The inverse of a conditional statement is when both the hypothesis and conclusion are negated
2. D.
The contrapositive of a conditional statement is a combination of the converse and the inverse. The “If” part or p is replaced with the “then” part or q and the “then” part or q is replaced with the “If” part or p. After that, both parts are negated. In Geometry the conditional statement is referred to as p → q.
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Answer:
1. B.
The inverse of a conditional statement is when both the hypothesis and conclusion are negated
2. D.
The contrapositive of a conditional statement is a combination of the converse and the inverse. The “If” part or p is replaced with the “then” part or q and the “then” part or q is replaced with the “If” part or p. After that, both parts are negated. In Geometry the conditional statement is referred to as p → q.
both hypothesis and conclusion