In this paper we present a two-term Machin-like formula for pi \[\frac{\pi}{4} = 2^{k - 1}\arctan\left(\frac{1}{u_1}\right) + \arctan\left(\frac{1}{u_2}\right)\] with small Lehmer's measure $e \approx 0.245319$ and describe iteration procedure for simplified determination of the required rational number $u_2$ at $k = 27$ and $u_1 = 85445659$. With these results we obtained a formula that has no irrational numbers involved in computation and provides $16$ digits of pi at each increment by one of the summation terms. This is the smallest Lehmer's measure ever reported for the Machin-like formulas for pi
The paper describes an interesting (and unexpected) application of the Fast Fourier transform in num...
The note generalizes a well-known formula for pi/2 named after the English mathematician John Wallis...
Constants with formulae of the form treated by D. Bailey, P. Borwein, and S. Plouffe (BBP formulae t...
Previously we have proposed a new method of transforming quotients into integer reciprocals in the M...
The file 'u2.txt' contains the computed value of the rational number u2 at k = 27 and u1 = 85445659 ...
In our earlier publication we have shown how to compute by iteration a rational number u2,k in the t...
The inverse tangent function can be used to approximate pi. When approximating pi, the convergence o...
Around 1700, renowned mathematicians started using arctangent identities to find digits of Pi. Their...
In this note, we find all solutions of the equation pi 4 = a arctan(φκ)+ b arctan(φ`), in integers κ...
In his 1685 paper “Observationes cyclometricae ” published in Acta Eruditorum, Adam Adamandy Kochań...
In this note, we find all solutions of the equation pi 4 = a arctan(φκ)+ b arctan(φ`), in integers κ...
This paper presents a catalogue of mathematical formulas and iterative algorithms for evaluating the...
We study several formal proofs and algorithms related to the number pi in the context of Coq's stand...
<p>In this paper we provide an elementary derivation of a Viète-like formula for the constant pi. Th...
Abstract. Of what use are the zeros of the Riemann zeta function? We can use sums involving zeta zer...
The paper describes an interesting (and unexpected) application of the Fast Fourier transform in num...
The note generalizes a well-known formula for pi/2 named after the English mathematician John Wallis...
Constants with formulae of the form treated by D. Bailey, P. Borwein, and S. Plouffe (BBP formulae t...
Previously we have proposed a new method of transforming quotients into integer reciprocals in the M...
The file 'u2.txt' contains the computed value of the rational number u2 at k = 27 and u1 = 85445659 ...
In our earlier publication we have shown how to compute by iteration a rational number u2,k in the t...
The inverse tangent function can be used to approximate pi. When approximating pi, the convergence o...
Around 1700, renowned mathematicians started using arctangent identities to find digits of Pi. Their...
In this note, we find all solutions of the equation pi 4 = a arctan(φκ)+ b arctan(φ`), in integers κ...
In his 1685 paper “Observationes cyclometricae ” published in Acta Eruditorum, Adam Adamandy Kochań...
In this note, we find all solutions of the equation pi 4 = a arctan(φκ)+ b arctan(φ`), in integers κ...
This paper presents a catalogue of mathematical formulas and iterative algorithms for evaluating the...
We study several formal proofs and algorithms related to the number pi in the context of Coq's stand...
<p>In this paper we provide an elementary derivation of a Viète-like formula for the constant pi. Th...
Abstract. Of what use are the zeros of the Riemann zeta function? We can use sums involving zeta zer...
The paper describes an interesting (and unexpected) application of the Fast Fourier transform in num...
The note generalizes a well-known formula for pi/2 named after the English mathematician John Wallis...
Constants with formulae of the form treated by D. Bailey, P. Borwein, and S. Plouffe (BBP formulae t...