Short and sweet. Though I do wonder what the intended difficulty of the Moldova NMO is, since this seems awfully easy as p3 in any contest. Since $\angle MBC = \angle MKC = 60^{\circ}$, $MKBC$ is cyclic. Then $\angle KBC = \angle KMC = 60^{\circ}$, so \[\angle KBA + \angle CAB = \angle KBC + \angle CBA + \angle CAB = 180^{\circ}\]and we're done. Remark. I found $MKBC$ cyclic originally by spiral similarity instead of the obvious angles. Oops.