10123457689
domain: N
Appears in sequences
- Pandigital primes.at n=0A050288
- a(n) is the smallest prime containing all the distinct digits occurring in the first n positive integers.at n=9A068836
- a(n) is the smallest prime containing all the distinct digits occurring in the first n positive integers.at n=10A068836
- a(n) is the smallest prime containing all the distinct digits occurring in the first n positive integers.at n=11A068836
- a(n) is the smallest prime containing all the distinct digits occurring in the first n positive integers.at n=12A068836
- a(n) is the smallest prime containing all the distinct digits occurring in the first n positive integers.at n=13A068836
- a(n) is the smallest prime containing all the distinct digits occurring in the first n positive integers.at n=14A068836
- a(n) is the smallest prime containing all the distinct digits occurring in the first n positive integers.at n=15A068836
- a(n) is the smallest prime containing all the distinct digits occurring in the first n positive integers.at n=16A068836
- a(n) is the smallest prime containing all the distinct digits occurring in the first n positive integers.at n=17A068836
- a(n) is the smallest prime containing all the distinct digits occurring in the first n positive integers.at n=18A068836
- Smallest prime that can be formed using the digits of first 3n+1 numbers, or 0 if no such number exists.at n=2A083428
- Smallest prime using all the digits of first n numbers. If necessary, extra digits can be used.at n=9A088628
- a[n] is the smallest prime built up using the sets of digits {0,1},{0,1,2},...,{0,1,2,3,4,5,6,7,8,9}.at n=8A099182
- Largest primes arising in A099756 which were built up from n distinct digits. This sequence differs from A007810 because more than one copy of each digit is permitted.at n=9A100369
- a(n) is the smallest prime p such that p^n contains every digit.at n=0A112388
- Smallest n-digit prime using the most distinct and consecutive digits.at n=10A141405
- Partial sums of A050288.at n=0A173051
- Smallest prime p = p(k) containing all decimal digits from "1" up to "k" (k = 1,2, ..., 9, 0).at n=9A176009
- a(n) = minimum pandigital prime in base n.at n=8A185122