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1. Beyond that, all I can do is offer some advice about structuring a proof by contradiction.^[1]
2. The tricky thing is that it is hard to test statements within a proof by contradiction for plausibility.^[1]
3. To avoid this issue, it's often best to try to build up as much of the framework for the proof as possible outside of the actual proof by contradiction.^[1]
4. If you make the actual proof by contradiction as short and simple as possible, then it will help you avoid mistakes and help other people check your work.^[1]
5. Certain types of proof come up again and again in all areas of mathematics, one of which is proof by contradiction.^[2]
6. You may like to try this challenge which involves a slightly different proof by contradiction to prove the same result.^[2]
7. This would have been much quicker than going through the whole proof by contradiction.^[2]
8. This is a basic rule of logic, and proof by contradiction depends upon it.^[3]
9. It is that last condition of truth and falsity that is exploited, powerfully and universally, by proof by contradiction.^[3]
10. That alerts the reader that you are using proof by contradiction and will plug away at the proof until it collapses logically.^[3]
11. You may well benefit from rereading it several times, but once you do, you should feel more confident in your understanding of proof by contradiction.^[3]
12. Another method of proof that is frequently used in mathematics is a proof by contradiction.^[4]
13. So if we want to prove a statement \(X\) using a proof by contradiction, we assume that \(\urcorner X\) is true and show that this leads to a contradiction.^[4]
14. When we try to prove the conditional statement, “If \(P\) then \(Q\)” using a proof by contradiction, we must assume that \(P \to Q\) is false and show that this leads to a contradiction.^[4]
15. To begin a proof by contradiction for this statement, we need to assume the negation of the statement.^[4]
16. In a proof by contradiction, it is shown that the denial of the statement being proved results in such a contradiction.^[5]
17. This fact is used in proof by contradiction.^[5]
18. An existence proof by contradiction assumes that some object doesn't exist, and then proves that this would lead to a contradiction; thus, such an object must exist.^[5]
19. Proof by contradiction also depends on the law of the excluded middle, also first formulated by Aristotle.^[5]
20. The steps taken for a proof by contradiction (also called indirect proof) are: Assume the opposite of your conclusion.^[6]
21. An indirect proof establishes that the opposite conclusion is not consistent with the premise and that, therefore, the original conclusion must be true.^[6]
22. Proof by contradiction is used frequently in classical mathematics.^[7]
23. The approach of proof by contradiction is simple yet its consequence and result are remarkable.^[8]
24. Just a word of advice, use the proof by contradiction if the methods of direct and contrapositive proofs do seem to fail.^[8]
25. Having said this, I should note that it is considered bad style to write a proof by contradiction when you can give a direct proof.^[9]
26. In those situations, the proof by contradiction often looks awkward.^[9]
27. In some cases, proof by contradiction is used as part of a larger proof --- for instance, to eliminate certain possibilities.^[9]
28. This is of course the classic proof by contradiction, and one can even give a kind of quasi-proof that it must use contradiction.^[10]
29. At first sight, this looks like a direct argument rather than a proof by contradiction: we used the hypothesis that to deduce that has a property that obviously implies irrationality.^[10]
30. It’s obvious that a rational number has a terminating continued fraction, because as you work it out the denominators keep decreasing … oops, sorry, that was a proof by contradiction.^[10]
31. So perhaps the answer is indeed that if you are trying to prove a negative statement, then you have to use a proof by contradiction.^[10]
32. The method of proof by contradiction is to assume that a statement is not true and then to show that that assumption leads to a contradiction.^[11]
33. For many students, the method of proof by contradiction is a tremendous gift and a trojan horse, both of which follow from how strong the method is.^[11]
34. They are closely related, even interchangeable in some circumstances, though proof by contradiction is more powerful.^[12]
35. Proof by contradiction makes some people uneasy—it seems a little like magic, perhaps because throughout the proof we appear to be `proving' false statements.^[12]
36. Still, there seems to be no way to avoid proof by contradiction.^[12]
37. Are there any clues that might lead you to think that an indirect proof might be a good idea?^[12]
38. And that would be your proof by contradiction.^[13]
39. Famous results which utilized proof by contradiction include the irrationality of and the infinitude of primes.^[14]
40. This technique usually works well on problems where not a lot of information is known, and thus we can create some using proof by contradiction.^[14]
41. Proof by contradiction is also known as indirect proof, apagogical argument, proof by assuming the opposite, and reductio ad impossibilem.^[15]
42. In an indirect proof of a theorem P → Q, you assume P → Q and ~ Q, and try to show ~ P. You can write this as ((P → Q) ∧ ~ Q) →~ P, and construct a truth table for this compound statement.^[16]
43. The key to a proof by contradiction is that you assume the negation of the conclusion and contradict any of your definitions, postulates, theorems, or assumptions.^[16]
44. Hypothesis testing can be thought of as being the probabilistic counterpart of proof by contradiction.^[17]
45. When we use proof by contradiction, we start by assuming the opposite of A (denoted ~A or not A) as being true, and then we try to reach to a contradiction (a statement that is always false).^[17]
46. As in the case of proof by contradiction, just because we may not have a good idea of how to reach a contradiction once we assumed ~A to be true, this does not necessarily mean that ~A is true.^[17]
47. In fact, we can go in the other direction, and use the law of the excluded middle to justify proof by contradiction.^[18]
48. If all else fails, use a proof by contradiction.^[18]
49. Sometimes a proof by contradiction is necessary, but when it isn’t, it can be less informative than a direct proof.^[18]
50. To prove the statement “A implies B,” a proof by contradiction assumes that both A and “not B” are true, and then shows that this is impossible.^[19]
51. Another commonly given example of proof by contradiction is Cantor’s diagonalization argument showing that the set of real numbers is “bigger” than the set of counting numbers.^[19]
52. But by trying a proof by contradiction, we have in some sense a tangible "villain" to fight against.^[19]
53. Proof by contradiction is a strong method of proving statements.^[20]

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• ID : Q184899

Spacy 패턴 목록

• [{'LOWER': 'proof'}, {'LOWER': 'by'}, {'LEMMA': 'contradiction'}]
• [{'LOWER': 'indirect'}, {'LEMMA': 'proof'}]
• [{'LOWER': 'apagogical'}, {'LEMMA': 'argument'}]
• [{'LOWER': 'proof'}, {'LOWER': 'by'}, {'LOWER': 'assuming'}, {'LOWER': 'the'}, {'LEMMA': 'opposite'}]
• [{'LOWER': 'reductio'}, {'LOWER': 'ad'}, {'LEMMA': 'impossibilem'}]