%0 Journal Article
%T Continue quadrilaterals
%A Laudano
%A Francesco
%A Vincenzi
%A Giovanni
%J -
%D 2019
%X Sa£żetak In this article, we introduce the notion of continue quadrilateral, that is a quadrilateral whose sides are in geometric progression. We obtain an extension of the principal result referring to the growth of continue triangles. Precisely, we will see that the growth of a continue quadrilateral belongs to the interval $(1/\Phi_2, \Phi_2)$, where $\Phi_2$ is the Silver mean. The main result is that in any circle a continue quadrilateral of growth $\mu$ can be inscribed for every $\mu$ belonging to the interval $(1/\Phi_2, \Phi_2)$. Our investigation is supported by dynamical software
%K Cyclic quadrilaterals
%K Geometric progressions
%K Silver mean
%K Continue quadrilaterals
%K Growth
%U https://hrcak.srce.hr/index.php?show=clanak&id_clanak_jezik=314489