Add to ORKGWe show that identities involving trigonometric sums recently proved by Harshitha, Vasuki and Yathirajsharma, using Ramanujan's theory of theta functions, were either already in the literature or can be proved easily by adapting results that can be found in the literature. Also we prove two conjectures given in that paper. After mentioning many other works dealing with identities for various trigonometric sums, we end this paper by describing an automated approach for proving such trigonometric identities
Five binomial sums are extended by a free parameter $m$, that are shown, through the generating func...
AbstractThe sum f(m, n)=∑a=1m−1(|sinπanm||sinπam|) arises in bounding incomplete exponential sums. I...
© 2018 The Fibonacci Association. All rights reserved. In this paper, we give closed formulas for a ...
Two classes of finite trigonometric sums, each involving only $\sin$'s, are evaluated in closed form...
As a sequel to our recent paper, its general approach was here extended to finite alternating trigon...
AbstractTrigonometric sums over the angles equally distributed on the upper half plane are investiga...
We present several new inequalities for trigonometric sums. Among others, we show that the inequalit...
AbstractWe give an evaluation of a trigonometrical sum which plays a key role in a proof by H. Minc ...
We record $$ \binom{42}2+\binom{23}2+\binom{13}2=1192 $$ functional identities that, apart from bein...
Finite trigonometric sums occur in various branches of physics, mathematics, and their applications....
In this paper, we express three different, yet related, character sums in terms of generalized Berno...
We start from classical trigonometric sums (of terms such as k^n*cos(k), k^n*sin(k) - where n is a p...
AbstractOn page 335 in his lost notebook, Ramanujan recorded without proofs two identities involving...
Using Euler’s theorem, geometric sums and Chebyshev polynomials, we prove trigonometric identities i...
Some new positive trigonometric sums that sharpen Vietoris’s classical inequalities are presented. ...
Five binomial sums are extended by a free parameter $m$, that are shown, through the generating func...
AbstractThe sum f(m, n)=∑a=1m−1(|sinπanm||sinπam|) arises in bounding incomplete exponential sums. I...
© 2018 The Fibonacci Association. All rights reserved. In this paper, we give closed formulas for a ...
Two classes of finite trigonometric sums, each involving only $\sin$'s, are evaluated in closed form...
As a sequel to our recent paper, its general approach was here extended to finite alternating trigon...
AbstractTrigonometric sums over the angles equally distributed on the upper half plane are investiga...
We present several new inequalities for trigonometric sums. Among others, we show that the inequalit...
AbstractWe give an evaluation of a trigonometrical sum which plays a key role in a proof by H. Minc ...
We record $$ \binom{42}2+\binom{23}2+\binom{13}2=1192 $$ functional identities that, apart from bein...
Finite trigonometric sums occur in various branches of physics, mathematics, and their applications....
In this paper, we express three different, yet related, character sums in terms of generalized Berno...
We start from classical trigonometric sums (of terms such as k^n*cos(k), k^n*sin(k) - where n is a p...
AbstractOn page 335 in his lost notebook, Ramanujan recorded without proofs two identities involving...
Using Euler’s theorem, geometric sums and Chebyshev polynomials, we prove trigonometric identities i...
Some new positive trigonometric sums that sharpen Vietoris’s classical inequalities are presented. ...
Five binomial sums are extended by a free parameter $m$, that are shown, through the generating func...
AbstractThe sum f(m, n)=∑a=1m−1(|sinπanm||sinπam|) arises in bounding incomplete exponential sums. I...
© 2018 The Fibonacci Association. All rights reserved. In this paper, we give closed formulas for a ...