The Art of Doing Science and Engineering: Learning to Learn


Artificial Intelligence—II



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Richard R. Hamming - Art of Doing Science and Engineering Learning to Learn-GORDON AND BREACH SCIENCE PUBLISHERS (1997 2005)
7
Artificial Intelligence—II
In this book we are more concerned with the aid computers can give us in the intellectual areas than in the more mechanical areas, for example, manufacturing. In the mechanical area computers have enabled us to make better, preferable, and cheaper products, and in some areas they have been essential, such as spaceflights to the moon which could hardly be done without the aid of computers. AI can be viewed as complementary to robotics—it is mainly concerned with the intellectual side of the human rather than the physical side, though obviously both are closely connected inmost projects.
Let us start again and return to the elements of machines and humans. Both are built out of atoms and molecules. Both have organized basic parts the machine has, among other things, two state devices both for storage and for gates, while humans are built of cells. Both have larger structures, arithmetic units, storage,
control, and IO for machines, and humans have bones, muscles, organs, blood vessels, nervous system, etc.
But let us note somethings carefully. From large organizations new effects can arise. For example we believe there is no friction between molecules, but most large structures show this effect—it is an effect which arises from the organization of smaller parts which do not show the effect.
We should also note often when we engineer some device to do the same as Nature does, we do it differently. For example, we have airplanes which, generally, use fixed wings (or rotors, while birds mainly flap their wings. But we also do a different thing-we fly much higher and certainly much faster than birds can. Nature never invented the wheel, though we use wheels in many, many ways. Our nervous system is comparatively slow and signals with a velocity of around a few hundred meters per second, while computers signal at around 186,000 miles per second.
A third thing to note, before continuing with what AI has accomplished, is the human brain has many,
many components in the form of nerves interconnected with each other. We want to have the definition of
“thinking” to be something the human brain can do. With past failures to program a machine to think, the excuse is often given that the machine was not big enough, fast enough, etc. Some people conclude from this if we build a big enough machine then automatically it will be able to think Remember, it seems to be more the problem of writing the program than it is building a machine, unless you believe, as with friction,
enough small parts will produce anew effect—thinking from nonthinking parts. Perhaps that is all thinking really is Perhaps it is not a separate thing, it is just an artifact of largeness. One cannot flatly deny this as we have to admit we do not know what thinking really is.
Returning again to the past accomplishments of AI. There was a geometry proving routine which proved theorems in classical school geometry much as you did when you took such a course. The famous theorem
“If two sides of a triangle are equal then the base angles are also equal was given to the program,
Figure I. You would probably bisect the top angle, and goon to prove the two parts are congruent triangles, hence corresponding angles are equal. A few of you might bisect the third side, and draw the line to the opposite angle, again getting two congruent triangles. The proof the machine produced used no

constructions but compared triangle ABC with triangle CBA, and then proved the selfcongruence, hence equal angles.
Anyone looking at that proof will admit it is elegant, correct, and surprising. Indeed, the people who wrote the geometry proving program did not know it, nor was it widely known, though it is a footnote in my copy of Euclid. One is inclined to say the program showed originality. The result was the program apparently showed novelty not put into the program by the designers the program showed “creativity”;
and all those sorts of good things.
A bit of thinking will show the programmers gave the instructions in the program to first try to prove the given theorem, and then when stuck try drawing auxiliary lines. If that had been the way you were taught to do geometry then more of you would have found the above elegant proof. So, in a sense, it was programmed in. But, as I said before, what was the course in geometry you were taught except trying to load a program into you Inefficiently, to be sure. That is the way with humans, but with machines it is clean, you just put the program in once and for all, and you do not need to endlessly repeat and repeat, and still have things forgotten!
Did Samuel’s checker playing program show originality when it made surprising moves and defeated the
State Checker Champion If not, can you show you have originality Just what is the test you will use to separate you from a computer program?
One can claim the checker playing program learned and the geometry theorem proving program showed creativity, “originality”, or whatever you care to call it. They are but a pair of examples of many similar programs which have been written. The difficulty in convincing you the programs have the claimed properties is simply once a program exists to do something you immediately regard what is done as involving nothing other than a rote routine, even when random numbers obtained from the real world are included in the program. Thus we have the paradox the existence of the program automatically turns you against believing it is other than a rote process. With this attitude, of course, the machine can never demonstrate it is more than a machine in the classical sense, there is noway it can demonstrate, for example, it can think. The hard AI people claim man is only a machine and nothing else, and hence anything humans can do in the intellectual area can be copied by a machine. As noted above, most readers, when shown some result from a machine automatically believe it cannot be the human trait that was claimed. Two questions immediately arise. One, is this fair Two, how sure are you, you are not just a collection of molecules in a radiant energy field and hence the whole world is merely molecule bouncing against molecule If you believe in other (unnamed, mysterious) forces how do they affect the motion of the molecules, and if they cannot affect the motion then how can they affect the real world Is physics complete in its description of the universe, or are there unknown (to them) forces It is a hard choice to have to make. Aside At the

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