Download Differential Geometry: Geometry in Mathematical Physics and by Greene R., Yau S.-T. (eds.) PDF
By Greene R., Yau S.-T. (eds.)
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Additional info for Differential Geometry: Geometry in Mathematical Physics and Related Topics, Part 2
Sample text
My most extreme example is a crank, not a trisector, who made the following discovery. Take the six permutations of 1, 2, 3; arrange them in increasing order; and write the differences between successive terms: 123 132 9 213 81 231 18 312 81 321 9. 28 2. Characteristics of Trisectors The sums of the two lines are 1,332 and 198. ) in groups of three and add that magic constant 198: 314 198 159 198 265 198 512 357 463. We will ignore the numerological significance of 512 = 29and 357, with odd digits in increasing order.
125 exactly: Mr. Smith's method of proving that every circle is 3,i diameters is to assume that it is so,—"if you dislike the term datum, then, by hypothesis, let 8 circumferences be exactly equal to 25 diameters,"—and then to show that every other supposition is thereby made absurd. " (Budget, vol. 2, p. ) Wow! Using the same reasoning, I must be a billionaire because, if I make that assumption, then any other conclusion about my net worth is made absurd. Trisectors are great letter writers. Mostly, they correspond eagerly with any mathematician they can and are hard to get rid of.
This is why: all who are fit to read the refutation are satisfied already, and can, if they please, detect the paradoxer for themselves. Those who are not fit to do this would not know the difference between the true answer and the new capitals and diagrams on which the delighted paradoxer would declare that he had crumbled the philosophers, and not they him.... They call mankind to witness that science will not defend itself, though publicly attacked in terms which might sting a pickpocket into standing up for his character; science, in return, allows mankind to witness or not, at pleasure, that is does not defend itself, and yet receives no injury from centuries of assault.