Q:

What is a conditional statement in geometry?

A:

A conditional statement is an "if-then" statement used in geometry to relate a particular hypothesis to its conclusion. An arrow originating at the hypothesis, denoted by p, and pointing at the conclusion, denoted by q, represents a conditional statement. A conditional statement is read as, "if p then q."

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If the hypothesis is true and the conclusion is false, then the conditional statement is false. When the positions of the hypothesis and the conclusion are interchanged, the result is a converse statement. A converse statement and its conditional do not have the same meaning. The negation of the hypothesis and the conclusion results in an inverse statement.

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