that converses
1Tom the Dancing Bug — Infobox Comic strip title=Tom the Dancing Bug caption= creator=Ruben Bolling current= status=Running syndicate=Quaternary Features (1990 1997) Universal Press Syndicate (1997 present) comictype=print genre=Humor, Politics, Satire first=June 1990… …
2Seán Cullen — Infobox Comedian name =Seán Cullen imagesize = caption =Cullen in 2004 pseudonym = birth name =Seán Cullen birth date =1965 birth place =Peterborough, Ontario death date = death place = medium =Stand up television Radio nationality =Canadian… …
3Coriolan (Shakespeare) —  Pour l’article homonyme, voir Coriolan.  facsimile du premier folio de 1623, ouvert à la page de Coriolan Coriolan est une tragédie de William Sh …
4Coriolan (théâtre) — Coriolan (Shakespeare)  Pour l’article homonyme, voir Coriolan.  facsimile du premier folio de 1623, ouvert à la page de Coriolan Coriolan …
5converse — converses, conversing, conversed (The verb is pronounced [[t]kənvɜ͟ː(r)s[/t]]. The noun is pronounced [[t]kɒ̱nvɜː(r)s[/t]].) 1) V RECIP If you converse with someone, you talk to them. You can also say that two people converse. [FORMAL] [V with n] …
6Descartes: methodology — Stephen Gaukroger INTRODUCTION The seventeenth century is often referred to as the century of the Scientific Revolution, a time of fundamental scientific change in which traditional theories were either replaced by new ones or radically… …
7Von Neumann–Bernays–Gödel set theory — In the foundations of mathematics, von Neumann–Bernays–Gödel set theory (NBG) is an axiomatic set theory that is a conservative extension of the canonical axiomatic set theory ZFC. A statement in the language of ZFC is provable in NBG if and only …
8Banach fixed-point theorem — In mathematics, the Banach fixed point theorem (also known as the contraction mapping theorem or contraction mapping principle) is an important tool in the theory of metric spaces; it guarantees the existence and uniqueness of fixed points of… …
9De motu corporum in gyrum — (Latin: On the motion of bodies in an orbit ) is the (presumed) title of a manuscript by Isaac Newton sent to Edmond Halley in November 1684. It followed a visit by Halley earlier in that year, when Halley had questioned Newton about problems… …
10Inferno (Dante) — Dante s Inferno redirects here. For other uses, see Dante s Inferno (disambiguation). Gustave Doré s engravings illustrated the Divine Comedy (1861–1868); here Dante is lost in Canto 1 of the Inferno …
