Given : NL bisects KNM and KLM Prove: ΔNKL ≅ ΔNML

ASAP NEED HELP Assignment DUE IN 10 MINS

ΔNKL ≅ ΔNML by ASA rule of congruency

Step-by-step explanation:

The given parameters are;

Given the quadrilateral, KLMN, with diagonal = LN

The diagonal LN = Angle bisector of angles ∠KNM and ∠KLM

Therefore, we have;

∠KNM = ∠KNL + ∠MNL and ∠KNL ≅ ∠MNL by definition of angles in angles formed by angle bisector NL

Given;

∠KNL ≅ ∠MNL by angles formed by an angle bisector angle

≅ by reflexive property

∴ ΔNKL ≅ ΔNML by Angle-Side-Angle (ASA) rule of congruency

Answer is No, ITS NOT.

Refer below.

Step-by-step explanation:

There are two different cost of the same activity i.e. $10 on Saturday and Sunday and $5 on Monday through Friday, So it wouldn't be a function.