izvorni znanstveni rad
This paper presents novel analytical forms of Fuss’ relations for bicentric polygons
with an odd number of sides and higher rotation numbers. The method is based on Poncelet’s
theorem and Radi´c’s theorem and conjecture concerning the connection between Fuss’ relations
for different rotation numbers. Explicit analytical expressions are obtained for the bicentric
triskaidecagon with k = 2, 4, 6 and for the bicentric pentadecagon with k = 2, while complete
sets of relations are established for the bicentric heptadecagon (k = 1, 2, 3, 4, 5, 6, 7, 8) and enneadecagon
(k = 1, 2, 3, 4, 5, 6, 7, 8, 9). The proposed approach simplifies the derivation and
enables a systematic extension of known Fuss’ relations to higher-order bicentric polygons and
new rotation numbers, confirming the validity of Radi´c’s conjecture.
bicentric polygon, Fuss’ relation, rotation number, triskaidecagon, pentadecagon, heptadecagon, enneadecagon
Razvojem virtualizacijskih tehnologija raste kompleksnost IT sustava, dok korisnici istovremeno zahtijevaju brži pristup resursima, napredne integracije i jednostavnost korištenja. Jedno od ključnih rješenja za ove izazove primjena je…
Ovaj rad istražuje i uspoređuje mogućnosti prosljeđivanja grafičkih kartica na Hyper-V i KVM hipervizorima prema virtualnim strojevima, detaljno opisujući metode, postupke i razlike u arhitekturi koje utječu na…
The ever-growing usage and adaptation of HTTP/3 in web traffic leverages Quick UDP Internet Connections (QUIC) as a transport protocol. QUIC is widely recognized for reduced latency, enhanced…
