Prove statements about segments & angles

Prove statements about segments & angles

Write a two-column proof for the situation in Example 4 on page 107. m∠ 1=m∠ 3 GIVEN: m∠ EBA= m∠ DBC PROVE: REASONS STATEMENT 1. 1. m∠ 1=m∠ 3 Given 2. Angle Addition Postulate 2. m∠ EBA =m∠ 3 + m∠ 2 3. Substitution Property of Equality 3. m∠ EBA=m∠ 1 + m∠ 2 EXAMPLE 1 Write a two-column proof

4. Angle Addition Postulate m∠ EBA= m∠ DBC 5. 5. Transitive Property of Equality EXAMPLE 1 Write a two-column proof 4. m∠ 1 +m∠ 2 = m∠ DBC

1. Four steps of a proof are shown. Give the reasons for the last two steps. REASONS STATEMENT 1. 1. AC = AB + AB Given 2. 2. AB + BC = AC Segment Addition Postulate ? 3. 3. AB + AB = AB + BC ? 4. 4. AB = BC for Example 1 GUIDED PRACTICE GIVEN :AC = AB + AB PROVE :AB = BC

ANSWER GIVEN :AC = AB + AB PROVE :AB = BC REASONS STATEMENT 1. 1. AC = AB + AB Given 2. 2. AB + BC = AC Segment Addition Postulate 3. 3. AB + AB = AB + BC Transitive Property of Equality 4. 4. AB = BC Subtraction Property of Equality for Example 1 GUIDED PRACTICE

a. IfRTandTP, then RP. b. IfNKBD, thenBDNK. a. Transitive Property of Angle Congruence b. Symmetric Property of Segment Congruence EXAMPLE 2 Name the property shown Name the property illustrated by the statement. SOLUTION

2. CD CD ANSWER Reflexive Property of Congruence 3. If Q V, then V Q. ANSWER Symmetric Property of Congruence for Example 2 GUIDED PRACTICE

GIVEN: Bis the midpoint of AC. Cis the midpoint of BD. PROVE: AB = CD REASONS STATEMENT 1. 1. Bis the midpoint of AC. Given Cis the midpoint of BD. ABBC 2. 2. Definition of midpoint 3. 3. BCCD Definition of midpoint EXAMPLE 4 Solve a multi-step problem

4. Transitive Property of Congruence ABCD 4. 5. AB = CD 5. Definition of congruent segments EXAMPLE 4 Solve a multi-step problem

Prove statements about segments & angles