32942
domain: N
Appears in sequences
- Maxima of the rows of the triangle A259095.at n=48A005577
- a(n) = floor(Pi^n mod n^Pi).at n=27A066434
- Squarefree numbers k with largest prime factor = floor(sqrt(k)).at n=29A071311
- Maximum of A073830(k) for k between A001359(n) and A001359(n+1).at n=12A073831
- Deficient oblong numbers.at n=32A077804
- Intersection of A002378 and A135013.at n=5A135014
- a(n) = (4*n+1)*(4*n+2) = (4*n+2)!/(4*n)!.at n=45A157870
- Composite squarefree numbers n such that p(i)+2 divides n-2, where p(i) are the prime factors of n.at n=2A225712
- Number of nX7 0..3 arrays with no element equal to zero plus the sum of elements to its left or one plus the sum of elements above it or one plus the sum of the elements diagonally to its northwest or zero plus the sum of the elements antidiagonally to its northeast, modulo 4.at n=4A241355
- T(n,k) = Number of n X k 0..3 arrays with no element equal to zero plus the sum of elements to its left or one plus the sum of the elements above it or one plus the sum of the elements diagonally to its northwest or zero plus the sum of the elements antidiagonally to its northeast, modulo 4.at n=59A241356
- Number of 5Xn 0..3 arrays with no element equal to zero plus the sum of elements to its left or one plus the sum of the elements above it or one plus the sum of the elements diagonally to its northwest or zero plus the sum of the elements antidiagonally to its northeast, modulo 4.at n=6A241360
- a(n) = 3*4^n + 10*2^n + 6*3^n + 5^n + 15.at n=6A254364
- Third partial sums of sixth powers (A001014).at n=4A254640
- Partial sums of the number of active (ON, black) cells in n-th stage of growth of two-dimensional cellular automaton defined by "Rule 461", based on the 5-celled von Neumann neighborhood.at n=35A272293
- Positive numbers n such that the set of base-7 digits of n equals both the set of base-8 digits of n and the set of base-9 digits of n.at n=6A292125
- Oblong composite numbers m such that beta(m) = tau(m)/2 - 1 where beta(m) is the number of Brazilian representations of m and tau(m) is the number of divisors of m.at n=13A326384
- Oblong numbers which are products of four distinct primes.at n=33A358988