Answer:
Given information: AK bisects ∠BAC, point M ∈ AK so that m∠AMB = m∠AMC.
Prove : BK = CK.
Proof:
In triangle ABM and ACM,
[tex]\angle AMB\cong \angle AMC[/tex] (Given)
[tex]AM=AM[/tex] (Reflection property)
[tex]\angle MAB\cong \angle MAC[/tex] (Definition of angle bisector)
By SAS postulate,
[tex]\triangle AMB\cong \triangle AMC[/tex]
[tex]AB\cong AC[/tex] (CPCTC)
[tex]AB=AC[/tex]
It means triangle ABC is an isosceles triangle.
The angle bisector of an isosceles triangle divides the non equal side in two equal parts.
[tex]BK=CK[/tex]
Hence proved.
