complete the proof that ∠qur ≅ ∠sut.
diagram: lines intersecting at u, with points s (up), q (down) on one line; r (left), t (right) on another line
| statement | reason |
| --- | --- |
| 1. ( mangle qur + mangle rus = 180^circ ) | angles forming a linear pair sum to ( 180^circ ) |
| 2. ( mangle rus + mangle sut = 180^circ ) | angles forming a linear pair sum to ( 180^circ ) |
| 3. ( mangle qur + mangle rus = mangle rus + mangle sut ) | transitive property of equality |
| 4. ( mangle qur = mangle sut ) | properties of addition, subtraction, multiplication, and division |
| 5. ( angle qur cong angle sut ) | blank for reason |

Question

Accepted Answer

# Explanation:
## Step1: Recall the definition of congruent angles
If two angles have equal measures, then they are congruent. This is the definition of congruent angles.
## Step2: Apply the definition to the given angles
We know from step 4 that $ m\angle QUR = m\angle SUT $. By the definition of congruent angles (if $ m\angle A=m\angle B $, then $ \angle A\cong\angle B $), we can conclude that $ \angle QUR\cong\angle SUT $.

# Answer:
If two angles have equal measures, then the angles are congruent (Definition of Congruent Angles)

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QUESTION IMAGE

Question

Explanation:

Step1: Recall the definition of congruent angles

Step2: Apply the definition to the given angles

Answer:

statement	reason
2. ( mangle rus + mangle sut = 180^circ )	angles forming a linear pair sum to ( 180^circ )
3. ( mangle qur + mangle rus = mangle rus + mangle sut )	transitive property of equality
4. ( mangle qur = mangle sut )	properties of addition, subtraction, multiplication, and division
5. ( angle qur cong angle sut )	blank for reason