Given the conditional statement, determine the inverse statement. Statement: If it is summer, then some people are not drinking lemonade. If it is not summer, then all people are drinking lemonade. If all people are drinking lemonade, then it is not summer. If it is summer, then no people are drinking lemonade. If all people are drinking lemonade, then it is summer.
Since it says the since the conditional is "if p then q" and the inverse is "if not p, then not q" I think it's supposed to be A? @jayfafr
If all people are drinking lemonade, then it is not summer."
your wrong actually
The given statement is: "If it is summer, then some people are not drinking lemonade."
The inverse statement would be: "If some people are not drinking lemonade, then it is not summer."
Oh-
Yeah that does make more sense now that I think about it
The inverse statement of the given conditional statement is formed by negating both the hypothesis and the conclusion. Given statement: if it is summer, then some people are not drinking lemonade. Inverse statement: if it is not summer then all people are drinking lemonade. therefore the correct answer is: - If it is not summer, then all people are drinking lemonade
lol
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