To find the maximum height attained by the stone and the time taken to achieve this height, we can use the equations of motion for vertical motion under constant acceleration.
Given: Initial velocity (v₀) = 98 m/s (upward) Acceleration due to gravity (a) = -9.8 m/s² (downward)
- Maximum Height: At the maximum height, the stone will momentarily come to rest, so its final velocity (vf) will be 0 m/s. We can use the equation:
vf = v₀ + a * t
0 = 98 - 9.8 * t
Solving for time (t), we find:
t = v₀ / a
t = 98 / 9.8
t ≈ 10 s
Now, to find the maximum height (h), we can use the equation:
h = v₀ * t + (1/2) * a * t²
h = 98 * 10 + (1/2) * (-9.8) * (10)²
h = 980 - 490
h = 490 meters
Therefore, the stone reaches a maximum height of 490 meters.
- Time taken to achieve maximum height: As calculated earlier, the time taken to reach the maximum height is approximately 10 seconds.
Thus, the stone takes approximately 10 seconds to achieve its maximum height.