A Tangled Tale by Lewis Carroll (best novels for beginners TXT) π
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In the late 19th century, Lewis Carrollβbetter known these days as the author of Aliceβs Adventures in Wonderlandβwas also an established mathematician who had published many books and papers in the fields of algebra and logic. His mathematical interest extended to the setting of puzzles for popular consumption. The stories collected here cover varied subjects including the cataloguing of paintings, the number of times trains will pass each other on a circular track, the most efficient way to rent individual rooms on a square, and many more. They were published originally in The Monthly Packet magazine and then collected with some additional commentary into a book originally published in 1885. Included along with the stories is a full appendix with Carrollβs answers, and his often acerbic commentary on the answers submitted to him at the time.
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- Author: Lewis Carroll
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Of the 33 answers for which the working is given, 10 are wrong; 11 half-wrong and half-right; 3 right, except that they cherish the delusion that it was Clara who travelled in the easterly trainβ βa point which the data do not enable us to settle; and 9 wholly right.
The 10 wrong answers are from Bo-Peep, Financier, I. W. T., Kate B., M. A. H., Q. Y. Z., Seagull, Thistledown, Tom-Quad, and an unsigned one. Bo-Peep rightly says that the easterly traveller met all trains which started during the 3 hours of her trip, as well as all which started during the previous 2 hours, i.e., all which started at the commencements of 20 periods of 15 minutes each; and she is right in striking out the one she met at the moment of starting; but wrong in striking out the last train, for she did not meet this at the terminus, but 15 minutes before she got there. She makes the same mistake in (2). Financier thinks that any train, met for the second time, is not to be counted. I. W. T. finds, by a process which is not stated, that the travellers met at the end of 71 minutes and 26Β½ seconds. Kate B. thinks the trains which are met on starting and on arriving are never to be counted, even when met elsewhere. Q. Y. Z. tries a rather complex algebraical solution, and succeeds in finding the time of meeting correctly: all else is wrong. Seagull seems to think that, in (1), the easterly train stood still for 3 hours; and says that, in (2), the travellers met at the end of 71 minutes 40 seconds. Thistledown nobly confesses to having tried no calculation, but merely having drawn a picture of the railway and counted the trains; in (1), she counts wrong; in (2) she makes them meet in 75 minutes. Tom-Quad omits (1): in (2) he makes Clara count the train she met on her arrival. The unsigned one is also unintelligible; it states that the travellers go βΒΉβββth more than the total distance to be traversedβ! The βClaraβ theory, already referred to, is adopted by 5 of these, viz., Bo-Peep, Financier, Kate B., Tom-Quad, and the nameless writer.
The 11 half-right answers are from Bog-Oak, Bridget, Castor, Cheshire Cat, G. E. B., Guy, Mary, M. A. H., Old Maid, R. W., and Vendredi. All these adopt the βClaraβ theory. Castor omits (1). Vendredi gets (1) right, but in (2) makes the same mistake as Bo-Peep. I notice in your solution a marvellous proportion-sum:β ββ300 miles: 2 hours :: one mile: 24 seconds.β May I venture to advise your acquiring, as soon as possible, an utter disbelief in the possibility of a ratio existing between miles and hours? Do not be disheartened by your two friendsβ sarcastic remarks on your βroundabout ways.β Their short method, of adding 12 and 8, has the slight disadvantage of bringing the answer wrong: even a βroundaboutβ method is better than that! M. A. H., in (2), makes the travellers count βoneβ after they met, not when they met. Cheshire Cat and Old Maid get β20β as answer for (1), by forgetting to strike out the train met on arrival. The others all get β18β in various ways. Bog-Oak, Guy, and R. W. divide the trains which the westerly traveller has to meet into 2 sets, viz., those already on the line, which they (rightly) make β11,β and those which started during her 2 hoursβ journey (exclusive of train met on arrival), which they (wrongly) make β7β; and they make a similar mistake with the easterly train. Bridget (rightly) says that the westerly traveller met a train every 6 minutes for 2 hours, but (wrongly) makes the number β20β; it should be β21.β G. E. B. adopts Bo-Peepβs method, but (wrongly) strikes out (for the easterly traveller) the train which started at the commencement of the previous 2 hours. Mary thinks a train, met on arrival, must not be counted, even when met on a previous occasion.
The 3, who are wholly right but for the unfortunate βClaraβ theory, are F. Lee, G. S. C., and X. A. B.
And now βdescend, ye classic Ten!β who have solved the whole problem. Your names are Aix-les-Bains, Algernon Bray (thanks for a friendly remark, which comes with a heart-warmth that not even the Atlantic could chill), Arvon, Bradshaw of the Future, Fifee, H. L. R., J. L. O., Omega, S. S. G., and Waiting for the Train. Several of these have put Clara, provisionally, into the easterly train: but they seem to have understood that the data do not decide that point.
Class List.
Aix-les-Bains.
Algernon Bray.
Bradshaw of the Future.
Fifee.
H. L. R.
Omega.
S. S. G.
Waiting for the train.
Arvon.
J. L. O.
F. Lee.
G. S. C.
X. A. B.
Answers to Knot IVProblem.β ββThere are 5 sacks, of which Nos. 1, 2, weigh 12 lbs.; Nos. 2, 3, 13Β½ lbs.; Nos. 3, 4, 11Β½ lbs.; Nos. 4, 5, 8 lbs.; Nos. 1, 3, 5, 16 lbs. Required the weight of each sack.β
Answer.β ββ5Β½, 6Β½, 7, 4Β½, 3Β½.β
The sum of all the weighings, 61 lbs., includes sack No. 3 thrice and each other twice. Deducting twice the sum of the 1st and 4th weighings, we get 21 lbs. for thrice No. 3, i.e., 7 lbs. for No. 3. Hence, the 2nd and 3rd weighings give 6Β½ lbs., 4Β½ lbs. for Nos. 2, 4; and hence again, the 1st and 4th weighings give 5Β½ lbs., 3Β½ lbs., for Nos. 1, 5.
Ninety-seven
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