New Prime Numbers
I have found some new prime numbers using the PROTH program of Yves Gallot.
This program is based on the following theorem:
Proth Theorem (1878):
Let N=k 2n +1 where k < 2n . If there is an integer number a so that
a(n-1)/2 =-1(mod N) therefore N is prime.
The Proth program is a test for primality of greater numbers defined as
k bn + 1 or k bn - 1. The program is made to look for numbers of less than
5.000.000 digits and it is optimized for numbers of more than 1000 digits.
Using this Program, I have found the following prime numbers:
3239 212345 + 1 with 3720 digits a=3, a=7
7551 212345 + 1 with 3721 digits a=5, a=7
7595 212345 + 1 with 3721 digits a=3, a=11
9363 212345 + 1 with 3713 digits a=5, a=7
Since the exponents of the first three numbers are Smarandache numbers
Sm(5)=12345 we can call this type of prime numbers, prime numbers
of Smarandache.
Helped by the MATHEMATICA program, I have also found new prime numbers
which are a variant of prime numbers of Fermat. They are the following:
2^(2^n)·3^(2^n)-2^(2^n)-3^(2^n), for n=1,4,5,7.
It is important to mention that for n=7 the number which is obtained has 100 digits.
Chris Nash has verified the values n=8 to n=20, this last one being a number of
815.951 digits, obtaining that they are all composite. All of them have tiny factor
except n=13.
REFERENCES:
Smarandache Factors and Reverse Factors. Micha Fluren. Smarandache Notions
Journal Vol. 10. www.gallup.unm.edu/~Smarandache
The Prime Pages www.utm.edu/research/primes
AUTHOR:
Sebastián Martín Ruiz . Avda. de Regla 43. Chipiona 11550 Spain