I’m focusing on “overlap”. Cantors diagonal numbers don’t overlap... - Deepstash

I’m focusing on “overlap”. Cantors diagonal numbers don’t overlap with the ones on the list either. Even and don’t overlap odd either. Since we can order {0,1,3..} and {0,1,2,3,4…} by the time we get to 2 in the second list, we know we will never find it in the first. Both are infinite yet different. Can you agree to that? – 

J Kusin

 22 hours ago 

Let's do thought experiment. consider there is huge room. do you thing only one of both kind of number can fill the entire space? no. both (integers & real numbers) can fill the entire space in a single room. – 

Seremonia

 22 hours ago   Delete

11

24 reads

CURATED FROM

IDEAS CURATED BY

seremonia

IN GOD WE TRUST I am free not because i have choices, but i am free because i rely on God with quality assured

Beware of Illusion in Math | Denial of CH Determines that We are not Living On Discrete World

The idea is part of this collection:

Centers of Progress

Learn more about scienceandnature with this collection

The historical significance of urban centers

The impact of cultural and technological advances

The role of urban centers in shaping society

Related collections

Similar ideas

Discussion @StackExchange

What are the useful outcomes of denying the Continuum Hypothesis?

This opens new perspective of how we think on math.

_____

How do the integers and ...

When someone said about "infinity" don't be tricked by the cardinality, but try seeing on infinity itself as it's expanding to the entire possible space – 

Seremonia

 22 hours ago   Delete

We don’t know how math relates to the physical. I can write down 50^80 yet what is the phy...

Okay i will try following you – 

Seremonia

 22 hours ago   Delete

Any cantor's diagonal trial, actually can be connected bijective, simply by understanding that both numbers can be divided. are we on the same page on this?. make a detail question. we try to slice this sharply to...

Read & Learn

20x Faster

without
deepstash

with
deepstash

with

deepstash

Personalized microlearning

100+ Learning Journeys

Access to 200,000+ ideas

Access to the mobile app

Unlimited idea saving

Unlimited history

Unlimited listening to ideas

Downloading & offline access

Supercharge your mind with one idea per day

Enter your email and spend 1 minute every day to learn something new.

Email

I agree to receive email updates