DEDUCTIVE REASONING SYLLOGISM FALSE PREMISE INDUCTIVE REASONING.
Reasoning and Conditional Statements Advanced Geometry Deductive Reasoning Lesson 1.
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Transcript of Reasoning and Conditional Statements Advanced Geometry Deductive Reasoning Lesson 1.
Reasoning and Conditional Statements
Advanced Geometry
Deductive Reasoning
Lesson 1
Inductive Reasoning
making conclusions based on observations
similar to a hypothesis in science
Conjecture
Examples: Make a conjecture about the next term in each sequence and then find the term.
20, 16, 11, 5, -2, -10160, -80, 40, -20, 10
divide by -2; -5
Example: Find the next term in each sequence.
Example: Make a conjecture about the next term in each sequence and then find the term.
1 1 1 2 5 7, , , , ,1,6 3 2 3 6 6
Example: Make a conjecture based on the given information. Draw a figure to illustrate your conjecture.
Each side of a square measures 3 feet.
Example: Make a conjecture based on the given information. Draw a figure to illustrate your conjecture.
and are vertical angles.1 2
Counterexamplean example – proves the statement is false
Example: Give a counterexample to show that the conjecture is false.
Given: Angles 1 and 2 are adjacent angles.Conjecture: Angles 1 and 2 form a linear pair.
Example: Determine whether each conjecture is true or false. Give a counterexample for any false conjecture.
Given: All sides of a quadrilateral are 3 inches long.
Conjecture: The quadrilateral’s perimeter is 12 inches.
Deductive Reasoning
making conclusions based on facts
Deductive Reasoning is used to PROVE statements in mathematics.
All statements must be justified by:• definitions,• properties,• postulates, OR• theorems
Validity
Definition: being deduced or inferred based on facts or evidence
Validity and truth are not the same thing.
A statement is valid if it follows the rule.
Example: Determine whether the stated conclusion is valid based on the given information. If not, write invalid. Explain your reasoning.
If two numbers are odd, then their sum is even.
Given: The numbers 3 and 11.Conclusion: The sum is even.
Given: The numbers 2 and 7.Conclusion: The sum is even.
Valid
Example: Determine whether the stated conclusion is valid based on the given information. If not, write invalid. Explain your reasoning.
If two angles are vertical angles, then they are congruent.
Given: Conclusion: M and N
are vertical angles.
Given: X and Y are vertical anglesConclusion:
M N
X Y
Invalid:
Example: Determine a conclusion that follows from statements (1) and (2). If a valid conclusion does not follow, write no valid conclusion.
(1) If n is a natural number, then n is an integer.(2) n is a natural number
(1) If it is Saturday, then I do not have to go to school.
(2) I did not go to school today.
(1) If x = 4, then y = 7.(2) If y = 7, then z = 12.
n is an integer
no valid conclusion
Conditional StatementsExample: If three points are on the same line, then they are collinear.
Example (cont.):
Hypothesis: three points are on the same line
Conclusion: they are collinear
DOES NOT INCLUDE IF
DOES NOT INCLUDE THEN
Sometimes a conditional statement is not written in if-then form.
Example: Write the statement “Adjacent angles have a common vertex” in if-then form.
If
then
two angles are adjacent,
they have a common vertex.
Separate the original statement at the verb.
Converse:If two angles have the same measure, then they are congruent.
Original Statement:If two angles are congruent, then they have the same measure.
Converse
switch the hypothesis and conclusion
Write the converse of each conditional. Determine if the converse is true or false. If it is false, give a counterexample.
Angles that form a linear pair are supplementary.
Example:
All squares are rectangles.