| Section | Problems | Notes
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| 1.2 | 40 | Look at #41 to see what sort of answer it is looking for.
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| 1.3 | 58 | Briefly describe how you arrived at your answer.
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| 1.4 | 32 | See the solution to #33 for an example of what it is asking for. In particular, for each one you need to:- Specify the domain and define appropriate predicate(s).
- Express the statement using your predicate(s) and the appropriate quantifier(s).
- Negate the expression and then move the negation as far to the right as you can.
- Express the negation in English, phrasing it "nicely".
(This one is worth 20 points)
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| 1.7 | 2 | Be very precise, using the definition of even (In particular, you cannot not say, for instance, that 10x+14y-6z+12 is even. You must use algebra to make it look like 2k for some integer k. Similarly for future problems with either odd or even.). A common mistake on this kind of proof is to write it in such a way that you are essentially assuming the two numbers are the same number without realizing it.
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| 16 | As with the previous problem, make sure you don't construct a proof that only ends up proving it for m=n.
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| Review Question | 12 | On page 111 |