satisfying (1) is called a “<span class="searchmatch">generalised</span> <span class="searchmatch">circle</span>.” It may either be a true <span class="searchmatch">circle</span> or a line. In this sense a line is a <span class="searchmatch">generalised</span> <span class="searchmatch">circle</span> of infinite radius....
<span class="searchmatch">generalised</span> <span class="searchmatch">circles</span> plural of <span class="searchmatch">generalised</span> <span class="searchmatch">circle</span>...
262—ca 190 BCE). circle of Apollonius (plural <span class="searchmatch">circles</span> of Apollonius) (geometry) The figure (a <span class="searchmatch">generalised</span> <span class="searchmatch">circle</span>) definable as the locus of points P such that...
<span class="searchmatch">generalised</span> <span class="searchmatch">circle</span> generalized <span class="searchmatch">circle</span> (plural generalized <span class="searchmatch">circles</span>) (geometry, inversive geometry) A <span class="searchmatch">circle</span> or a line, the two being regarded as types of...
full circle <span class="searchmatch">generalised</span> <span class="searchmatch">circle</span> generalized <span class="searchmatch">circle</span> gorge <span class="searchmatch">circle</span> great <span class="searchmatch">circle</span> great-<span class="searchmatch">circle</span> arc great <span class="searchmatch">circle</span> arc great <span class="searchmatch">circle</span> route green <span class="searchmatch">circle</span> gyrocircle...
along it; […] . (inversive geometry) A reference <span class="searchmatch">generalised</span> <span class="searchmatch">circle</span> through which two given <span class="searchmatch">circles</span> are inverses of each other. 1994, Tim Gallagher, Bruce...
<span class="searchmatch">generalised</span> generalized (comparative more generalized, superlative most generalized) Made more general, less specialized. The generalized formula applies...
with inversion transformations, specifically <span class="searchmatch">circle</span> inversions in the Euclidean plane, but also as <span class="searchmatch">generalised</span> in non-Euclidean and higher-dimensional spaces...
Chance[1], London: Methuen, →OCLC: “Any ship is that—for a reasonable man,” <span class="searchmatch">generalised</span> Marlow in a conciliatory tone. “A sailor isn’t a globetrotter.” 1922...
apei‧ro‧gon apeirogon (plural apeirogons) (mathematics, geometry) A type of <span class="searchmatch">generalised</span> polygon with a countably infinite number of sides and vertices; (in the...