05-07-2017, 01:35 PM
Count to 1000
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05-09-2017, 09:50 AM
144
i actually playing the "rick astley - never gonna give you up" video . so if you see the image above you technically are rickrolled by me
i actually playing the "rick astley - never gonna give you up" video . so if you see the image above you technically are rickrolled by me
humanpuff69@FPAX:~$ Thanks To Shadow Hosting And Post4VPS for VPS 5
09-11-2017, 10:41 PM
146 146 146 146 146 ر 146 146 146 146 146 146 146 146 146 146 146
09-12-2017, 09:25 AM
149
149 is the 35th prime number, and with the next prime number, 151, is a twin prime, thus 149 is a Chen prime.[1]
149 is an emirp, since the number 941 is also prime.[2]
149 is a strong prime in the sense that it is more than the arithmetic mean of its two neighboring primes.
149 is an irregular prime since it divides the numerator of the Bernoulli number B130.
149 is an Eisenstein prime with no imaginary part and a real part of the form 3 n − 1 {\displaystyle 3n-1} 3n-1.
The repunit with 149 1s is a prime in base 5 and base 7.
Given 149, the Mertens function returns 0.[3] It is the third prime having this property.[4]
149 is a tribonacci number, being the sum of the three preceding terms, 24, 44, 81.[5]
149 is a strictly non-palindromic number, meaning that it is not palindromic in any base from binary to base 147. However, in base 10 (and also base 2), it is a full reptend prime, since the decimal expansion of 1/149 repeats 006711409395973154362416107382550335570469798657718120805369127516778523489932885906040268 4563758389261744966442953020134228187919463087248322147651 indefinitely.
In the military
149 is the 35th prime number, and with the next prime number, 151, is a twin prime, thus 149 is a Chen prime.[1]
149 is an emirp, since the number 941 is also prime.[2]
149 is a strong prime in the sense that it is more than the arithmetic mean of its two neighboring primes.
149 is an irregular prime since it divides the numerator of the Bernoulli number B130.
149 is an Eisenstein prime with no imaginary part and a real part of the form 3 n − 1 {\displaystyle 3n-1} 3n-1.
The repunit with 149 1s is a prime in base 5 and base 7.
Given 149, the Mertens function returns 0.[3] It is the third prime having this property.[4]
149 is a tribonacci number, being the sum of the three preceding terms, 24, 44, 81.[5]
149 is a strictly non-palindromic number, meaning that it is not palindromic in any base from binary to base 147. However, in base 10 (and also base 2), it is a full reptend prime, since the decimal expansion of 1/149 repeats 006711409395973154362416107382550335570469798657718120805369127516778523489932885906040268 4563758389261744966442953020134228187919463087248322147651 indefinitely.
In the military
09-12-2017, 09:40 AM
humanpuff69@FPAX:~$ Thanks To Shadow Hosting And Post4VPS for VPS 5
09-12-2017, 10:05 AM
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