complete the proof by choosing the correct
eason\.
given ( mangle ejg = mangle hjf )
prove ( mangle 1 = mangle 3 )

| statement | reason |
| --- | --- |
| 1. ( mangle ejg = mangle 1 + mangle 2 ) | reason? |
| 2. ( mangle hjf = mangle 2 + mangle 3 ) | reason? |
| 3. ( mangle ejg = mangle hjf ) | reason? |
| 4. ( mangle 1 + mangle 2 = mangle 2 + mangle 3 ) | reason? |
| 5. ( mangle 1 = mangle 3 ) | reason? |

Question

complete the proof by choosing the correct
eason\.
given ( mangle ejg = mangle hjf )
prove ( mangle 1 = mangle 3 )

| statement | reason |
| --- | --- |
| 1. ( mangle ejg = mangle 1 + mangle 2 ) | reason? |
| 2. ( mangle hjf = mangle 2 + mangle 3 ) | reason? |
| 3. ( mangle ejg = mangle hjf ) | reason? |
| 4. ( mangle 1 + mangle 2 = mangle 2 + mangle 3 ) | reason? |
| 5. ( mangle 1 = mangle 3 ) | reason? |

Accepted Answer

To solve this proof, we analyze each step's reason:

### Step 1: $ m\angle EJG = m\angle 1 + m\angle 2 $
This is the **Angle Addition Postulate**, which states that if a point lies in the interior of an angle, the sum of the two smaller angles formed equals the measure of the larger angle.

### Step 2: $ m\angle HJF = m\angle 2 + m\angle 3 $
Similarly, this uses the **Angle Addition Postulate** (same logic as Step 1: a point splits $ \angle HJF $ into $ \angle 2 $ and $ \angle 3 $).

### Step 3: $ m\angle EJG = m\angle HJF $
This is given in the problem statement (the initial “Given” condition: $ m\angle EJG = m\angle HJF $).

### Step 4: $ m\angle 1 + m\angle 2 = m\angle 2 + m\angle 3 $
This is the **Substitution Property of Equality**. Since $ m\angle EJG = m\angle 1 + m\angle 2 $ (Step 1) and $ m\angle EJG = m\angle HJF $ (Step 3), we substitute $ m\angle EJG $ in Step 3 with $ m\angle 1 + m\angle 2 $, and $ m\angle HJF $ with $ m\angle 2 + m\angle 3 $ (Step 2).

### Step 5: $ m\angle 1 = m\angle 3 $
This is the **Subtraction Property of Equality**. Subtract $ m\angle 2 $ from both sides of $ m\angle 1 + m\angle 2 = m\angle 2 + m\angle 3 $, so $ m\angle 1 + m\angle 2 - m\angle 2 = m\angle 2 + m\angle 3 - m\angle 2 $, simplifying to $ m\angle 1 = m\angle 3 $.

### Final Answer (for each step’s reason):
1. Angle Addition Postulate
2. Angle Addition Postulate
3. Given
4. Substitution Property of Equality
5. Subtraction Property of Equality

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QUESTION IMAGE

Question

Explanation:

Step 1: \( m\angle EJG = m\angle 1 + m\angle 2 \)

Step 2: \( m\angle HJF = m\angle 2 + m\angle 3 \)

Step 3: \( m\angle EJG = m\angle HJF \)

Step 4: \( m\angle 1 + m\angle 2 = m\angle 2 + m\angle 3 \)

Step 5: \( m\angle 1 = m\angle 3 \)

Final Answer (for each step’s reason):

Answer: