Final answer:
The speed of the river current is calculated by dividing the downstream distance (41.0 m) by the time taken to cross the river (73.0 s), which gives approximately 0.56 m/s.
Step-by-step explanation:
To find the speed of the river current, we need to analyze the swimmer's motion across the river. Given that the swimmer swims at a speed of 1.00 m/s relative to still water and arrives 41.0 m downstream after crossing a river that is 73.0 m wide, we can use the Pythagorean theorem to model the swimmer's path as the resultant of two perpendicular vectors: the swimmer's velocity relative to the water, and the speed of the river current.
The time it takes for the swimmer to reach the other side can be found using the width of the river and the swimmer's speed:
Time = Width of River / Swimmer's Speed = 73.0 m / 1.00 m/s = 73.0 s.
Using the time, we can calculate the speed of the river current: River Current Speed = Downstream Distance / Time = 41.0 m / 73.0 s ≈ 0.56 m/s.
Therefore, the speed of the river current is approximately 0.56 m/s.