Ancient cultures had various ideas about the nature of infinity. The ancient Indians and the Greeks did not define infinity in precise formalism as does modern mathematics, and instead approached infinity as a philosophical concept. The earliest recorded idea of infinity in Greece may be that of Anaximander (c. 610 – c. 546 BC) a pre-Socratic Greek philosopher. He used the word apeiron, which means "unbounded", "indefinit… WebNov 25, 2010 · Wiki User. ∙ 2010-11-25 18:24:48. Study now. See answers (3) Copy. Infinity is not a number. You can add a zero to the end of any number and make it 10 times bigger, and you can do it again and again. You can always add one more zero and you always get a new number that is ten times larger -- but. you NEVER get to infinity.
Does infinity exist? plus.maths.org
WebNot that we know of. The entirety of our application suite (minus Infinity's game-downloading tech) can't connect to the open internet; any registry changes made by Flashpoint Secure Player are removed once the game is closed; all incoming curations are passed through a PC with competent and up-to-date antivirus software; and most … WebNov 30, 2024 · In many videos Sal repeatedly says that although some people say that functions that tend to infinity have a limit infinity. (For example, in this video, the says that the function $ y = \frac {2}{x-1} $ (here's a link to the graph ) is unbounded as x approaches 1 from the left side, although "some" people would say that the function is tending ... crotalaria retusa common name
Introduction to limits at infinity (video) Khan Academy
WebIf a line does not pass though V, then we call this line a point at infinity . Example: V=R 2=, W=R= We have one line which does not intersect W, that is the line {(1,t) t in R}. This is our point at infinity. You can rotate this line though. And if you rotate it just a tiny amount of will intersect W at a point very far away from (0,0). WebNov 26, 2024 · I'm reading Cassels and Flynn's book on Genus 2 curves. In the background section, they have the following: Still working over an algebraically closed field $\bar{k}$, we suppose that the characteristic is not 2 and take as an example the curve $\mathcal{C}$ given in the affine plane by $$ Y^2 = \prod_{j=1}^6 (X-\theta_j).$$ It is not complete: … WebThere's no "starting point" because any number you could think of would not be infinity... Infinity is a loose concept. If you're talking about ordinal numbers, the first infinite one is … crotalaria pallida aiton