All appearances have a determinate magnitude (the relation of which to another assignable). The infinite does not appear as such, likewise not the simple. For the appearances are included between two boundaries (points) and are thus themselves determinate magnitudes.


Notes and Fragments (ed. Cambridge University Press, 2005) - ISBN: 9781139443159


All appearances have a determinate magnitude (the relation of which to another assignable). The infinite does not appear as such, likewise not the...

All appearances have a determinate magnitude (the relation of which to another assignable). The infinite does not appear as such, likewise not the...

All appearances have a determinate magnitude (the relation of which to another assignable). The infinite does not appear as such, likewise not the...

All appearances have a determinate magnitude (the relation of which to another assignable). The infinite does not appear as such, likewise not the...