There is a concept of "being perfect" and another concept of "being imperfect." If anything is perfect, it cannot be imperfect in human understanding and wisdom.
But the state of "being imperfect" should be included in anything that is "perfect." Otherwise it lacks the concept of "being imperfect."
If it lacks anything, it cannot be perfect.
Therefore, "perfectibility" includes "incompleteness" in its component, no matter if it looks contradict; yes, it is but only to mankind not to God.
The concept "perfectibility" really leads to existence of God who is almighty and omnipotent.
* * *
In this way, we can see two levels for concepts.
At a lower level, mankind can clearly understand concepts based on his experience and logical thinking.
However, at an upper level, mankind can see only their expressions but cannot understand their structure and significance as reality.
What is "perfectibility" that can be "perfect" and also "imperfect?"
What is "perfectibility" that can be "infinite" and also "finite?"
What is "perfectibility" that can be "true" and also "false?"
Yes, here we have come back to the beginning of the universe, or more correctly to the beginning of concepts that allows for the beginning of the Logical Universe and then the Material Universe.
Before the beginning of the Logical Universe and then the Material Universe, "perfectibility" and "incompleteness" are one; "infinite" and "finite" are one; and "true" and "false" are one and the same thing.
Only God can handle and use these concepts as meaningful at this step or level.
Mankind was given ability that can only handle and use the concepts at the lower level established in the Logical Universe preceding the beginning of the Material Universe.
* * *
The miracle comes from the upper level preceding the Logical Universe and the Material Universe.
It comes from a level where "perfect" and "imperfect" are one; "infinite" and "finite" are one; and "true" and "false" are one and the same thing, as the God wishes.
Herein, before the Beginnings, there were full of miracles.
* * *
Now, Jesus Christ, as the Son of God, had the power of causing miracles, while He was living as a member of mankind 2000 years ago. Eventually He gave the power to His disciples.
For you to prove yourself to be His disciple, you have to perform a miracle and cure a patient.
The issue is whether Vatican can now perform a miracle at their will.
(When Islam was established around 1300 years ago, Vatican might have lost this ability. Or probably, as it lost it, Islam was endowed mankind with.)
(I hope nonetheless that a certain miracle would happen through the EEE-Report to help poor believers and benevolent ladies drive out devils.)
"...The Young People Will Grow Strong on its Grain and Wine..."
*** *** *** ***
Addition in October 2011:
The God created every number using a number, one, and a rule, addition.
Then some number comes to have a miracle, such as 153:
Catch of the Day (153 Fishes)
A slightly more obscure property of 153 is that it equals the sum of the cubes of its decimal digits. In fact, if we take ANY integer multiple of 3, and add up the cubes of its decimal digits, then take the result and sum the cubes of its digits, and so on, we invariably end up with 153. For example, since the number 4713 is a multiple of 3, we can reach 153 by iteratively summing the cubes of the digits, as follows:
starting number = 4713
4^3 + 7^3 + 1^3 + 3^3 = 435
4^3 + 3^3 + 5^3 = 216
2^3 + 1^3 + 6^3 = 225
2^3 + 2^3 + 5^3 = 141
1^3 + 4^3 + 1^3 = 66
6^3 + 6^3 = 432
4^3 + 3^3 + 2^3 = 99
9^3 + 9^3 = 1458
1^3 + 4^3 + 5^3 + 8^3 = 702
7^3 + 2^3 = 351
3^3 + 5^3 + 1^3 = 153
*------
The fact that this works for any multiple of 3 is easy to prove. First, recall that any integer n is congruent modulo 3 to the sum of its decimaldigits (because the base 10 is congruent to 1 modulo 3). Then, letting f(n) denote the sum of the cubes of the decimal digits of n, by Fermat's little theorem it follows that f(n) is congruent to n modulo 3. Also, we can easily see that f(n) is less than n for all n greater than 1999. Hence, beginning with any multiple of 3, and iterating the function f(n), we must arrive at a multiple of 3 that is less than 1999. We can then show by inspection that every one of these reduces to 153.
http://www.mathpages.com/home/kmath463.htmIndeed, this is a miracle though it might have existed from the beginning:
Joh 21:11 Simon Peter went up, and drew the net to land full of great fishes, an hundred and fifty and three: and for all there were so many, yet was not the net broken.