I actually left my third KCP choice up to my mom. I showed her some of my FCs I was considering for KCP2019, and she pointed to Shiloh and said "I think you should enter the mermaid girl."

Jan 1 2019 - Brick, Total Drama Feb 9 - Blaise x Callisto Feb 27 - Gundham Tanaka, Danganronpa Mar 10 - Green Mask April 9 - Onionfest Sarge Fan June 1 - Professor Layton June 13 - Ocean Throwing Blaise June 27 - Animal, The Muppets June 28 - Ocean Throwing Blaise... Again July 12 - Cherry Pepsi July 17 - Kingsley's Customerpalooza 2019 Entries! August 8 - Ode Made It To KCP19! August 28 - Akira, Wii Sports Gang August 31 - Keaton September 13 - My Art of Ode for KCP2019 September 18 - My Drakson Art October 1 - Allan's Style H October 14 - Glowflake by Pogo October 21 - Michael Jackson Eating Popcorn November 1 - My Keaton Art November 12 - Kaito Momota, Danganronpa (name change to Kaito) November 22 - Allan December 26 - Tanner (FC Games 2) February 16 2020 - Tanr (derpy Tanner) March 23 - Kaito Momota, Danganronpa April 22 - Tanner Couch April 27 - Tanner's FCG3 Outfit May 22 - Tanner Holding Fizzo June 18 - Cosmic Fizzo

Favorite Quotes:

Theo [Aug 28 07:11 PM]: speedo your love for asian women is undying

I don't hate him. It's just that if I had to kill 15 Flipline customers, he would be the 6th one.

-PastelPenguins- [Apr 10 04:56 PM]: I mean, religion should have it's importance to everyone who has one but that shouldn't interfere with their view on other people

I actually left my third KCP choice up to my mom. I showed her some of my FCs I was considering for KCP2019, and she pointed to Shiloh and said "I think you should enter the mermaid girl."

Jan 1 2019 - Brick, Total Drama Feb 9 - Blaise x Callisto Feb 27 - Gundham Tanaka, Danganronpa Mar 10 - Green Mask April 9 - Onionfest Sarge Fan June 1 - Professor Layton June 13 - Ocean Throwing Blaise June 27 - Animal, The Muppets June 28 - Ocean Throwing Blaise... Again July 12 - Cherry Pepsi July 17 - Kingsley's Customerpalooza 2019 Entries! August 8 - Ode Made It To KCP19! August 28 - Akira, Wii Sports Gang August 31 - Keaton September 13 - My Art of Ode for KCP2019 September 18 - My Drakson Art October 1 - Allan's Style H October 14 - Glowflake by Pogo October 21 - Michael Jackson Eating Popcorn November 1 - My Keaton Art November 12 - Kaito Momota, Danganronpa (name change to Kaito) November 22 - Allan December 26 - Tanner (FC Games 2) February 16 2020 - Tanr (derpy Tanner) March 23 - Kaito Momota, Danganronpa April 22 - Tanner Couch April 27 - Tanner's FCG3 Outfit May 22 - Tanner Holding Fizzo June 18 - Cosmic Fizzo

Favorite Quotes:

Theo [Aug 28 07:11 PM]: speedo your love for asian women is undying

I don't hate him. It's just that if I had to kill 15 Flipline customers, he would be the 6th one.

-PastelPenguins- [Apr 10 04:56 PM]: I mean, religion should have it's importance to everyone who has one but that shouldn't interfere with their view on other people

I haven’t gone to work yet lol, it’s in a few hours. I’m just working as a server at a local retirement home, but it’s still my first day at a new job and I just hope everything goes well.

Jan 1 2019 - Brick, Total Drama Feb 9 - Blaise x Callisto Feb 27 - Gundham Tanaka, Danganronpa Mar 10 - Green Mask April 9 - Onionfest Sarge Fan June 1 - Professor Layton June 13 - Ocean Throwing Blaise June 27 - Animal, The Muppets June 28 - Ocean Throwing Blaise... Again July 12 - Cherry Pepsi July 17 - Kingsley's Customerpalooza 2019 Entries! August 8 - Ode Made It To KCP19! August 28 - Akira, Wii Sports Gang August 31 - Keaton September 13 - My Art of Ode for KCP2019 September 18 - My Drakson Art October 1 - Allan's Style H October 14 - Glowflake by Pogo October 21 - Michael Jackson Eating Popcorn November 1 - My Keaton Art November 12 - Kaito Momota, Danganronpa (name change to Kaito) November 22 - Allan December 26 - Tanner (FC Games 2) February 16 2020 - Tanr (derpy Tanner) March 23 - Kaito Momota, Danganronpa April 22 - Tanner Couch April 27 - Tanner's FCG3 Outfit May 22 - Tanner Holding Fizzo June 18 - Cosmic Fizzo

Favorite Quotes:

Theo [Aug 28 07:11 PM]: speedo your love for asian women is undying

I don't hate him. It's just that if I had to kill 15 Flipline customers, he would be the 6th one.

-PastelPenguins- [Apr 10 04:56 PM]: I mean, religion should have it's importance to everyone who has one but that shouldn't interfere with their view on other people

TOTALLY! TOTALLY! It would be so kawaii, it would absolutely confuse the baddies, and Tony and Mandi would be impressed! They could use a pacifier and a rattle as weapons.

TOTALLY! TOTALLY! It would be so kawaii, it would absolutely confuse the baddies, and Tony and Mandi would be impressed! They could use a pacifier and a rattle as weapons.

The facts that 2 and 3 are the first even and odd prime numbers respectively, and that 2 is the only even prime number follow immediately from the definition of a prime number. The fact that there are infinitely many prime numbers, and hence infinitely many odd prime numbers, isn't so obvious. Here is a proof of this fact, it uses proof by contradiction and the fundamental theorem of arithmetic, that every integer greater than or equal to 2 has a unique prime factorization.

First assume that there are only a finite amount of prime numbers, then all of the prime numbers can be listed in the following way, p_1, p_2, p_3, ... p_n. Now consider the number, n=p_1*...*p_n+1. By the fundamental theorem of arithmetic n must be divisible by at least one of these prime numbers which we'll call p_k, hence n=ap_k where a is an integer. Substituting this into out equation we get, ap_k=p_1*...*p_k*...*p_n+1. Dividing both sides of the equation by p_k gives us, a=p_1*...*p_(k-1)*p_(k+1)*...*p_n+1/p_k Now subtract both sides by p_1*...*p_(k-1)*p_(k+1)*...*p_n to arrive at the equation, a-p_1*...*p_(k-1)*p_(k+1)*...*p_n=1/p_k. The left hand side is an integer, so what this equation is telling us is that if we divide 1 by some prime number we will get an integer which we know isn't true. Since we have a contradiction our original assumption, that there are only a finite amount of prime numbers, must be false, hence there are infinitely many prime numbers.