given quadrilateral abcd with (overline{ad} cong overline{bc}), (overline{ab} cong overline{dc})
prove: (abcd) is a parallelogram
move statements and reasons to the table to complete the proof.
| statements | reasons |
| --- | --- |
| quadrilateral (abcd) with (overline{ad} cong overline{bc}), (overline{ab} cong overline{dc}) | given |
| | reflexive property |
| | |
| (angle dac cong angle bca), (angle dca cong angle bac) | |
| | converse of alternate interior angles theorem |
| (abcd) is a parallelogram | definition of parallelogram |

(overline{ac} cong overline{ac})
( riangle dac cong riangle bca)
(da parallel bc), (ab parallel dc)
cpctc
asa
sss
( riangle dac cong riangle bcd)
sas

Question

given quadrilateral abcd with (overline{ad} cong overline{bc}), (overline{ab} cong overline{dc})
prove: (abcd) is a parallelogram
move statements and reasons to the table to complete the proof.
| statements | reasons |
| --- | --- |
| quadrilateral (abcd) with (overline{ad} cong overline{bc}), (overline{ab} cong overline{dc}) | given |
|  | reflexive property |
|  |  |
| (angle dac cong angle bca), (angle dca cong angle bac) |  |
|  | converse of alternate interior angles theorem |
| (abcd) is a parallelogram | definition of parallelogram |

(overline{ac} cong overline{ac})
(	riangle dac cong 	riangle bca)
(da parallel bc), (ab parallel dc)
cpctc
asa
sss
(	riangle dac cong 	riangle bcd)
sas

Accepted Answer

# Explanation:
## Step1: Identify reflexive side
$\overline{AC} \cong \overline{AC}$
## Step2: Prove triangle congruence
$	riangle DAC \cong 	riangle BCA$ (SSS)
## Step3: Justify angle congruence
CPCTC
## Step4: Prove parallel sides
$\overline{AD} \parallel \overline{BC}, \overline{AB} \parallel \overline{DC}$

# Answer:
Completed proof table:
| Statements | Reasons |
|------------|---------|
| Quadrilateral $ABCD$ with $\overline{AD} \cong \overline{BC}, \overline{AB} \cong \overline{DC}$ | Given |
| $\overline{AC} \cong \overline{AC}$ | Reflexive Property |
| $	riangle DAC \cong 	riangle BCA$ | SSS |
| $\angle DAC \cong \angle BCA, \angle DCA \cong \angle BAC$ | CPCTC |
| $\overline{AD} \parallel \overline{BC}, \overline{AB} \parallel \overline{DC}$ | Converse of Alternate Interior Angles Theorem |
| $ABCD$ is a parallelogram | Definition of parallelogram |

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QUESTION IMAGE

Question

Explanation:

Step1: Identify reflexive side

Step2: Prove triangle congruence

Step3: Justify angle congruence

Step4: Prove parallel sides

Answer:

statements	reasons
	reflexive property

(angle dac cong angle bca), (angle dca cong angle bac)
	converse of alternate interior angles theorem
(abcd) is a parallelogram	definition of parallelogram

Statements	Reasons
$\overline{AC} \cong \overline{AC}$	Reflexive Property
$\triangle DAC \cong \triangle BCA$	SSS
$\angle DAC \cong \angle BCA, \angle DCA \cong \angle BAC$	CPCTC
$\overline{AD} \parallel \overline{BC}, \overline{AB} \parallel \overline{DC}$	Converse of Alternate Interior Angles Theorem
$ABCD$ is a parallelogram	Definition of parallelogram