QUESTION IMAGE
Question
given: m || n and p is a transversal
prove: m∠2 = m∠7
diagram of lines m, n (parallel), transversal p with angles 1,2,3,4 on line m; angles 5,6,7,8 on line n
what is the missing reason in the proof?
| statement | reason |
|---|---|
| 2. ( angle 2 cong angle 3 ) | 2. ver. ( angle )s theorem |
| 3. ( mangle 2 = mangle 3 ) | 3. def. of congruent |
| 4. ( angle 3 cong angle 7 ) | 4. corr. ( angle )s theorem |
| 5. ( mangle 3 = mangle 7 ) | 5. def. of congruent |
| 6. ( mangle 2 = mangle 7 ) | 6. ? |
options:
- corresponding angles theorem
- alternate interior angles theorem
- transitive property
- subtraction property
Step1: Recall the transitive property
The transitive property of equality states that if \( a = b \) and \( b = c \), then \( a = c \).
Step2: Apply to the given angles
From step 3, we have \( m\angle2 = m\angle3 \), and from step 5, we have \( m\angle3 = m\angle7 \). Using the transitive property, we can conclude that \( m\angle2 = m\angle7 \).
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transitive property