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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 zoom the issue. but we have to relate this with reality, so we can make sense of this case –
Seremonia
22 hours ago Delete
Remember that any time we talk about numbers, then we talked about things (not just numbers) –
Seremonia
22 hours ago Delete
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24 reads
MORE IDEAS ON THIS
Surprisingly George Cantor claims there is an infinite-2 which is greater than infinity-1.
Isn’t infinity enough innumerable? Then how can there be two kinds of infinite, where one "infinity" is greater than the second "infinity".
Yet intuitively, the infinite is pretty much weird. ...
19
202 reads
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 ...
10
45 reads
It’s like when we button a shirt, so if all buttons are buttoned, it is assumed that the left and right sides are the same length.
But when the buttons don’t fit properly, so you can see that there is a longer side of the shirt. But actually THE LEFT SIDE & RIGHT SIDE IS TOTALLY THE SAME LE...
17
112 reads
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 differ...
11
24 reads
Actually, whether we are trying to do cantor’s diagonal, or multiplying power set of aleph-null, but it’s actually we are doing on the same numbers as whole numbers, as one infinity.
Although you can create multiple infinities, still we are doing on the same range.
14
50 reads
A series of numbers is always uncountable, so how can there be a series of numbers that is more uncountable than the one that was previously uncountable?
How to measure one thing than the other when both are equal? Thus the method was found which became the root of this problem. Some have o...
18
172 reads
Continuum hypothesis is failed, because of these reasons:
If we can do multiple calc on different areas of infinity and that looks like we are doing things differently, or we're dealing with different infinity, but actually we're doing at the same area, the same numbes were used interchange...
13
39 reads
The Concept of Infinity in the Continuum Hypothesis
This is not as commonly known, infinite value. But countless in different contexts.
However, the sequence of numbers of any type is always infinite, in the sense it's unreachable.
There are two infinite series of numbers, th...
19
377 reads
How can, according to George Cantor’s version, formally determine that there is an infinite series of numbers that is more infinite than another infinite?
Simply by making a relationship (connecting in) between each member of the two sets.
So, if the members of the two sets can be c...
17
110 reads
Those all sets are just one set of infinite number, and we did arranging those numbers into different set of point of view, so we thought we were dealing with something different increasingly at different stage of infniity.
It’s just a set. Only they did interchange in between numbers, so i...
15
53 reads
A single finite number may be related to a banana. two finite numbers may be related to two bananas. more & more numbers may be related to more and more bananas, rocks, books, atom, and so forth. more & more infinites number then, must be related to all of possible things that fill the entire pos...
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39 reads
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They thought there were points that couldn’t be connected (marked by a red cross) one to one (bijective) from left to right (from the member of the...
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62 reads
You have to relate math on reality. if you reject this, try with small step. consider a number must be related to a thing, otherwise we're dealing with nonsense. although someday someone accept math explaining other dimention, or relativity, still it has to do with things. there is nothing simple...
10
36 reads
When you point to the number one, you are actually pointing to something that exists.
The question is "how wide is the “number 1" you’re pointing at?"
17
63 reads
What is the method for measuring that something that is innumerable can challenge another that is also innumerable?
I will give an example before going into the formal method, so that we can see the weird of the continuum hypothesis in this case.
It’s like between hot water & ice wa...
17
128 reads
So that between the members of the set of integers and the members of the set of real numbers (involving decimals), it can always be paired (connected) one to one (bijective) for all members of the two set of different types of numbers.
This also has confirmed that from the left side to the...
17
69 reads
MORE LIKE THIS
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 differ...
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