| It is not clear what is to be understood here by “position”
and “space.” I stand at the window of a railway carriage which
is travelling uniformly, and drop a stone on the embankment, without throwing
it. Then, disregarding the influence of the air resistance, I see the stone
descend in a straight line. A pedestrian who observes the misdeed from the
footpath notices that the stone falls to earth in a parabolic curve. I now
ask: Do the “positions” traversed by the stone lie “in reality”
on a straight line or on a parabola? Moreover, what is meant here by motion
“in space”? From the considerations of the previous section the
answer is self-evident. In the first place, we entirely shun the vague word
“space,”
of which, we must honestly acknowledge, we cannot form the slightest conception,
and we replace it by “motion relative to a practically rigid body of
reference.” The positions relative to the body of reference (railway
carriage or embankment) have already been defined in detail in the preceding
section. If instead of “body of reference” we insert “system
of co-ordinates,” which is a useful idea for mathematical description,
we are in a position to say: The stone traverses a straight line relative
to a system of co-ordinates rigidly attached to the carriage, but relative
to a system of co-ordinates rigidly attached to the ground (embankment)
it describes a parabola. With the aid of this example it is clearly seen
that there is no such thing as an independently existing trajectory (lit.
“path-curve” 1), but only a trajectory
relative to a particular body of reference. |
2 |