Answer:
4) [tex]\overline{BD}\ and\ \overline{AC} \ \textrm{bisect each other.}[/tex]
Step-by-step explanation:
Given:
[tex]\overline{BD}\ and\ \overline{AC} \ \textrm{bisect each other}[/tex]
AE =EC and
BE = DE
To Prove:
Δ ABE ≅ ΔCDE
Proof:
[tex]In\ \triangle ABE\ and\ \triangle CDE\\\overline{AE} \cong \overline{CE}\ \textrm{Given BD and AC bisect each other}\\ \angle AEB \cong \angle CED\ \textrm{vertically opposite angles}\\ \overline{BE} \cong \overline{DE}\ \textrm{Given BD and AC bisect each other}\\ \therefore \triangle ABE \cong \triangle CDE\ \textrm{By Side-Angle-Side test...PROVED}[/tex].
Hence,
4) [tex]\overline{BD}\ and\ \overline{AC} \ \textrm{bisect each other.}[/tex]
sufficient to prove Δ ABE ≅ ΔCDE .
