Download presentation
Presentation is loading. Please wait.
1
2.5 Vocabulary Two-Column Proof
A proof is deductive reasoning that uses logic, definitions, properties, and previously proven statements to show that a conclusion is true. When writing a proof, it is important to justify each logical step with a reason. You can use symbols and abbreviations, but they must be clear enough so that anyone who reads your proof will understand them. Definitions Postulates Properties Theorems Hypothesis Conclusion
2
Remember… The Distributive Property: a(b + c) = ab + ac
The Commutative Property: a + b = b + c
3
Remember… Definitions (Biconditional ↔ ) ≅ ↔ = Mid pt ↔ 2≅ Bis ↔ 2≅ Rt ↔ 90 St ↔ 180 (you can “see” a st ) Acute ↔ 0<A<90 Obtuse ↔ 90<Obtuse<180 Supplementary ↔ 2∡ = 180 Complementary ↔ 2∡ = 90 Postulates: Seg Addition Postulate Angle Addition Postulate
4
New:
5
Example 2. Two Column Proof
Given: A and B are supplementary and mA = 45° Prove: mB = 135° STATEMENTS REASONS 1. A and B are supplementary, mA = 45° Given 2. mA + mB = 180° Supplementary ↔ 2∡s = 180 3. 45° + mB = 180° Subst. Prop of = Steps 1, 2 4. mB = 135° Subtr. Prop of =
6
Given: B is the midpoint of AC, AB EF Prove: BC EF
Check It Out! Example 3 Given: B is the midpoint of AC, AB EF Prove: BC EF STATEMENTS REASONS 1. B is the midpoint of AC. 2. AB BC 3. AB EF 4. BC EF
7
Example 4. ( addition theorem: ’s + same = ’s )
Given: 1 3 Prove: mDBA = mEBC 1 2 3 C B A STATEMENTS REASONS
8
Example 5. Given: M is midpoint of AB Prove: AM = ½ AB
STATEMENTS REASONS
Similar presentations
© 2024 SlidePlayer.com. Inc.
All rights reserved.