Final answer:
Assuming constant speed, the time taken by the shuttle to travel half the distance between two stations would be half the total travel time. This follows the basic proportional relationship between distance, speed, and time in physics.
Step-by-step explanation:
The question is asking about the time taken by the shuttle to travel half the distance between two stations compared to the total travel time. The relationship between distance, speed, and time is fundamental in physics, often expressed in the formula Distance = Speed x Time. If the shuttle is traveling at a constant speed, then the time taken to travel half the distance would indeed be half the total travel time. However, if acceleration or deceleration is involved, the scenario might differ, requiring the use of more complex equations to determine the actual time taken.
The notion that covering half the distance might take half the time seems reasonable, as long as the speed is constant. The provided information suggests that the shuttle covers a certain distance in a specific amount of time, which can be scaled proportionally to find the time taken for half the distance. This follows the principle that if you travel a certain distance in a given time, halving the distance while maintaining the same speed would also halve the time necessary.