OpenStudy (anonymous):
Which choice shows a true conditional, with the hypothesis and conclusion identified correctly? (1 point) Yesterday was Monday if tomorrow is Thursday. Hypothesis: Tomorrow is Thursday. Conclusion: Yesterday was Monday. If tomorrow is Thursday, then yesterday was Tuesday. Hypothesis: Yesterday was Tuesday. Conclusion: Tomorrow is not Thursday. If tomorrow is Thursday, then yesterday was Tuesday. Hypothesis: Yesterday was Tuesday. Conclusion: Tomorrow is Thursday. Yesterday was Tuesday if tomorrow is Thursday. Hypothesis: Tomorrow is Thursday. Conclusion: Yesterday was Tuesday. Wh
OpenStudy (bahrom7893):
Yesterday was Tuesday if tomorrow is Thursday. Hypothesis: Tomorrow is Thursday. Conclusion: Yesterday was Tuesday.
Directrix (directrix):
Yesterday was Monday if tomorrow is Thursday. Hypothesis: Tomorrow is Thursday. Conclusion: Yesterday was Monday.
OpenStudy (bahrom7893):
wait lol directrix... what about tuesday?
OpenStudy (bahrom7893):
Directrix, you're wrong, sorry
Directrix (directrix):
Sorry but I'm right.
OpenStudy (bahrom7893):
U can't be right, if tomorrow is thursday, yesterday was tuesday, because today is wednesday.
OpenStudy (bahrom7893):
the day before yesterday was monday
OpenStudy (bahrom7893):
uhmm hello? people? Or am i getting my days of week wrong?
OpenStudy (mertsj):
Today is Wednesday. What is tomorrow? What is yesterday?
OpenStudy (radar):
Too many "ifs" lol, I have enough trouble keeping track of the days (being retired) M T W TH F S Su
OpenStudy (bahrom7893):
Yesterday was Tuesday if tomorrow is Thursday. Hypothesis: Tomorrow is Thursday. Conclusion: Yesterday was Tuesday. If tomorrow = thursday, then today is wednesday, conclusion = yesterday was tuesday
OpenStudy (mertsj):
Today is Tuesday. What is tomorrow? What is yesterday?
OpenStudy (mertsj):
So how can Directrix be correct?
OpenStudy (bahrom7893):
that's what i've been trying to say... lol
OpenStudy (phi):
Which choice shows a true conditional, with the hypothesis and conclusion identified correctly? Choices B and C do not correctly identify the hypothesis/conclusion. A is a false conditional D is a true conditional. The question asks for a true conditional, therefore choice D The truth value of a conditional if p then q = not(p) or q
OpenStudy (mertsj):
Yep. I agree phi.
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