91204
domain: N
Appears in sequences
- Squares of numbers in triangle of Eulerian numbers that are not 1.at n=7A014732
- Squares of numbers in triangle of Eulerian numbers that are not 1.at n=8A014732
- Squares of even numbers in triangle of Eulerian numbers.at n=4A014733
- Squares of even numbers in triangle of Eulerian numbers.at n=5A014733
- Squares of numbers in array formed from elements to the right of middle of rows of triangle of Eulerian numbers.at n=6A014748
- Squares of numbers in array formed from elements to the right of middle of rows of triangle of Eulerian numbers that are not 1.at n=2A014749
- Squares of numbers in array formed from even elements to the right of middle of rows of triangle of Eulerian numbers.at n=1A014759
- Squares of distinct elements in triangle of Eulerian numbers.at n=6A014765
- a(n) = (8*n+6)^2.at n=37A017138
- a(n) = (10*n + 2)^2.at n=30A017294
- a(n) = (11*n + 5)^2.at n=27A017450
- a(n) = (12*n + 2)^2.at n=25A017546
- Palindromic squares in base 12.at n=13A029738
- Squares with initial digit '9'.at n=10A045793
- a(n) = 4*prime(n)^2.at n=35A069262
- Squares of the form n+prime(n).at n=28A104992
- Perfect powers which have the form prime(n) + n for some n.at n=34A107606
- Squares of the form semiprime(n) + prime(n).at n=32A111440
- a(1)=1, then a(n) is the smallest square not occurring earlier, not ending with zero and starting with the last digit of a(n-1).at n=43A155985
- Square numbers s such that all the digits needed to write the consecutive square numbers from 0 to s fill exactly a square (no holes, no overlaps).at n=12A158028