Answer:
Step-by-step explanation:
Proof:
- m∠ABK ≅ m∠KBD — given that BK bisects ∠ABD
- m∠ABD = m∠ABK + m∠KBD = 2·m∠ABK
- m∠ABD ≅ m∠DBC — properties of a rhombus: a diagonal bisects the angles
- m∠DBC = 2·m∠ABK — transitive property (both equal to m∠ABD)
- m∠KBC = m∠KBD + m∠DBC — adjacent angles
- m∠KBC = m∠ABK + 2·m∠ABK = 3·m∠ABK — substitute for m∠KBD and m∠DBC
- m∠AKB = m∠KBC — alternate interior angles of parallel lines AD, BC
- m∠AKB = 3·m∠ABK — substitute for m∠KBC
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Proof is always in the eye of the beholder, and the details depend on the supporting theorems and postulates you're allowed to invoke. The basic idea is that you have cut a vertex angle in half twice, and you're trying to show that the smallest part to the rest of it has the ratio 1 : 3.
