Final Answer:
The alternate exterior angles of K and IN are LMO and NM.option.1
Step-by-step explanation:
When two lines, K and IN, are parallel, the corresponding angles are equal. In this case, we can identify the corresponding angles as follows:
ZLMO and NM are the alternate exterior angles of K and IN, respectively.
To prove that ZLMO and NM are alternate exterior angles, we can use the fact that corresponding angles are equal. Since K and IN are parallel, we know that:
∠KLM = ∠INM (Corresponding Angles Theorem)
Now, we can use the fact that ∠KLM is an exterior angle of △KLM, and ∠INM is an exterior angle of △INM. Therefore, we can conclude that:
∠ZLMO = ∠NM (Alternate Exterior Angles Theorem)
Therefore, ZLMO and NM are the alternate exterior angles of K and IN, respectively.
Correct option is option.1