1023456798

Appears in sequences

• Pandigital numbers: numbers containing the digits 0-9. Version 1: each digit appears exactly once.at n=1A050278
• Numbers that are 1-persistent but not 2-persistent.at n=0A051264
• Smallest multiple of n containing all 10 digits from 0 to 9.at n=1A061604
• Smallest multiple of n containing all 10 digits from 0 to 9.at n=5A061604
• Smallest multiple of n containing all 10 digits from 0 to 9.at n=6A061604
• Smallest multiple of n containing all 10 digits from 0 to 9.at n=12A061604
• Smallest multiple of n containing all 10 digits from 0 to 9.at n=13A061604
• Smallest multiple of n containing all 10 digits from 0 to 9.at n=17A061604
• Pandigital numbers: numbers containing the digits 0-9. Version 2: each digit appears at least once.at n=1A171102
• Smallest pandigital number (A171102) divisible by the n-th prime A000040(n).at n=0A180489
• Smallest pandigital number (A171102) divisible by the n-th prime A000040(n).at n=3A180489
• Smallest pandigital number (A171102) divisible by the n-th prime A000040(n).at n=5A180489
• Smallest number that is n-persistent but not (n+1)-persistent, i.e., k, 2*k, ..., n*k, but not (n+1)*k, are pandigital in the sense of A171102; 0 if such a number does not exist.at n=0A204047
• Smallest pandigital number with exactly n prime factors (with multiplicity).at n=6A225298
• Least pandigital number which sums up with the n-th pandigital number A171102(n) to another pandigital number.at n=5A292569
• a(n) is the smallest pandigital number divisible by n, or 0 if no such pandigital number exists.at n=1A302096
• a(n) is the smallest pandigital number divisible by n, or 0 if no such pandigital number exists.at n=5A302096
• a(n) is the smallest pandigital number divisible by n, or 0 if no such pandigital number exists.at n=6A302096
• a(n) is the smallest pandigital number divisible by n, or 0 if no such pandigital number exists.at n=12A302096
• a(n) is the smallest pandigital number divisible by n, or 0 if no such pandigital number exists.at n=13A302096