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GEOMETRY 2.1 Conditional Statements and distance. September 7, 2016 2.1 CONDITIONAL STATEMENTS ESSENTIAL QUESTION When is a conditional statement true or false? September 7, 2016 2.1 CONDITIONAL STATEMENTS WHAT YOU WILL LEARN oWrite conditional statements. oUse definitions written as conditional statements. oWrite biconditional statements. September 7, 2016 2.1 CONDITIONAL STATEMENTS September 7, 2016 2.1 CONDITIONAL STATEMENTS CONDITIONAL A type of logical statement that has two parts, a hypothesis and a conclusion. A conditional can be written in IF-THEN form. September 7, 2016 2.1 CONDITIONAL STATEMENTS SHORTHAND If HYPOTHESIS, then CONCLUSION. If P, then Q. In the study of logic, P’s and Q’s are universally accepted to represent hypothesis and conclusion. September 7, 2016 2.1 CONDITIONAL STATEMENTS EXAMPLE 1 If I study hard, hard then I will get good grades. HYPOTHESIS September 7, 2016 CONCLUSION 2.1 CONDITIONAL STATEMENTS CAN YOU IDENTIFY THE HYPOTHESIS AND CONCLUSION? If today is Monday, then tomorrow is Tuesday. Hypothesis: today is Monday Conclusion: tomorrow is Tuesday. Note: IF is NOT part of the hypothesis, and THEN is NOT part of the conclusion. September 7, 2016 2.1 CONDITIONAL STATEMENTS YOUR TURN Underline the hypothesis and circle the conclusion. 1. If the weather is warm, then we should go swimming. 2. If you want good service, then take your car to Joe’s Service Center. September 7, 2016 2.1 CONDITIONAL STATEMENTS REWRITING STATEMENTS. oUse common sense. The hypothesis always follows “IF.” oDon’t over analyze it. No “if?” The first part is usually the hypothesis. oMake sure the sentence is grammatically correct. Make your English teacher proud! Does it sound right? September 7, 2016 2.1 CONDITIONAL STATEMENTS EXAMPLE 2A Rewrite the following statement in if-then form: All birds have feathers. What is the hypothesis? All birds What is the conclusion? have feathers If-then form? If an animal is a bird, then it has feathers. September 7, 2016 2.1 CONDITIONAL STATEMENTS EXAMPLE 2B Rewrite the following statement in if-then form: You are in Texas if you are in Houston. What is the hypothesis? You are in Houston What is the conclusion? You are in Texas If-then form? If you are in Houston, then you are in Texas. September 7, 2016 2.1 CONDITIONAL STATEMENTS EXAMPLE 2C Rewrite the following statement in if-then form: An even number is divisible by 2. What is the hypothesis? An even number What is the conclusion? Divisible by 2. If-then form? If a number is even, then it is divisible by 2. September 7, 2016 2.1 CONDITIONAL STATEMENTS YOUR TURN Rewrite the conditional statement in if-then form. 3. Today is Monday if yesterday was Sunday. If yesterday was Sunday, then today is Monday. 4. An object that measures 12 inches is one foot long. If an object measures 12 inches, then it is one foot long. September 7, 2016 2.1 CONDITIONAL STATEMENTS NEGATION The negative of the original statement. Examples: I am happy. I am not happy. mC = 30°. mC 30°. A, B and C are on the same line. A, B and C are not on the same line. September 7, 2016 2.1 CONDITIONAL STATEMENTS NEGATION September 7, 2016 2.1 CONDITIONAL STATEMENTS EXAMPLE 3 Write the negation of each statement. a. The ball is red. The ball is not red. b. The cat is not black. The cat is black. c. The car is white. The car is not white. September 7, 2016 2.1 CONDITIONAL STATEMENTS September 7, 2016 2.1 CONDITIONAL STATEMENTS RELATED CONDITIONAL STATEMENTS Looking at the conditional statement: If p, then q. There are three similar statements we can make. o Converse o Inverse o Contrapositive September 7, 2016 2.1 CONDITIONAL STATEMENTS CONVERSE If Q, then P. The converse of a statement is formed by switching the hypothesis and the conclusion. Conditional: If you play drums, then you are in the band. Converse: If you are in the band, then you play drums. September 7, 2016 2.1 CONDITIONAL STATEMENTS EXAMPLE 4 Write the converse of the statement below. If you like tennis, then you play on the tennis team. Answer: If you play on the tennis team, then you like tennis. September 7, 2016 2.1 CONDITIONAL STATEMENTS INVERSE If not P, then not Q. The inverse is formed by taking the negation of the hypothesis and of the conclusion. Conditional: If x = 3, then 2x = 6. Inverse: If x 3, then 2x 6. September 7, 2016 2.1 CONDITIONAL STATEMENTS EXAMPLE 5 Write the inverse of the statement below. If today is Monday, then tomorrow is Tuesday. Answer: If today is not Monday, then tomorrow is not Tuesday. September 7, 2016 2.1 CONDITIONAL STATEMENTS CONTRAPOSITIVE If not Q, then not P. The contrapositive is formed by switching and negating the hypothesis and the conclusion. (Take the inverse of the converse, or, the converse of the inverse.) Conditional: If I am in 10th grade, then I am a sophomore. Contrapositive: If I am not a sophomore, then I am not in 10th grade. September 7, 2016 2.1 CONDITIONAL STATEMENTS EXAMPLE 6 Write the contrapositive of the statement below. If x is odd, then x + 1 is even. Negate Negate x + 1 is not even x is not odd If x+1 is not even, then x is not odd. September 7, 2016 2.1 CONDITIONAL STATEMENTS LOGICAL STATEMENTS If I live in Mesa, then I live in Arizona. Converse: (switch hypothesis and conclusion) If I live in Arizona, then I live in Mesa. Inverse: (negate hypothesis and conclusion) If I don’t live in Mesa, then I don’t live in Arizona. Contrapositive: (switch and negate both) If I don’t live in Arizona, then I don’t live in Mesa. September 7, 2016 2.1 CONDITIONAL STATEMENTS YOUR TURN. WRITE THE CONVERSE, INVERSE, AND CONTRAPOSITIVE. If mA = 20, then A is acute. Converse: (switch hypothesis and conclusion) If A is acute, then mA = 20. Inverse: (negate hypothesis and conclusion) If mA 20, then A is not acute. Contrapositive: (switch and negate both) If A is not acute, then mA 20. September 7, 2016 2.1 CONDITIONAL STATEMENTS REVIEW: LOGICAL STATEMENTS Conditional: If P, then Q. Converse: If Q, then P. Inverse: If not P, then not Q. Contrapositive: If not Q, then not P. September 7, 2016 2.1 CONDITIONAL STATEMENTS DEFINITION: PERPENDICULAR LINES Two lines that intersect to form a right angle. n Notation: m September 7, 2016 mn 2.1 CONDITIONAL STATEMENTS USING DEFINITIONS You can write a definition as a conditional statement in if-then form. Let’s look at an example: Perpendicular Lines: two lines that intersect to form a right angle. The conditional statement would be: If two lines are perpendicular, then they intersect to form a right angle. The converse statement also ends up being true: If two lines intersect to form a right angle, then they are perpendicular lines. September 7, 2016 2.1 CONDITIONAL STATEMENTS DAY 2 2.1 Conditional Statements TRUTH VALUES •A conditional is either True or False. •To show that it is true, you must have an argument (a proof) that it is true in all cases. •To show that it is false, you need to provide at least one counterexample. September 7, 2016 2.1 CONDITIONAL STATEMENTS EXAMPLE 7 True or false? If false provide a counter example. If x2= 9, then x = 3. FALSE! Counterexample: x could be –3. September 7, 2016 2.1 CONDITIONAL STATEMENTS EXAMPLE 8 If x = 10, then x + 4 = 14. True! Proof: x = 10 x + 4 = 10 + 4 x + 4 = 14 September 7, 2016 2.1 CONDITIONAL STATEMENTS EQUIVALENT STATEMENTS When two statements are both true or both false, they are called equivalent statements. A conditional statement is always equivalent to its contrapositive. The inverse and converse are also equivalent. September 7, 2016 2.1 CONDITIONAL STATEMENTS EQUIVALENT STATEMENTS Original: TRUE If mA = 20, then A is acute. Converse: (switch hypothesis and conclusion) If A is acute, then mA = 20. Inverse: (negate hypothesis and conclusion) If mA 20, then A is not acute. Contrapositive: (switch and negate both) If A is not acute, then mA 20. September 7, 2016 False False TRUE 2.1 CONDITIONAL STATEMENTS EXAMPLE 9 Statement: If x = 5, then x2 = 25. TRUE Contrapositive: If x2 25, then x 5. TRUE Converse: If x2 = 25, then x = 5. FALSE – could be –5. Inverse: If x 5, then x2 25. September 7, 2016 FALSE 2.1 CONDITIONAL STATEMENTS JUSTIFYING STATEMENTS In math, deciding if a statement is true or false demands that you can justify your answers. “Just because”, or, “It looks like it” are not sufficient. Justification must come in the form of Postulates, Definitions, or Theorems. September 7, 2016 GEOMETRY 2.1 CONDITIONAL STATEMENTS Statement D, X, and B are collinear. EXAMPLE 10 A D X B Truth Value TRUE Reason Definition of collinear points. C September 7, 2016 GEOMETRY 2.1 CONDITIONAL STATEMENTS Statement EXAMPLE 11 AC DB Truth Value TRUE A D X B Reason Definition of Perpendicular lines Def lines C September 7, 2016 GEOMETRY 2.1 CONDITIONAL STATEMENTS Statement EXAMPLE 12 CXB is adjacent to BXA Truth Value TRUE A Reason D X B Def. of adjacent angles Def. of adj. s C September 7, 2016 GEOMETRY 2.1 CONDITIONAL STATEMENTS Statement DXA and CXB are adjacent angles. Truth Value EXAMPLE 13 FALSE A D X B Reason There is not a common side. (Or, they are vertical angles.) C September 7, 2016 GEOMETRY 2.1 CONDITIONAL STATEMENTS VERY IMPORTANT! In doing proofs, you must be able to justify every statement with a valid reason. To be able to do this you must know every definition, postulate and theorem. Being able to look them up is no substitute for memorization. September 7, 2016 GEOMETRY 2.1 CONDITIONAL STATEMENTS YOUR TURN D A E B F September 7, 2016 H C G GEOMETRY 2.1 CONDITIONAL STATEMENTS YOUR TURN False (they are not collinear) True (add to 180 ) True (post. 8) D A E B H C G F False (no rt. mark) September 7, 2016 GEOMETRY 2.1 CONDITIONAL STATEMENTS YOUR TURN True (def. lines) False (they are supplementary) E B True (half of 180 is 90 -- a right ) September 7, 2016 D A H C F G GEOMETRY 2.1 CONDITIONAL STATEMENTS BICONDITIONALS When a conditional statement and its converse are both TRUE, they can be written as a single biconditional statement. Let’s look at an example: Conditional If 2 s are complementary, then their sum is 90°. True Converse If the sum of 2 s is 90°, then they are complementary. True Biconditional 2 s are complementary if and only if their sum is 90°. September 7, 2016 2.1 CONDITIONAL STATEMENTS BICONDITIONALS (Continued) Written with p’s and q’s a biconditional looks like this: p if and only if q. or p iff q. Iff means “if and only if”. September 7, 2016 2.1 CONDITIONAL STATEMENTS PUTTING IT ALL TOGETHER Statements Conditional Converse Inverse Contrapostive Biconditional September 7, 2016 In words In symbols If p, then q 𝑝→𝑞 If q, then p 𝑞→𝑝 If not p, then not q ~𝑝 → ~𝑞 If not q, then not p ~𝑞 → ~𝑝 p if and only if q 𝑝↔𝑞 2.1 CONDITIONAL STATEMENTS EXAMPLE 14 Let P be the statement: “x = 3” Let Q be the statement: “2x = 6” Write: PQ If x = 3, then 2x = 6. QP If 2x = 6, then x = 3. PQ x = 3 if and only if 2x = 6. or 2x = 6 iff x = 3. September 7, 2016 2.3 DEDUCTIVE REASONING 51 DEFINITIONS ALL definitions are biconditionals. Example: Definition of Congruent Angles Two angles are congruent iff they have the same measure. Conditional: If two angles are congruent, then they have the same measure. Converse: If two angles have the same measure, then they are congruent. September 7, 2016 GEOMETRY 2.1 CONDITIONAL STATEMENTS TRUTH VALUES OF BICONDITIONALS A biconditional is TRUE if both the conditional and the converse are true. A biconditional is FALSE if either the conditional or the converse is false, or both are false. September 7, 2016 GEOMETRY 2.1 CONDITIONAL STATEMENTS EXAMPLE 15 Biconditional or False? False! x = 5 iff x2 = 25. True Conditional true or False? If x = 5, then x2 = 25. True Converse False!or False? If x2 = 25, then x = 5. True September 7, 2016 GEOMETRY 2.1 CONDITIONAL STATEMENTS YOUR TURN Write the following biconditional statement as a conditional statement and its converse. An angle is obtuse iff it measures between 90 and 180. Answer Conditional: If an angle is obtuse, then it measures between 90 and 180. Converse: If an angle measures between 90 and 180, then it is obtuse. September 7, 2016 GEOMETRY 2.1 CONDITIONAL STATEMENTS WHY IS THIS IMPORTANT? Geometry is stated in rules of logic. We use logic to prove things. It teaches us to think clearly and without error. It impresses girl friends (or boy friends). You can talk like… September 7, 2016 2.1 CONDITIONAL STATEMENTS September 7, 2016 2.1 CONDITIONAL STATEMENTS ASSIGNMENT 2.1 DAY 1 #2-20 EVEN, 50, 64-68 EVEN 2.1 DAY 2 #26-36 EVEN, 37, 38, 46, 48 CHALLENGE PROBLEM #62 September 7, 2016 2.1 CONDITIONAL STATEMENTS
