move reasons to the table to prove that abcd is a parallelogram.
| statement | reason |
|--|--|
| $overline{ab}congoverline{cd}$ and $overline{ab}paralleloverline{cd}$ | given |
| $angle1congangle4$ | |
| $overline{db}congoverline{db}$ | |
| $ riangle dabcong riangle bcd$ | |
| $angle3congangle2$ | corresponding parts of congruent triangles are congruent |
| $overline{ad}paralleloverline{bc}$ | if alternate interior angles are congruent for two lines cut by a transversal, the lines are parallel. |
| abcd is a parallelogram | a parallelogram is a quadrilateral with opposite sides parallel. |
asa sas sss
parallel postulate reflexive property
alternate interior angles theorem corresponding angles theorem

Question

move reasons to the table to prove that abcd is a parallelogram.
| statement | reason |
|--|--|
| $overline{ab}congoverline{cd}$ and $overline{ab}paralleloverline{cd}$ | given |
| $angle1congangle4$ |  |
| $overline{db}congoverline{db}$ |  |
| $	riangle dabcong	riangle bcd$ |  |
| $angle3congangle2$ | corresponding parts of congruent triangles are congruent |
| $overline{ad}paralleloverline{bc}$ | if alternate interior angles are congruent for two lines cut by a transversal, the lines are parallel. |
| abcd is a parallelogram | a parallelogram is a quadrilateral with opposite sides parallel. |
asa sas sss
parallel postulate reflexive property
alternate interior angles theorem corresponding angles theorem

Accepted Answer

# Explanation:
## Step1: For $\angle1\cong\angle4$
By Alternate Interior Angles Theorem (since $AB\parallel CD$ and $DB$ is a transversal).
## Step2: For $\overline{DB}\cong\overline{DB}$
By Reflexive Property (a segment is congruent to itself).
## Step3: For $	riangle DAB\cong	riangle BCD$
Since $\overline{AB}\cong\overline{CD}$, $\angle1\cong\angle4$, $\overline{DB}\cong\overline{DB}$, by SAS (Side - Angle - Side) congruence criterion.
# Answer:
| Statement | Reason |
|--|--|
| $\overline{AB}\cong\overline{CD}$ and $\overline{AB}\parallel\overline{CD}$ | Given |
| $\angle1\cong\angle4$ | Alternate Interior Angles Theorem |
| $\overline{DB}\cong\overline{DB}$ | Reflexive Property |
| $	riangle DAB\cong	riangle BCD$ | SAS |
| $\angle3\cong\angle2$ | Corresponding Parts of Congruent Triangles are Congruent |
| $\overline{AD}\parallel\overline{BC}$ | If alternate interior angles are congruent for two lines cut by a transversal, the lines are parallel. |
| $ABCD$ is a parallelogram | A parallelogram is a quadrilateral with opposite sides parallel. |

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QUESTION IMAGE

Question

Explanation:

Step1: For $\angle1\cong\angle4$

Step2: For $\overline{DB}\cong\overline{DB}$

Step3: For $\triangle DAB\cong\triangle BCD$

Answer:

statement	reason
$angle1congangle4$
$overline{db}congoverline{db}$
$\triangle dabcong\triangle bcd$
$angle3congangle2$	corresponding parts of congruent triangles are congruent
$overline{ad}paralleloverline{bc}$	if alternate interior angles are congruent for two lines cut by a transversal, the lines are parallel.
abcd is a parallelogram	a parallelogram is a quadrilateral with opposite sides parallel.

Statement	Reason
$\angle1\cong\angle4$	Alternate Interior Angles Theorem
$\overline{DB}\cong\overline{DB}$	Reflexive Property
$\triangle DAB\cong\triangle BCD$	SAS
$\angle3\cong\angle2$	Corresponding Parts of Congruent Triangles are Congruent
$\overline{AD}\parallel\overline{BC}$	If alternate interior angles are congruent for two lines cut by a transversal, the lines are parallel.
$ABCD$ is a parallelogram	A parallelogram is a quadrilateral with opposite sides parallel.