Answer:
ΔLNO ≅ ΔLMN iff ∠LNO = ∠LNM
Step-by-step explanation:
Lets get started using the statement that...
<em> In ΔLON and ΔLMN</em>
<u><em> Side ON ≅ Side MN </em></u>
<u><em> Side LN ≅ Side NM </em></u>
<u><em> ∠LON ≅ ∠LMN</em></u>
To Prove: ∠LON ≅ ∠LMN by ASA congruence theorem.
Solution: In order to prove ASA congruence between the triangles we need two angles to be congruent to each other. When we look at the figure, we see that <u><em>∠LNO ≅ ∠LNM is a common angle </em></u>in both the triangles.
Hence, using this we will prove that the triangles are congruent by ASA congruence rule.
<u><em>In ΔLON and ΔLMN</em></u>
Side ON ≅ Side MN
∠LNO ≅ ∠LNM ( ∵ common )
∠LON ≅ ∠LMN (∵ Given )
<u>⇒ ΔLON ≅ ΔLMN ( By ASA congruence theorem).</u>
