83737

Properties

Appears in sequences

• Primes whose consecutive digits differ by 4 or 5.at n=34A048416
• Start of the first run of exactly n consecutive primes, none of which are twin primes.at n=23A065044
• Number of nX3 binary arrays without the pattern 0 0 0 antidiagonally or horizontally.at n=5A188868
• T(n,k)=Number of nXk binary arrays without the pattern 0 0 0 antidiagonally or horizontally.at n=33A188874
• Number of 6Xn binary arrays without the pattern 0 0 0 antidiagonally or horizontally.at n=2A188878
• T(n,k)=Number of nXk binary arrays without the pattern 0 1 0 antidiagonally or horizontally.at n=33A189064
• Number of 6Xn binary arrays without the pattern 0 1 0 antidiagonally or horizontally.at n=2A189068
• Number of nX6 binary arrays without the pattern 0 0 1 vertically or antidiagonally.at n=2A189193
• T(n,k)=Number of nXk binary arrays without the pattern 0 0 1 vertically or antidiagonally.at n=30A189196
• Primes of the form 2*n^2 + 78*n + 37.at n=29A217501
• T(n,k)=Number of nXk 0..1 arrays with rows and antidiagonals unimodal.at n=33A223680
• Number of 6Xn 0..1 arrays with rows and antidiagonals unimodal.at n=2A223684
• Prime(n), where n is such that (1 + Sum_{i=1..n} prime(i)^15) / n is an integer.at n=15A233414
• Primes of form n^2 + 20736.at n=20A256840
• Prime numbersat n=8171