Post on 22-Dec-2015
TODAY IN GEOMETRY…
Learning Goal 1: 2.4 You will use postulates involving points, lines, and planes
Independent Practice – 20 minutes!
Learning Goal 2: 2.5 Use Algebraic properties to form logical arguments
Test Retakes before next Friday
POSTULATE 5: POSTULATE 6: Through any two points there exists one line.
A line contains at least two points.
𝐴
𝐵
𝐶
𝐴
𝐵
𝐶𝐷
POSTULATE 7: POSTULATE 8: If two lines intersect, then their intersection is exactly one point.
Through any three noncollinear points there exists exactly one plane.
𝐴
𝐴
𝐵𝐶
POSTULATE 9: POSTULATE 10: A plane contains at least three noncollinear points.
If two points lie in a plane, then the line containing them lies in the plane.
𝐸
𝐹𝐺
𝐻𝐼
𝐺
𝐻
POSTULATE 11: If two planes intersect, then their intersection is a line.
PRACTICE: State the postulate illustrated by the diagram.
POSTULATE 7:If two lines intersect, then their intersection is exactly
one point.
POSTULATE 11:If two planes intersect, then their intersection is a line.
PRACTICE: Use the diagram to write examples of each postulate:
POSTULATE 9:
POSTULATE 10:
A plane contains at least three noncollinear points.
Plane P contains points noncollinear points B, A, C
If two points lie in a plane, then the line containing them lies in the plane.
Points A and B lie on Plane P, line n also lies on Plane P.
PRACTICE: Use the diagram to determine if the statement is true or false.1. All points are coplanar.
2. G, F, and E are collinear.
3. and intersect.
4. and are vertical angles.
5. and intersect at H.
6.
T
F
F
T
T
F
20 minutesHOMEWORK #2:
Pg. 99: 3-8, 11-23
If finished, work on other assignments:
HW #1: Pg. 82: 3-18, 26-28, 47-54
2.5 Algebraic Properties
Addition property
Subtraction property
Multiplication property
Division Property
Substitution property
Distribution property
Combine like terms
ADDITION PROPERTY: SUBTRACTION PROPERTY:Use when you must
add to solve an algebraic problem.
Use when you must subtract to solve an algebraic problem.
EXAMPLE: If , then
EXAMPLE: If , then
MULTIPLICATION PROPERTY:
DIVISION PROPERTY: Use when you must multiply to solve an algebraic problem.
Use when you must divide to solve an algebraic problem.
EXAMPLE: If , then
EXAMPLE: If , then
SUBSTITUTION PROPERTY:
DISTRIBUTIVE PROPERTY:
COMBINE LIKE TERMS: Use
when you must substitute to solve an algebraic problem.
EXAMPLE: If , then
Use when you must distribute to solve an algebraic problem.
Use when you must combine like terms to solve an algebraic problem.
EXAMPLE: If , then
EXAMPLE: If , then
ALGEBRAIC PROOF:
Statement
Reason
Given: Prove:
1. 1. Given.
2. 2. Subtraction Property
3. 3. Division Property
ALGEBRAIC PROOF:
Statement
Reason
Given: Prove:
1. 1. Given.
2. 2. Subtraction Property
3. 3. Division Property
PROOFS WITHOUT THE “WORK”
ALGEBRAIC PROOF:
Statement
Reason
Given: Prove:
1. 1. Given.
2. 2. Distribution Property
3. 3. Addition Property+8+8
−4 (11𝑥 )+ (−4 ) (2 )=80
4. 4. Division Property
ALGEBRAIC PROOF:
Statement
Reason
Given: Prove:
1. 1. Given.
2. 2. Distribution Property
3. 3. Addition Property
4. 4. Division Property
PROOFS WITHOUT THE “WORK”
ALGEBRAIC PROOF:
Statement
Reason
Given: Prove:
1. 1. Given.
2. 2. Distribution Property
4. 4. Subtraction Property−3−3
2 (𝑥 )+(2 ) (5 )−7=19
5. 5. Division Property
2 𝑥+(10−7 )=193. 3. Combine like terms
ALGEBRAIC PROOF:
Statement
Reason
Given: Prove:
1. 1. Given.
2. 2. Distribution Property
4. 4. Subtraction Property
5. 5. Division Property
3. 3. Combine like terms
PROOFS WITHOUT THE “WORK”
PROPERTIESREAL
NUMBERS SEGMENTS ANGLESREFLEXIVE
SYMMETRIC
TRANSITIVE
“equals itself”
“same in reverse”
“there’s a middle man”
SOLUTIONS:4. SYMMETRIC PROPERTY5. TRANSITIVE PROPERTY6. REFLEXIVE PROPERTY