For both cases:lochs said:I have an assignment question, it states: Surprisingly little advantage is gained by getting a running start in a downhill race. To demonstrate this, claculate the final speed of a skier who skis down a hill 80-m-high with negligible friction (a) if her initial speed is zero; (b) if her initial speed is 3.0 m/sec. [this final speed found in part (b) is larger than in part (a), but by far less than 3.0 m/sec!]
The final speed of a skier can be calculated using the formula: final speed = initial speed + (acceleration x time). The initial speed is the speed at which the skier begins skiing down the hill and acceleration is the rate at which the skier's speed increases. Time is the duration of the skier's descent down the hill.
The unit of measurement for the final speed of a skier is typically meters per second (m/s) or miles per hour (mph).
The steeper the hill, the faster the skier will accelerate and therefore, the higher their final speed will be. This is because a steeper hill will have a higher slope, which means a greater force of gravity acting on the skier.
Yes, air resistance is a factor that can affect the final speed of a skier. As the skier moves down the hill, they will encounter air resistance, which can slow them down. However, the effect of air resistance on the final speed of a skier is typically negligible compared to other factors such as the steepness of the hill and the skier's mass.
Yes, it is important to always prioritize safety when skiing. Make sure the skier is wearing appropriate protective gear such as a helmet and follow all safety guidelines for the specific ski slope. It is also important to accurately measure the initial speed and time to ensure an accurate calculation of the final speed.