question 11 (1 point)
complete the two - column proof.
given: ∠1 and ∠3 are vertical angles.
prove: ∠1 ≅ ∠3
diagram of two intersecting lines forming angles 1, 2, 3
statements
1. ∠1 and ∠3 are vertical angles.
2. ∠1 and ∠2 are supplementary.
∠2 and ∠3 are supplementary.
3. ( mangle1 + mangle2 = 180 )
( mangle2 + mangle3 = 180 )
4. ( mangle1 + mangle2 = mangle2 + mangle3 )
5. ( mangle1 = mangle3 )
6. ( angle1 cong angle3 )
reasons
1. given
2. ∠s that form a linear pair are supplementary.
∠1 and ∠2 form a linear pair.
∠2 and ∠3 form a linear pair.
3. the sum of the measures of supplementary angles is 180.
4. ______
5. ______
6. ______
options:
○ a
4. addition property of equality
5. subtraction property of equality
6. ∠s with the same measure are ≅.
○ b
4. transitive property of equality
5. subtraction property of equality
6. ∠s with the same measure are ≅.
○ c
4. transitive property of equality
5. addition property of equality
6. ∠s with the same measure are ≅.
○ d
4. addition property of equality
5. transitive property of equality
6. ∠s with the same measure are ≅.

Question

question 11 (1 point)
complete the two - column proof.
given: ∠1 and ∠3 are vertical angles.
prove: ∠1 ≅ ∠3
diagram of two intersecting lines forming angles 1, 2, 3
statements
1. ∠1 and ∠3 are vertical angles.
2. ∠1 and ∠2 are supplementary.
   ∠2 and ∠3 are supplementary.
3. ( mangle1 + mangle2 = 180 )
   ( mangle2 + mangle3 = 180 )
4. ( mangle1 + mangle2 = mangle2 + mangle3 )
5. ( mangle1 = mangle3 )
6. ( angle1 cong angle3 )
reasons
1. given
2. ∠s that form a linear pair are supplementary.
   ∠1 and ∠2 form a linear pair.
   ∠2 and ∠3 form a linear pair.
3. the sum of the measures of supplementary angles is 180.
4. ______
5. ______
6. ______
options:
○ a
   4. addition property of equality
   5. subtraction property of equality
   6. ∠s with the same measure are ≅.
○ b
   4. transitive property of equality
   5. subtraction property of equality
   6. ∠s with the same measure are ≅.
○ c
   4. transitive property of equality
   5. addition property of equality
   6. ∠s with the same measure are ≅.
○ d
   4. addition property of equality
   5. transitive property of equality
   6. ∠s with the same measure are ≅.

Accepted Answer

# Brief Explanations:
1. For step 4: We know $ m\angle1 + m\angle2 = 180 $ and $ m\angle2 + m\angle3 = 180 $. By the Transitive Property of Equality (if $ a = c $ and $ b = c $, then $ a = b $), we can say $ m\angle1 + m\angle2 = m\angle2 + m\angle3 $.
2. For step 5: To get $ m\angle1 = m\angle3 $, we subtract $ m\angle2 $ from both sides of $ m\angle1 + m\angle2 = m\angle2 + m\angle3 $, which is the Subtraction Property of Equality.
3. For step 6: If two angles have the same measure ($ m\angle1 = m\angle3 $), then the angles are congruent ($ \angle1\cong\angle3 $) by the definition that angles with the same measure are congruent.

Looking at the options, option b has step 4 as Transitive Property of Equality, step 5 as Subtraction Property of Equality, and step 6 as $ \angle\text{s with the same measure are}\cong $.

# Answer:
b. 4. Transitive Property of Equality; 5. Subtraction Property of Equality; 6. $ \angle\text{s with the same measure are}\cong $

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