2 Answers

Cee · Answer 1 · 2022-04-04T06:10:13+0000

$Given: AD \parallel BCAD∥BC and AD=CB$

To Prove:
$AB \parallel DCAB∥DC$

1.
$AD \parallel BCAD∥BC , AD=CB$

Reason: Given

2. AC = AC

Reason: Reflexive Property of Equality

3.
$\angle 2 = \angle 3∠2=∠3$

Reason: If Lines are parallel, then Alternate Interior Angles are Equal).

4.
$\Delta ACD \cong \Delta CABΔACD≅ΔCAB$

Reason: SAS

5.
$\angle 1 = \angle 4∠1=∠4$

Reason: CPCTE

6.
$AB \parallel DCAB∥DC$

Reason: If Alternate Interior Angles are Congruent, then Lines are Parallel.

Ben Myers · Answer 2 · 2022-04-09T07:06:57+0000

Answer:

The missing Statements and reasons are given below

Statement >> Reason

4. CB ≅ BC >> reflexive property of congruence

5. ∠ABC ≅ ∠DCB and ∠ACB ≅ ∠DBC >> Alternate interior angles theorem

6. ΔACB ≅ ΔDBC >> ASA congruence

7. AB ≅ DC and AC ≅ DB >> CPCTC

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