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Book III Part 1
Nature has been defined as a 'principle of
motion and change', and it is the subject
of our inquiry. We must therefore see that
we understand the meaning of 'motion'; for
if it were unknown, the meaning of 'nature'
too would be unknown.
When we have determined the nature of motion,
our next task will be to attack in the same
way the terms which are involved in it. Now
motion is supposed to belong to the class
of things which are continuous; and the infinite
presents itself first in the continuous-that
is how it comes about that 'infinite' is
often used in definitions of the continuous
('what is infinitely divisible is continuous').
Besides these, place, void, and time are
thought to be necessary conditions of motion.
Clearly, then, for these reasons and also
because the attributes mentioned are common
to, and coextensive with, all the objects
of our science, we must first take each of
them in hand and discuss it. For the investigation
of special attributes comes after that of
the common attributes.
To begin then, as we said, with motion. We
may start by distinguishing (1) what exists
in a state of fulfilment only, (2) what exists
as potential, (3) what exists as potential
and also in fulfilment-one being a 'this',
another 'so much', a third 'such', and similarly
in each of the other modes of the predication
of being.
Further, the word 'relative' is used with
reference to (1) excess and defect, (2) agent
and patient and generally what can move and
what can be moved. For 'what can cause movement'
is relative to 'what can be moved', and vice
versa.
Again, there is no such thing as motion over
and above the things. It is always with respect
to substance or to quantity or to quality
or to place that what changes changes. But
it is impossible, as we assert, to find anything
common to these which is neither 'this' nor
quantum nor quale nor any of the other predicates.
Hence neither will motion and change have
reference to something over and above the
things mentioned, for there is nothing over
and above them.
Now each of these belongs to all its subjects
in either of two ways: namely (1) substance-the
one is positive form, the other privation;
(2) in quality, white and black; (3) in quantity,
complete and incomplete; (4) in respect of
locomotion, upwards and downwards or light
and heavy. Hence there are as many types
of motion or change as there are meanings
of the word 'is'.
We have now before us the distinctions in
the various classes of being between what
is full real and what is potential.
Def. The fulfilment of what exists potentially,
in so far as it exists potentially, is motion-namely,
of what is alterable qua alterable, alteration:
of what can be increased and its opposite
what can be decreased (there is no common
name), increase and decrease: of what can
come to be and can pass away, coming to he
and passing away: of what can be carried
along, locomotion.
Examples will elucidate this definition of
motion. When the buildable, in so far as
it is just that, is fully real, it is being
built, and this is building. Similarly, learning,
doctoring, rolling, leaping, ripening, ageing.
The same thing, if it is of a certain kind,
can be both potential and fully real, not
indeed at the same time or not in the same
respect, but e. g. potentially hot and actually
cold. Hence at once such things will act
and be acted on by one another in many ways:
each of them will be capable at the same
time of causing alteration and of being altered.
Hence, too, what effects motion as a physical
agent can be moved: when a thing of this
kind causes motion, it is itself also moved.
This, indeed, has led some people to suppose
that every mover is moved. But this question
depends on another set of arguments, and
the truth will be made clear later. is possible
for a thing to cause motion, though it is
itself incapable of being moved.
It is the fulfilment of what is potential
when it is already fully real and operates
not as itself but as movable, that is motion.
What I mean by 'as' is this: Bronze is potentially
a statue. But it is not the fulfilment of
bronze as bronze which is motion. For 'to
be bronze' and 'to be a certain potentiality'
are not the same.
If they were identical without qualification,
i. e. in definition, the fulfilment of bronze
as bronze would have been motion. But they
are not the same, as has been said. (This
is obvious in contraries. 'To be capable
of health' and 'to be capable of illness'
are not the same, for if they were there
would be no difference between being ill
and being well. Yet the subject both of health
and of sickness-whether it is humour or blood-is
one and the same.)
We can distinguish, then, between the two-just
as, to give another example, 'colour' and
visible' are different-and clearly it is
the fulfilment of what is potential as potential
that is motion. So this, precisely, is motion.
Further it is evident that motion is an attribute
of a thing just when it is fully real in
this way, and neither before nor after. For
each thing of this kind is capable of being
at one time actual, at another not. Take
for instance the buildable as buildable.
The actuality of the buildable as buildable
is the process of building. For the actuality
of the buildable must be either this or the
house. But when there is a house, the buildable
is no longer buildable. On the other hand,
it is the buildable which is being built.
The process then of being built must be the
kind of actuality required But building is
a kind of motion, and the same account will
apply to the other kinds also.
Part 2
The soundness of this definition is evident
both when we consider the accounts of motion
that the others have given, and also from
the difficulty of defining it otherwise.
One could not easily put motion and change
in another genus-this is plain if we consider
where some people put it; they identify motion
with or 'inequality' or 'not being'; but
such things are not necessarily moved, whether
they are 'different' or 'unequal' or 'non-existent';
Nor is change either to or from these rather
than to or from their opposites.
The reason why they put motion into these
genera is that it is thought to be something
indefinite, and the principles in the second
column are indefinite because they are privative:
none of them is either 'this' or 'such' or
comes under any of the other modes of predication.
The reason in turn why motion is thought
to be indefinite is that it cannot be classed
simply as a potentiality or as an actuality-a
thing that is merely capable of having a
certain size is not undergoing change, nor
yet a thing that is actually of a certain
size, and motion is thought to be a sort
of actuality, but incomplete, the reason
for this view being that the potential whose
actuality it is is incomplete. This is why
it is hard to grasp what motion is. It is
necessary to class it with privation or with
potentiality or with sheer actuality, yet
none of these seems possible. There remains
then the suggested mode of definition, namely
that it is a sort of actuality, or actuality
of the kind described, hard to grasp, but
not incapable of existing.
The mover too is moved, as has been said-every
mover, that is, which is capable of motion,
and whose immobility is rest-when a thing
is subject to motion its immobility is rest.
For to act on the movable as such is just
to move it. But this it does by contact,
so that at the same time it is also acted
on. Hence we can define motion as the fulfilment
of the movable qua movable, the cause of
the attribute being contact with what can
move so that the mover is also acted on.
The mover or agent will always be the vehicle
of a form, either a 'this' or 'such', which,
when it acts, will be the source and cause
of the change, e. g. the full-formed man
begets man from what is potentially man.
Part 3
The solution of the difficulty that is raised
about the motion-whether it is in the movable-is
plain. It is the fulfilment of this potentiality,
and by the action of that which has the power
of causing motion; and the actuality of that
which has the power of causing motion is
not other than the actuality of the movable,
for it must be the fulfilment of both. A
thing is capable of causing motion because
it can do this, it is a mover because it
actually does it. But it is on the movable
that it is capable of acting. Hence there
is a single actuality of both alike, just
as one to two and two to one are the same
interval, and the steep ascent and the steep
descent are one-for these are one and the
same, although they can be described in different
ways. So it is with the mover and the moved.
This view has a dialectical difficulty. Perhaps
it is necessary that the actuality of the
agent and that of the patient should not
be the same. The one is 'agency' and the
other 'patiency'; and the outcome and completion
of the one is an 'action', that of the other
a 'passion'. Since then they are both motions,
we may ask: in what are they, if they are
different? Either (a) both are in what is
acted on and moved, or (b) the agency is
in the agent and the patiency in the patient.
(If we ought to call the latter also 'agency',
the word would be used in two senses.)
Now, in alternative (b), the motion will
be in the mover, for the same statement will
hold of 'mover' and 'moved'. Hence either
every mover will be moved, or, though having
motion, it will not be moved.
If on the other hand (a) both are in what
is moved and acted on-both the agency and
the patiency (e. g. both teaching and learning,
though they are two, in the learner), then,
first, the actuality of each will not be
present in each, and, a second absurdity,
a thing will have two motions at the same
time. How will there be two alterations of
quality in one subject towards one definite
quality? The thing is impossible: the actualization
will be one.
But (some one will say) it is contrary to
reason to suppose that there should be one
identical actualization of two things which
are different in kind. Yet there will be,
if teaching and learning are the same, and
agency and patiency. To teach will be the
same as to learn, and to act the same as
to be acted on-the teacher will necessarily
be learning everything that he teaches, and
the agent will be acted on. One may reply:
(1) It is not absurd that the actualization
of one thing should be in another. Teaching
is the activity of a person who can teach,
yet the operation is performed on some patient-it
is not cut adrift from a subject, but is
of A on B.
(2) There is nothing to prevent two things
having one and the same actualization, provided
the actualizations are not described in the
same way, but are related as what can act
to what is acting.
(3) Nor is it necessary that the teacher
should learn, even if to act and to be acted
on are one and the same, provided they are
not the same in definition (as 'raiment'
and 'dress'), but are the same merely in
the sense in which the road from Thebes to
Athens and the road from Athens to Thebes
are the same, as has been explained above.
For it is not things which are in a way the
same that have all their attributes the same,
but only such as have the same definition.
But indeed it by no means follows from the
fact that teaching is the same as learning,
that to learn is the same as to teach, any
more than it follows from the fact that there
is one distance between two things which
are at a distance from each other, that the
two vectors AB and Ba, are one and the same.
To generalize, teaching is not the same as
learning, or agency as patiency, in the full
sense, though they belong to the same subject,
the motion; for the 'actualization of X in
Y' and the 'actualization of Y through the
action of X' differ in definition.
What then Motion is, has been stated both
generally and particularly. It is not difficult
to see how each of its types will be defined-alteration
is the fulfillment of the alterable qua alterable
(or, more scientifically, the fulfilment
of what can act and what can be acted on,
as such)-generally and again in each particular
case, building, healing, &c. A similar
definition will apply to each of the other
kinds of motion.
Part 4
The science of nature is concerned with spatial
magnitudes and motion and time, and each
of these at least is necessarily infinite
or finite, even if some things dealt with
by the science are not, e. g. a quality or
a point-it is not necessary perhaps that
such things should be put under either head.
Hence it is incumbent on the person who specializes
in physics to discuss the infinite and to
inquire whether there is such a thing or
not, and, if there is, what it is.
The appropriateness to the science of this
problem is clearly indicated. All who have
touched on this kind of science in a way
worth considering have formulated views about
the infinite, and indeed, to a man, make
it a principle of things.
(1) Some, as the Pythagoreans and Plato,
make the infinite a principle in the sense
of a self-subsistent substance, and not as
a mere attribute of some other thing. Only
the Pythagoreans place the infinite among
the objects of sense (they do not regard
number as separable from these), and assert
that what is outside the heaven is infinite.
Plato, on the other hand, holds that there
is no body outside (the Forms are not outside
because they are nowhere),yet that the infinite
is present not only in the objects of sense
but in the Forms also.
Further, the Pythagoreans identify the infinite
with the even. For this, they say, when it
is cut off and shut in by the odd, provides
things with the element of infinity. An indication
of this is what happens with numbers. If
the gnomons are placed round the one, and
without the one, in the one construction
the figure that results is always different,
in the other it is always the same. But Plato
has two infinites, the Great and the Small.
The physicists, on the other hand, all of
them, always regard the infinite as an attribute
of a substance which is different from it
and belongs to the class of the so-called
elements-water or air or what is intermediate
between them. Those who make them limited
in number never make them infinite in amount.
But those who make the elements infinite
in number, as Anaxagoras and Democritus do,
say that the infinite is continuous by contact-compounded
of the homogeneous parts according to the
one, of the seed-mass of the atomic shapes
according to the other.
Further, Anaxagoras held that any part is
a mixture in the same way as the All, on
the ground of the observed fact that anything
comes out of anything. For it is probably
for this reason that he maintains that once
upon a time all things were together. (This
flesh and this bone were together, and so
of any thing: therefore all things: and at
the same time too.) For there is a beginning
of separation, not only for each thing, but
for all. Each thing that comes to be comes
from a similar body, and there is a coming
to be of all things, though not, it is true,
at the same time. Hence there must also be
an origin of coming to be. One such source
there is which he calls Mind, and Mind begins
its work of thinking from some starting-point.
So necessarily all things must have been
together at a certain time, and must have
begun to be moved at a certain time.
Democritus, for his part, asserts the contrary,
namely that no element arises from another
element. Nevertheless for him the common
body is a source of all things, differing
from part to part in size and in shape.
It is clear then from these considerations
that the inquiry concerns the physicist.
Nor is it without reason that they all make
it a principle or source. We cannot say that
the infinite has no effect, and the only
effectiveness which we can ascribe to it
is that of a principle. Everything is either
a source or derived from a source. But there
cannot be a source of the infinite or limitless,
for that would be a limit of it. Further,
as it is a beginning, it is both uncreatable
and indestructible. For there must be a point
at which what has come to be reaches completion,
and also a termination of all passing away.
That is why, as we say, there is no principle
of this, but it is this which is held to
be the principle of other things, and to
encompass all and to steer all, as those
assert who do not recognize, alongside the
infinite, other causes, such as Mind or Friendship.
Further they identify it with the Divine,
for it is 'deathless and imperishable' as
Anaximander says, with the majority of the
physicists.
Belief in the existence of the infinite comes
mainly from five considerations:
(1) From the nature of time-for it is infinite.
(2) From the division of magnitudes-for the
mathematicians also use the notion of the
infinite.
(3) If coming to be and passing away do not
give out, it is only because that from which
things come to be is infinite.
(4) Because the limited always finds its
limit in something, so that there must be
no limit, if everything is always limited
by something different from itself.
(5) Most of all, a reason which is peculiarly
appropriate and presents the difficulty that
is felt by everybody-not only number but
also mathematical magnitudes and what is
outside the heaven are supposed to be infinite
because they never give out in our thought.
The last fact (that what is outside is infinite)
leads people to suppose that body also is
infinite, and that there is an infinite number
of worlds. Why should there be body in one
part of the void rather than in another?
Grant only that mass is anywhere and it follows
that it must be everywhere. Also, if void
and place are infinite, there must be infinite
body too, for in the case of eternal things
what may be must be. But the problem of the
infinite is difficult: many contradictions
result whether we suppose it to exist or
not to exist. If it exists, we have still
to ask how it exists; as a substance or as
the essential attribute of some entity? Or
in neither way, yet none the less is there
something which is infinite or some things
which are infinitely many?
The problem, however, which specially belongs
to the physicist is to investigate whether
there is a sensible magnitude which is infinite.
We must begin by distinguishing the various
senses in which the term 'infinite' is used.
(1) What is incapable of being gone through,
because it is not in its nature to be gone
through (the sense in which the voice is
'invisible').
(2) What admits of being gone through, the
process however having no termination, or
what scarcely admits of being gone through.
(3) What naturally admits of being gone through,
but is not actually gone through or does
not actually reach an end.
Further, everything that is infinite may
be so in respect of addition or division
or both.
Part 5
Now it is impossible that the infinite should
be a thing which is itself infinite, separable
from sensible objects. If the infinite is
neither a magnitude nor an aggregate, but
is itself a substance and not an attribute,
it will be indivisible; for the divisible
must be either a magnitude or an aggregate.
But if indivisible, then not infinite, except
in the sense
(1) in which the voice is 'invisible'. But
this is not the sense in which it is used
by those who say that the infinite exists,
nor that in which we are investigating it,
namely as (2) 'that which cannot be gone
through'. But if the infinite exists as an
attribute, it would not be, qua infinite
an element in substances, any more than the
invisible would be an element of speech,
though the voice is invisible.
Further, how can the infinite be itself any
thing, unless both number and magnitude,
of which it is an essential attribute, exist
in that way? If they are not substances,
a fortiori the infinite is not.
It is plain, too, that the infinite cannot
be an actual thing and a substance and principle.
For any part of it that is taken will be
infinite, if it has parts: for 'to be infinite'
and 'the infinite' are the same, if it is
a substance and not predicated of a subject.
Hence it will be either indivisible or divisible
into infinites. But the same thing cannot
be many infinites. (Yet just as part of air
is air, so a part of the infinite would be
infinite, if it is supposed to be a substance
and principle.) Therefore the infinite must
be without parts and indivisible. But this
cannot be true of what is infinite in full
completion: for it must be a definite quantity.
Suppose then that infinity belongs to substance
as an attribute. But, if so, it cannot, as
we have said, be described as a principle,
but rather that of which it is an attribute-the
air or the even number.
Thus the view of those who speak after the
manner of the Pythagoreans is absurd. With
the same breath they treat the infinite as
substance, and divide it into parts.
This discussion, however, involves the more
general question whether the infinite can
be present in mathematical objects and things
which are intelligible and do not have extension,
as well as among sensible objects. Our inquiry
(as physicists) is limited to its special
subject-matter, the objects of sense, and
we have to ask whether there is or is not
among them a body which is infinite in the
direction of increase.
We may begin with a dialectical argument
and show as follows that there is no such
thing. If 'bounded by a surface' is the definition
of body there cannot be an infinite body
either intelligible or sensible. Nor can
number taken in abstraction be infinite,
for number or that which has number is numerable.
If then the numerable can be numbered, it
would also be possible to go through the
infinite.
If, on the other hand, we investigate the
question more in accordance with principles
appropriate to physics, we are led as follows
to the same result.
The infinite body must be either (1) compound,
or (2) simple; yet neither alternative is
possible.
(1) Compound the infinite body will not be,
if the elements are finite in number. For
they must be more than one, and the contraries
must always balance, and no one of them can
be infinite. If one of the bodies falls in
any degree short of the other in potency-suppose
fire is finite in amount while air is infinite
and a given quantity of fire exceeds in power
the same amount of air in any ratio provided
it is numerically definite-the infinite body
will obviously prevail over and annihilate
the finite body. On the other hand, it is
impossible that each should be infinite.
'Body' is what has extension in all directions
and the infinite is what is boundlessly extended,
so that the infinite body would be extended
in all directions ad infinitum.
Nor (2) can the infinite body be one and
simple, whether it is, as some hold, a thing
over and above the elements (from which they
generate the elements) or is not thus qualified.
(a) We must consider the former alternative;
for there are some people who make this the
infinite, and not air or water, in order
that the other elements may not be annihilated
by the element which is infinite. They have
contrariety with each other-air is cold,
water moist, fire hot; if one were infinite,
the others by now would have ceased to be.
As it is, they say, the infinite is different
from them and is their source.
It is impossible, however, that there should
be such a body; not because it is infinite
on that point a general proof can be given
which applies equally to all, air, water,
or anything else-but simply because there
is, as a matter of fact, no such sensible
body, alongside the so-called elements. Everything
can be resolved into the elements of which
it is composed. Hence the body in question
would have been present in our world here,
alongside air and fire and earth and water:
but nothing of the kind is observed.
(b) Nor can fire or any other of the elements
be infinite. For generally, and apart from
the question of how any of them could be
infinite, the All, even if it were limited,
cannot either be or become one of them, as
Heraclitus says that at some time all things
become fire. (The same argument applies also
to the one which the physicists suppose to
exist alongside the elements: for everything
changes from contrary to contrary, e. g.
from hot to cold).
The preceding consideration of the various
cases serves to show us whether it is or
is not possible that there should be an infinite
sensible body. The following arguments give
a general demonstration that it is not possible.
It is the nature of every kind of sensible
body to be somewhere, and there is a place
appropriate to each, the same for the part
and for the whole, e. g. for the whole earth
and for a single clod, and for fire and for
a spark.
Suppose (a) that the infinite sensible body
is homogeneous. Then each part will be either
immovable or always being carried along.
Yet neither is possible. For why downwards
rather than upwards or in any other direction?
I mean, e. g, if you take a clod, where will
it be moved or where will it be at rest?
For ex hypothesi the place of the body akin
to it is infinite. Will it occupy the whole
place, then? And how? What then will be the
nature of its rest and of its movement, or
where will they be? It will either be at
home everywhere-then it will not be moved;
or it will be moved everywhere-then it will
not come to rest.
But if (b) the All has dissimilar parts,
the proper places of the parts will be dissimilar
also, and the body of the All will have no
unity except that of contact. Then, further,
the parts will be either finite or infinite
in variety of kind. (i) Finite they cannot
be, for if the All is to be infinite, some
of them would have to be infinite, while
the others were not, e. g. fire or water
will be infinite. But, as we have seen before,
such an element would destroy what is contrary
to it. (This indeed is the reason why none
of the physicists made fire or earth the
one infinite body, but either water or air
or what is intermediate between them, because
the abode of each of the two was plainly
determinate, while the others have an ambiguous
place between up and down.)
But (ii) if the parts are infinite in number
and simple, their proper places too will
be infinite in number, and the same will
be true of the elements themselves. If that
is impossible, and the places are finite,
the whole too must be finite; for the place
and the body cannot but fit each other. Neither
is the whole place larger than what can be
filled by the body (and then the body would
no longer be infinite), nor is the body larger
than the place; for either there would be
an empty space or a body whose nature it
is to be nowhere.
Anaxagoras gives an absurd account of why
the infinite is at rest. He says that the
infinite itself is the cause of its being
fixed. This because it is in itself, since
nothing else contains it-on the assumption
that wherever anything is, it is there by
its own nature. But this is not true: a thing
could be somewhere by compulsion, and not
where it is its nature to be.
Even if it is true as true can be that the
whole is not moved (for what is fixed by
itself and is in itself must be immovable),
yet we must explain why it is not its nature
to be moved. It is not enough just to make
this statement and then decamp. Anything
else might be in a state of rest, but there
is no reason why it should not be its nature
to be moved. The earth is not carried along,
and would not be carried along if it were
infinite, provided it is held together by
the centre. But it would not be because there
was no other region in which it could be
carried along that it would remain at the
centre, but because this is its nature. Yet
in this case also we may say that it fixes
itself. If then in the case of the earth,
supposed to be infinite, it is at rest, not
because it is infinite, but because it has
weight and what is heavy rests at the centre
and the earth is at the centre, similarly
the infinite also would rest in itself, not
because it is infinite and fixes itself,
but owing to some other cause.
Another difficulty emerges at the same time.
Any part of the infinite body ought to remain
at rest. Just as the infinite remains at
rest in itself because it fixes itself, so
too any part of it you may take will remain
in itself. The appropriate places of the
whole and of the part are alike, e. g. of
the whole earth and of a clod the appropriate
place is the lower region; of fire as a whole
and of a spark, the upper region. If, therefore,
to be in itself is the place of the infinite,
that also will be appropriate to the part.
Therefore it will remain in itself.
In general, the view that there is an infinite
body is plainly incompatible with the doctrine
that there is necessarily a proper place
for each kind of body, if every sensible
body has either weight or lightness, and
if a body has a natural locomotion towards
the centre if it is heavy, and upwards if
it is light. This would need to be true of
the infinite also. But neither character
can belong to it: it cannot be either as
a whole, nor can it be half the one and half
the other. For how should you divide it?
or how can the infinite have the one part
up and the other down, or an extremity and
a centre?
Further, every sensible body is in place,
and the kinds or differences of place are
up-down, before-behind, right-left; and these
distinctions hold not only in relation to
us and by arbitrary agreement, but also in
the whole itself. But in the infinite body
they cannot exist. In general, if it is impossible
that there should be an infinite place, and
if every body is in place, there cannot be
an infinite body.
Surely what is in a special place is in place,
and what is in place is in a special place.
Just, then, as the infinite cannot be quantity-that
would imply that it has a particular quantity,
e, g, two or three cubits; quantity just
means these-so a thing's being in place means
that it is somewhere, and that is either
up or down or in some other of the six differences
of position: but each of these is a limit.
It is plain from these arguments that there
is no body which is actually infinite.
Part 6
But on the other hand to suppose that the
infinite does not exist in any way leads
obviously to many impossible consequences:
there will be a beginning and an end of time,
a magnitude will not be divisible into magnitudes,
number will not be infinite. If, then, in
view of the above considerations, neither
alternative seems possible, an arbiter must
be called in; and clearly there is a sense
in which the infinite exists and another
in which it does not.
We must keep in mind that the word 'is' means
either what potentially is or what fully
is. Further, a thing is infinite either by
addition or by division.
Now, as we have seen, magnitude is not actually
infinite. But by division it is infinite.
(There is no difficulty in refuting the theory
of indivisible lines.) The alternative then
remains that the infinite has a potential
existence.
But the phrase 'potential existence' is ambiguous.
When we speak of the potential existence
of a statue we mean that there will be an
actual statue. It is not so with the infinite.
There will not be an actual infinite. The
word 'is' has many senses, and we say that
the infinite 'is' in the sense in which we
say 'it is day' or 'it is the games', because
one thing after another is always coming
into existence. For of these things too the
distinction between potential and actual
existence holds. We say that there are Olympic
games, both in the sense that they may occur
and that they are actually occurring.
The infinite exhibits itself in different
ways-in time, in the generations of man,
and in the division of magnitudes. For generally
the infinite has this mode of existence:
one thing is always being taken after another,
and each thing that is taken is always finite,
but always different. Again, 'being' has
more than one sense, so that we must not
regard the infinite as a 'this', such as
a man or a horse, but must suppose it to
exist in the sense in which we speak of the
day or the games as existing things whose
being has not come to them like that of a
substance, but consists in a process of coming
to be or passing away; definite if you like
at each stage, yet always different.
But when this takes place in spatial magnitudes,
what is taken perists, while in the succession
of time and of men it takes place by the
passing away of these in such a way that
the source of supply never gives out.
In a way the infinite by addition is the
same thing as the infinite by division. In
a finite magnitude, the infinite by addition
comes about in a way inverse to that of the
other. For in proportion as we see division
going on, in the same proportion we see addition
being made to what is already marked off.
For if we take a determinate part of a finite
magnitude and add another part determined
by the same ratio (not taking in the same
amount of the original whole), and so on,
we shall not traverse the given magnitude.
But if we increase the ratio of the part,
so as always to take in the same amount,
we shall traverse the magnitude, for every
finite magnitude is exhausted by means of
any determinate quantity however small.
The infinite, then, exists in no other way,
but in this way it does exist, potentially
and by reduction. It exists fully in the
sense in which we say 'it is day' or 'it
is the games'; and potentially as matter
exists, not independently as what is finite
does.
By addition then, also, there is potentially
an infinite, namely, what we have described
as being in a sense the same as the infinite
in respect of division. For it will always
be possible to take something ah extra. Yet
the sum of the parts taken will not exceed
every determinate magnitude, just as in the
direction of division every determinate magnitude
is surpassed in smallness and there will
be a smaller part.
But in respect of addition there cannot be
an infinite which even potentially exceeds
every assignable magnitude, unless it has
the attribute of being actually infinite,
as the physicists hold to be true of the
body which is outside the world, whose essential
nature is air or something of the kind. But
if there cannot be in this way a sensible
body which is infinite in the full sense,
evidently there can no more be a body which
is potentially infinite in respect of addition,
except as the inverse of the infinite by
division, as we have said. It is for this
reason that Plato also made the infinites
two in number, because it is supposed to
be possible to exceed all limits and to proceed
ad infinitum in the direction both of increase
and of reduction. Yet though he makes the
infinites two, he does not use them. For
in the numbers the infinite in the direction
of reduction is not present, as the monad
is the smallest; nor is the infinite in the
direction of increase, for the parts number
only up to the decad.
The infinite turns out to be the contrary
of what it is said to be. It is not what
has nothing outside it that is infinite,
but what always has something outside it.
This is indicated by the fact that rings
also that have no bezel are described as
'endless', because it is always possible
to take a part which is outside a given part.
The description depends on a certain similarity,
but it is not true in the full sense of the
word. This condition alone is not sufficient:
it is necessary also that the next part which
is taken should never be the same. In the
circle, the latter condition is not satisfied:
it is only the adjacent part from which the
new part is different.
Our definition then is as follows: A quantity
is infinite if it is such that we can always
take a part outside what has been already
taken. On the other hand, what has nothing
outside it is complete and whole. For thus
we define the whole-that from which nothing
is wanting, as a whole man or a whole box.
What is true of each particular is true of
the whole as such-the whole is that of which
nothing is outside. On the other hand that
from which something is absent and outside,
however small that may be, is not 'all'.
'Whole' and 'complete' are either quite identical
or closely akin. Nothing is complete (teleion)
which has no end (telos); and the end is
a limit.
Hence Parmenides must be thought to have
spoken better than Melissus. The latter says
that the whole is infinite, but the former
describes it as limited, 'equally balanced
from the middle'. For to connect the infinite
with the all and the whole is not like joining
two pieces of string; for it is from this
they get the dignity they ascribe to the
infinite-its containing all things and holding
the all in itself-from its having a certain
similarity to the whole. It is in fact the
matter of the completeness which belongs
to size, and what is potentially a whole,
though not in the full sense. It is divisible
both in the direction of reduction and of
the inverse addition. It is a whole and limited;
not, however, in virtue of its own nature,
but in virtue of what is other than it. It
does not contain, but, in so far as it is
infinite, is contained. Consequently, also,
it is unknowable, qua infinite; for the matter
has no form. (Hence it is plain that the
infinite stands in the relation of part rather
than of whole. For the matter is part of
the whole, as the bronze is of the bronze
statue.) If it contains in the case of sensible
things, in the case of intelligible things
the great and the small ought to contain
them. But it is absurd and impossible to
suppose that the unknowable and indeterminate
should contain and determine.
Part 7
It is reasonable that there should not be
held to be an infinite in respect of addition
such as to surpass every magnitude, but that
there should be thought to be such an infinite
in the direction of division. For the matter
and the infinite are contained inside what
contains them, while it is the form which
contains. It is natural too to suppose that
in number there is a limit in the direction
of the minimum, and that in the other direction
every assigned number is surpassed. In magnitude,
on the contrary, every assigned magnitude
is surpassed in the direction of smallness,
while in the other direction there is no
infinite magnitude. The reason is that what
is one is indivisible whatever it may be,
e. g. a man is one man, not many. Number
on the other hand is a plurality of 'ones'
and a certain quantity of them. Hence number
must stop at the indivisible: for 'two' and
'three' are merely derivative terms, and
so with each of the other numbers. But in
the direction of largeness it is always possible
to think of a larger number: for the number
of times a magnitude can be bisected is infinite.
Hence this infinite is potential, never actual:
the number of parts that can be taken always
surpasses any assigned number. But this number
is not separable from the process of bisection,
and its infinity is not a permanent actuality
but consists in a process of coming to be,
like time and the number of time.
With magnitudes the contrary holds. What
is continuous is divided ad infinitum, but
there is no infinite in the direction of
increase. For the size which it can potentially
be, it can also actually be. Hence since
no sensible magnitude is infinite, it is
impossible to exceed every assigned magnitude;
for if it were possible there would be something
bigger than the heavens.
The infinite is not the same in magnitude
and movement and time, in the sense of a
single nature, but its secondary sense depends
on its primary sense, i. e. movement is called
infinite in virtue of the magnitude covered
by the movement (or alteration or growth),
and time because of the movement. (I use
these terms for the moment. Later I shall
explain what each of them means, and also
why every magnitude is divisible into magnitudes.)
Our account does not rob the mathematicians
of their science, by disproving the actual
existence of the infinite in the direction
of increase, in the sense of the untraversable.
In point of fact they do not need the infinite
and do not use it. They postulate only that
the finite straight line may be produced
as far as they wish. It is possible to have
divided in the same ratio as the largest
quantity another magnitude of any size you
like. Hence, for the purposes of proof, it
will make no difference to them to have such
an infinite instead, while its existence
will be in the sphere of real magnitudes.
In the fourfold scheme of causes, it is plain
that the infinite is a cause in the sense
of matter, and that its essence is privation,
the subject as such being what is continuous
and sensible. All the other thinkers, too,
evidently treat the infinite as matter-that
is why it is inconsistent in them to make
it what contains, and not what is contained.
Part 8
It remains to dispose of the arguments which
are supposed to support the view that the
infinite exists not only potentially but
as a separate thing. Some have no cogency;
others can be met by fresh objections that
are valid.
(1) In order that coming to be should not
fail, it is not necessary that there should
be a sensible body which is actually infinite.
The passing away of one thing may be the
coming to be of another, the All being limited.
(2) There is a difference between touching
and being limited. The former is relative
to something and is the touching of something
(for everything that touches touches something),
and further is an attribute of some one of
the things which are limited. On the other
hand, what is limited is not limited in relation
to anything. Again, contact is not necessarily
possible between any two things taken at
random.
(3) To rely on mere thinking is absurd, for
then the excess or defect is not in the thing
but in the thought. One might think that
one of us is bigger than he is and magnify
him ad infinitum. But it does not follow
that he is bigger than the size we are, just
because some one thinks he is, but only because
he is the size he is. The thought is an accident.
(a) Time indeed and movement are infinite,
and also thinking, in the sense that each
part that is taken passes in succession out
of existence.
(b) Magnitude is not infinite either in the
way of reduction or of magnification in thought.
This concludes my account of the way in which
the infinite exists, and of the way in which
it does not exist, and of what it is.
|
Evans Experientialism 
