Alright lets see how good you are. Are there more odd numbers or odd and even numbers ?
Alright lets see how good you are
more odds since all negative numbers are odd
in the poset of subsets of the naturals ordered by subsets, the odd numbers are strictly below the naturals
but the odd numbers are also equicardinal with the naturals
Get outta here and go back to Hilbert's Hotel!
[math] \aleph_0 [/math]
depends on what set of numbers you're using
Hitler's Hotel never ran out of room either.
All odd numbers have a negative equivalent
Almost all even numbers have a negative equivalent
0 and -0 are the same thing
Because 0 has no proper negative equivalent, there is one fewer even number than odd
implying [math]\infty-1<\infty [/math]
You're a retard. QED
not compatable with definition
An unbounded quantity that is greater than every real number.
y=x and y=x-1
tell me where they intersect
theres the same amount of both, brainlets
There are infinitely many odd numbers and infinitely many even numbers. Infinity isn't a number you can graph.
Infinity isn't a number you can graph
There are just as many even numbers as odd numbers.
Even numbers = 2x
Odd numbers = 2x+1
implying it is
Show me a graph of the "number infinity" on a number line. I'll wait.
what is a ray
That's nice. But what about OP's babby-tier brainlet question?
Odd and even is clearly a larger infinity that just odd.
Try something harder next time.
all infinite series are the same size
the ones discussed are
this is going in my lecture notes about compactification
No, they're not.
OP specified a series of odd numbers and a series of odd and even numbers.
A grade school student could tell you the series of odd and even numbers would be the larger infinite series. At any odd number in the first series, the second series would have nearly twice as many numbers at the same odd number.
lectures in subway stops intensifies
your rat friends will believe you as long as you have bread to offer
they both are aleph-0 you incontinent retard
For the set of all odd numbers to be aleph-0 it must be paired with the set of all even numbers.
They intersect at infinity dumb dumb.
or paired with all the natural numbers
or anything fucking else the size of aleph-0
There is a bijection between them, if that is what you are asking.
odd and even numbers
odd and even
trick question, no number is both odd and even
his question was :
let a represent odd numbers;
let b represent even numbers;
let c = a+b;
now his question was :
"Are there more odd numbers or odd and even numbers?"
the awser is : yeah we have more odd and even numbers.
I see what you did there.
a, b, c are not real numbers so that doesn't work
Depends on what mathematics you’re analyzing. Nicomachus classified numbers into three categories ‘even and odd’ ‘odd and even’ and ‘even and even’. It’s just based on the factors of the numbers involved to create that number. In truth, specifically, number types really are more complicated than people give them credit for and the two types ‘even’ and ‘odd’ is far too simplistic.