Final answer:
To find the kayak's average speed in still water, one must equate the time taken to paddle upstream and downstream, considering the current's speed. With this method, the kayak's average speed in still water is calculated to be 5 km/h.
Step-by-step explanation:
The question is asking for the average speed of the kayak in still water given that a kayaker paddles 2 km upstream and 3 km downstream in the same amount of time with a current speed of 1 km/h. To solve this, we can define the variables Vk as the kayak's speed in still water and Vc=1 km/h as the current's speed.
When the kayak is going upstream, its effective speed is Vk - Vc, and when going downstream, its effective speed is Vk + Vc. Since the times are the same for paddling upstream and downstream, we can set up an equation that equates the time taken for both parts of the trip:
T = 2/(Vk - Vc) = 3/(Vk + Vc)
We substitute Vc as 1 km/h and can start cross multiplying to solve the equation:
- 2(Vk + 1) = 3(Vk - 1)
- 2Vk + 2 = 3Vk - 3
- Vk = 5 km/h
Therefore, the kayak's average speed in still water is 5 km/h.