Prime Numbers
This is just an interesting topic I've been thinking about recently.
In your opinion, do you think there are an infinite amount of prime numbers? Vote in the poll and share your opinion. I think this could make an interesting discussion :). |
Re: Prime Numbers
Maybe.
|
Re: Prime Numbers
There is an infinite amount of numbers. So there might as well be an infinite amount of prime numbers.
|
Re: Prime Numbers
Quote:
That is the question. I'm pretty torn myself. I voted yes, but I can see why you might say no. Gah, brain is fried. 1 limit approaching both infinity and 0 at the same time! Paradox? |
Re: Prime Numbers
There's an infinite amount. Wikipedia article.
|
Re: Prime Numbers
All even numbers are divisible by 2
|
Re: Prime Numbers
http://en.wikipedia.org/wiki/Prime_number
Different URL but just about the same from 2 posts above me |
Re: Prime Numbers
Quote:
|
Re: Prime Numbers
Damn... it's still interesting to think about :P
btw |
Re: Prime Numbers
Prime numbers are sexy. I had no idea until algebra this year that prime numbers have so many sweet properties.
|
Re: Prime Numbers
Yes there's an infinite amount of prime numbers. My math professor proved it last semester lol.
Quote:
|
Re: Prime Numbers
Quote:
I have linear algebra next term. |
Re: Prime Numbers
|
Re: Prime Numbers
Quote:
|
Re: Prime Numbers
Quote:
|
Re: Prime Numbers
Are there infinitely many sets of prime numbers that are only 2 away from each other, i.e. 11 & 13?
|
Re: Prime Numbers
Why is it that all prime numbers that have a remainder of 1 when divided by 4 can be written as the sum of two squared integers, i.e. 13 = 2^2 + 3^2, but all prime numbers that have a remainder of 3 when divided by 4 can't?
http://en.wikipedia.org/wiki/Proofs_...of_two_squares |
Re: Prime Numbers
Quote:
http://shell.cas.usf.edu/~wclark/elem_num_th_book.pdf I'm curently having a class called Linear Algebra and Vector Geometry and it's really fun so you're probably going to like Linear Algebra xD |
Re: Prime Numbers
I think prime numbers have an infinite amount..man i don't remember this stuff anymore i took algebra 2 last year.
|
Re: Prime Numbers
As long as the number system will have an infinite amount of numbers, there will be an infinite amount of prime numbers.
EDIT: *facepalm* Damn it Izzy. |
All times are GMT -5. The time now is 07:40 AM. |
Powered by vBulletin® Version 3.8.1
Copyright ©2000 - 2024, Jelsoft Enterprises Ltd.
Copyright FlashFlashRevolution