Answer:
The given argument  ∀x (S(x) ∧ (M(x) V D(x)) --> ¬ A(x)) ∧ S(Penelope) ∧ A(Penelope) -->¬ D(Penelope) is valid.
Explanation:
Solution:
Let us Consider following predicates:
M(x): x missed the class
D(x): x got a detention
S(x): x is a student in the class
A(x): x got an A
Now,
We Express the hypotheses and conclusion as:
The hypotheses: ∀x (S(x) ∧ (M(x) V D(x)) -->  A(x)) and S(Penelope) and A(Penelope)
So,
The Conclusion: Â D(Penelope)
Thus,
The Argument:
∀x (S(x) ∧ (M(x) V D(x)) -->  A(x)) ∧ S(Penelope) ∧ A(Penelope) -->D(Penelope)
Then,
The given argument is valid or correct and prove using the inference  rule as follows:
Step            Premises           Reason (Rule used)
1.  ∀x (S(x) ∧ (M(x) V D(x)) -->  A(x))         Premise
2. S(Penelope) ∧ (M(Penelope)
 V D(Penelope)) --> ¬ A(Penelope)       Universal instantiation
3. Â S(Penelope) Â Â Â Â Â Â Â Â Â Â Â Â Â Â Â Â Â Â Â Â Â Â Â Premise
4. Â A(Penelope) Â Â Â Â Â Â Â Â Â Â Â Â Â Â Â Â Â Â Â Â Â Â Â Premise
5. ¬[S(Penelope) ∧ (M(Penelope)
 V D(Penelope))]                     2,4, Modus Tollens
6. ¬S(Penelope) V (¬M(Penelope)
 ∧ ¬D(Penelope))                     De Morgan law
7.¬M(Penelope) ∧ ¬D(Penelope)         3,6,Disjunctive Syllogism
8¬D(Penelope)                        7, Simplification
Therefore, the given argument ∀x (S(x) ∧ (M(x) V D(x)) --> ¬ A(x)) ∧ S(Penelope) ∧ A(Penelope) -->¬ D(Penelope) is valid.
Answer:
Consider following predicates:
M(x): x missed the class
D(x): x got a detention
S(x): x is a student in the class
Express the hypotheses and conclusion
Hypotheses:
∀x (S(x) ∧ M(x) --> D(x)) and S(Penelope) and D(Penelope)
Conclusion: M(Penelope)
Argument:
∀x (S(x) ∧ M(x) --> D(x)) ∧ S(Penelope) ∧ D(Penelope) --> M(Penelope)
The given argument is valid and prove using rules of inference as follows (Check attached image)
