Final answer:
The river's current flows at approximately 1.83 m/s with respect to the ground, and the swimmer's speed with respect to a friend at rest on the ground is approximately 2.14 m/s.
Step-by-step explanation:
To determine the speed of the river and the speed of the swimmer with respect to a friend on the ground, we need to find two components: the swimmer's velocity perpendicular to the current and the river's current velocity. Given that the swimmer crosses the river and ends up 40 meters downstream, we can set up a right triangle where the width of the river is one side (24 m), and the distance downstream (where the swimmer ends up) is the other side (40 m).
The swimmer's speed perpendicular to the current is 1.1 m/s. To find the time it takes for the swimmer to cross the river, we can use the equation:
Time = Distance / Speed
Time = 24 m / 1.1 m/s = 21.82 seconds (approximately).
Now, we can calculate the current's speed by using the downstream distance and the time:
Current Speed = Distance downstream / Time
Current Speed = 40 m / 21.82 s = 1.83 m/s (approximately).
For part B, calculating the speed of the swimmer with respect to a friend at rest on the ground involves combining the swimmer's speed across the river and the current's speed down the river to find the resultant velocity:
Resultant Speed = √(Swimmer's Speed² + Current Speed²)
Resultant Speed = √(1.1² + 1.83²)
Resultant Speed = √(1.21 + 3.35)
Resultant Speed = √(4.56)
Resultant Speed = 2.14 m/s