 9.at n=46A136867
• Numbers k such that k and k^2 use only the digits 0, 1, 5, 8 and 9.at n=30A136874
• Numbers k such that k and k^2 use only the digits 0, 1, 6, 8 and 9.at n=32A136879
• Numbers k such that k and k^2 use only the digits 0, 1, 7, 8 and 9.at n=32A136880
• Numbers k such that k and k^2 use only the digits 0, 1, 8 and 9.at n=30A136881
• Numbers with prime factorization pq^2r^3s^3.at n=7A190320
• Number A(n,k) of lattice paths without interior points from {n}^k to {0}^k using steps that decrement one component by 1; square array A(n,k), n>=0, k>=0, read by antidiagonals.at n=30A225094
• Number of nonisomorphic proper colorings of partition multicycle graph using six colors.at n=83A298266
• Numbers m such that the largest digit in the decimal expansion of 1/m is 1.at n=23A333402