Final answer:
The correct answer is Option A, where the ladybug travels at 5 cm/sec and the ant at 10 cm/sec, allowing the ant to eventually be twice as far from the ladybug.
Step-by-step explanation:
Given the details in the question regarding how fast each bug is traveling, we can deduce that the speeds of the bugs are proportional to their initial distances, similar to the example provided about ants on a stretching ruler. When an intelligent ant measures other ants' speeds as the ruler stretches, he discovers speed is proportional to distance from him, aligning with the Hubble's Law concept, where objects at greater distances from a point move away faster due to the stretching of space. In the options provided, we're looking for a scenario where the ant eventually is twice as far from the ladybug. For this to be true, since both bugs start at the same point, the ant must move away at a velocity that is greater than that of the ladybug. The only option where the ant is moving faster than the ladybug is Option A, where the ladybug is traveling at 5 cm/sec, and the ant is traveling at 10 cm/sec. This allows for the ant to eventually be twice as far away from the ladybug. The correct answer is Option A: Ladybug: 5 cm/sec, Ant: 10 cm/sec, True.