Infinity can also be infinitely small.
The quote "Infinity can also be infinitely small" captures a fascinating aspect of mathematical and philosophical concepts related to infinity. Traditionally, we think of infinity as something vast and boundless, like the endlessness of space or time. However, in mathematics, the idea of infinity extends to the infinitely small as well. This is evident in concepts such as infinitesimals in calculus, which are quantities that are greater than zero but smaller than any positive real number. This idea challenges our conventional understanding of size and scale, suggesting that infinity is not only about the vastness of large numbers or quantities but also about exploring extremes at the other end—where even the tiniest, most seemingly negligible points can be infinitely divisible. Thus, the quote encourages a broader contemplation of infinity, encompassing both the immense and the minuscule.
Quote By: Giorgio Agamben