It takes an infinite amount of energy for something finite to emerge from something infinite.
Infinite wholeness
The paradoxical nature of infinity is that even if you remove a heck of a lot of infinity from infinity, it is still infinite. In fact, if you remove an infinite amount from infinity, it still remains infinite!
Infinite speaks of a characteristic of whatever is under discussion. That characteristic is one that cannot be expressed except in negatives, as “has no beginning and no end”; is uncountable; is larger, longer, taller, deeper, et al, than anything you could ever imagine.
Thus the concept of infinity encompasses everything imaginable in its range, plus all that you could not imagine. In its immensity it forms a totality, a One-ness.
One could imagine that if there is any change of state within this infinity, this would “spread”, perhaps “instantaneously”, across this infinity even though it would not affect it in the slightest.
Let me give you an example. Let us remove the numbers 1 -100 from the collection of numbers and begin to count from 101. Thus 101 would be the first number, equivalent to 1 in our present day, and 102 would be 2nd, equivalent to two, and 1762 would be the 1661st number… etc., etc. It would make no difference to the infinite set of numbers we started with. If I count in thousands, there would still be an infinite amount of them. I have “changed” the components of the infinite set, yet have not affected the “infinity” of the total set. In fact, I can show you that there are as many 1000’s in the infinite set of numbers as there are numbers. A good example of this is a similar proof regarding prime numbers — numbers divisible by 1 and themselves alone.
I acknowledge that I am referring to an infinite set of finite objects. By finite objects, I mean recognisable in some form or fashion (even if it is only a mathematical object). Rather than apologise, I will firstly say that whether made up of a set of finite or infinite objects (real or imaginary) will make no difference to this.