course Mth 151 tуcyTOSassignment #013
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09:58:44 3.2.6 ~(p^q) false; truth values of components
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RESPONSE --> p is T and q is T confidence assessment: 3
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09:58:56 **The question asks for the truth values of p and q that would make the statement ~(p^q) false. If ~(p^q) is false then p^q is true, which means that both p and q must be true.**
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RESPONSE --> got it self critique assessment: 3
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09:59:43 3.2.18 p false q true ~[(~p^~q) U ~q]
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RESPONSE --> True confidence assessment: 3
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09:59:57 **~p ^ ~q is false because ~q is false. One false is fatal to a conjunction. ~q is false so both parts of the disjunction [(~p^~q) U ~q] are false. Thus [(~p^~q) U ~q] is false. The negation ~[(~p^~q) U ~q] of this statement is therefore true.**
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RESPONSE --> got it self critique assessment: 3
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10:02:08 3.2.36 p: 2>7 q: 8 not > 6 r: 19 <= 19 evaluate -(p U -q) U -r
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RESPONSE --> True for the question in the book confidence assessment: 3
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10:02:18 ** p and q are both false statements, while r is a true statement. It follows that p U ~q is true: since ~q is true the disjunction is true. It therefore follows that ~(p U ~q) is false. Since r is true, ~r is false. Thus ~(p U ~q) U ~r is a disjunction of two false statements, ~(p U ~q) and ~r. A disjunction of two false statements is false. So the statement is false. **
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RESPONSE --> Different in the book self critique assessment: 3
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10:03:14 3.2.42 How many rows are there in a statement involving p,q,r,s,u,v,m,n? Note that rows go across the page. For example a statement involving just p and q will have four rows, one each for TT, TF, FT and FF. The headings (i.e., p, q and whatever other statements are necessary to evaluate the truth table) might also be considered a row, but for this problem do not consider the headings to be a row.
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RESPONSE --> 20 confidence assessment: 2
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10:03:46 ** If you just have two statements p and q, then there are four possible truth values: TT, TF, FT and FF. If you have three statements p, q and r then there are eight possible truth values: TTT, TTF, TFT, TFF, and FTT, FTF, FFT, FFF. Note that the number of possible truth values doubles every time you add a statement. The number of truth values for 2 statements is 4, which is 2^2. For 3 statements this doubles to 8, which is 2^3. Every added statement doubles the number, which adds a power to 2. From this we see that the number of possible truth values for n statements is 2^n. For the 8 statements listed for this problem, there are therefore 2^8 =256 possible truth values. **
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RESPONSE --> There are 8 statements for # 42? I think it must be different in the book self critique assessment: 3
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10:05:53 3.2.54 truth table for (-p ^ -q) U (~p U q)
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RESPONSE --> FFFF confidence assessment: 1
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10:06:14 ** For column headings p q ~p ~q ~p^~q ~p U q (~p^~q) U (~p Uq) the first row would start off T T, for p and for q. Then F F for ~p and ~q. Then F for ~p ^ ~q, then T for ~p V q, then T for the final column. So the first row would be T T F F F T T. The second row would be T F F T F F F The third row would be F T T F F T T and the fourth row would be F F T T T T T **
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RESPONSE --> Oh wow definitely doing that wrong. Gotta work on that self critique assessment: 3
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10:07:55 3.2.66 negate using De Morgan's Law: ' V.M. tried to sell the book but she was unable to do so'.
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RESPONSE --> 1/2 is not a positive number and -9 is not less than zero confidence assessment: 3
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10:08:10 ** We use two ideas here. The first is that 'but' is interpreted as 'and'; and the second is that the negation of an 'and' statement is an 'or' statement. deMorgan's Laws say that the negation of p OR q is ~p AND ~q, while the negation of p AND q is ~p OR ~q. The given statement ' V.M. tried to sell the book but she was unable to do so' can be symbolized as 'p ^ q'. Its negation would be ~(p ^ q) = ~p U ~q. We translate this as 'V.M. didn't try to sell the book or she sold it', or something equivalent. **
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RESPONSE --> Not the question from the book self critique assessment: 3
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10:08:56 3.2.78 is the statement 3 + 1 = 4 xor 2 + 5 = 9 true or false?
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RESPONSE --> Exclusive for the question from the book confidence assessment: 3
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10:09:10 ** For an XOR statement exactly one part has to be true. The statement is true because the first part is true and the second is false. We need exactly one true statement; if both parts were true the XOR wouldn't be. **
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RESPONSE --> Not the question from the book self critique assessment: 3
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