LAC
/
Questionnaire-2024
3
0
Fork 0
Code Issues Pull Requests Projects Releases 9 Wiki Activity
Browse Source

added ndpred chapter
continuous-integration/drone/push Build is passing
Details
continuous-integration/drone/tag Build is passing
Details

main release_ndpred
sp 3 weeks ago
parent
4891ec7200
commit
b6821f399c
147 changed files with 1153 additions and 7 deletions
Whitespace
Show all changes Ignore whitespace when comparing lines Ignore changes in amount of whitespace Ignore changes in whitespace at EOL
Split View
Diff Options
Show Stats Download Patch File Download Diff File
  1. 6
      compile
  2. 2
      main.tex
  3. 1
      natural_deduction_predicate_logic/0001.tex
  4. 10
      natural_deduction_predicate_logic/0001_sol.tex
  5. 1
      natural_deduction_predicate_logic/0002.tex
  6. 9
      natural_deduction_predicate_logic/0002_sol.tex
  7. 1
      natural_deduction_predicate_logic/0003.tex
  8. 21
      natural_deduction_predicate_logic/0003_sol.tex
  9. 1
      natural_deduction_predicate_logic/0004.tex
  10. 10
      natural_deduction_predicate_logic/0004_sol.tex
  11. 1
      natural_deduction_predicate_logic/0005.tex
  12. 12
      natural_deduction_predicate_logic/0005_sol.tex
  13. 1
      natural_deduction_predicate_logic/0006.tex
  14. 1
      natural_deduction_predicate_logic/0007.tex
  15. 12
      natural_deduction_predicate_logic/0007_sol.tex
  16. 18
      natural_deduction_predicate_logic/0008.tex
  17. 13
      natural_deduction_predicate_logic/0008_sol.tex
  18. 1
      natural_deduction_predicate_logic/0009.tex
  19. 11
      natural_deduction_predicate_logic/0009_sol.tex
  20. 1
      natural_deduction_predicate_logic/0010.tex
  21. 14
      natural_deduction_predicate_logic/0010_sol.tex
  22. 1
      natural_deduction_predicate_logic/0011.tex
  23. 14
      natural_deduction_predicate_logic/0011_sol.tex
  24. 1
      natural_deduction_predicate_logic/0012.tex
  25. 13
      natural_deduction_predicate_logic/0012_sol.tex
  26. 1
      natural_deduction_predicate_logic/0013.tex
  27. 14
      natural_deduction_predicate_logic/0013_sol.tex
  28. 1
      natural_deduction_predicate_logic/0014.tex
  29. 15
      natural_deduction_predicate_logic/0014_sol.tex
  30. 4
      natural_deduction_predicate_logic/1001.tex
  31. 1
      natural_deduction_predicate_logic/1002.tex
  32. 14
      natural_deduction_predicate_logic/1002_sol.tex
  33. 2
      natural_deduction_predicate_logic/1003.tex
  34. 20
      natural_deduction_predicate_logic/1003_sol.tex
  35. 1
      natural_deduction_predicate_logic/1004.tex
  36. 18
      natural_deduction_predicate_logic/1004_sol.tex
  37. 1
      natural_deduction_predicate_logic/1005.tex
  38. 15
      natural_deduction_predicate_logic/1005_sol.tex
  39. 1
      natural_deduction_predicate_logic/1006.tex
  40. 27
      natural_deduction_predicate_logic/1006_sol.tex
  41. 1
      natural_deduction_predicate_logic/1007.tex
  42. 24
      natural_deduction_predicate_logic/1007_sol.tex
  43. 1
      natural_deduction_predicate_logic/1008.tex
  44. 12
      natural_deduction_predicate_logic/1008_sol.tex
  45. 1
      natural_deduction_predicate_logic/1009.tex
  46. 15
      natural_deduction_predicate_logic/1009_sol.tex
  47. 1
      natural_deduction_predicate_logic/1010.tex
  48. 15
      natural_deduction_predicate_logic/1010_sol.tex
  49. 1
      natural_deduction_predicate_logic/1011.tex
  50. 13
      natural_deduction_predicate_logic/1011_sol.tex
  51. 1
      natural_deduction_predicate_logic/1012.tex
  52. 17
      natural_deduction_predicate_logic/1012_sol.tex
  53. 14
      natural_deduction_predicate_logic/1013.tex
  54. 14
      natural_deduction_predicate_logic/1013_sol.tex
  55. 24
      natural_deduction_predicate_logic/1014.tex
  56. 23
      natural_deduction_predicate_logic/1014_sol.tex
  57. 1
      natural_deduction_predicate_logic/1015.tex
  58. 13
      natural_deduction_predicate_logic/1015_sol.tex
  59. 5
      natural_deduction_predicate_logic/2001.tex
  60. 27
      natural_deduction_predicate_logic/2001_sol.tex
  61. 5
      natural_deduction_predicate_logic/2002.tex
  62. 17
      natural_deduction_predicate_logic/2002_sol.tex
  63. 5
      natural_deduction_predicate_logic/2003.tex
  64. 7
      natural_deduction_predicate_logic/2003_sol.tex
  65. 2
      natural_deduction_predicate_logic/2004.tex
  66. 14
      natural_deduction_predicate_logic/2004_sol.tex
  67. 2
      natural_deduction_predicate_logic/2005.tex
  68. 15
      natural_deduction_predicate_logic/2005_sol.tex
  69. 2
      natural_deduction_predicate_logic/2006.tex
  70. 14
      natural_deduction_predicate_logic/2006_sol.tex
  71. 2
      natural_deduction_predicate_logic/2007.tex
  72. 20
      natural_deduction_predicate_logic/2007_sol.tex
  73. 1
      natural_deduction_predicate_logic/2008.tex
  74. 6
      natural_deduction_predicate_logic/2999.tex
  75. 14
      natural_deduction_predicate_logic/9999_sol.tex
  76. 8
      natural_deduction_predicate_logic/multiple_choice/4_1_fol_lect.tex
  77. 8
      natural_deduction_predicate_logic/multiple_choice/4_1_fol_lect_sol.tex
  78. 151
      natural_deduction_predicate_logic/natural_deduction_predicate_logic.tex
  79. 1
      natural_deduction_predicate_logic/practical_questions/0_10_prac.tex
  80. 5
      natural_deduction_predicate_logic/practical_questions/0_1_prac.tex
  81. 1
      natural_deduction_predicate_logic/practical_questions/0_2_prac.tex
  82. 1
      natural_deduction_predicate_logic/practical_questions/0_3_prac.tex
  83. 1
      natural_deduction_predicate_logic/practical_questions/0_4_prac.tex
  84. 1
      natural_deduction_predicate_logic/practical_questions/0_5_prac.tex
  85. 1
      natural_deduction_predicate_logic/practical_questions/0_6_prac.tex
  86. 1
      natural_deduction_predicate_logic/practical_questions/0_7_prac.tex
  87. 1
      natural_deduction_predicate_logic/practical_questions/0_8_prac.tex
  88. 1
      natural_deduction_predicate_logic/practical_questions/0_9_prac.tex
  89. 1
      natural_deduction_predicate_logic/practical_questions/1_1_fol_lect.tex
  90. 9
      natural_deduction_predicate_logic/practical_questions/1_1_fol_lect_sol.tex
  91. 1
      natural_deduction_predicate_logic/practical_questions/1_1_fol_self.tex
  92. 1
      natural_deduction_predicate_logic/practical_questions/1_2_fol_lect.tex
  93. 21
      natural_deduction_predicate_logic/practical_questions/1_2_fol_lect_sol.tex
  94. 1
      natural_deduction_predicate_logic/practical_questions/1_2_fol_self.tex
  95. 1
      natural_deduction_predicate_logic/practical_questions/2_1_fol_lect.tex
  96. 10
      natural_deduction_predicate_logic/practical_questions/2_1_fol_lect_sol.tex
  97. 1
      natural_deduction_predicate_logic/practical_questions/2_1_fol_self.tex
  98. 1
      natural_deduction_predicate_logic/practical_questions/2_2_fol_lect.tex
  99. 12
      natural_deduction_predicate_logic/practical_questions/2_2_fol_lect_sol.tex
  100. 1
      natural_deduction_predicate_logic/practical_questions/2_2_fol_self.tex

6
compile
View File

@ -9,9 +9,7 @@ SINK=/dev/null
VALID_ARGS="abdh"
BURST=0
DEBUG=0
ANNOTATE=0
DEBUG=0 ANNOTATE=0
printUsage() {
printf "A shell wrapper for this questionnaire using latexmk.\n"
printf "Currently this wrapper supports compiling of the whole script and a burst mode,\nas well as three different <version>s: 'blank', solution, spacing and all which will compile all three in one run.\n\n"
@ -104,7 +102,7 @@ compile_wrapper() {
compile_chapter() {
#for chapter in smtzthree proplogic satsolver ndpred predlogic ndpred smt bdd eqchecking symbenc temporal
for chapter in eqchecking
for chapter in ndpred
do
set_chapter "\\chapter${chapter}true"
compile_wrapper "$chapter" "$@"

2
main.tex
View File

@ -107,7 +107,7 @@
\fi
\ifchapterndpred
\setsectionnum{5}
\setsectionnum{7}
\section{Natural Deduction for Predicate Logic}
\input{natural_deduction_predicate_logic/natural_deduction_predicate_logic.tex}
\pagebreak

1
natural_deduction_predicate_logic/0001.tex
View File

@ -0,0 +1 @@
\item \lect $\forall x \; \big(P(x) \imp Q(x)\big), \forall x \; P(x)\ent \forall x \; Q(x).$

10
natural_deduction_predicate_logic/0001_sol.tex
View File

@ -0,0 +1,10 @@
\begin{logicproof}{1}
\forall x \; \big(P(x) \imp Q(x)\big) & prem.\\
\forall x \; P(x) & prem.\\
\begin{subproof}
\llap{$x_0\quad$} P(x_0) \imp Q(x_0) & $\forall \mathrm{e}$ 1 \\
P(x_0) & $\forall \mathrm{e}$ 2 \\
Q(x_0) & $\imp \mathrm{e}$ 3,4
\end{subproof}
\forall x \; Q(x) & $\forall \mathrm{i}$ 3-5
\end{logicproof}

1
natural_deduction_predicate_logic/0002.tex
View File

@ -0,0 +1 @@
\item \lect $\forall x \; P(x) \land \forall x \; (P(y) \imp Q(x)) \quad \ent \quad Q(z)$

9
natural_deduction_predicate_logic/0002_sol.tex
View File

@ -0,0 +1,9 @@
\setlength\subproofhorizspace{1em}
\begin{logicproof}{0}
\forall x \; P(x) \land \forall x \; (P(y) \imp Q(x)) & prem.\\
\forall x \; P(x) & $\land \mathrm{e}_1$ 1\\
\forall x \; (P(y) \imp Q(x)) & $\land \mathrm{e}_2$ 1\\
P(y) & $\forall \mathrm{e}$ 2\\
P(y) \imp Q(z) & $\forall \mathrm{e}$ 3\\
Q(z) & $\imp \mathrm{e}$ 5,4
\end{logicproof}

1
natural_deduction_predicate_logic/0003.tex
View File

@ -0,0 +1 @@
\item \lect $\forall x \; P(x) \lor \forall x \; Q(x) \quad \ent \quad \forall y \; (P(y) \lor Q(y))$

21
natural_deduction_predicate_logic/0003_sol.tex
View File

@ -0,0 +1,21 @@
\setlength\subproofhorizspace{1.7em}
\begin{logicproof}{2}
\forall x \; P(x) \lor \forall x \; Q(x) & prem.\\
\begin{subproof}
\forall x \; P(x) & ass.\\
\begin{subproof}
\llap{$t\enspace \;$} P(t) & $\forall \mathrm{e}$ 2\\
P(t) \lor Q(t) & $\lor \mathrm{i}_1$ 3
\end{subproof}
\forall y \; (P(y) \lor Q(y)) & $\forall \mathrm{i}$ 3-4
\end{subproof}
\begin{subproof}
\forall x \; Q(x) & ass.\\
\begin{subproof}
\llap{$s\enspace \;$} Q(s) & $\forall \mathrm{e}$ 6\\
P(s) \lor Q(s) & $\lor \mathrm{i}_2$ 7
\end{subproof}
\forall y \; (P(y) \lor Q(y)) & $\forall \mathrm{i}$ 7-8
\end{subproof}
\forall y \; (P(y) \lor Q(y)) & $\lor \mathrm{e}$ 1,2-5,6-9
\end{logicproof}

1
natural_deduction_predicate_logic/0004.tex
View File

@ -0,0 +1 @@
\item \ifassignmentsheet \points{2} \fi $\forall x \; (P(x) \imp Q(y)), \forall y \; (P(y) \land R(x)) \quad \ent \quad \exists x \; Q(x))$

10
natural_deduction_predicate_logic/0004_sol.tex
View File

@ -0,0 +1,10 @@
\setlength\subproofhorizspace{1em}
\begin{logicproof}{0}
\forall x \; (P(x) \imp Q(y)) & prem.\\
\forall y \; (P(y) \land R(x)) & prem.\\
P(t) \imp Q(y) & $\forall \mathrm{e}$ 1\\
P(t) \land R(x) & $\forall \mathrm{e}$ 2\\
P(t) & $\land \mathrm{e}_1$ 4\\
Q(y) & $\imp \mathrm{e}$ 3\\
\exists x \; Q(x) & $\exists \mathrm{i}$ 6
\end{logicproof}

1
natural_deduction_predicate_logic/0005.tex
View File

@ -0,0 +1 @@
\item \ifassignmentsheet \points{3} \fi $\forall a \forall b \; (P(a) \land Q(b)) \quad \ent \quad \forall a \exists b \; (P(a) \lor Q(b))$

12
natural_deduction_predicate_logic/0005_sol.tex
View File

@ -0,0 +1,12 @@
\setlength\subproofhorizspace{1.1em}
\begin{logicproof}{1}
\forall a \forall b \; (P(a) \land Q(b)) & prem.\\
\begin{subproof}
\llap{$t\enspace \;$} \forall b \; (P(s) \land Q(b)) & $\forall \mathrm{e}$ 1\\
P(s) \land Q(t) & $\forall \mathrm{e}$ 2\\
P(s) & $\land \mathrm{e}_1$ 3\\
P(s) \lor Q(t) & $\lor \mathrm{i}_1$ 4\\
\exists b \; (P(s) \lor Q(b)) & $\exists \mathrm{i}$ 5
\end{subproof}
\forall a \exists b \; (P(a) \lor Q(b)) & $\forall \mathrm{i}$ 2-6
\end{logicproof}

1
natural_deduction_predicate_logic/0006.tex
View File

@ -0,0 +1 @@
\item \lect Explain the $\exists$-elimination rule ($\exists$e). Why does this rule require a box and what does it mean that $x_0$ is \textit{fresh}?

1
natural_deduction_predicate_logic/0007.tex
View File

@ -0,0 +1 @@
\item \lect $\exists x \; \lnot P(x), \forall x \; \lnot Q(x) \quad \ent \quad \exists x \; (\lnot P(x) \land \lnot Q(x))$

12
natural_deduction_predicate_logic/0007_sol.tex
View File

@ -0,0 +1,12 @@
\setlength\subproofhorizspace{1.6em}
\begin{logicproof}{1}
\exists x \; \lnot P(x) & prem.\\
\forall x \; \lnot Q(x) & prem.\\
\begin{subproof}
\llap{$x_0\enspace \;$} \lnot P(x_0) & ass.\\
\lnot Q(x_0) & $\forall \mathrm{e}$ 2\\
\lnot P(x_0) \land \lnot Q(x_0) & $\land \mathrm{i}$ 3,4\\
\exists x \; (\lnot P(x) \land \lnot Q(x)) & $\exists \mathrm{i}$ 5
\end{subproof}
\exists x \; (\lnot P(x) \land \lnot Q(x)) & $\exists \mathrm{e}$ 3-6
\end{logicproof}

18
natural_deduction_predicate_logic/0008.tex
View File

@ -0,0 +1,18 @@
\item \ifassignmentsheet \points{4} \fi Consider the following natural deduction proof for the sequent $$\forall x \; (P(x)\imp Q(x)), \quad \exists x \; P(x) \quad \ent \quad \forall x Q(x).$$
Is the proof correct? If not, explain the error in the proof and either show how to correctly prove the sequent, or give a counterexample that proves the sequent invalid.
\setlength\subproofhorizspace{1.1em}
\begin{logicproof}{2}
\forall x \; (P(x)\imp Q(x)) & prem.\\
\exists x \; P(x) & prem.\\
\begin{subproof}
\llap{$x_0\enspace \;$} &\\
\begin{subproof}
P(x_0) & ass.\\
P(x_0) \imp Q(x_0) & $\forall \mathrm{e}$ 1\\
Q(x_0) & $\imp \mathrm{e}$, 4,5
\end{subproof}
\forall x \; Q(x) & $\forall \mathrm{i}$ 4-6
\end{subproof}
\forall x \; Q(x) & $\exists \mathrm{e}$ 2,3-7
\end{logicproof}

13
natural_deduction_predicate_logic/0008_sol.tex
View File

@ -0,0 +1,13 @@
This sequent is not provable.
Model $\mathcal{M}$:\\
\begin{minipage}{0.2\textwidth}
\begin{align*}
\mathcal{A} =& \; \{ a,b \}\\
P^\mathcal{M} =& \; \{ a \}\\
Q^\mathcal{M} =& \; \{ a \}\\
\end{align*}
\end{minipage}\\
$\mathcal{M} \models \forall x \; (P(x)\imp Q(x)), \quad \exists x \; P(x)$\\
$\mathcal{M} \nmodels \forall x Q(x)$

1
natural_deduction_predicate_logic/0009.tex
View File

@ -0,0 +1 @@
\item \lect $\exists x \; (P(x) \imp Q(y)), \quad \forall x \; P(x) \quad \ent \quad Q(y)$

11
natural_deduction_predicate_logic/0009_sol.tex
View File

@ -0,0 +1,11 @@
\setlength\subproofhorizspace{1em}
\begin{logicproof}{2}
\exists x \; (P(x) \imp Q(y)) & prem.\\
\forall x \; P(x) & prem.\\
\begin{subproof}
\llap{$x_0\enspace \;$} P(x_0) \imp Q(y) & ass.\\
P(x_0) & $\forall \mathrm{e}$ 2\\
Q(y) & $\imp \mathrm{e}$ 3,4
\end{subproof}
Q(y) & $\exists \mathrm{e}$ 3-5
\end{logicproof}

1
natural_deduction_predicate_logic/0010.tex
View File

@ -0,0 +1 @@
\item \lect $\forall x \; \lnot (P(x) \land Q(x)) \quad \ent \quad \lnot \exists x \; (P(x) \land Q(x))$

14
natural_deduction_predicate_logic/0010_sol.tex
View File

@ -0,0 +1,14 @@
\setlength\subproofhorizspace{1.3em}
\begin{logicproof}{2}
\forall x \; \lnot (P(x) \land Q(x)) & prem.\\
\begin{subproof}
\exists x \; (P(x) \land Q(x)) & ass.\\
\begin{subproof}
\llap{$t\enspace \;$} P(t) \land Q(t) & ass.\\
\lnot P(t) \land Q(t) & $\forall \mathrm{e}$ 1\\
\bot & $\lnot \mathrm{e}$ 3,4
\end{subproof}
\bot & $\exists \mathrm{e}$ 3-5
\end{subproof}
\lnot \exists x \; (P(x) \land Q(x)) & $\lnot \mathrm{i}$ 2-6
\end{logicproof}

1
natural_deduction_predicate_logic/0011.tex
View File

@ -0,0 +1 @@
\item \lect $\lnot \exists x \; (P(x) \land Q(x)) \quad \ent \quad \forall x \; \lnot (P(x) \land Q(x))$

14
natural_deduction_predicate_logic/0011_sol.tex
View File

@ -0,0 +1,14 @@
\setlength\subproofhorizspace{1.3em}
\begin{logicproof}{2}
\lnot \exists x \; (P(x) \land Q(x)) & prem.\\
\begin{subproof}
\llap{$t\enspace \;$} & \\
\begin{subproof}
P(t) \land Q(t) & ass.\\
\exists x \; \lnot (P(x) \land Q(x)) & $\exists \mathrm{i}$ 3\\
\bot & $\lnot \mathrm{e}$ 1,4
\end{subproof}
\lnot P(t) \land Q(t) & $\lnot \mathrm{i}$ 3-5
\end{subproof}
\forall x \; \lnot (P(x) \land Q(x)) & $\forall \mathrm{i}$ 2-6
\end{logicproof}

1
natural_deduction_predicate_logic/0012.tex
View File

@ -0,0 +1 @@
\item \ifassignmentsheet \points{2} \fi $\exists x \; \lnot P(x), \exists x \; \lnot Q(x) \quad \ent \quad \exists x \; (\lnot P(x) \land \lnot Q(x))$

13
natural_deduction_predicate_logic/0012_sol.tex
View File

@ -0,0 +1,13 @@
This sequent is not provable.
Model $\mathcal{M}$:\\
\begin{minipage}{0.2\textwidth}
\begin{align*}
\mathcal{A} =& \; \{ a,b \}\\
P^\mathcal{M} =& \; \{ a \}\\
Q^\mathcal{M} =& \; \{ b \}\\
\end{align*}
\end{minipage}\\
$\mathcal{M} \models \exists x \; \lnot P(x), \exists x \; \lnot Q(x)$\\
$\mathcal{M} \nmodels \exists x \; (\lnot P(x) \land \lnot Q(x))$

1
natural_deduction_predicate_logic/0013.tex
View File

@ -0,0 +1 @@
\item \lect $\exists x \; (P(x) \imp Q(y)), \quad \exists x \; P(x) \quad \ent \quad Q(y)$

14
natural_deduction_predicate_logic/0013_sol.tex
View File

@ -0,0 +1,14 @@
This sequent is not provable.
Model $\mathcal{M}$:\\
\begin{minipage}{0.2\textwidth}
\begin{align*}
\mathcal{A} =& \; \{ a,b \}\\
P^\mathcal{M} =& \; \{ a \}\\
Q^\mathcal{M} =& \; \{ a \} \\
y \leftarrow \; b \\
\end{align*}
\end{minipage}\\
$\mathcal{M} \models \exists x \; (P(x) \imp Q(y)), \quad \exists x \; P(x)$\\
$\mathcal{M} \nmodels Q(y)$

1
natural_deduction_predicate_logic/0014.tex
View File

@ -0,0 +1 @@
\item \lect $\forall x ( P(x) \land Q(x)) \ent \forall x P(x) \land \forall x Q(x) $

15
natural_deduction_predicate_logic/0014_sol.tex
View File

@ -0,0 +1,15 @@
\setlength\subproofhorizspace{1.7em}
\begin{logicproof}{1}
\forall x \;( P(x) \land Q(x) ) & prem.\\
\begin{subproof}
\llap{$x_0\enspace \;$} P(x_0) \land Q(x_0) & $\forall \mathrm{e}$ 1\\
P(x_0) & $\land \mathrm{e}$ 2
\end{subproof}
\forall x \; P(x) & $\forall \mathrm{i} 2-3$\\
\begin{subproof}
\llap{$x_1\enspace \;$} P(x_1) \land Q(x_1) & $\forall \mathrm{e}$ 1\\
Q(x_1) & $\land \mathrm{e}$ 5
\end{subproof}
\forall x \; Q(x) & $\forall \mathrm{i} 5-6$\\
\forall x \; P(x) \land \forall x \; Q(x) & $\land \mathrm{i}$ 4,7
\end{logicproof}

4
natural_deduction_predicate_logic/1001.tex
View File

@ -0,0 +1,4 @@
\item \self Explain the $\forall$-introduction rule
and the $\forall$-elimination rule.
Explain why one rule needs a box while the other one does not.
What does it mean that $x_0$ needs to be fresh?

1
natural_deduction_predicate_logic/1002.tex
View File

@ -0,0 +1 @@
\item \self $\forall x \; (P(x) \land Q(x)) \quad \ent \quad \forall x \; ( (Q(x) \lor R(x)) \land (R(x) \lor P(x)) )$

14
natural_deduction_predicate_logic/1002_sol.tex
View File

@ -0,0 +1,14 @@
\begin{logicproof}{2}
\forall x \; (P(x) \land Q(x)) &\prem \\
\begin{subproof}
& \freshVar{$x_0$} \\
P(x_0) \land Q(x_0) & \foralle 1 $x_0$ \\
P(x_0) & \ande{1}1 \\
Q(x_0) & \ande{2}1 \\
R(x_0) \lor P(x_0) & \ori 4 \\
Q(x_0) \lor R(x_0) & \ori 5 \\
(Q(x_0) \lor R(x_0)) \land (R(x) \lor P(x)) & \andi 6,7
\end{subproof}
\forall x \; ((Q(x) \lor R(x)) \land (R(x) \lor P(x))) & \foralli 2-8
\end{logicproof}

2
natural_deduction_predicate_logic/1003.tex
View File

@ -0,0 +1,2 @@
\item \ifassignmentsheet \points{3} \fi
$\forall x \; (P(x)\lor Q(x)),\quad \forall x \; (\lnot P(x)) \quad \ent \quad \forall x \; (Q(x))$

20
natural_deduction_predicate_logic/1003_sol.tex
View File

@ -0,0 +1,20 @@
\begin{logicproof}{2}
\forall x \; (P(x) \lor Q(x)) &\prem \\
\forall x \; (\lnot P(x)) &\prem \\
\begin{subproof}
& \freshVar{$x_0$}\\
P(x_0) \lor Q(x_0) &$\foralle 1$ $x_0$ \\
\lnot P(x_0) &$\foralle 2$ \\
\begin{subproof}
P(x_0) &\assum \\
\bot &$\nege 5,6$ \\
Q(x_0) &$\bote 7$
\end{subproof}
\begin{subproof}
Q(x_0) &\assum
\end{subproof}
Q(x_0) &$\ore 4,6-8,9$
\end{subproof}
\forall x \; Q(x) &$\foralli 3-10 $
\end{logicproof}

1
natural_deduction_predicate_logic/1004.tex
View File

@ -0,0 +1 @@
\item \self $\exists x \; (Q(x) \imp R(x)),\quad \exists x \; (P(x)\land Q(x)) \quad \ent \quad \exists x \; (P(x) \land R(x))$

18
natural_deduction_predicate_logic/1004_sol.tex
View File

@ -0,0 +1,18 @@
\begin{logicproof}{2}
\exists x \; (Q(x) \imp R(x)) &\prem \\
\exists x \; (P(x)\land Q(x)) &\prem \\
\begin{subproof}
Q(x_0) \imp R(x_0) &\assum~\freshVar{$x_0$} \\
\begin{subproof}
P(x_0) \land Q(x_0) &\assum~\freshVar{$x_0$}\\
P(x_0) &\ande{1} 4\\
Q(x_0) &\ande{2} 4\\
R(x_0) &\impe 5,3\\
P(x_0) \land R(x_0) & \andi 5,7\\
\exists x (P(x) \land R(x)) & \existi 8
\end{subproof}
\exists x \; (P(x) \land R(x)) & \existe 2,4-9
\end{subproof}
\exists x \; (P(x) \land R(x)) & \existe 1,3-10
\end{logicproof}

1
natural_deduction_predicate_logic/1005.tex
View File

@ -0,0 +1 @@
\item \self $\forall x \; (Q(x) \imp R(x)),\quad \exists x \; (P(x)\land Q(x)) \quad \ent \quad \exists x \; (P(x) \land R(x))$

15
natural_deduction_predicate_logic/1005_sol.tex
View File

@ -0,0 +1,15 @@
\begin{logicproof}{2}
\forall x \; (Q(x) \imp R(x)) &\prem \\
\exists x \; (P(x)\land Q(x)) &\prem \\
\begin{subproof}
P(x_0) \land Q(x_0) & \assum~\freshVar{$x_0$}\\
Q(x_0) \imp R(x_0) & \foralle 1 $x_0$\\
P(x_0) & \ande{1} 3 \\
Q(x_0) & \ande{2} 3 \\
R(x_0) & \impe 6,4\\
P(x_0) \land R(x_0) & \andi 5,7\\
\exists x \; (P(x) \land R(x)) & \existi 8
\end{subproof}
\exists x \; (P(x) \land R(x)) &\existe 2,3-9
\end{logicproof}

1
natural_deduction_predicate_logic/1006.tex
View File

@ -0,0 +1 @@
\item \self $\lnot \exists x \forall y \; (P(x) \land Q(y)) \quad \ent \quad \forall x \exists y \; \lnot (P(x) \land Q(y))$

27
natural_deduction_predicate_logic/1006_sol.tex
View File

@ -0,0 +1,27 @@
\setlength\subproofhorizspace{1.3em}
\begin{logicproof}{4}
\lnot \exists x \forall y \; (P(x) \land Q(y)) & \prem\\
\begin{subproof}
\begin{subproof}
\forall y (P(x_0)\land Q(y)) & $\assum$ $\freshVar{$x_0$}$\\
\exists x \forall y (P(x)\land Q(y)) & $\existi2$\\
\bot & $\nege1,3$
\end{subproof}
\lnot \forall y (P(x_0)\land Q(y)) & $\negi2-4$\\
\begin{subproof}
\lnot \exists y \lnot (P(x_0)\land Q(y)) & $\assum$\\
\begin{subproof}
\begin{subproof}
\lnot (P(x_0)\land Q(y_0)) & $\assum$ $\freshVar{$y_0$}$\\
\exists y \lnot (P(x_0) \land Q(y)) & $\existi7$\\
\bot & $\nege6,8$
\end{subproof}
P(x_0) \land Q(y_0) & $PBC 7-9$
\end{subproof}
\forall y (P(x_0)\land Q(y)) & $\foralli7-10$\\
\bot & $\nege5,11$
\end{subproof}
\exists y \lnot (P(x_0)\land Q(y)) & $PBC 6-12$
\end{subproof}
\forall x \exists y \; \lnot (P(x) \land Q(y)) & $\foralli2-13$
\end{logicproof}

1
natural_deduction_predicate_logic/1007.tex
View File

@ -0,0 +1 @@
\item \self $\forall x \exists y \; \lnot (P(x) \land Q(y)) \quad \ent \quad \lnot \exists x \forall y \; (P(x) \land Q(y))$

24
natural_deduction_predicate_logic/1007_sol.tex
View File

@ -0,0 +1,24 @@
\setlength\subproofhorizspace{1.3em}
\begin{logicproof}{2}
\forall x \exists y \; \lnot (P(x) \land Q(y)) & \prem\\
\exists y \lnot (P(x_0)\land Q(y)) & $\foralle1$\\
\begin{subproof}
\lnot (P(x_0)\land Q(y_0)) & $\assum$ $\freshVar{$y_0$}$\\
\begin{subproof}
\forall y (P(x_0)\land Q(y)) & $\assum$\\
P(x_0)\land Q(y_0) & $\foralle4$\\
\bot & $\nege3,5$
\end{subproof}
\lnot \forall y (P(x_0)\land Q(y)) & $\negi4-6$
\end{subproof}
\lnot \forall y (P(x_0)\land Q(y)) & $\existe2,3-7$\\
\begin{subproof}
\exists x \forall y (P(x)\land Q(y)) & $\assum$\\
\begin{subproof}
\forall y (P(x_0)\land Q(y)) & $\assum$ $\freshVar{$x_0$}$\\
\bot & $\nege8,10$
\end{subproof}
\bot & $\existe9,10-11$
\end{subproof}
\lnot \exists x \forall y \; (P(x) \land Q(y)) & $\negi9-12$
\end{logicproof}

1
natural_deduction_predicate_logic/1008.tex
View File

@ -0,0 +1 @@
\item \self $\lnot \exists x \; \lnot P(x) \quad \ent \quad \forall x \; \lnot P(x)$

12
natural_deduction_predicate_logic/1008_sol.tex
View File

@ -0,0 +1,12 @@
This sequent is not provable.
Model $\mathcal{M}$:\\
\begin{minipage}{0.2\textwidth}
\begin{align*}
\mathcal{A} =& \; \{ a \}\\
P^\mathcal{M} =& \; \{ a\}
\end{align*}
\end{minipage}\\
$\mathcal{M} \models \lnot \exists x \lnot P(x)$\\
$\mathcal{M} \nmodels \forall x \lnot P(x)$

1
natural_deduction_predicate_logic/1009.tex
View File

@ -0,0 +1 @@
\item \self $P(x) \lor Q(y),\quad P(x)\imp R(z),\quad Q(y) \imp R(z) \quad \ent \quad R(z)$

15
natural_deduction_predicate_logic/1009_sol.tex
View File

@ -0,0 +1,15 @@
\setlength\subproofhorizspace{1.3em}
\begin{logicproof}{1}
P(x) \lor Q(y) &\prem\\
P(x)\imp R(z) &\prem\\
Q(y) \imp R(z) &\prem\\
\begin{subproof}
P(x) &$\assum$\\
R(z) &$\impe2,4$
\end{subproof}
\begin{subproof}
Q(y) &$\assum$\\
R(z) &$\impe3,6$
\end{subproof}
R(z) &$\ore1,4-5,6-7$
\end{logicproof}

1
natural_deduction_predicate_logic/1010.tex
View File

@ -0,0 +1 @@
\item \self $\exists y \forall x \; (P(x,y)) \quad \ent \quad \forall x \exists y \; (P(x,y))$

15
natural_deduction_predicate_logic/1010_sol.tex
View File

@ -0,0 +1,15 @@
This sequent is provable.
\setlength\subproofhorizspace{1.3em}
\begin{logicproof}{2}
\exists y \forall x P(x,y) & \prem \\
\begin{subproof}
\forall x P(x,y_0) & $\assum$ $\freshVar{$y_0$}$ \\
\begin{subproof}
P(x_0,y_0) & $\foralle 2$ $\freshVar{$x_0$}$ \\
\exists y P(x_0,y) & $\existi 3$
\end{subproof}
\forall x \exists y P(x,y) & $\foralli3-4$
\end{subproof}
\forall x \exists y P(x,y) & $\existe 1,2-5$
\end{logicproof}

1
natural_deduction_predicate_logic/1011.tex
View File

@ -0,0 +1 @@
\item \self $\exists a \forall b \; (S(b,a) \land T(b,a)) \quad \ent \quad \forall b \forall a \; (S(b,a) \land T(b,a))$

13
natural_deduction_predicate_logic/1011_sol.tex
View File

@ -0,0 +1,13 @@
This sequent is not provable.
Model $\mathcal{M}$:\\
\begin{minipage}{0.2\textwidth}
\begin{align*}
\mathcal{A} =& \; \{ 0,1 \}\\
S^\mathcal{M} =& \; \{ (0,1),(1,1) \}\\
T^\mathcal{M} =& \; \{ (0,1),(1,1) \}
\end{align*}
\end{minipage}\\
$\mathcal{M} \models \exists a \forall b \; (S(b,a) \land T(b,a))$\\
$\mathcal{M} \nmodels \forall b \forall a \; (S(b,a) \land T(b,a))$

1
natural_deduction_predicate_logic/1012.tex
View File

@ -0,0 +1 @@
\item \self $ P(y) \imp \forall x Q(x), \enspace\exists x \lnot Q(x) \ent \exists x \lnot P(x) $

17
natural_deduction_predicate_logic/1012_sol.tex
View File

@ -0,0 +1,17 @@
\setlength\subproofhorizspace{1.3em}
\begin{logicproof}{2}
P(y) \imp \forall x Q(x) & \prem\\
\exists x \lnot Q(x) & \prem\\
\begin{subproof}
P(y) & $\assum$\\
\forall x Q(x) & $\impe1,3$\\
\begin{subproof}
\lnot Q(x_0) &$\assum$ $\freshVar{$x_0$}$\\
Q(x_0) &$\foralle4$\\
\bot &$\nege5,6$
\end{subproof}
\bot &$\existe2,5-7$
\end{subproof}
\lnot P(y) &$\negi3-8$\\
\exists x \lnot P(x) &$\existi9$
\end{logicproof}

14
natural_deduction_predicate_logic/1013.tex
View File

@ -0,0 +1,14 @@
\item Consider the following natural deduction proof for the sequent $$\exists x \; \lnot P(x) \quad \ent \quad \lnot \forall x \; P(x).$$
Is the proof correct? If not, explain the error in the proof and either show how to correctly prove the sequent, or give a counterexample that proves the sequent invalid.
\setlength\subproofhorizspace{1em}
\begin{logicproof}{1}
\exists x \; \lnot P(x) & prem.\\
\begin{subproof}
\forall x \; P(x) & ass.\\
P(x_0) & $\forall \mathrm{e}$ 2\\
\exists x \; P(x) & $\exists \mathrm{i}$ 3\\
\bot & $\lnot \mathrm{e}$ 1,4
\end{subproof}
\lnot \forall x \; P(x) & $\lnot \mathrm{e}$ 2-5
\end{logicproof}

14
natural_deduction_predicate_logic/1013_sol.tex
View File

@ -0,0 +1,14 @@
\setlength\subproofhorizspace{1.3em}
\begin{logicproof}{2}
\exists x \; \lnot P(x) & \prem\\
\begin{subproof}
\forall x \; P(x) & $\assum$\\
P(x_0) & $\foralle2$\\
\begin{subproof}
\lnot P(x_0) & $\assum$ $\freshVar{$x_0$}$\\
\bot & $\nege3,4$
\end{subproof}
\bot & $\existe1,3-5$
\end{subproof}
\lnot \forall x \; P(x) & $\negi2-5$
\end{logicproof}

24
natural_deduction_predicate_logic/1014.tex
View File

@ -0,0 +1,24 @@
\item \self Consider the following natural deduction proof for the sequent $$\quad \exists x \; P(x) \lor \exists x \; Q(x) \quad \ent \quad \exists x \; (P(x)\lor Q(x)).$$
Is the proof correct? If not, explain the error in the proof and either show how to correctly prove the sequent, or give a counterexample that proves the sequent invalid.
\setlength\subproofhorizspace{1.7em}
\begin{logicproof}{2}
\exists x \; P(x) \lor \exists x \; Q(x) & prem.\\
\begin{subproof}
\exists x \; P(x) & ass.\\
\begin{subproof}
\llap{$x_0\enspace \;$} P(x_0) & ass.\\
P(x_0) \lor Q(x_0) & $\lor \mathrm{i}_1$ 3
\end{subproof}
\exists x \; (P(x) \lor Q(x)) & $\exists \mathrm{e}$ 2,3-4
\end{subproof}
\begin{subproof}
\exists x \; Q(x) & ass.\\
\begin{subproof}
\llap{$x_0\enspace \;$} Q(x_0) & ass.\\
P(x_0) \lor Q(x_0) & $\lor \mathrm{i}_2$ 7
\end{subproof}
\exists x \; (P(x)\lor Q(x)) & $\exists \mathrm{e}$ 6,7-8
\end{subproof}
\exists x \; (P(x)\lor Q(x)) & $\lor \mathrm{e}$ 1,2-5,6-9
\end{logicproof}

23
natural_deduction_predicate_logic/1014_sol.tex
View File

@ -0,0 +1,23 @@
\setlength\subproofhorizspace{1.3em}
\begin{logicproof}{2}
\exists x \; P(x) \lor \exists x \; Q(x) & \prem\\
\begin{subproof}
\exists x \; P(x) & $\assum$\\
\begin{subproof}
P(x_0) & $\assum$ $\freshVar{$x_0$}$\\
P(x_0) \lor Q(x_0) & $\ori3$\\
\exists x \; (P(x) \lor Q(x)) & $\existi4$
\end{subproof}
\exists x \; (P(x) \lor Q(x)) & $\existe2,3-5$
\end{subproof}
\begin{subproof}
\exists x \; Q(x) & $\assum$\\
\begin{subproof}
Q(x_0) & $\assum$ $\freshVar{$x_0$}$\\
P(x_0) \lor Q(x_0) & $\ori8$\\
\exists x \; (P(x) \lor Q(x)) & $\existi9$
\end{subproof}
\exists x \; (P(x)\lor Q(x)) & $\existe7,8-10$
\end{subproof}
\exists x \; (P(x)\lor Q(x)) & $\ore1,2-6,7-11$
\end{logicproof}

1
natural_deduction_predicate_logic/1015.tex
View File

@ -0,0 +1 @@
\item \self $\forall x \exists y \; (P(x) \imp Q(y)), P(s) \quad \ent \quad \exists x \forall y \; (\lnot P(x) \lor Q(y))$

13
natural_deduction_predicate_logic/1015_sol.tex
View File

@ -0,0 +1,13 @@
This sequent is not provable.
Model $\mathcal{M}$:\\
\begin{minipage}{0.2\textwidth}
\begin{align*}
\mathcal{A} =& \; \{ a,b \}\\
P^\mathcal{M} =& \; \{ a,b \}\\
Q^\mathcal{M} =& \; \{ a \}
\end{align*}
\end{minipage}\\
$\mathcal{M} \models \forall x \exists y \; (P(x) \imp Q(y)), P(s)$\\
$\mathcal{M} \nmodels \exists x \forall y \; (\lnot P(x) \lor Q(y))$

5
natural_deduction_predicate_logic/2001.tex
View File

@ -0,0 +1,5 @@
\item
\ifassignmentsheet \points{4}
\else \prac
\fi
$\lnot \exists x~P(x) \lor \lnot \exists y~Q(y) \entails \forall z~\lnot(Q(z) \land P(z))$

27
natural_deduction_predicate_logic/2001_sol.tex
View File

@ -0,0 +1,27 @@
\setlength{\subproofhorizspace}{1.5em}
\begin{logicproof}{3}
\lnot \exists x~P(x) \lor \lnot \exists y~Q(y) &prem \\
\begin{subproof}
\begin{subproof}
\hspace*{-2.75em}
\llap{$z_0\enspace \;$} \: \hspace{2.75em} Q(z_0) \land P(z_0) &assum \\
\begin{subproof}
\lnot \exists x~P(x) & assum \\
P(z_0) &$\land \mathrm{e} 2$ \\
\exists x~P(x) &$\exists \mathrm{i} 4$ \\
\bot &$\lnot \mathrm{e} 3,5$
\end{subproof}
\begin{subproof}
\lnot \exists y~Q(y) & assum \\
Q(z_0) &$\land \mathrm{e} 2$ \\
\exists y~Q(y) &$\exists \mathrm{i} 8$ \\
\bot &$\lnot \mathrm{e} 7,9$
\end{subproof}
\bot &$\lor \mathrm{e} 1,3-6,7-10$
\end{subproof}
\lnot(Q(z_0) \land P(z_0)) &$\lnot \mathrm{i} 3-11$
\end{subproof}
\forall z \; \lnot(Q(z) \land P(z)) &$\forall \mathrm{i} 3-12$
\end{logicproof}

5
natural_deduction_predicate_logic/2002.tex
View File

@ -0,0 +1,5 @@
\item
\ifassignmentsheet \points{2}
\else \prac
\fi
$\lnot \exists x \; Q(x)\quad \ent \quad \forall x \; \lnot Q(x)$

17
natural_deduction_predicate_logic/2002_sol.tex
View File

@ -0,0 +1,17 @@
\setlength{\subproofhorizspace}{1.5em}
\begin{logicproof}{2}
\lnot \exists x \; Q(x) &prem \\
\begin{subproof}
\hspace*{-1.5em}
\llap{$x_0\enspace \;$}
\begin{subproof}
Q(x_0) &assum \\
\exists x \; Q(x) &$\exists \mathrm{i} 2$ \\
\bot &$\lnot \mathrm{e} 1,3$
\end{subproof}
\lnot Q(x_0) &$\lnot \mathrm{i} 2-4$
\end{subproof}
\forall x \; \lnot Q(x) &$\forall \mathrm{i} 2-5$
\end{logicproof}

5
natural_deduction_predicate_logic/2003.tex
View File

@ -0,0 +1,5 @@
\item
\ifassignmentsheet \points{2}
\else \prac
\fi
$\forall x \; (P(x) \land Q(x)) \quad \ent \quad \exists x \; (P(x) \lor Q(x))$

7
natural_deduction_predicate_logic/2003_sol.tex
View File

@ -0,0 +1,7 @@
\begin{logicproof}{0}
\forall x \; (P(x) \land Q(x)) &prem \\
P(x_0) \land Q(x_0) &$\forall \mathrm{e} 1$ \\
P(x_0) &$\land \mathrm{e} 2$ \\
P(x_0) \lor Q(x_0) &$\lor \mathrm{i} 3$ \\
\exists x \; (P(x) \lor Q(x)) &$\exists \mathrm{i} 4$
\end{logicproof}

2
natural_deduction_predicate_logic/2004.tex
View File

@ -0,0 +1,2 @@
\item \ifassignmentsheet \points{2} \else \prac \fi
$\exists x~(P(x) \implies Q(x)) , ~\lnot Q(z) \entails \lnot P(z)$

14
natural_deduction_predicate_logic/2004_sol.tex
View File

@ -0,0 +1,14 @@
This sequent is not provable.
Model $\mathcal{M}$:\\
\begin{minipage}{0.2\textwidth}
\begin{align*}
\mathcal{A} =& \; \{ a,z \}\\
P^\mathcal{M} =& \; \{ a,z \}\\
Q^\mathcal{M} =& \; \{ a\}
\end{align*}
\end{minipage}\\
$\mathcal{M} \models \exists x \; P(x) \imp Q(x)$\\
$\mathcal{M} \models \lnot Q(z)$\\
$\mathcal{M} \nmodels \lnot P(z)$

2
natural_deduction_predicate_logic/2005.tex
View File

@ -0,0 +1,2 @@
\item \ifassignmentsheet \points{2} \else \prac \fi
$\exists x \; (Q(y) \imp P(x)) \quad \ent \quad Q(y) \imp \exists x \; P(x)$

15
natural_deduction_predicate_logic/2005_sol.tex
View File

@ -0,0 +1,15 @@
\setlength\subproofhorizspace{1.3em}
\begin{logicproof}{3}
\exists x \;(Q(y) \imp P(x)) & prem.\\
\begin{subproof}
\llap{$x_0\enspace \;$} Q(y) \imp P(x_0) & ass.\\
\begin{subproof}
Q(y) & ass.\\
P(x_0) & $\imp \mathrm{e}$ 3,2 \\
\exists x \; P(x) & $\exists \mathrm{i}$ 4
\end{subproof}
Q(y) \imp \exists x \; P(x) & $\imp \mathrm{i}$ 3-5
\end{subproof}
Q(y) \imp \exists x \; P(x) & $\exists \mathrm{e}$ 1, 2-6
\end{logicproof}

2
natural_deduction_predicate_logic/2006.tex
View File

@ -0,0 +1,2 @@
\item \ifassignmentsheet \points{2} \else \prac \fi
$ \exists x \; (P(x) \land Q(x)) \quad\ent\quad \exists x \; P(x) \land \exists x \; Q(x)$

14
natural_deduction_predicate_logic/2006_sol.tex
View File

@ -0,0 +1,14 @@
\setlength\subproofhorizspace{1.3em}
\begin{logicproof}{1}
\exists x \;(P(x) \land Q(x)) & prem.\\
\begin{subproof}
\llap{$x_0\enspace \;$} P(x_0) \land Q(x_0) & ass.\\
P(x_0) & $\land\mathrm{e} 2$\\
Q(x_0) & $\land\mathrm{e} 2$\\
\exists x \; P(x) & $\exists\mathrm{i} 3$\\
\exists x \; Q(x) & $\exists\mathrm{i} 4$\\
\exists x \; P(x) \land \exists \; Q(x) & $\land\mathrm{i} 5,6$
\end{subproof}
\exists x \;P(x) \land \exists x \; Q(x)) & $\exists\mathrm{e} 1,2-7$
\end{logicproof}

2
natural_deduction_predicate_logic/2007.tex
View File

@ -0,0 +1,2 @@
\item \ifassignmentsheet \points{2} \fi
$ \exists x \; (P(x) \lor Q(x)) \quad\ent\quad \exists x \; P(x) \lor \exists x \; Q(x)$

20
natural_deduction_predicate_logic/2007_sol.tex
View File

@ -0,0 +1,20 @@
\setlength\subproofhorizspace{1.3em}
\begin{logicproof}{2}
\exists x \;(P(x) \lor Q(x)) & prem.\\
\begin{subproof}
\llap{$x_0\enspace \;$} P(x_0) \lor Q(x_0) & ass.\\
\begin{subproof}
P(x_0) & ass.\\
\exists x \; P(x) &$ \exists\mathrm{i} 3$\\
\exists x \; P(x) \lor \exists x \; Q(x) &$ \lor\mathrm{i} 4$
\end{subproof}
\begin{subproof}
Q(x_0) & ass.\\
\exists x \; Q(x) &$ \exists\mathrm{i} 6$\\
\exists x \; P(x) \lor \exists x \; Q(x) &$ \lor\mathrm{i} 7$
\end{subproof}
\exists x \;P(x) \lor \exists x \; Q(x) &$ \lor\mathrm{e} 2,3-8$
\end{subproof}
\exists x \;P(x) \lor \exists x \; Q(x) & $\exists\mathrm{e} 1,2-9$
\end{logicproof}

1
natural_deduction_predicate_logic/2008.tex
View File

@ -0,0 +1 @@
\item \ifassignmentsheet \points{3} \fi $ \exists x \; \lnot P(x) \quad \ent \quad \lnot \forall x \; P(x).$

6
natural_deduction_predicate_logic/2999.tex
View File

@ -0,0 +1,6 @@
\item
\ifassignmentsheet \points{2}
\else \prac
\fi
TBD

14
natural_deduction_predicate_logic/9999_sol.tex
View File

@ -0,0 +1,14 @@
\begin{logicproof}{1}
\forall x \; (P(x) \land Q(x)) &prem \\
\begin{subproof}
\llap{$x_0\enspace \;$} \: P(x_0) \land Q(x_0) &$\forall \mathrm{e} 1 $\\
P(x_0) &$\land \mathrm{e} 2$
\end{subproof}
\forall x \; P(x) &$\forall \mathrm{i} 2-3 $\\
\begin{subproof}
\llap{$x_1\enspace \;$} \: P(x_1) \land Q(x_1) &$\forall \mathrm{e} 1 $\\
Q(x_1) &$\land \mathrm{e} 5$
\end{subproof}
\forall x \; Q(x) &$\forall \mathrm{i} 5-6 $\\
\forall x \; P(x) \land \forall x \; Q(x) &$\land \mathrm{i} 4,7$
\end{logicproof}

8
natural_deduction_predicate_logic/multiple_choice/4_1_fol_lect.tex
View File

@ -0,0 +1,8 @@
\item \lect Considering \textit{Quantifier Equivalences} in \textit{Natural Deduction} for \textit{Predicate Logic}, tick all statements in the list, that are equivalent.
\begin{itemize}
\item[$\square$] $\forall x \; \phi \equiv \exists x \; \lnot \phi$
\item[$\square$] $\forall x \; \phi \equiv \lnot \exists x \; \lnot \phi$
\item[$\square$] $\lnot \forall x \; \phi \equiv \exists x \; \lnot \phi$
\item[$\square$] $\exists x \; \lnot \phi \equiv \lnot \forall x \; \lnot \phi$
\end{itemize}

8
natural_deduction_predicate_logic/multiple_choice/4_1_fol_lect_sol.tex
View File

@ -0,0 +1,8 @@
\item \lect Considering \textit{Quantifier Equivalences} in \textit{Natural Deduction} for \textit{Predicate Logic}, tick all statements in the list, that are equivalent.
\begin{itemize}
\item[$\square$] $\forall x \; \phi \equiv \exists x \; \lnot \phi$
\item[$\ticked$] $\forall x \; \phi \equiv \lnot \exists x \; \lnot \phi$
\item[$\ticked$] $\lnot \forall x \; \phi \equiv \exists x \; \lnot \phi$
\item[$\square$] $\exists x \; \lnot \phi \equiv \lnot \forall x \; \lnot \phi$
\end{itemize}

151
natural_deduction_predicate_logic/natural_deduction_predicate_logic.tex
View File

@ -0,0 +1,151 @@
%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
\ndDescription
\begin{questionSection}{Natural Deduction Rules}
\question{natural_deduction_predicate_logic/0001.tex}
{natural_deduction_predicate_logic/0001_sol.tex}
{3cm}
\question{natural_deduction_predicate_logic/0002.tex}
{natural_deduction_predicate_logic/0002_sol.tex}
{3cm}
\question{natural_deduction_predicate_logic/0014.tex}
{natural_deduction_predicate_logic/0014_sol.tex}
{3cm}
\question{natural_deduction_predicate_logic/0003.tex}
{natural_deduction_predicate_logic/0003_sol.tex}
{3cm}
\question{natural_deduction_predicate_logic/0004.tex}
{natural_deduction_predicate_logic/0004_sol.tex}
{3cm}
\question{natural_deduction_predicate_logic/0007.tex}
{natural_deduction_predicate_logic/0007_sol.tex}
{3cm}
\question{natural_deduction_predicate_logic/0008.tex}
{natural_deduction_predicate_logic/0008_sol.tex}
{3cm}
\question{natural_deduction_predicate_logic/0009.tex}
{natural_deduction_predicate_logic/0009_sol.tex}
{3cm}
\question{natural_deduction_predicate_logic/0010.tex}
{natural_deduction_predicate_logic/0010_sol.tex}
{3cm}
\question{natural_deduction_predicate_logic/0012.tex}
{no_solution}
{3cm}
\question{natural_deduction_predicate_logic/0013.tex}
{natural_deduction_predicate_logic/0013_sol.tex}
{3cm}
\question{natural_deduction_predicate_logic/2003.tex}
{no_solution}
{3cm}
\question{natural_deduction_predicate_logic/1003.tex}
{no_solution}
{3cm}
\question{natural_deduction_predicate_logic/2002.tex}
{natural_deduction_predicate_logic/2002_sol.tex}
{3cm}
\question{natural_deduction_predicate_logic/2001.tex}
{natural_deduction_predicate_logic/2001_sol.tex}
{3cm}
\question{natural_deduction_predicate_logic/2005.tex}
{natural_deduction_predicate_logic/2005_sol.tex}
{3cm}
\ifsolution \clearpage\fi
\question{natural_deduction_predicate_logic/2004.tex}
{natural_deduction_predicate_logic/2004_sol.tex}
{3cm}
\question{natural_deduction_predicate_logic/2006.tex}
{natural_deduction_predicate_logic/2006_sol.tex}
{3cm}
\question{natural_deduction_predicate_logic/2007.tex}
{no_solution}
{3cm}
\question{natural_deduction_predicate_logic/1001.tex}
{no_solution}
{3cm}
\question{natural_deduction_predicate_logic/1002.tex}
{natural_deduction_predicate_logic/1002_sol.tex}
{3cm}
\question{natural_deduction_predicate_logic/1004.tex}
{natural_deduction_predicate_logic/1004_sol.tex}
{3cm}
\question{natural_deduction_predicate_logic/1005.tex}
{natural_deduction_predicate_logic/1005_sol.tex}
{3cm}
\question{natural_deduction_predicate_logic/1006.tex}
{natural_deduction_predicate_logic/1006_sol.tex}
{3cm}
\question{natural_deduction_predicate_logic/1007.tex}
{natural_deduction_predicate_logic/1007_sol.tex}
{3cm}
\question{natural_deduction_predicate_logic/1008.tex}
{natural_deduction_predicate_logic/1008_sol.tex}
{3cm}
\question{natural_deduction_predicate_logic/1009.tex}
{natural_deduction_predicate_logic/1009_sol.tex}
{3cm}
\question{natural_deduction_predicate_logic/1010.tex}
{natural_deduction_predicate_logic/1010_sol.tex}
{3cm}
\question{natural_deduction_predicate_logic/1011.tex}
{natural_deduction_predicate_logic/1011_sol.tex}
{3cm}
\question{natural_deduction_predicate_logic/1012.tex}
{natural_deduction_predicate_logic/1012_sol.tex}
{3cm}
\question{natural_deduction_predicate_logic/1013.tex}
{no_solution}
{3cm}
\question{natural_deduction_predicate_logic/1014.tex}
{natural_deduction_predicate_logic/1014_sol.tex}
{3cm}
\question{natural_deduction_predicate_logic/1015.tex}
{natural_deduction_predicate_logic/1015_sol.tex}
{3cm}
\question{natural_deduction_predicate_logic/0005.tex}
{no_solution}
{3cm}
\question{natural_deduction_predicate_logic/2008.tex}
{no_solution}
{3cm}
\end{questionSection}

1
natural_deduction_predicate_logic/practical_questions/0_10_prac.tex
View File

@ -0,0 +1 @@
\item \prac \textbf{[3.5 Point]} $\exists x \; P(x) \imp \exists x \; Q(x) \quad \ent \quad \exists x \; (P(x) \imp Q(x))$

5
natural_deduction_predicate_logic/practical_questions/0_1_prac.tex
View File

@ -0,0 +1,5 @@
\item \prac \textbf{[2 Point]}
\begin{enumerate}
\item $(\forall x \; (\lnot A(x)) \lor (\exists x \; (B(x)) \quad \ent \quad \forall x \; (\lnot A(x) \lor B(x))$
\item $(\forall x \; (\lnot A(x)) \lor (\exists x \; (B(x)) \quad \ent \quad \exists x \; (\lnot A(x) \lor B(x))$
\end{enumerate}

1
natural_deduction_predicate_logic/practical_questions/0_2_prac.tex
View File

@ -0,0 +1 @@
\item \prac \textbf{[2 Point]} $ \exists x P(x) \lor \exists x Q(x) \ent \exists x( P(x) \lor Q(x))$

1
natural_deduction_predicate_logic/practical_questions/0_3_prac.tex
View File

@ -0,0 +1 @@
\item \prac \textbf{[3 Point]} $\exists b \; (a \imp B(b)) \quad \ent \quad a \imp \exists b \; B(b)$

1
natural_deduction_predicate_logic/practical_questions/0_4_prac.tex
View File

@ -0,0 +1 @@
\item \prac \textbf{[1 Point]} $\ent \quad (x = y + y) \land (y = 1 \lor y = 2)$

1
natural_deduction_predicate_logic/practical_questions/0_5_prac.tex
View File

@ -0,0 +1 @@
\item \prac \textbf{[3 Point]} $\exists x \; (S(x) \imp T(x)), \lnot T(z) \land \lnot T(y) \quad \ent \quad \lnot S(y)$

1
natural_deduction_predicate_logic/practical_questions/0_6_prac.tex
View File

@ -0,0 +1 @@
\item \prac \textbf{[1 Point]} $\exists x \forall y \; f(x) = f(y) \quad \ent \quad \exists x \forall y \; x = y $

1
natural_deduction_predicate_logic/practical_questions/0_7_prac.tex
View File

@ -0,0 +1 @@
\item \prac \textbf{[1 Point]} $\lnot \forall a \; \lnot \lnot (a = f(g(a))) \quad \ent \quad \lnot \lnot \exists a \; \lnot(a = f(g(a)))$

1
natural_deduction_predicate_logic/practical_questions/0_8_prac.tex
View File

@ -0,0 +1 @@
\item \prac \textbf{[3 Point]} $\forall r \; U(r) \land \forall r \; (S(r) \imp T(r)) \quad \ent \quad \exists r \; \lnot T(x) \imp \exists r (\lnot S(r) \land U(r))$

1
natural_deduction_predicate_logic/practical_questions/0_9_prac.tex
View File

@ -0,0 +1 @@
\item \prac \textbf{[3.5 Point]} $\exists a \; (P(a) \lor Q(a)),\quad \exists a \; P(a) \imp R(c),\quad \exists b \; Q(b) \imp R(c) \quad \ent \quad R(c)$

1
natural_deduction_predicate_logic/practical_questions/1_1_fol_lect.tex
View File

@ -0,0 +1 @@
\item \lect $\forall x \; P(x) \land \forall x \; (P(y) \imp Q(x)) \quad \ent \quad Q(z)$

9
natural_deduction_predicate_logic/practical_questions/1_1_fol_lect_sol.tex
View File

@ -0,0 +1,9 @@
\setlength\subproofhorizspace{1em}
\begin{logicproof}{0}
\forall x \; P(x) \land \forall x \; (P(y) \imp Q(x)) & prem.\\
\forall x \; P(x) & $\land \mathrm{e}_1$ 1\\
\forall x \; (P(y) \imp Q(x)) & $\land \mathrm{e}_2$ 1\\
P(y) & $\forall \mathrm{e}$ 2\\
P(y) \imp Q(z) & $\forall \mathrm{e}$ 3\\
Q(z) & $\imp \mathrm{e}$ 5,4
\end{logicproof}

1
natural_deduction_predicate_logic/practical_questions/1_1_fol_self.tex
View File

@ -0,0 +1 @@
\item \self $\forall x \; (P(x) \land Q(x)) \quad \ent \quad \forall x \; ( (Q(x) \lor R(x)) \land (R(x) \lor P(x)) )$

1
natural_deduction_predicate_logic/practical_questions/1_2_fol_lect.tex
View File

@ -0,0 +1 @@
\item \lect $\forall x \; P(x) \lor \forall x \; Q(x) \quad \ent \quad \forall y \; (P(y) \lor Q(y))$

21
natural_deduction_predicate_logic/practical_questions/1_2_fol_lect_sol.tex
View File

@ -0,0 +1,21 @@
\setlength\subproofhorizspace{1.7em}
\begin{logicproof}{2}
\forall x \; P(x) \lor \forall x \; Q(x) & prem.\\
\begin{subproof}
\forall x \; P(x) & ass.\\
\begin{subproof}
\llap{$t\enspace \;$} P(t) & $\forall \mathrm{e}$ 2\\
P(t) \lor Q(t) & $\lor \mathrm{i}_1$ 3
\end{subproof}
\forall y \; (P(y) \lor Q(y)) & $\forall \mathrm{i}$ 3-4
\end{subproof}
\begin{subproof}
\forall x \; Q(x) & ass.\\
\begin{subproof}
\llap{$s\enspace \;$} Q(s) & $\forall \mathrm{e}$ 6\\
P(s) \lor Q(s) & $\lor \mathrm{i}_2$ 7
\end{subproof}
\forall y \; (P(y) \lor Q(y)) & $\forall \mathrm{i}$ 7-8
\end{subproof}
\forall y \; (P(y) \lor Q(y)) & $\imp \mathrm{e}$ 1,2-5,6-9
\end{logicproof}

1
natural_deduction_predicate_logic/practical_questions/1_2_fol_self.tex
View File

@ -0,0 +1 @@
\item \self $\forall x \; (P(x)\lor Q(x)),\quad \forall x \; (\lnot P(x)) \quad \ent \quad \forall x \; (Q(x))$

1
natural_deduction_predicate_logic/practical_questions/2_1_fol_lect.tex
View File

@ -0,0 +1 @@
\item \lect $\forall x \; (P(x) \imp Q(y)), \forall y \; (P(y) \land R(x)) \quad \ent \quad \exists x \; Q(x))$

10
natural_deduction_predicate_logic/practical_questions/2_1_fol_lect_sol.tex
View File

@ -0,0 +1,10 @@
\setlength\subproofhorizspace{1em}
\begin{logicproof}{0}
\forall x \; (P(x) \imp Q(y)) & prem.\\
\forall y \; (P(y) \land R(x)) & prem.\\
P(t) \imp Q(y) & $\forall \mathrm{e}$ 1\\
P(t) \land R(x) & $\forall \mathrm{e}$ 2\\
P(t) & $\land \mathrm{e}_1$ 4\\
Q(y) & $\imp \mathrm{e}$ 3\\
\exists x \; Q(x) & $\exists \mathrm{i}$ 6
\end{logicproof}

1
natural_deduction_predicate_logic/practical_questions/2_1_fol_self.tex
View File

@ -0,0 +1 @@
\item \self $\exists x \; (Q(x) \imp R(x)),\quad \exists x \; (P(x)\land Q(x)) \quad \ent \quad \exists x \; (P(x) \land R(x))$

1
natural_deduction_predicate_logic/practical_questions/2_2_fol_lect.tex
View File

@ -0,0 +1 @@
\item \lect $\forall a \forall b \; (P(a) \land Q(b)) \quad \ent \quad \forall a \exists b \; (P(a) \lor Q(b))$

12
natural_deduction_predicate_logic/practical_questions/2_2_fol_lect_sol.tex
View File

@ -0,0 +1,12 @@
\setlength\subproofhorizspace{1.1em}
\begin{logicproof}{1}
\forall a \forall b \; (P(a) \land Q(b)) & prem.\\
\begin{subproof}
\llap{$t\enspace \;$} \forall b \; (P(s) \land Q(b)) & $\forall \mathrm{e}$ 1\\
P(s) \land Q(t) & $\forall \mathrm{e}$ 2\\
P(s) & $\land \mathrm{e}_1$ 3\\
P(s) \lor Q(t) & $\lor \mathrm{i}_1$ 4\\
\exists b \; (P(s) \lor Q(b)) & $\exists \mathrm{i}$ 5
\end{subproof}
\forall a \exists b \; (P(a) \lor Q(b)) & $\forall \mathrm{i}$ 2-6
\end{logicproof}

1
natural_deduction_predicate_logic/practical_questions/2_2_fol_self.tex
View File

@ -0,0 +1 @@
\item \self $\forall x \; (Q(x) \imp R(x)),\quad \exists x \; (P(x)\land Q(x)) \quad \ent \quad \exists x \; (P(x) \land R(x))$

Some files were not shown because too many files changed in this diff

Write Preview
Loading…
Cancel
Save