In this paper, we give a pedagogical introduction to several beautiful formulas discovered by Ramanujan. Using these results, we evaluate a Ramanujan-type integral formula. The result can be expressed in terms of the Golden Ratio
AbstractThree results from the unorganized pages of Ramanujan's second notebook are proved. The resu...
This paper deals with the evaluation of a certain continued fraction carried out in an attempt to pr...
Abstract: The interesting thing about mathematical concepts is that we can trace their development o...
In this paper, we give a pedagogical introduction to several beautiful formulas discovered by Ramanu...
The Golden Ratio appears in many situations: in geometry, in lists with special numbers drawn up by ...
The Golden Ratio, also known as the Golden Section, exists as a proportion of lengths. Calculated to...
In 1915, Ramanujan stated the following formula ∫ 0 ∞ t x - 1 ( - a t ; q ) ∞ ( - t...
International audienceRamanujan's first letter to Hardy states an asymptotic formula for the coeffic...
AbstractIn this paper we find the formula (7) which generalizes the Ramanujan formula (2)
Omjer dva različita broja jednak je zlatnom rezu ako je omjer većeg broja prema manjem jednak omjeru...
We discuss the well-known importance of the golden ratio in Science and Art with few examples: its t...
This paper is an exposition on misconceptions and applications of the Golden Ratio. This is taken f...
An operational method, already employed to formulate a generalization of the Ramanujan master theore...
The main purpose of this paper is to give many new formulas involving the Fibonacci numbers, the gol...
This centennial tribute commemorates Ramanujan the man and Ramanujan the mathematician. A brief acco...
AbstractThree results from the unorganized pages of Ramanujan's second notebook are proved. The resu...
This paper deals with the evaluation of a certain continued fraction carried out in an attempt to pr...
Abstract: The interesting thing about mathematical concepts is that we can trace their development o...
In this paper, we give a pedagogical introduction to several beautiful formulas discovered by Ramanu...
The Golden Ratio appears in many situations: in geometry, in lists with special numbers drawn up by ...
The Golden Ratio, also known as the Golden Section, exists as a proportion of lengths. Calculated to...
In 1915, Ramanujan stated the following formula ∫ 0 ∞ t x - 1 ( - a t ; q ) ∞ ( - t...
International audienceRamanujan's first letter to Hardy states an asymptotic formula for the coeffic...
AbstractIn this paper we find the formula (7) which generalizes the Ramanujan formula (2)
Omjer dva različita broja jednak je zlatnom rezu ako je omjer većeg broja prema manjem jednak omjeru...
We discuss the well-known importance of the golden ratio in Science and Art with few examples: its t...
This paper is an exposition on misconceptions and applications of the Golden Ratio. This is taken f...
An operational method, already employed to formulate a generalization of the Ramanujan master theore...
The main purpose of this paper is to give many new formulas involving the Fibonacci numbers, the gol...
This centennial tribute commemorates Ramanujan the man and Ramanujan the mathematician. A brief acco...
AbstractThree results from the unorganized pages of Ramanujan's second notebook are proved. The resu...
This paper deals with the evaluation of a certain continued fraction carried out in an attempt to pr...
Abstract: The interesting thing about mathematical concepts is that we can trace their development o...