Amusements in Mathematics - The Original Classic Edition. Dudeney Henry

Чтение книги онлайн.

Читать онлайн книгу Amusements in Mathematics - The Original Classic Edition - Dudeney Henry страница 4

Amusements in Mathematics - The Original Classic Edition - Dudeney Henry

Скачать книгу

silver coins in Christmas-boxes, giving every person the same amount, and it cost him exactly PS1, 10s. 1d. Can you tell just how many persons received the present, and how he could have managed the distribution? That odd penny looks queer, but it is all right.

       24.--A SHOPPING PERPLEXITY.

       Two ladies went into a shop where, through some curious eccentricity, no change was given, and made purchases amounting together to less than five shillings. "Do you know," said one lady, "I find I shall require no fewer than six current coins of the realm to pay for what I have bought." The other lady considered a moment, and then exclaimed: "By a peculiar coincidence, I am exactly in the same dilemma." "Then we will pay the two bills together." But, to their astonishment, they still required six coins. What is the smallest possible amount of their purchases--both different?

       25.--CHINESE MONEY.

       The Chinese are a curious people, and have strange inverted ways of doing things. It is said that they use a saw with an upward pres-sure instead of a downward one, that they plane a deal board by pulling the tool toward them instead of pushing it, and that in building a house they first construct the roof and, having raised that into position, proceed to work downwards. In money the currency

       of the country consists of taels of fluctuating value. The tael became thinner and thinner until 2,000 of them piled together made

       less than three inches in height. The common cash consists of brass coins of varying thicknesses, with a round, square, or triangular

       6

       hole in the centre, as in our illustration.

       These are strung on wires like buttons. Supposing that eleven coins with round holes are worth fifteen ching-changs, that eleven with square holes are worth sixteen ching-changs, and that eleven with triangular holes are worth seventeen ching-changs, how can a Chinaman give me change for half a crown, using no coins other than the three mentioned? A ching-chang is worth exactly twopence and four-fifteenths of a ching-chang.

       26.--THE JUNIOR CLERK'S PUZZLE.

       Two youths, bearing the pleasant names of Moggs and Snoggs, were employed as junior clerks by a merchant in Mincing Lane. They

       were both engaged at the same salary--that is, commencing at the rate of PS50 a year, payable half-yearly. Moggs had a yearly rise of

       PS10, and Snoggs was offered the same, only he asked, for reasons that do not concern our puzzle, that he might take his rise at PS2,

       10s. half-yearly, to which his employer (not, perhaps, unnaturally!) had no objection.

       Now we come to the real point of the puzzle. Moggs put regularly into the Post Office Savings Bank a certain proportion of his sal-ary, while Snoggs saved twice as great a proportion of his, and at the end of five years they had together saved PS268, 15s. How much had each saved? The question of interest can be ignored.

       27.--GIVING CHANGE.

       Every one is familiar with the difficulties that frequently arise over the giving of change, and how the assistance of a third person with a few coins in his pocket will sometimes help us to set the matter right. Here is an example. An Englishman went into a shop in New York and bought goods at a cost of thirty-four cents. The only money he had was a dollar, a three-cent piece, and a two-cent piece. The tradesman had only a half-dollar and a quarter-dollar. But another customer happened to be present, and when asked to help produced two dimes, a five-cent piece, a two-cent piece, and a one-cent piece. How did the tradesman manage to give change? For the benefit of those readers who are not familiar with the American coinage, it is only necessary to say that a dollar is a hundred cents and a dime ten cents. A puzzle of this kind should rarely cause any difficulty if attacked in a proper manner.

       28.--DEFECTIVE OBSERVATION.

       Our observation of little things is frequently defective, and our memories very liable to lapse. A certain judge recently remarked in a case that he had no recollection whatever of putting the wedding-ring on his wife's finger. Can you correctly answer these questions without having the coins in sight? On which side of a penny is the date given? Some people are so unobservant that, although they are handling the coin nearly every day of their lives, they are at a loss to answer this simple question. If I lay a penny flat on the table, how many other pennies can I place around it, every one also lying flat on the table, so that they all touch the first one? The geometrician will, of course, give the answer at once, and not need to make any experiment. Pg 5He will also know that, since all circles are similar, the same answer will necessarily apply to any coin. The next question is a most interesting one to ask a company,

       each person writing down his answer on a slip of paper, so that no one shall be helped by the answers of others. What is the greatest number of threepenny-pieces that may be laid flat on the surface of a half-crown, so that no piece lies on another or overlaps the surface of the half-crown? It is amazing what a variety of different answers one gets to this question. Very few people will be found to give the correct number. Of course the answer must be given without looking at the coins.

       29.--THE BROKEN COINS.

       A man had three coins--a sovereign, a shilling, and a penny--and he found that exactly the same fraction of each coin had been broken away. Now, assuming that the original intrinsic value of these coins was the same as their nominal value--that is, that the sovereign was worth a pound, the shilling worth a shilling, and the penny worth a penny--what proportion of each coin has been lost if the value of the three remaining fragments is exactly one pound?

       30.--TWO QUESTIONS IN PROBABILITIES.

       There is perhaps no class of puzzle over which people so frequently blunder as that which involves what is called the theory of probabilities. I will give two simple examples of the sort of puzzle I mean. They are really quite easy, and yet many persons are tripped up by them. A friend recently produced five pennies and said to me: "In throwing these five pennies at the same time, what are the chances that at least four of the coins will turn up either all heads or all tails?" His own solution was quite wrong, but the correct answer ought not to be hard to discover. Another person got a wrong answer to the following little puzzle which I heard

       him propound: "A man placed three sovereigns and one shilling in a bag. How much should be paid for permission to draw one coin

       7

       from it?" It is, of course, understood that you are as likely to draw any one of the four coins as another.

       31.--DOMESTIC ECONOMY.

       Young Mrs. Perkins, of Putney, writes to me as follows: "I should be very glad if you could give me the answer to a little sum that has been worrying me a good deal lately. Here it is: We have only been married a short time, and now, at the end of two years from the time when we set up housekeeping, my husband tells me that he finds we have spent a third of his yearly income in rent, rates, and taxes, one-half in domestic expenses, and one-ninth in other ways. He has a balance of PS190 remaining in the bank. I know this last, because he accidentally left out his pass-book the other day, and I peeped into it. Don't you think that a husband ought to give his wife his entire confidence in his money matters? Well, I do; and--will you believe it?--he has never told me what his income re-ally is, and I want, very naturally, to find out. Can you tell me what it is from the figures I have given you?"

       Yes; the answer can certainly be given from the figures contained in Mrs. Perkins's letter. And my readers, if not warned, will be practically unanimous in declaring the income to be--something absurdly in excess of the correct answer!

       32.--THE EXCURSION TICKET PUZZLE.

       When

Скачать книгу