Why is two the only even number that is prime?
The other prime numbers are all odd numbers such as $5, 11, 127,$ and $37$. So, why is $2$ the only prime even number there is?
Is it because it only has 1 and itself that way, even though it's even? Check it out on this excellent math page one-fourth from the bottom.
elementary-number-theory
edited Sep 19 at 22:14
Theoretical Economist
3,6762830
asked Nov 3 '14 at 1:40
Mathster
53941422
add a comment |
The other prime numbers are all odd numbers such as $5, 11, 127,$ and $37$. So, why is $2$ the only prime even number there is?
Is it because it only has 1 and itself that way, even though it's even? Check it out on this excellent math page one-fourth from the bottom.
elementary-number-theory
edited Sep 19 at 22:14
Theoretical Economist
3,6762830
asked Nov 3 '14 at 1:40
Mathster
53941422
You mean even I guess... Do you know how prime numbers are defined?
– Curious Droid
Nov 3 '14 at 1:41
2
Just think, all even numbers are divisible by $2$, so they can't be prime. But if $2$ is itself, then it doesn't count.
– Edward Jiang
Nov 3 '14 at 1:42
A prime number has ${largettmbox{just two}}$ different divisors. So $1$ is not prime, $2$ is prime, etc...
– Felix Marin
Nov 3 '14 at 1:56
add a comment |
The other prime numbers are all odd numbers such as $5, 11, 127,$ and $37$. So, why is $2$ the only prime even number there is?
Is it because it only has 1 and itself that way, even though it's even? Check it out on this excellent math page one-fourth from the bottom.
elementary-number-theory
edited Sep 19 at 22:14
Theoretical Economist
3,6762830
asked Nov 3 '14 at 1:40
Mathster
53941422
The other prime numbers are all odd numbers such as $5, 11, 127,$ and $37$. So, why is $2$ the only prime even number there is?
Is it because it only has 1 and itself that way, even though it's even? Check it out on this excellent math page one-fourth from the bottom.
elementary-number-theory
elementary-number-theory
edited Sep 19 at 22:14
Theoretical Economist
3,6762830
asked Nov 3 '14 at 1:40
Mathster
53941422
edited Sep 19 at 22:14
Theoretical Economist
3,6762830
asked Nov 3 '14 at 1:40
Mathster
53941422
edited Sep 19 at 22:14
Theoretical Economist
3,6762830
edited Sep 19 at 22:14
Theoretical Economist
3,6762830
edited Sep 19 at 22:14
Theoretical Economist
3,6762830
3,6762830
asked Nov 3 '14 at 1:40
Mathster
53941422
asked Nov 3 '14 at 1:40
Mathster
53941422
asked Nov 3 '14 at 1:40
Mathster
53941422
53941422
You mean even I guess... Do you know how prime numbers are defined?
– Curious Droid
Nov 3 '14 at 1:41
2
Just think, all even numbers are divisible by $2$, so they can't be prime. But if $2$ is itself, then it doesn't count.
– Edward Jiang
Nov 3 '14 at 1:42
A prime number has ${largettmbox{just two}}$ different divisors. So $1$ is not prime, $2$ is prime, etc...
– Felix Marin
Nov 3 '14 at 1:56
add a comment |
You mean even I guess... Do you know how prime numbers are defined?
– Curious Droid
Nov 3 '14 at 1:41
2
Just think, all even numbers are divisible by $2$, so they can't be prime. But if $2$ is itself, then it doesn't count.
– Edward Jiang
Nov 3 '14 at 1:42
A prime number has ${largettmbox{just two}}$ different divisors. So $1$ is not prime, $2$ is prime, etc...
– Felix Marin
Nov 3 '14 at 1:56
You mean even I guess... Do you know how prime numbers are defined?
– Curious Droid
Nov 3 '14 at 1:41
You mean even I guess... Do you know how prime numbers are defined?
– Curious Droid
Nov 3 '14 at 1:41
2
2
Just think, all even numbers are divisible by $2$, so they can't be prime. But if $2$ is itself, then it doesn't count.
– Edward Jiang
Nov 3 '14 at 1:42
Just think, all even numbers are divisible by $2$, so they can't be prime. But if $2$ is itself, then it doesn't count.
– Edward Jiang
Nov 3 '14 at 1:42
A prime number has ${largettmbox{just two}}$ different divisors. So $1$ is not prime, $2$ is prime, etc...
– Felix Marin
Nov 3 '14 at 1:56
A prime number has ${largettmbox{just two}}$ different divisors. So $1$ is not prime, $2$ is prime, etc...
– Felix Marin
Nov 3 '14 at 1:56
add a comment |
8 Answers
8
active
oldest
votes
A (positive) even number is some number $n$ such that $n = 2 cdot k$ for some (positive) integer $k$. A prime number has only itself and $1$ as (positive) divisors.
What happens if $n not = 2$ in our definition of even numbers?
add a comment |
Why is two the only even $($binary$)$ number that is prime?
For the same reason that three is the only ternary number that is prime. Which is the same reason for which five is the only quinary number that is prime. Etc.
answered Nov 3 '14 at 2:59
Lucian
41k159130
1
This is the best answer!
– HEKTO
Nov 3 '14 at 3:09
add a comment |
Pick a prime $p$. Call a number $n$ $p$-divisible if $pmid n$. Then $p$ is the only $p$-divisible prime, trivially. In particular, $2$ is the only $2$-divisible, or even, prime.
3
(So yes, saying "2 is the only even prime" is a red herring)
– Pedro Tamaroff♦
Nov 3 '14 at 1:56
add a comment |
In the integers, $-2$ is another even prime.
For variety, in the Gaussian integers, $2$ is not prime: e.g. factors as $(1+i)(1-i)$. The even primes of the Gaussian integers are $pm 1 pm i$, although these are all the "same" prime in the same sense that in the integers, $2$ and $-2$ are the "same" prime.
(I define "even" in a number field to be equivalent to its norm being even)
In the ring of all rational numbers with odd denominator, $2/7$ is an even prime. In fact, $2/n$ is prime for every odd integer $n$. (but again, these are all the "same" prime)
There are also number rings that have distinct even primes that are not the "same" in the sense implied above.
answered Nov 3 '14 at 2:00
Hurkyl
111k9117259
add a comment |
Because every even number other than 2 is obviously divisible by 2 and so by definition cannot be prime.
answered Mar 26 '17 at 0:48
John Kontol
1506
add a comment |
A prime number is such that it is divisible by only itself and one. Including 1 as a prime number would violate the fundamental theory of arithmetic, so in modern mathematics it is excluded. Two is a prime because it is divisible by only two and one. All the other even numbers are not prime because they are all divisible by two. That leaves only the odd numbers. Of course, not all odd numbers are prime (e.g. nine is divisible by three).
answered Jan 28 '15 at 8:36
Michael Lee
507314
add a comment |
The word prime comes from the Latin word primus which means "first." Two (2) is the first even number. In other words, it starts all the even numbers. There is more than one odd prime number because odd numbers are never divisible by 2.
answered Mar 26 '17 at 0:32
Carly Brooke Steffen
111
This explanation of the word origin is doubtful. Prime numbers are called prime because they are the "building blocks", the "atoms" of whole numbers. In contrast to /composite/ numbers.
– mathematician
Mar 26 '17 at 0:41
That's why they are considered what would come first as of numbers. A composite number gets its name because it's composed of at least one prime number.
– Carly Brooke Steffen
Mar 27 '17 at 3:03
@mathematician That is not true. They are called "prime" because they are "the first in the list". Take a list of all positive integers. Starting with $2$, circle all numbers that have not been circled yet, and cross out all numbers that are multiples of previous numbers. What you get are the primes, i.e., the first numbers in the list that are not multiples of other numbers.
– Klangen
Sep 19 at 22:15
add a comment |
The number $2$ has only two whole number factors, $1$ and itself. That's pretty much it after this: The other numbers that are even up from two are all divisible by that number in some way. This is also known as the "oddest prime" because it's the only prime number that's even, so it's also known as the odd one out. I guess now that that's pretty much it going to the question about why this can happen.
answered Nov 3 '14 at 1:45
Mathster
53941422
add a comment |
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8 Answers
8
active
oldest
votes
8 Answers
8
active
oldest
votes
active
oldest
votes
active
oldest
votes
A (positive) even number is some number $n$ such that $n = 2 cdot k$ for some (positive) integer $k$. A prime number has only itself and $1$ as (positive) divisors.
What happens if $n not = 2$ in our definition of even numbers?
add a comment |
A (positive) even number is some number $n$ such that $n = 2 cdot k$ for some (positive) integer $k$. A prime number has only itself and $1$ as (positive) divisors.
What happens if $n not = 2$ in our definition of even numbers?
add a comment |
A (positive) even number is some number $n$ such that $n = 2 cdot k$ for some (positive) integer $k$. A prime number has only itself and $1$ as (positive) divisors.
What happens if $n not = 2$ in our definition of even numbers?
A (positive) even number is some number $n$ such that $n = 2 cdot k$ for some (positive) integer $k$. A prime number has only itself and $1$ as (positive) divisors.
What happens if $n not = 2$ in our definition of even numbers?
answered Nov 3 '14 at 1:42
user171177
add a comment |
add a comment |
Why is two the only even $($binary$)$ number that is prime?
For the same reason that three is the only ternary number that is prime. Which is the same reason for which five is the only quinary number that is prime. Etc.
answered Nov 3 '14 at 2:59
Lucian
41k159130
1
This is the best answer!
– HEKTO
Nov 3 '14 at 3:09
add a comment |
Why is two the only even $($binary$)$ number that is prime?
For the same reason that three is the only ternary number that is prime. Which is the same reason for which five is the only quinary number that is prime. Etc.
answered Nov 3 '14 at 2:59
Lucian
41k159130
1
This is the best answer!
– HEKTO
Nov 3 '14 at 3:09
add a comment |
Why is two the only even $($binary$)$ number that is prime?
For the same reason that three is the only ternary number that is prime. Which is the same reason for which five is the only quinary number that is prime. Etc.
answered Nov 3 '14 at 2:59
Lucian
41k159130
Why is two the only even $($binary$)$ number that is prime?
For the same reason that three is the only ternary number that is prime. Which is the same reason for which five is the only quinary number that is prime. Etc.
answered Nov 3 '14 at 2:59
Lucian
41k159130
answered Nov 3 '14 at 2:59
Lucian
41k159130
answered Nov 3 '14 at 2:59
Lucian
41k159130
answered Nov 3 '14 at 2:59
Lucian
41k159130
41k159130
1
This is the best answer!
– HEKTO
Nov 3 '14 at 3:09
add a comment |
1
This is the best answer!
– HEKTO
Nov 3 '14 at 3:09
1
1
This is the best answer!
– HEKTO
Nov 3 '14 at 3:09
This is the best answer!
– HEKTO
Nov 3 '14 at 3:09
add a comment |
Pick a prime $p$. Call a number $n$ $p$-divisible if $pmid n$. Then $p$ is the only $p$-divisible prime, trivially. In particular, $2$ is the only $2$-divisible, or even, prime.
3
(So yes, saying "2 is the only even prime" is a red herring)
– Pedro Tamaroff♦
Nov 3 '14 at 1:56
add a comment |
Pick a prime $p$. Call a number $n$ $p$-divisible if $pmid n$. Then $p$ is the only $p$-divisible prime, trivially. In particular, $2$ is the only $2$-divisible, or even, prime.
3
(So yes, saying "2 is the only even prime" is a red herring)
– Pedro Tamaroff♦
Nov 3 '14 at 1:56
add a comment |
Pick a prime $p$. Call a number $n$ $p$-divisible if $pmid n$. Then $p$ is the only $p$-divisible prime, trivially. In particular, $2$ is the only $2$-divisible, or even, prime.
Pick a prime $p$. Call a number $n$ $p$-divisible if $pmid n$. Then $p$ is the only $p$-divisible prime, trivially. In particular, $2$ is the only $2$-divisible, or even, prime.
answered Nov 3 '14 at 1:42
community wiki
Pedro Tamaroff
3
(So yes, saying "2 is the only even prime" is a red herring)
– Pedro Tamaroff♦
Nov 3 '14 at 1:56
add a comment |
3
(So yes, saying "2 is the only even prime" is a red herring)
– Pedro Tamaroff♦
Nov 3 '14 at 1:56
3
3
(So yes, saying "2 is the only even prime" is a red herring)
– Pedro Tamaroff♦
Nov 3 '14 at 1:56
(So yes, saying "2 is the only even prime" is a red herring)
– Pedro Tamaroff♦
Nov 3 '14 at 1:56
add a comment |
In the integers, $-2$ is another even prime.
For variety, in the Gaussian integers, $2$ is not prime: e.g. factors as $(1+i)(1-i)$. The even primes of the Gaussian integers are $pm 1 pm i$, although these are all the "same" prime in the same sense that in the integers, $2$ and $-2$ are the "same" prime.
(I define "even" in a number field to be equivalent to its norm being even)
In the ring of all rational numbers with odd denominator, $2/7$ is an even prime. In fact, $2/n$ is prime for every odd integer $n$. (but again, these are all the "same" prime)
There are also number rings that have distinct even primes that are not the "same" in the sense implied above.
answered Nov 3 '14 at 2:00
Hurkyl
111k9117259
add a comment |
In the integers, $-2$ is another even prime.
For variety, in the Gaussian integers, $2$ is not prime: e.g. factors as $(1+i)(1-i)$. The even primes of the Gaussian integers are $pm 1 pm i$, although these are all the "same" prime in the same sense that in the integers, $2$ and $-2$ are the "same" prime.
(I define "even" in a number field to be equivalent to its norm being even)
In the ring of all rational numbers with odd denominator, $2/7$ is an even prime. In fact, $2/n$ is prime for every odd integer $n$. (but again, these are all the "same" prime)
There are also number rings that have distinct even primes that are not the "same" in the sense implied above.
answered Nov 3 '14 at 2:00
Hurkyl
111k9117259
add a comment |
In the integers, $-2$ is another even prime.
For variety, in the Gaussian integers, $2$ is not prime: e.g. factors as $(1+i)(1-i)$. The even primes of the Gaussian integers are $pm 1 pm i$, although these are all the "same" prime in the same sense that in the integers, $2$ and $-2$ are the "same" prime.
(I define "even" in a number field to be equivalent to its norm being even)
In the ring of all rational numbers with odd denominator, $2/7$ is an even prime. In fact, $2/n$ is prime for every odd integer $n$. (but again, these are all the "same" prime)
There are also number rings that have distinct even primes that are not the "same" in the sense implied above.
answered Nov 3 '14 at 2:00
Hurkyl
111k9117259
In the integers, $-2$ is another even prime.
For variety, in the Gaussian integers, $2$ is not prime: e.g. factors as $(1+i)(1-i)$. The even primes of the Gaussian integers are $pm 1 pm i$, although these are all the "same" prime in the same sense that in the integers, $2$ and $-2$ are the "same" prime.
(I define "even" in a number field to be equivalent to its norm being even)
In the ring of all rational numbers with odd denominator, $2/7$ is an even prime. In fact, $2/n$ is prime for every odd integer $n$. (but again, these are all the "same" prime)
There are also number rings that have distinct even primes that are not the "same" in the sense implied above.
answered Nov 3 '14 at 2:00
Hurkyl
111k9117259
answered Nov 3 '14 at 2:00
Hurkyl
111k9117259
answered Nov 3 '14 at 2:00
Hurkyl
111k9117259
answered Nov 3 '14 at 2:00
Hurkyl
111k9117259
111k9117259
add a comment |
add a comment |
Because every even number other than 2 is obviously divisible by 2 and so by definition cannot be prime.
answered Mar 26 '17 at 0:48
John Kontol
1506
add a comment |
Because every even number other than 2 is obviously divisible by 2 and so by definition cannot be prime.
answered Mar 26 '17 at 0:48
John Kontol
1506
add a comment |
Because every even number other than 2 is obviously divisible by 2 and so by definition cannot be prime.
answered Mar 26 '17 at 0:48
John Kontol
1506
Because every even number other than 2 is obviously divisible by 2 and so by definition cannot be prime.
answered Mar 26 '17 at 0:48
John Kontol
1506
answered Mar 26 '17 at 0:48
John Kontol
1506
answered Mar 26 '17 at 0:48
John Kontol
1506
answered Mar 26 '17 at 0:48
John Kontol
1506
1506
add a comment |
add a comment |
A prime number is such that it is divisible by only itself and one. Including 1 as a prime number would violate the fundamental theory of arithmetic, so in modern mathematics it is excluded. Two is a prime because it is divisible by only two and one. All the other even numbers are not prime because they are all divisible by two. That leaves only the odd numbers. Of course, not all odd numbers are prime (e.g. nine is divisible by three).
answered Jan 28 '15 at 8:36
Michael Lee
507314
add a comment |
A prime number is such that it is divisible by only itself and one. Including 1 as a prime number would violate the fundamental theory of arithmetic, so in modern mathematics it is excluded. Two is a prime because it is divisible by only two and one. All the other even numbers are not prime because they are all divisible by two. That leaves only the odd numbers. Of course, not all odd numbers are prime (e.g. nine is divisible by three).
answered Jan 28 '15 at 8:36
Michael Lee
507314
add a comment |
A prime number is such that it is divisible by only itself and one. Including 1 as a prime number would violate the fundamental theory of arithmetic, so in modern mathematics it is excluded. Two is a prime because it is divisible by only two and one. All the other even numbers are not prime because they are all divisible by two. That leaves only the odd numbers. Of course, not all odd numbers are prime (e.g. nine is divisible by three).
answered Jan 28 '15 at 8:36
Michael Lee
507314
A prime number is such that it is divisible by only itself and one. Including 1 as a prime number would violate the fundamental theory of arithmetic, so in modern mathematics it is excluded. Two is a prime because it is divisible by only two and one. All the other even numbers are not prime because they are all divisible by two. That leaves only the odd numbers. Of course, not all odd numbers are prime (e.g. nine is divisible by three).
answered Jan 28 '15 at 8:36
Michael Lee
507314
answered Jan 28 '15 at 8:36
Michael Lee
507314
answered Jan 28 '15 at 8:36
Michael Lee
507314
answered Jan 28 '15 at 8:36
Michael Lee
507314
507314
add a comment |
add a comment |
The word prime comes from the Latin word primus which means "first." Two (2) is the first even number. In other words, it starts all the even numbers. There is more than one odd prime number because odd numbers are never divisible by 2.
answered Mar 26 '17 at 0:32
Carly Brooke Steffen
111
This explanation of the word origin is doubtful. Prime numbers are called prime because they are the "building blocks", the "atoms" of whole numbers. In contrast to /composite/ numbers.
– mathematician
Mar 26 '17 at 0:41
That's why they are considered what would come first as of numbers. A composite number gets its name because it's composed of at least one prime number.
– Carly Brooke Steffen
Mar 27 '17 at 3:03
@mathematician That is not true. They are called "prime" because they are "the first in the list". Take a list of all positive integers. Starting with $2$, circle all numbers that have not been circled yet, and cross out all numbers that are multiples of previous numbers. What you get are the primes, i.e., the first numbers in the list that are not multiples of other numbers.
– Klangen
Sep 19 at 22:15
add a comment |
The word prime comes from the Latin word primus which means "first." Two (2) is the first even number. In other words, it starts all the even numbers. There is more than one odd prime number because odd numbers are never divisible by 2.
answered Mar 26 '17 at 0:32
Carly Brooke Steffen
111
This explanation of the word origin is doubtful. Prime numbers are called prime because they are the "building blocks", the "atoms" of whole numbers. In contrast to /composite/ numbers.
– mathematician
Mar 26 '17 at 0:41
That's why they are considered what would come first as of numbers. A composite number gets its name because it's composed of at least one prime number.
– Carly Brooke Steffen
Mar 27 '17 at 3:03
@mathematician That is not true. They are called "prime" because they are "the first in the list". Take a list of all positive integers. Starting with $2$, circle all numbers that have not been circled yet, and cross out all numbers that are multiples of previous numbers. What you get are the primes, i.e., the first numbers in the list that are not multiples of other numbers.
– Klangen
Sep 19 at 22:15
add a comment |
The word prime comes from the Latin word primus which means "first." Two (2) is the first even number. In other words, it starts all the even numbers. There is more than one odd prime number because odd numbers are never divisible by 2.
answered Mar 26 '17 at 0:32
Carly Brooke Steffen
111
The word prime comes from the Latin word primus which means "first." Two (2) is the first even number. In other words, it starts all the even numbers. There is more than one odd prime number because odd numbers are never divisible by 2.
answered Mar 26 '17 at 0:32
Carly Brooke Steffen
111
answered Mar 26 '17 at 0:32
Carly Brooke Steffen
111
answered Mar 26 '17 at 0:32
Carly Brooke Steffen
111
answered Mar 26 '17 at 0:32
Carly Brooke Steffen
111
111
This explanation of the word origin is doubtful. Prime numbers are called prime because they are the "building blocks", the "atoms" of whole numbers. In contrast to /composite/ numbers.
– mathematician
Mar 26 '17 at 0:41
That's why they are considered what would come first as of numbers. A composite number gets its name because it's composed of at least one prime number.
– Carly Brooke Steffen
Mar 27 '17 at 3:03
@mathematician That is not true. They are called "prime" because they are "the first in the list". Take a list of all positive integers. Starting with $2$, circle all numbers that have not been circled yet, and cross out all numbers that are multiples of previous numbers. What you get are the primes, i.e., the first numbers in the list that are not multiples of other numbers.
– Klangen
Sep 19 at 22:15
add a comment |
This explanation of the word origin is doubtful. Prime numbers are called prime because they are the "building blocks", the "atoms" of whole numbers. In contrast to /composite/ numbers.
– mathematician
Mar 26 '17 at 0:41
That's why they are considered what would come first as of numbers. A composite number gets its name because it's composed of at least one prime number.
– Carly Brooke Steffen
Mar 27 '17 at 3:03
@mathematician That is not true. They are called "prime" because they are "the first in the list". Take a list of all positive integers. Starting with $2$, circle all numbers that have not been circled yet, and cross out all numbers that are multiples of previous numbers. What you get are the primes, i.e., the first numbers in the list that are not multiples of other numbers.
– Klangen
Sep 19 at 22:15
This explanation of the word origin is doubtful. Prime numbers are called prime because they are the "building blocks", the "atoms" of whole numbers. In contrast to /composite/ numbers.
– mathematician
Mar 26 '17 at 0:41
This explanation of the word origin is doubtful. Prime numbers are called prime because they are the "building blocks", the "atoms" of whole numbers. In contrast to /composite/ numbers.
– mathematician
Mar 26 '17 at 0:41
That's why they are considered what would come first as of numbers. A composite number gets its name because it's composed of at least one prime number.
– Carly Brooke Steffen
Mar 27 '17 at 3:03
That's why they are considered what would come first as of numbers. A composite number gets its name because it's composed of at least one prime number.
– Carly Brooke Steffen
Mar 27 '17 at 3:03
@mathematician That is not true. They are called "prime" because they are "the first in the list". Take a list of all positive integers. Starting with $2$, circle all numbers that have not been circled yet, and cross out all numbers that are multiples of previous numbers. What you get are the primes, i.e., the first numbers in the list that are not multiples of other numbers.
– Klangen
Sep 19 at 22:15
@mathematician That is not true. They are called "prime" because they are "the first in the list". Take a list of all positive integers. Starting with $2$, circle all numbers that have not been circled yet, and cross out all numbers that are multiples of previous numbers. What you get are the primes, i.e., the first numbers in the list that are not multiples of other numbers.
– Klangen
Sep 19 at 22:15
add a comment |
The number $2$ has only two whole number factors, $1$ and itself. That's pretty much it after this: The other numbers that are even up from two are all divisible by that number in some way. This is also known as the "oddest prime" because it's the only prime number that's even, so it's also known as the odd one out. I guess now that that's pretty much it going to the question about why this can happen.
answered Nov 3 '14 at 1:45
Mathster
53941422
add a comment |
The number $2$ has only two whole number factors, $1$ and itself. That's pretty much it after this: The other numbers that are even up from two are all divisible by that number in some way. This is also known as the "oddest prime" because it's the only prime number that's even, so it's also known as the odd one out. I guess now that that's pretty much it going to the question about why this can happen.
answered Nov 3 '14 at 1:45
Mathster
53941422
add a comment |
The number $2$ has only two whole number factors, $1$ and itself. That's pretty much it after this: The other numbers that are even up from two are all divisible by that number in some way. This is also known as the "oddest prime" because it's the only prime number that's even, so it's also known as the odd one out. I guess now that that's pretty much it going to the question about why this can happen.
answered Nov 3 '14 at 1:45
Mathster
53941422
The number $2$ has only two whole number factors, $1$ and itself. That's pretty much it after this: The other numbers that are even up from two are all divisible by that number in some way. This is also known as the "oddest prime" because it's the only prime number that's even, so it's also known as the odd one out. I guess now that that's pretty much it going to the question about why this can happen.
answered Nov 3 '14 at 1:45
Mathster
53941422
answered Nov 3 '14 at 1:45
Mathster
53941422
answered Nov 3 '14 at 1:45
Mathster
53941422
answered Nov 3 '14 at 1:45
Mathster
53941422
53941422
add a comment |
add a comment |
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You mean even I guess... Do you know how prime numbers are defined?
– Curious Droid
Nov 3 '14 at 1:41
2
Just think, all even numbers are divisible by $2$, so they can't be prime. But if $2$ is itself, then it doesn't count.
– Edward Jiang
Nov 3 '14 at 1:42
A prime number has ${largettmbox{just two}}$ different divisors. So $1$ is not prime, $2$ is prime, etc...
– Felix Marin
Nov 3 '14 at 1:56