3.5 what’s the condition? pg. 16 conditional statements
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3.5
What’s the Condition?
Pg. 16Conditional Statements
3.5 – What’s the Condition?______________Conditional Statements
Today you are going to explore conditional statements and rearrange them to develop a different meaning. You are also going to examine how to prove something with contradictions and counterexamples.
Conditional Statement
Hypothesis
Conclusion
If ______, then _________
If a, then b
Part following “if”a
Part following “then”b
3.24 – PARTS OF CONDITIONAL STATEMENTSIdentify the hypothesis and conclusion of each conditional statement. a. If a # is divisible by 2, then the number is even.
b. If the sidewalks are wet, then it has been raining.
hypothesis conclusion
hypothesis conclusion
3.25 – CONDITIONAL STATEMENTSRewrite the statements in “If …, then….” form. a. Quadrilaterals with all equal sides are
equilateral.
If a quadrilateral has all equal sides,
then it is equilateral
b. All polygons have three or more sides.
If a shape is a polygon,
then it has 3 or more sides
True Statement
False Statement
Counterexample
If hypothesis happens, then conclusion MUST happen
Given hypothesis, conclusion might or might not happen
Example the shows statement doesn’t HAVE to happen
3.26 – COUNTEREXAMPLES
False, you drive a black mustang
True
False, obtuse and 130
True
Converse
Flips the “If” and “Then”
If a, then b becomes….
If b, then a
3.27 – CONVERSES AND TRUE STATEMENTSIn the previous problem, you learned that each conditional statement has a converse. Are all converses true? Consider the conditional statement:
" 1 2 , 1 2 90 "If and are complementary then
a. Is this conditional statement true?
yes
b. Write the converse of this statement as a conditional statement. Is this converse true? Justify your answer.
" 1 2 , 1 2 90 "If and are complementary then
1 2 90 If , then 1 2 and are complementary
yes
c. Write the converse of the statement below. Is this converse true? Justify your answer.
a b If , then a and b are vertical angles
False, a b and corresponding angles
3.28 – CRAZY CONVERSES For each of these problems below, match the statement with the given conditions. Explain your reasoning.
a. A true statement whose converse is true.
b. A true statement whose converse is false.
c. A false statement whose converse is true.
d. A false statement whose converse is false.
I. If it is Halloween, then it is October 31st.
IV. If you go to Steele Canyon, then your mascot is a cougar
III. If you don’t eat steak, then you are a vegetarian
II. If you love math, then you love science
Biconditional
Original and converse are true
a if and only if b
a iff b
3.29 – BICONDITIONAL STATEMENTSRewrite the definition as a biconditional statement.
a. A figure is a square when it is a rectangle with 4 congruent sides A figure is a square iff
it is a rectangle with 4 congruent sides
b. Equilateral polygons have all of their sides congruent.
A polygon is equilateral iff
all of their sides are congruent
Inverse
Contrapositive
Negates the “If” and “Then”
If a, then b becomes….
If not a, then not b
Negates & flips
If a, then b becomes….
If not b, then not a
3.30 – REWRITING STATEMENTSRewrite the statement in if-then form. Then write the converse, the inverse, and the contrapositive.
a. A car runs when there is gas in the tank.
If-then: ______________________________________
Converse: ______________________________________
Inverse: ______________________________________
Contrapositive: ______________________________________
If a car runs, then there is gas in the tank
If there is gas in the tank, then the car runs
If the car isn’t running, then there isn’t gas in the tank
If there isn’t gas in the tank, then the car isn’t running
b. All triangles have three sides.
If-then: ______________________________________
Converse: ______________________________________
Inverse: ______________________________________
Contrapositive: ______________________________________
If a shape is a triangle, then it has 3 sides
If a shape has 3 sides, then it is a triangle.
If a shape isn’t a triangle, then it doesn’t have 3 sides
If a shape doesn’t have 3 sides, then it isn’t a triangle
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