# 1627

$t_title is "1627"

$t_adjust_path is "/~caldwell/curios/"

$t_class is "prime"

$short is "1627"

$nunber_id is "1644"

$t_meta['description'] is "One of many pages of prime number
curiosities and trivia. This page discusses 1627
Come explore a new prime today!"

The start of the first occurrence of three consecutive primes ending with the digit seven (1627, 1637, 1657). [Murthy]

The sum 2^(1/2)+3^(1/2)+5^(1/2)+...+43^(1/2)+47^(1/2) differs from the fraction 1627/(5^2) by less than 1/(2*10^5). Note that 1627 is prime. [Rupinski]

The last auroch (*Bos primigenius*) died in 1627.

The sum of the first 1627 palindromes is divisible by 1627 (242234268/1627=148884). The next such prime is 48337. [Gaydos]

The sum of the first three pernicious Honaker primes is a prime number. It is the smallest example of this form. [Bajpai]

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