Bertrand Russell: The Problems of Philosophy
Chapter 7
On Our Knowledge Of General Principles
We saw in the preceding chapter that the principle of Induction, while
necessary to the validity of all arguments based on experience, is itself
not capable of being proved by experience, and yet is unhesitatingly believed
by every one, at least in all its concrete applications. In these characteristics
the principle of induction does not stand alone. There are a number of
other principles which cannot be proved or disproved by experience, but
are used in arguments which start from what is experienced.
Some of these principles have even greater evidence than the principle
of induction, and the knowledge of them has the same degree of certainty
as the knowledge of the existence of sense-data. They constitute the means
of drawing inferences from what is given in sensation; and if what we infer
is to be true, it is just as necessary that our principles of inference
should be true as it is that our data should be true. The principles of
inference are apt to be overlooked because of their very obviousness --
the assumption involved is assented to without our realizing that it is
an assumption. But it is very important to realize the use of principles
of inference, if a correct theory of knowledge is to be obtained; for our
knowledge of them raises interesting and difficult questions.
In all our knowledge of general principles, what actually happens is
that first of all we realize some particular application of the principle,
and then we realize the particularity is irrelevant, and that there is
a generality which may equally truly be affirmed. This is of course familiar
in such matters as teaching arithmetic: 'two and two are four' is first
learnt in the case of some particular pair of couples, and then in some
other particular case, and so on, until at last it becomes possible to
see that it is true of any pair of couples. The same thing happens
with logical principles. Suppose two men are discussing what day of the
month it is. One of them says, 'At least you will admit that if
yesterday was the 15th to-day must the 16th.' 'Yes', says the other, 'I
admit that.' 'And you know', the first continues, 'that yesterday was the
15th, because you dined with Jones, and your diary will tell you that was
on the 15th.' 'Yes', says the second; 'therefore to-day is the 16th'
Now such an argument is not hard to follow; and if it is granted that
its premisses are true in fact, no one deny that the conclusion must also
be true. But it depends for its truth upon an instance of a general logical
principle. The logical principle is as follows: 'Suppose it known that
if this is true, then that is true. Suppose it also known that this
is true, then it follows that that is true.' When it is the case
that if this is true, that is true, we shall say that this 'implies' that,
that that 'follows from' this. Thus our principle states that if this implies
that, and this is true, then that is true. In other words, 'anything implied
by a proposition is true', or 'whatever follows from a true proposition
is true'.
This principle is really involved -- at least, concrete instances of
it are involved -- in all demonstrations. Whenever one thing which we believe
is used to prove something else, which we consequently believe, this principle
is relevant. If any one asks: 'Why should I accept the results of valid
arguments based on true premisses?' we can only answer by appealing to
our principle. In fact, the truth of the principle is impossible to doubt,
and its obviousness is so great that at first sight it seems almost trivial.
Such principles, however, are not trivial to the philosopher, for they
show that we may have indubitable knowledge which is in no way derived
from objects of sense.
The above principle is merely one of a certain number of self-evident
logical principles. Some at least of these principles must be granted before
any argument or proof becomes possible. When some of them have been granted,
others can be proved, though these others, so long as they are simple,
are just as obvious as the principles taken for granted. For no very good
reason, three of these principles have been singled out by tradition under
the name of 'Laws of Thought'.
They are as follows:
(1) The law of identity: 'Whatever is, is.'
(2) The law of contradiction: 'Nothing can both be and not be.'
(3) The law of excluded middle: 'Everything must either be or
not be.'
These three laws are samples of self-evident logical principles, but
are not really more fundamental or more self-evident than various other
similar principles: for instance. the one we considered just now, which
states that what follows from a true premiss is true. The name 'laws of
thought' is also misleading, for what is important is not the fact that
we think in accordance with these laws, but the fact that things behave
in accordance with them; in other words, the fact that when we think in
accordance with them we think truly. But this is a large question,
to which we return at a later stage.
In addition to the logical principles which enable us to prove from
a given premiss that something is certainly true, there are other
logical principles which enable us to prove, from a given premiss, that
there is a greater or less probability that something is true. An example
of such principles -- perhaps the most important example is the inductive
principle, which we considered in the preceding chapter.
One of the great historic controversies in philosophy is the controversy
between the two schools called respectively 'empiricists' and 'rationalists'.
The empiricists -- who are best represented by the British philosophers,
Locke, Berkeley, and Hume -- maintained that all our knowledge is derived
from experience; the rationalists -- who are represented by the continental
philosophers of the seventeenth century, especially Descartes and Leibniz
-- maintained that, in addition to what we know by experience, there are
certain 'innate ideas' and 'innate principles', which we know independently
of experience. It has now become possible to decide with some confidence
as to the truth or falsehood of these opposing schools. It must be admitted,
for the reasons already stated, that logical principles are known to us,
and cannot be themselves proved by experience, since all proof presupposes
them. In this, therefore, which was the most important point of the controversy,
the rationalists were in the right.
On the other hand, even that part of our knowledge which is logically
independent of experience (in the sense that experience cannot prove it)
is yet elicited and caused by experience. It is on occasion of particular
experiences that we become aware of the general laws which their connexions
exemplify. It would certainly be absurd to suppose that there are innate
principles in the sense that babies are born with a knowledge of everything
which men know and which cannot be deduced from what is experienced. For
this reason, the word 'innate' would not now be employed to describe our
knowledge of logical principles. The phrase 'a priori' is less objectionable,
and is more usual in modern writers. Thus, while admitting that all knowledge
is elicited and caused by experience, we shall nevertheless hold that some
knowledge is a priori, in the sense that the experience which makes
us think of it does not suffice to prove it, but merely so directs our
attention that we see its truth without requiring any proof from experience.
There is another point of great importance, in which the empiricists
were in the right as against the rationalists. Nothing can be known to
exist except by the help of experience. That is to say, if we wish
to prove that something of which we have no direct experience exists, we
must have among our premisses the existence of one or more things of which
we have direct experience. Our belief that the Emperor of China exists,
for example, rests upon testimony, and testimony consists, in the last
analysis, of sense-data seen or heard in reading or being spoken to. Rationalists
believed that, from general consideration as to what must be, they
could deduce the existence of this or that in the actual world. In this
belief they seem to have been mistaken. All the knowledge that we can acquire
a priori concerning existence seems to be hypothetical: it tells
us that if one thing exists, another must exist, or, more generally,
that if one proposition is true another must be true. This is exemplified
by principles we have already dealt with, such as 'if this is true,
and this implies that, then that is true', of 'ifthis and that have
been repeatedly found connected, they will probably be connected in the
next instance in which one of them is found'. Thus the scope and power
of a priori principles is strictly limited. All knowledge that something
exists must be in part dependent on experience. When anything is known
immediately, its existence is known by experience alone; when anything
is proved to exist, without being known immediately, both experience and
a priori principles must be required in the proof. Knowledge is
called empirical when it rests wholly or partly upon experience.
Thus all knowledge which asserts existence is empirical, and the only a
priori knowledge concerning existence is hypothetical, giving connexions
among things that exist or may exist, but not giving actual existence.
A priori knowledge is not all of the logical kind we hitherto
considering. Perhaps the most important example of non-logical a priori
knowledge is knowledge as to ethical value. I am not speaking of judgements
as to what is useful or as to what is virtuous, for such judgements do
require empirical premisses; I am speaking of judgements as to the intrinsic
desirability of things. If something is useful, it must be useful because
it secures some end, the end must, if we have gone far enough, be valuable
on its own account, and not merely because it is useful for some further
end. Thus all judgements as to what is useful depend upon judgements as
to what has value on its own account.
We judge, for example, that happiness is more desirable than misery,
knowledge than ignorance, goodwill than hatred, and so on. Such judgements
must, in part at least, be immediate and a priori. Like our previous
a priori judgements, they may be elicited by experience,
and indeed they must be; for it seems not possible to judge whether anything
is intrinsically valuable unless we have experienced something of the same
kind. But it is fairly obvious that they cannot be proved by experience;
for the fact that a thing exists or does not exist cannot prove either
that it is good that it should exist or that it is bad. The pursuit of
this subject belongs to ethics, where the impossibility of deducing what
ought to be from what is has to established. In the present connexion,
it is only important to realize that knowledge as to what is intrinsically
of value is a priori in the same sense in which logic is a priori,
namely in the sense that the truth of such knowledge can be neither proved
nor disproved by experience.
All pure mathematics is a priori, like logic. This strenuously
denied by the empirical philosophers, who maintained that experience was
as much the source of our knowledge of arithmetic as of our knowledge of
geography. They maintained that by the repeated experience of seeing two
things and two other things, and finding that altogether they made four
things, we were led by induction to the conclusion that two things and
two other things would always make four things altogether. If, however,
this were the source of our knowledge that two and two are four we should
proceed differently, in persuading ourselves of its truth, from the way
in which we do actually proceed. In fact, a certain number of instances
are needed to make us think of two abstractly, rather than of two coins
or two books or two people, or two of any other specified kind. But as
soon as we are able to divest our thoughts of irrelevant particularity,
we become able to see the general principle that two and two are
four; any one instance is seen to be typical and the examination
of other instances becomes unnecessary.*
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* Cf. A. N. Whitehead, Introduction to Mathematics (Home University
Library).
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The same thing is exemplified in geometry. If we want to prove some
property of all triangles, we draw some one triangle and reason
about it; but we can avoid making use of any property which it does not
share with all other triangles, and thus, from our particular case, we
obtain a general result. We do not, in fact, feel our certainty that two
and two are four increased by fresh instances, because, as soon as we have
seen the truth of this proposition, our certainty becomes so great as to
be incapable of growing greater. Moreover, we feel some quality of necessity
about the proposition 'two and two are four', which is absent from even
the best attested empirical generalizations. Such generalizations always
remain mere facts: we feel that there might be a world in which they were
false, though in the actual world they happen to be true. In any possible
world, on the contrary, we feel that two and two would be four: this is
not a mere fact, but a necessity to which everything actual and possible
must conform.
The case may be made clearer by considering a genuinely empirical generalization,
such as 'All men are mortal.' It is plain that we believe this proposition,
in the first place, because there is no known instance of men living beyond
a certain age, and in the second place because there seem to be physiological
grounds for thinking that an organism such as a man's body must sooner
or later wear out. Neglecting the second ground, and considering merely
our experience of men's mortality, it is plain that we should not be content
with one quite clearly understood instance of a man dying, whereas, in
the case of 'two and two are four', one instance does suffice, when carefully
considered, to persuade us that the same must happen in any other instance.
Also we can be forced to admit, on reflection, that there may be some doubt,
however slight, as to whether all men are mortal. This may be made
plain by the attempt to imagine two different worlds, in one of which there
are men who are not mortal, while in the other two and two make five. When
Swift invites us to consider the race of Struldbugs who never die, we are
able to acquiesce in imagination. But a world where two and two make five
seems quite on a different level. We feel that such a world, if there were
one, would upset the whole fabric of our knowledge and reduce us to utter
doubt.
The fact is that, in simple mathematical judgements such as 'two and
two are four', and also in many judgements of logic, we can know the general
proposition without inferring it from instances, although some instance
is usually necessary to make clear to us what the general proposition means.
This is why there is real utility in the process of deduction, which
goes from the general to the general, or from the general to the particular,
as well as in the process of induction, which goes from the particular
to the particular, or from the particular to the general. It is an old
debate among philosophers whether deduction ever gives new knowledge.
We can now see that in certain cases, least, it does do so. If we already
know that two and two always make four, and we know that Brown and Jones
are two, and so are Robinson and Smith, we can deduce that Brown and Jones
and Robinson and Smith are four. This is new knowledge, not contained in
our premisses, because the general proposition, 'two and two are four,
never told us there were such people as Brown and Jones and Robinson and
Smith, and the particular premisses do not tell us that there were four
of them, whereas the particular proposition deduced does tell us both these
things.
But the newness of the knowledge is much less certain if we take the
stock instance of deduction that is always given in books on logic, namely,
'All men are mortal; Socrates is a man, therefore Socrates is mortal.'
In this case, what we really know beyond reasonable doubt is that certain
men, A, B, C, were mortal, since, in fact, they have died. If Socrates
is one of these men, it is foolish to go the roundabout way through 'all
men are mortal' to arrive at the conclusion that probably Socrates
is mortal. If Socrates is not one of the men on whom our induction is based,
we shall still do better to argue straight from our A, B, C, to Socrates,
than to go round by the general proposition, 'all men are mortal'. For
the probability that Socrates is mortal is greater, on our data, than the
probability that all men are mortal. (This is obvious, because if all men
are mortal, so is Socrates; but if Socrates is mortal, it does not follow
that all men are mortal.) Hence we shall reach the conclusion that Socrates
is mortal with a greater approach to certainty if we make our argument
purely inductive than if we go by way of 'all men are mortal' and then
use deduction.
This illustrates the difference between general propositions known a
priori, such as 'two and two are four', and empirical generalizations
such as 'all men are mortal'. In regard to the former, deduction is the
right mode of argument, whereas in regard to the latter, induction is always
theoretically preferable, and warrants a greater confidence in the truth
of our conclusion, because all empirical generalizations are more uncertain
than the instances of them.
We have now seen that there are propositions known a priori,
and that among them are the propositions of logic and pure mathematics,
as well as the fundamental propositions of ethics. The question which must
next occupy us is this: How is it possible that there should be such knowledge?
And more particularly, how can there be knowledge of general propositions
in cases where we have not examined all the instances, and indeed never
can examine them all, because their number is infinite? These questions,
which were first brought prominently forward by the German philosopher
Kant (1724-1804), are very difficult, and historically very important.
