In the beginning, he was just an ordinary earthling.
It was only because he accidentally obtained the Final Fragment that he rose to great heights, cheated all the way and finally became an immortal.
"However, when I captured the clone of King Peter, I didn't feel any intimidation. Could it be because..."
Mu Cang thought deeply, "Is it because of chaos?"
If that's the case, then it's understandable.
Because Mu Cang already knew it a long, long time ago.
For example, [See is what I get], [Ling Yue Feifu], [Infinite Secret Strategy], and perhaps King Peter's [Domination Invasion].
These final fragments and the chaos of chaos actually belong to the same "series" and are part of the same divine object.
It's just that among these fragments, only Chaos's Delusion is the core of the core, part of the basic main part, while the other fragments belong to the branch parts. (See Chapter 620 for details)
As secondary parts, these fragments can only be unsealed and release their true power after being united with the main part, Chaos.
Just like King Silver Horn's female purple gold gourd, when she saw the male purple gold gourd of Monkey King, the Monkey King, her magical powers were suddenly greatly reduced.
Perhaps it is precisely because of this relationship of one male, one female and one master that King Peter's [Domination Invasion] failed to have the desired effect on Mu Cang.
In addition to this, Mu Cang also thought of a possible reason as to why the clone of King Peter did not start seizing the body after being interfered by him.
That is, could it be that the number of bodies taken by King Peter... has reached the upper limit?
There is a certain possibility.
"By the way, why wasn't Yun Zun taken away by King Pit? Instead, he defeated Xuan Mian and became a fake palm?"
With this question in mind, Mu Cang immediately activated [Ling Yue Feifu] again... No, he activated this skill many times, and around the heaven-defying ability of [Domination Invasion], he started various "void" attacks.
Ask a question".
Later, after many "questions", Mu Cang gradually understood the mystery.
In other words, the specific details of the power effect of the heaven-defying skill [Domination Invasion] have been further completed.
In short, according to the answers to the "Void Question", it can be seen that King Peter can indeed do it. When he senses and interferes with others, and when he is sensed and interfered by others, he immediately and automatically seizes the body.
But this function, King Pete himself... can actually intervene and reset the function by himself.
In other words, King Pit can take his body when he wants, or not if he doesn't want to. He can even take only half of his body, making the other person become a part of him, but he doesn't know that he has been taken away.
By analogy, it is as if King Pete as a whole belongs to a super hacker, while those non-staff individuals who have encountered half-inhabited homes belong to cyber broilers or backup broilers.
This is obviously much freer than "I'll get it when I see it".
To be honest, [See It, I Get It] is just a bit too overbearing. He only plays forced love. He doesn’t ask whether Mu Cang is willing to become stronger or not. He just pulls him hard when he gets the chance.
He flies.
It’s very tiring to fly all the time, okay?
In addition, Mu Cang also learned from the information obtained from the "Void Question" that King Pit's current strategy for seizing the body is very likely to... value the essence rather than the wealth.
In other words, only individuals with a strength of [super huge base] will be captured, and those below this level will basically not be captured.
In this regard, Mu Cang guessed that the number of clones of King Peter might be the super huge base number itself, so he probably wouldn't care if tens of thousands, hundreds of millions or even infinites died.
If King Peter has a lazy character, he may not even take revenge.
Because for King Peter, as long as they are not super huge cardinal-level clones, even if those other low-level ones die infinitely, it will not be more serious than losing a hair.
It can only be said that compared with super huge bases, measurable bases, Wuding bases, and ultra-compact bases are indeed weak.
As for how huge the super huge base is, this is another more complicated issue.
First of all, there are many huge high-order large cardinals between it and ultra-compact cardinals.
For example, a large cardinality that is "relatively close" to a supercompact cardinality is an extendable cardinality.
The fundamental definition and mathematical structure of this large base is... If a base δ is called extendable, then for each λ>δ, there will be an initial segment Vλ with e<λ, and a subsequent segment Vλ.
The element embedding map π from Vλ to Ve satisfies the result that π(δ)=δ and π is not an identity map.
In plain language, this mathematical definition means that the expandable base can "stretch" into a universe model smaller than itself, while maintaining certain structural characteristics of its own.
Very magical.
In addition, the so-called "scalability" is exactly the second-order analogy of "strong compactness".
At the same time, except for the expandable base.
Under the super huge cardinal numbers, there are also huge cardinal numbers, almost huge cardinal numbers, and Wopenka's principle.
The so-called Wopenka principle is an important mathematical principle closely related to set theory, category theory, and model theory.
Its main content can be briefly summarized, that is, for any proper class structure in some languages, there is an elementary embedding that can be embedded into a member of another proper class structure.
Therefore, a series of properties about true class structures and elementary embeddings can be derived through this principle.
These properties are related to unreachable cardinalities and their various applications in model theory.
Next, based on Wopenka's principle, is the almost huge cardinality.
Theoretically speaking, if a base k is an almost huge base, then for any regular base λ>k, there will be a λ-complete ultrafilter U on Pk(λ), and then for any X?Pk(
