Given:
Initial velocity with which the stone is thrown vertically upwards, u = 28 m/s
When the stone reaches the ground, its final velocity (v) is 0.
Also,
a = g = −9.8 m/s² (Acceleration due to gravity)
(a) Maximum height can be found using the equation of motion.
Thus, we have:
v² − u² = 2as

On putting respective values, we get:

(b) Total time taken by the stone to reach the maximum height:

⇒

As per the question, we need to find the velocity of the stone one second before it reaches the maximum height.

t ‘= 2.85 − 1 = 1.85 s

Again, using the equation of motion, we get:
v‘= u + at‘= 28 − 9.8 × 1.85

⇒ v ‘= 28 − 18.13 = 9.87 m/s

Hence, the velocity is 9.87 m/s

(c) No answer of part (b) will not change, as after one second, the velocity becomes zero for any initial velocity and acceleration (a = − 9.8 m/s²) remains the same.

For any initial velocity more than 28 m/s, only the maximum height increases.