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21 sty 2020 · Learn how to form and verify conditional statements, converses, inverses, contrapositives, and biconditionals in geometry. Watch video lessons and practice problems with postulates and Venn diagrams.
28 lis 2020 · Conditional Statement: A conditional statement (or 'if-then' statement) is a statement with a hypothesis followed by a conclusion. Angle: A geometric figure formed by two rays that connect at a single point or vertex. antecedent: The antecedent is the first, or “if,” part of a conditional statement. apodosis
Conditional Statement – statement that can be written in if-then form. Converse – formed by exchanging the hypothesis and conclusion of the conditional statement. Inverse – negating both the hypothesis and conclusion. Contrapositive – negating the hypothesis and conclusion of the converse.
Geometry uses conditional statements that can be symbolically written as \(p \rightarrow q\) (read as “if , then”). “If” is the hypothesis , and “then” is the conclusion . The conclusion is sometimes written before the hypothesis.
A conditional statement (also called an if-then statement) is a statement with a hypothesis followed by a conclusion. For example, Original: All students have a math class. Rewritten in if-then form, this statement would be Conditional: “If you are a student, then you have a math class”
2.1 Conditional Statements The conditional statement, inverse, converse and contrapositive all have a truth value. That is, we can determine if they are true or false. When two statements are both true or both false, we say that they are logically equivalent.
conditional statement, symbolized by p statement” that contains a hypothesis p and a q, can be written as an “if-then conclusion q. Here is an example. If a polygon is a triangle, then the sum of its angle measures is 180 °. hypothesis, p. conclusion, q. EXPLORE IT Determining Whether Statements Are True or False. Work with a partner.
