CONTENTS INTRODUCTION A—The Problem of Left and Right 1—ODDS AND EVENS 2—THE LEFT HAND OF THE ELECTRON 3—SEEING DOUBLE 4—THE 3-D MOLECULE 5—THE ASYMMETRY OF LD7E B—The Problem of Oceans 6—THE THALASSOGENS 7—HOT WATER 8—COLD WATER C—The Problem of Numbers and Lines 9—PRIME QUALITY 10—EUCLID'S FIFTH 11—THE PLANE TRUTH D—The Problem of the Platypus 12—HOLES IN THE HEAD Vlll CONTENTS E—The Problem of History 13—THE EUREKA PHENOMENON 159 14—POMPEY AND CIRCUMSTANCE 172 15—BILL AND I 186 F—The Problem of Population 16—STOP! 201 17 BUT HOW? 214 THE LEFT HAND OF THE ELECTRON . A—The Problem of Left and Right 1 ODDS AND EVENS I have just gone through a rather unsettling experience. Ordinarily it is not very difficult to think up a topic for these chapters. Some interesting point will occur to me, which will quickly lead my mind to a particular line of development, beginning in one place and ending in another. Then, I get started. Today, however, having determined to deal with asymmetry (in more than one chapter, very likely) and to end with life and antilife, I found that two possible starting points occurred to me. Ordinarily, when this happens, one starting point seems so much superior to me that I choose it over the other with a minimum of hesitation. This time, however, the question was whether to start with even numbers or with double refraction, and the arguments raging within my head for each case were so equally balanced that I couldn't make up my mind. For two hours I sat at my desk, pon dering first one and then the other and growing steadily un- happier. Indeed, I became uncomfortably aware of the resemblance of my case to that of "Buridan's ass." The reference, here, is to a fourteenth-century French philoso pher, Jean Buridan, who was supposed to have stated the follow ing: "If a hungry ass were placed exactly between two haystacks in every respect equal, it would starve to death, because there would be no motive why it should go to one rather than to the other." Actually, of course, there's a fallacy here, since the statement does not recognize the existence of the random factor. The ass, no logician, is bound to turn his head randomly so that one hay stack comes into better view, shuffle his feet randomly so that one 4 THE PROBLEM OF LEFT AND RIGHT haystack comes to be closer; and he would end at the haystack better seen or more closely approached. Which haystack that would be, one could not tell in advance. If one had a thousand asses placed exactly between a thousand sets of haystack pairs, one could confidently expect that about half would turn to the right and half to the left. The individual ass, however, would remain unpredictable. In the same way, it is impossible to predict whether an honest coin, honestly thrown, will come down heads or tails in any one particular case, but we can confidently predict that a very large number of coins tossed simultaneously (or one coin tossed a very large number of times) will show heads just about half the time and tails the other half. And so it happens that although the chance of the fall of heads or tails is exactly even, just fifty-fifty, you can nevertheless call upon the aid of randomness to help you make a decision by tossing one coin once. At this point, I snapped out of my reverie and did what a lesser mind would have done two hours before. I tossed a coin. Shall we start with even numbers, Gentle Readers? I suspect that some prehistoric philosopher must have decided that there were two kinds of numbers: peaceful ones and warlike ones. The peaceful numbers were those of the type 2, 4, 6, 8, while the numbers in between were warlike. If there were 8 stone axes and two individuals possessing equal claim, it would be easy to hand 4 to each and make peace. If there were 7, however, you would have to give 3 to each and then either toss away the 1 remaining (a clear loss of a valuable object) or let the two disputants fight over it. The fact that the original property that marked out the signifi cance of what we now call even and odd numbers was something like this is indicated by the very names we give them. The word "even" means fundamentally, "flat, smooth, without unusual depressions or elevations." We use the word in this sense ODDS AND EVENS 5 when we say that a person says something "in an even tone of voice." An even number of identical coins, for instance, can be divided into two piles of exactly the same height. The two piles are even in height and hence the number is called even. The even number is the one with the property of "equal shares." "Odd," on the other hand, is from an old Norse word meaning "point" or "tip." If an odd number of coins is divided into two piles as nearly equal as possible, one pile is higher by one coin and therefore rears a point or tip into the air, as compared with the other. The odd number possesses the property of "unequal shares," and it is no accident that the expression "odds" in betting implies the wagering of unequal amounts of money by the two participants. Since even numbers possess the property of equal shares, they were said to have "parity," from a Latin word meaning "equal." Originally, this word applied (as logic demanded) to even num bers only, but mathematicians found it convenient to say that if two numbers were both even or both odd, they were, in each case "of the same parity." An even number and an odd number, grouped together, were "of different parity." To see the convenience of this convention, consider the fol lowing: If two even numbers are added, the sum is invariably even. (This can be expressed mathematically by saying that two even numbers can be expressed as zm and zn where m and n are whole numbers and that the sum, zm + zn, is still clearly divisible by two. However, we are friends, you and I, and I'm sure we can dis pense with mathematical reasoning and that I will find you willing to accept my word of honor as a gentleman in such matters. Be sides, you are welcome to search for two even numbers whose sum isn't even.) If two odd numbers are added, the sum is also invariably even. If an odd number and an even number are added, however, the sum is invariably odd.