88883

Properties

Appears in sequences

• Primes that contain digits 3 and 8 only.at n=9A020464
• Smallest prime containing exactly n 8's.at n=4A037069
• Smallest prime beginning with exactly n 8's.at n=4A065591
• Largest n-digit prime with all even digits except for the least significant digit.at n=4A068692
• Primes of the form identical digits followed by a 3.at n=14A090146
• Primes of the form 80*R_k + 3, where R_k is the repunit (A002275) of length k.at n=3A093166
• a(n) is the largest prime before A002282(n) repdigits.at n=4A099668
• Near-repdigit primes with at least two 8's as the repeated digit.at n=4A105976
• Prime numbers, with a(1)=2, a(n+1) = least prime such that (sum of even digits of a(n)) < (sum of even digits of a(n+1)).at n=15A158084
• Primes with at least one digit appearing exactly four times in the decimal expansion.at n=33A161786
• Primes containing 888 as a substring.at n=18A167290
• a(n) = (8*10^n - 53)/9 for n > 0.at n=4A173811
• Largest n-digit prime with the most digits equal to 8.at n=4A178006
• Primes having only {3, 4, 8} as digits.at n=29A199348
• Primes formed by concatenating k, k and 3 for k >= 1.at n=22A210512
• For k in {2,3,...,9} define a sequence as follows: a(0)=0; for n>=0, a(n+1)=a(n)+1, unless a(n) ends in k, in which case a(n+1) is obtained by replacing the last digit of a(n) with the digit(s) of k^2. This is k(9).at n=39A237346
• Primes p such that digits of p do not appear in p^4.at n=18A253574
• Primes having only {2, 3, 8} as digits.at n=33A260127
• Primes having only {3, 5, 8} as digits.at n=27A260226
• Primes having only {0, 3, 8} as digits.at n=21A261434