Tertium Organum

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Tertium-Organum-by-P-D-Ouspensky

what really are the dimensions of space
and
why are there three of them?
What must strike us as most strange is the fact that it is impossible to
define
three-dimensionality
mathematically.
We are not clear about this, and it seems a paradox to us, because we
always speak of
measuring
space; nevertheless, it is a fact that mathematics
does not feel
the dimensions of space.
The question arises, how can such a fine instrument of analysis as
mathematics is, not feel dimensions if they constitute certain real properties
of space?
In speaking of mathematics, it is necessary, first of all, to accept as a
fundamental premise that/or
every mathematical expression there is a
corresponding relation of certain realities.
If this is absent, if this is not so - then there is no mathematics. Expressing
the relations of magnitudes is the task of mathematics;
this is its main essence, its chief content. But relations must be between
something. It should always be possible to substitute some reality for the
algebraical a,
b
and c. This is the ABC of all mathematics; a,
b
and
c
are
banknotes: they may be genuine, if they have
something
real behind them, or
they may be counterfeit, if behind them there is no reality.
'Dimensions' play here a very curious role. If we designate them by the
algebraic symbols,
a, b
and c, these symbols will have the character of
counterfeit banknotes: they cannot be replaced by any real magnitudes
capable of expressing the relations of dimensions.
Usually, dimensions are designated by powers - the first, the

second, the third. That is to say, if a line is called
a,
then the square, the sides
of which are equal to this line will be
a
2
,
and the cube, the sides of which are
equal to this square, will be a
3
.
As a matter of fact this is what provided Hinton with a basis for his theory
of
tessaracts,
or four-dimensional solids -
a
4
.
But this is sheer fantasy,
because, in the first place, the designation of dimensions by powers is purely
conventional. All powers may be represented on a line. Let us take a 5
millimetre segment of the line
a.
Then a 25-millimetre segment will be its
square, or
a
2
;
and a 125-millimetre segment will be its cube, or a
3
.
How are we to understand that mathematics does not feel dimensions, i.e.
that the difference between dimensions cannot be expressed mathematically?
It can be understood and explained in one way only, namely, by the fact
that
this difference does not exist.
Of course we know that all the three dimensions are actually identical, i.e.
that each of the three dimensions in its turn may be regarded as
the first,
the
second,
the
third,
or vice versa. This by itself proves clearly that dimensions
are not mathematical magnitudes. All the real properties of a thing can be
expressed mathematically as magnitudes, i.e. as numbers showing the
relation of these properties to other properties.
In the question of dimensions, however, mathematics seems to see more, or
farther, than we do; certain boundaries which stop us do not seem to hinder
mathematics from looking
through
them and seeing that there are no realities
to correspond to our concepts of dimensions.
If the three dimensions
really
corresponded to the three powers, we should
have the right to say that only three powers refer to geometry, and that all the
other relations between higher powers, beginning from the fourth, lie beyond
geometry.
But we have not even got the right to say that. The designation of
dimensions by powers is absolutely conventional.
Or, it would be more correct to say that, from the point of view of
mathematics, geometry is an artificial construction for the purpose of solving
problems based on conditional
data,
probably deduced from the
characteristics of our mentality.
Hinton calls the system of investigation of 'higher space',

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