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Get one of these. Think about *linear pairs *degrees in a triangle *degrees in a quadrilateral. Warm up. Make a new notebook then do the problems below. 2x + 3 = 4 + 5x X = -1/3 43 + 22 + 67 = 5x – 2 X = 134/5 √4 +2, -2 √9 +3, -3 √36 +6, -6. 2.2 Intro to Logic.
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Get one of these Think about *linear pairs *degrees in a triangle *degrees in a quadrilateral
Warm up Make a new notebook then do the problems below. • 2x + 3 = 4 + 5x • X = -1/3 • 43 + 22 + 67 = 5x – 2 • X = 134/5 • √4 • +2, -2 • √9 • +3, -3 • √36 • +6, -6
2.2 Intro to Logic Conditional Statements If-then form: If a car is a Corvette, then it is a Chevrolet. Notation: If p then q or p q Picking it apart: Ifa car is a Corvette,thenit is a Chevrolet. hypothesis conclusion (Notice “if” and “then” are not part of the hypothesis and conclusion.)
Euler diagrams(pronounced “Oiler”) • Often called Venn diagrams. Be sure you know both names. • Our example: If a car is a Corvette, then it is a Chevrolet. • Since all Corvettes are Chevrolets, and Corvettes are just a piece of the Chevrolet line, here is what the Euler looks like: • (it would be safe to say that the hypothesis goes ‘inside’ while the conclusion goes ‘outside’.) Corvettes
What about Susan? • Consider this: • Susan’s car is a Corvette. • Where does it belong in the diagram? (With Chevrolets or with Corvettes?) • Corvettes • Susan’s car • The complete process of drawing a conclusion is called a logical argument. • This 3 part argument is called a syllogism
Our SYLLOGISM about Susan(3 parts) 1. If a car is a Corvette, then it is a Chevrolet. 2. Susan’s car is a Corvette. 3. Therefore, Susan’s car is a Chevrolet.
Try this: • (Remember that an equilateral triangle is a triangle with 3 congruent sides.) • (Remember that an isosceles triangle is a triangle with at least 2 congruent sides.) Isoceles Triangles Equilateral Triangles ∆ ABC Draw an Euler diagram that conveys the following information: If a triangle is equilateral, then the triangle is isosceles. ∆ ABC is equilateral. What conclusion can you draw about ∆ ABC ? ∆ ABC IS ISOSCELES.
CONVERSE A converse statement switches the hypothesis and conclusion of the conditional statement. (The ‘if’ and ‘then’ stay put) Conditional: If a car is a Corvette, then it is a Chevrolet. Converse: If a car is a Chevrolet, then it is a Corvette.
Logical Chains Consider this: If cats freak, then mice frisk. If sirens shriek, then dogs howl. If dogs howl, then cats freak. We need to put these statements in a logical order…. So…. The easiest way is to find a conclusion that matches a hypothesis and make a zig-zag pattern: If sirens shriek, then dogs howl. If dogs howl, then cats freak. If cats freak, then mice frisk. CONCLUSION: If sirens shriek, then mice frisk.
The Logical Chain is also called: • Transitive Property. If A then B, And if B then C Conclusion: If A then C.
Quick Review • What is another name for an if-then statement? • What is the hypothesis part of an if-then statement? • What is the conclusion part of an if-then statement? • How do we make converse statement? • What is an Euler diagram? • Explain the Transitive property? • How would you write this as a conditional statement: All people who live in Ohio live in the United States. • How would you write the previous statement as a converse statement?
Assignment • Pg 95, 9-33 all, ≠ 29
