Talk:0

While the infinities can be larger and larger, can zeroes be smaller and smaller too? When we write 0, we usually mean that it is 0.000... (with \(\aleph_0\) zeroes), i.e. it is \(1 \over \aleph_0\). But can exist even smaller zero which is represented by \(1 \over \aleph_1\), in other words, having uncountably many zeroes after decimal point? Ikosarakt1 (talk ^ contribs) 10:52, September 9, 2013 (UTC)