33426748355
domain: N
Appears in sequences
- a(n) = prime(n)*...*prime(m), the least product of consecutive primes which is non-deficient.at n=2A007702
- a(n) = prime(n)*...*prime(m), the least product of consecutive primes which is abundant.at n=2A007741
- Numbers that are the product of 9 successive primes.at n=2A046327
- Product of primes < n that do not divide n.at n=35A066838
- Product of primes greater than the greatest prime factor of n but not greater than n.at n=35A083722
- a(1) = 1; for n>1, a(n) = a(n-1)*n if n is prime, a(n) = a(n-1)/n if n is composite dividing a(n-1) else a(n) = a(n-1).at n=30A085087
- a(1) = 1; for n>1, a(n) = a(n-1)*n if n is prime, a(n) = a(n-1)/n if n is composite dividing a(n-1) else a(n) = a(n-1).at n=31A085087
- Denominator of 1 - Sum_{i=1..n} Bernoulli(i).at n=30A100650
- Denominator of 1 - Sum_{i=1..n} Bernoulli(i).at n=31A100650
- Primorial number quotients arising in A007684: a(n) = A002110(A007684(n))/A002110(n-1).at n=2A112642
- Odd abundant numbers not divisible by 3.at n=3A115414
- Denominators of partial sums of (p+q)/p*q, where p and q are primes.at n=21A120832
- Denominators of partial sums of (p+q)/p*q, where p and q are primes.at n=22A120832
- Least odd primitive abundant numbers with no factor 3 and with 5^n but not 5^(n+1) as a factor.at n=1A133849
- Denominator of the fraction c(n) defined in A172030.at n=32A172031
- Least number k having exactly n distinct prime divisors and the Stern polynomial B(k,x) is irreducible.at n=8A186886
- Smallest odd primitive abundant number (A006038) having n distinct prime factors.at n=6A188342
- Smallest number k such that the n prime distinct divisors of k are also n consecutive divisors of k.at n=8A227105
- a(n) = product of distinct terms of row n in triangle A255313.at n=15A255427
- a(n) = product of distinct terms of row n in triangle A255313.at n=16A255427