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Sagot :
Using the rule of Conditional Proof :- Premise: E3(F36} ~l € H 2.H3(GsI} (FsIls(v~H) I :(E'H)3J B: 1. If B3(Cv~D) ~Cv(B ~ D), then B3(C) is true.
Conclusion: If B3(Cv~D) ~Cv(B ~ D), then H3(GsI} (FsIls(v~H)) is true. 3. If E'H)3J is true, then H3(GsI} (FsIls(v~H)) is true.
Conditional proofs, in their plural form (logic) a demonstration that, if an assumption A is true, then a logical conclusion or assertion B must likewise be true, i.e., B is true provided that A is true. A conditional proof is one that asserts a conditional and demonstrates that the conditional's antecedent inevitably results in the consequent. The conditional proof assumption refers to the presumptive antecedent of a conditional proof (CPA). Therefore, the purpose of a conditional proof is to show that the desired conclusion would logically follow if the CPA were true.
To know more about conditional proof:
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