5391411025
domain: N
Appears in sequences
- Smallest abundant number (sigma(x) > 2x) which is not divisible by any of the first n primes.at n=2A047802
- Primitive abundant numbers that set a new record for number of divisors.at n=21A083873
- Smallest abundant number relatively prime to n.at n=5A114371
- Smallest abundant number relatively prime to n.at n=11A114371
- Smallest abundant number relatively prime to n.at n=17A114371
- Smallest abundant number relatively prime to n.at n=23A114371
- Smallest abundant number relatively prime to n.at n=35A114371
- Smallest abundant number with some prime powers fixed by n.at n=5A114809
- Odd abundant numbers not divisible by 3.at n=0A115414
- Least odd primitive abundant number with 3^n as a divisor, but not 3^(n+1).at n=0A133688
- Least odd primitive abundant numbers with no factor 3 and with 5^n but not 5^(n+1) as a factor.at n=2A133849
- Abundant numbers that differ from the next abundant number by 5.at n=0A306497
- a(n) is the smallest abundant number that differs from the next abundant number by n.at n=4A331202
- Highly composite 5-rough numbers: numbers that are divisible by neither 2 nor 3 whose number of divisors reaches a record.at n=25A343734
- Column 0 of the irregular triangle A355588.at n=30A355952
- Column 0 of the irregular triangle A355588.at n=31A355952
- Least number k coprime to 2 and 3 such that sigma(k)/k >= n.at n=1A358412