No it is not flawed.
Not really. If it were a sound proof, it would be quickly published in any number of mathematical journals, not first on Answers.com. However, if you have a subtly flawed proof that purports to solve this ancient question, it might be entertaining as an exercise in proof analysis.
It isn't equal, and any proof that they are equal is flawed.
There are many beautiful proofs in Mathematics and one cannot say that any particular proof is the most elegant. But if I had to choose one, it would definitely be the proof that's associated with the Gödel's Incompleteness Theorem. It is Mathematics at its best. Read more about it from the related link given just below.
It is not really waterproof.
It is not true so you cannot prove it. You can concoct a "proof" that might look OK but it will be flawed.
Sometimes Yes, as in Pythagoras' Theorem. Other times No, for as Godel's Incompleteness Theorem shows, there will be complete bodies of knowledge in which there will be truths that cannot be proven, and falsities which cannot be denied. [I paraphrase his theorem.]
most of them are but there are really smart kids that knows how to open such containers.
There is no proof really..
i am radey
Proof surrogate is a flawed rhetorical device that suggests evidence to support their argument, but does not provide the source. An example of a proof surrogate would be saying "studies show that you can get cancer from microwaves" without providing the studies.
I am not really sure what you are asking but there are 3 types of proofs in geometry a flow proof, a 2-collumn proof, and a paragraph proof.
In mathematical logic, a Gödel numbering is a function that assigns to each symbol and well-formed formula of some formal language a unique natural number, called its Gödel number. The concept was used by Kurt Gödel for the proof of his incompleteness theorems.