This paper presents an attempt to finally solve the problem of constructing the squares of the same surface of the given circle, in a simple way: by determining the exact value of the number π. The value of this constant thus far implies the following: in the Universe there is no square of the same surface as the given circle!? It's pointless. The number π is not irrational, so it is not transcendental number either.  
Proofs that the area of a circle is ?r2 can be found in mathematical literature dating as far back a...
Abstract. The set-theoretical circle-squaring problem goes back to Tarski: Can a circle be partition...
Squaring the circle is one of the oldest challenges in mathematical geometry. In 1882, it was proven...
This paper presents an attempt to finally solve the problem of constructing the squares of the same ...
Abstract: Historically, mathematicians sought for a unique relationship between a square and a circl...
This paper provides the proof of invalidity of the most fundamental constant known to mankind. Imagi...
Constructing a regular quadrilateral (square) and circle of equal area was proved impossible in Eucl...
Almost every mathematical culture through history seems to have proved, trusted, or suspected that t...
Bolyai ended his 1832 introduction to non-Euclidean geometry with a strategy for constructing regula...
The new discovery of squaring number can be use in getting a square of any number be it positive int...
The thesis describes how mathematicians calculated the approximations of the number π by using the s...
In grade school we were all given the formulas for the area and circumference of a circle: A = πr 2 ...
The circle constant, the number pi (), is defined as the ratio between the circumference of a circle...
ABSTRACTDetermining a value of p is very important in mathematics. So, presented to find a value of ...
The trigonometry which you learnt at school is the wrong trigonometry. Young people over the ages ha...
Proofs that the area of a circle is ?r2 can be found in mathematical literature dating as far back a...
Abstract. The set-theoretical circle-squaring problem goes back to Tarski: Can a circle be partition...
Squaring the circle is one of the oldest challenges in mathematical geometry. In 1882, it was proven...
This paper presents an attempt to finally solve the problem of constructing the squares of the same ...
Abstract: Historically, mathematicians sought for a unique relationship between a square and a circl...
This paper provides the proof of invalidity of the most fundamental constant known to mankind. Imagi...
Constructing a regular quadrilateral (square) and circle of equal area was proved impossible in Eucl...
Almost every mathematical culture through history seems to have proved, trusted, or suspected that t...
Bolyai ended his 1832 introduction to non-Euclidean geometry with a strategy for constructing regula...
The new discovery of squaring number can be use in getting a square of any number be it positive int...
The thesis describes how mathematicians calculated the approximations of the number π by using the s...
In grade school we were all given the formulas for the area and circumference of a circle: A = πr 2 ...
The circle constant, the number pi (), is defined as the ratio between the circumference of a circle...
ABSTRACTDetermining a value of p is very important in mathematics. So, presented to find a value of ...
The trigonometry which you learnt at school is the wrong trigonometry. Young people over the ages ha...
Proofs that the area of a circle is ?r2 can be found in mathematical literature dating as far back a...
Abstract. The set-theoretical circle-squaring problem goes back to Tarski: Can a circle be partition...
Squaring the circle is one of the oldest challenges in mathematical geometry. In 1882, it was proven...