Ancient Greeks discussed infinity as philosophical concept, using word "apeiron". Aristotle distinguished between potential and actual infinity, which he considered impossible. Zeno's "Achilles and the Tortoise" paradox showed inadequacy of popular conceptions. Jain text Surya Prajnapti classified numbers into enumerable, innumerable, and infinite
Transfinite numbers are larger than all finite numbers. Term "transfinite" was coined by Georg Cantor in 1895. Modern usage refers to them as infinite numbers
e^Infinity represents an exponential function using the constant e. e is approximately equal to 2.71828 and serves as the base of natural logarithm. The limit of e^Infinity as x approaches infinity is infinity. e^Infinity grows faster than any polynomial function. The derivative of e^Infinity is itself
Greek 'apeiron' means 'infinite', derived from Latin 'infinitas'. Anaximander identified infinite as principle of existence. Pythagoreans saw infinite negatively, emphasizing spatial limits. Eleatics claimed reality was infinite, Zeno developed paradoxes about infinity
Indeterminacy is the state of being infinitely beyond all scaling and definition. There are two main types: Rational Indeterminacy (Nigh-Omnipotence) and Irrational Indeterminacy (True Omnipotence). Users are beyond absolute infinity, which is still logical scaling
First used by mathematician John Wallis in 1655. Also known as lemniscate, meaning "with hanging ribbons". Represents endlessness and limitless concepts in mathematics