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In the diagram, DG ∥ EF. On a coordinate plane, quadrilateral D E F G is shown. Point D is at (negative 2, 2), point G is at (1, 2), point F is at (3, negative 3), and point E is at (negative 4, negative
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18 votes
18 votes
In the diagram, DG ∥ EF.

On a coordinate plane, quadrilateral D E F G is shown. Point D is at (negative 2, 2), point G is at (1, 2), point F is at (3, negative 3), and point E is at (negative 4, negative 3).

What additional information would prove that DEFG is an isosceles trapezoid?

DE ≅ GF
DE ≅ DG
EF ≅ DG
EF ≅ GF

User CoolEsh
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2.5k points

2 Answers

10 votes
10 votes

Answer:DE ≅ GF

Explanation:

cause i said so

User Syeful Islam
by
2.6k points
12 votes
12 votes

Answer:


DE \cong GF

Explanation:

Given

See attachment for quadrilateral

Required

What proves DEFG as isosceles trapezoid

The non-parallel sides of an isosceles trapezoid are similar and equal.

From the attached quadrilateral, the non-parallel sides are: DE and GF

Hence, for DEFG to be an isosceles trapezoid;


DE \cong GF

In the diagram, DG ∥ EF. On a coordinate plane, quadrilateral D E F G is shown. Point-example-1
User Fonewiz
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2.8k points
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