The sum of the first 53 primes is 5830, which is divisible by 53, a property shared by only a few other numbers.[2][3]
53 cannot be expressed as the sum of any integer and its decimal digits, making 53 the ninth self number in decimal.[4]
53 is the smallest prime number that does not divide the order of any sporadic group, inclusive of the six pariahs; it is also the first prime number that is not a member of Bhargava's prime-universality criterion theorem (followed by the next prime number 59), an integer-matrix quadratic form that represents all prime numbers when it represents the sequence of seventeen integers {2, ..., 47, 67, 73}.[5]