First we find the truth table for $\\var{a} \\var{op} \\var{b}$:
\n| $p$ | $q$ | $\\var{a} \\var{op} \\var{b}$ |
|---|---|---|
| $\\var{disp[0]}$ | \n$\\var{disq[0]}$ | \n$\\var{ev1[0]}$ | \n
| $\\var{disp[1]}$ | \n$\\var{disq[1]}$ | \n$\\var{ev1[1]}$ | \n
| $\\var{disp[2]}$ | \n$\\var{disq[2]}$ | \n$\\var{ev1[2]}$ | \n
| $\\var{disp[3]}$ | \n$\\var{disq[3]}$ | \n$\\var{ev1[3]}$ | \n
Then the truth table for $\\var{a1} \\var{op2} \\var{b1}$:
\n| $p$ | $q$ | $\\var{a1} \\var{op2} \\var{b1}$ |
|---|---|---|
| $\\var{disp[0]}$ | \n$\\var{disq[0]}$ | \n$\\var{ev2[0]}$ | \n
| $\\var{disp[1]}$ | \n$\\var{disq[1]}$ | \n$\\var{ev2[1]}$ | \n
| $\\var{disp[2]}$ | \n$\\var{disq[2]}$ | \n$\\var{ev2[2]}$ | \n
| $\\var{disp[3]}$ | \n$\\var{disq[3]}$ | \n$\\var{ev2[3]}$ | \n
Putting these together to find $(\\var{a} \\var{op} \\var{b})\\var{op1}(\\var{a1} \\var{op2} \\var{b1})$:
\n\n| $\\var{a} \\var{op} \\var{b}$ | $\\var{a1} \\var{op2} \\var{b1}$ | $(\\var{a} \\var{op} \\var{b})\\var{op1}(\\var{a1} \\var{op2} \\var{b1})$ |
|---|---|---|
| $\\var{ev1[0]}$ | \n$\\var{ev2[0]}$ | \n$\\var{t_value[0]}$ | \n
| $\\var{ev1[1]}$ | \n$\\var{ev2[1]}$ | \n$\\var{t_value[1]}$ | \n
| $\\var{ev1[2]}$ | \n$\\var{ev2[2]}$ | \n$\\var{t_value[2]}$ | \n
| $\\var{ev1[3]}$ | \n$\\var{ev2[3]}$ | \n$\\var{t_value[3]}$ | \n
| $p$ | $q$ | $\\var{a} \\var{op} \\var{b}$ | $\\var{a1} \\var{op2} \\var{b1}$ | $(\\var{a} \\var{op} \\var{b}) \\var{op1} (\\var{a1} \\var{op2} \\var{b1})$ |
|---|---|---|---|---|
| $\\var{disp[0]}$ | \n$\\var{disq[0]}$ | \n[[0]] | \n[[4]] | \n[[8]] | \n
| $\\var{disp[1]}$ | \n$\\var{disq[1]}$ | \n[[1]] | \n[[5]] | \n[[9]] | \n
| $\\var{disp[2]}$ | \n$\\var{disq[2]}$ | \n[[2]] | \n[[6]] | \n[[10]] | \n
| $\\var{disp[3]}$ | \n$\\var{disq[3]}$ | \n[[3]] | \n[[7]] | \n[[11]] | \n
Fyll inn S og F i oppbyggingen av sannhetstabellen for uttrykket \\[(\\var{a} \\var{op} \\var{b})\\var{op1}(\\var{a1} \\var{op2} \\var{b1}).\\] Tast inn S for sann og F for falsk.
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\nFor example: $(p \\lor \\neg q) \\land(q \\to \\neg p)$.
", "licence": "Creative Commons Attribution 4.0 International"}, "type": "question", "showQuestionGroupNames": false, "question_groups": [{"name": "", "pickingStrategy": "all-ordered", "pickQuestions": 0, "questions": []}], "contributors": [{"name": "Tore Gaupseth", "profile_url": "https://numbas.mathcentre.ac.uk/accounts/profile/28/"}]}]}], "contributors": [{"name": "Tore Gaupseth", "profile_url": "https://numbas.mathcentre.ac.uk/accounts/profile/28/"}]}