directions: complete each proof.
1. given: $overline{de} \parallel \overline{gh}$
prove: $\triangle dfe \sim \triangle gfh$
(there is a diagram with triangle dfe, point f on dg, and triangle gfh, with de parallel to gh)
(a table with statements and reasons columns, with some filled entries: de || gh (given); $\angle d \cong \angle g$, $\angle e \cong \angle h$ (alternate interior angles theorem), and empty rows below)

Question

directions: complete each proof.
1. given: $overline{de} \parallel \overline{gh}$
   prove: $\triangle dfe \sim \triangle gfh$
   (there is a diagram with triangle dfe, point f on dg, and triangle gfh, with de parallel to gh)
   (a table with statements and reasons columns, with some filled entries: de || gh (given); $\angle d \cong \angle g$, $\angle e \cong \angle h$ (alternate interior angles theorem), and empty rows below)

Accepted Answer

# Explanation:
## Step1: State vertical angles congruence
$\angle DFE \cong \angle GFH$
## Step2: Apply AA similarity criterion
$	riangle DFE \sim 	riangle GFH$
# Answer:
| Statements | Reasons |
|------------|---------|
| $\overline{DE} \parallel \overline{GH}$ | Given |
| $\angle D \cong \angle G$, $\angle E \cong \angle H$ | Alternate Interior Angles Theorem |
| $\angle DFE \cong \angle GFH$ | Vertical Angles Congruence Theorem |
| $	riangle DFE \sim 	riangle GFH$ | AA (Angle-Angle) Similarity Postulate |

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QUESTION IMAGE

Question

Explanation:

Step1: State vertical angles congruence

Step2: Apply AA similarity criterion

Answer:

Statements	Reasons
$\angle D \cong \angle G$, $\angle E \cong \angle H$	Alternate Interior Angles Theorem
$\angle DFE \cong \angle GFH$	Vertical Angles Congruence Theorem
$\triangle DFE \sim \triangle GFH$	AA (Angle-Angle) Similarity Postulate