Answer:
Tomorrow is Thursday if today is Wednesday
Hypothesis: Today is Wednesday .
Conclusion: Tomorrow is Thursday.
Step-by-step explanation:
Given
1. If today is Wednesday , then tomorrow is Thursday.
Hypothesis p : Today is Wednesday .
Conclusion q : Tomorrow is Thursday .
Conditional statement: [tex]p\implies q[/tex]
But given
Hypothesis : Tomorrow is Thursday .
Conclusion: Today is Wednesday .
Converse statement; [tex]q\implies P[/tex]
Therefore, the given statement is converse not conditional.
2. If today is Wednesday , then tomorrow is Thursday.
Given
Hypothesis p: Tomorrow is Thursday.
Conclusion q: Today is not Wednesday.
Statement :[tex]q\implies \neg p[/tex]
Hence, it is not a true conditional statement.
3.Tomorrow is Friday if today is Wednesday.
Given
Hypothesis: Today is Wednesday.
Conclusion: Tomorrow is Friday.
It is not a true conditional statement.
4. Tomorrow is Thursday if today is Wednesday.
Given
Hypothesis p: Today is Wednesday.
Conclusion q: Tomorrow is Thursday.
Then the statement : [tex]p\implies q[/tex]
It is a true conditional statement.Because when hypothesis true and conclusion is true then the conditional is true.
