Add to ORKGIn this sequel to our recent note [D. Cvijovic, Values of the derivatives of the cotangent at ration...
AbstractIn this sequel to our recent note [D. Cvijović, Values of the derivatives of the cotangent a...
AbstractIn this note, we prove a residual relation for Halley’s method for finding the principal pth...
In this paper we present a method for solving the Diophantine equation, first we find the polynomial...
AbstractLet D=F2+2G be a monic quartic polynomial in Z[x], where degG<degF. Then for F/G∈Q[x], a nec...
Quadratic irrationals √D have a periodic representation in terms of continued fractions. In this pap...
AbstractFor an irrational number x and n⩾1, we denote by kn(x) the exact number of partial quotients...
AbstractIn this paper we give a new proof of Ramanujanʼs continued fraction involving the Gamma func...
AbstractThe idea to use classical hypergeometric series and, in particular, well-poised hypergeometr...
AbstractIn 2001, Jinhee Yi found many explicit values of the famous Rogers–Ramanujan continued fract...
In this paper, we establish several new modular equations of degree 9 using Ramanujan's modular equa...
In this paper, we obtain some new modular equations of degree2. We obtain several general formulas f...
AbstractWith two elementary trigonometric sums and the Jacobi theta function θ1, we provide a new pr...
Contains a correction with respect to the printed versionWe provide sharp estimates for the number o...
AbstractWe show some new variations on Tasoev's continued fractions [0;ak,…,ak︸m¯]k=1∞, where the pe...
In this sequel to our recent note [D. Cvijovic, Values of the derivatives of the cotangent at ration...
AbstractIn this sequel to our recent note [D. Cvijović, Values of the derivatives of the cotangent a...
AbstractIn this note, we prove a residual relation for Halley’s method for finding the principal pth...
In this paper we present a method for solving the Diophantine equation, first we find the polynomial...
AbstractLet D=F2+2G be a monic quartic polynomial in Z[x], where degG<degF. Then for F/G∈Q[x], a nec...
Quadratic irrationals √D have a periodic representation in terms of continued fractions. In this pap...
AbstractFor an irrational number x and n⩾1, we denote by kn(x) the exact number of partial quotients...
AbstractIn this paper we give a new proof of Ramanujanʼs continued fraction involving the Gamma func...
AbstractThe idea to use classical hypergeometric series and, in particular, well-poised hypergeometr...
AbstractIn 2001, Jinhee Yi found many explicit values of the famous Rogers–Ramanujan continued fract...
In this paper, we establish several new modular equations of degree 9 using Ramanujan's modular equa...
In this paper, we obtain some new modular equations of degree2. We obtain several general formulas f...
AbstractWith two elementary trigonometric sums and the Jacobi theta function θ1, we provide a new pr...
Contains a correction with respect to the printed versionWe provide sharp estimates for the number o...
AbstractWe show some new variations on Tasoev's continued fractions [0;ak,…,ak︸m¯]k=1∞, where the pe...
In this sequel to our recent note [D. Cvijovic, Values of the derivatives of the cotangent at ration...
AbstractIn this sequel to our recent note [D. Cvijović, Values of the derivatives of the cotangent a...
AbstractIn this note, we prove a residual relation for Halley’s method for finding the principal pth...