DB is perpendicular to AE at C, AB is congruent to DE, and C is the midpoint of AE. Prove DE is parallel to AB

Question

asked Jul 17, 2023 31.5k views

1 Answer

Kyle Robson · Answer 1 · 2023-07-22T05:35:46+0000

1.
$\overline{DB}$ is perpendicular to
$\overline{AE}$ at
(given)

2.
$\angle ACB$ and
$\angle DCB$ are right angles (perpendicular lines form right angles)

3.
$\triangle ACB$ and
$\triangle DCE$ are right triangles (a triangle with a right angle is a right triangle)

4.
is the midpoint of
$\overline{AE}$ (given)

5.
$\overline{AC} \cong \overline{CE}$ (definition of midpoint)

6.
$\overline{AB} \cong \overline{DE}$ (given)

7.
$\triangle ACB \cong \triangle ECB$ (HL)

8.
$\angle BAC \cong \angle DEC$ (CPCTC)

9.
$\overline{DE} \parallel \overline{AB}$ (converse of alternate interior angles theorem)