A missile is fired from the ground level rises `x` metres vertically upwards in `t` second, where `x=100 t-25/2t^(2)`. The maximum height reached is

A stone thrown vertically upwards rises S ft in t seconds where S =112t-16t ^(2) . The maximum height reached by the stone is

A particle when thrown obliquely from ground, can have a maximum horizontal range 'X'. When it is thrown vertically upwards with the same speed, the maximum height reached by the particle, will be 2 Х 2x √2

A stone is thrown up vertically and the height x ft it reached in t seconds is x=(80)t -(16)t^(2) . It reached the maximum height in time t=

A stone thrown vertically upwards satisfies the equations s = 80t –16t^(2) . The time required to reach the maximum height is

A stone thrown down with a seed u takes a time t_(1) to reach the ground , while another stone, thrown upwards from the same point with the same speed, takes time t_(2) . The maximum height the second stone reaches from the ground is

A stone is projected vertically upwards. Its height h at time t sec is h=(80)t-(16)t^(2) . The velocity with which it hits the ground is

The maximum height is reached is 5s by a stone thrown vertically upwards and moving under the equation 10s=10ut-49t^(2) , where s is in metre and t is in second. The value of u is

A stone, vertically thrown upward is moving in a line. Its equation of motion is s=294t-49t^(2) , then the maximum height that the stone reaches is

A stone thrown upwards from ground level, has its equation of height h=490t-4.9t^(2) where 'h' is in metres and t is in seconds respectively. What is the maximum height reached by it ?

Soumya throws a ball upwards, from a rooftop, 80 m above. It will reach a maximum height and then fall back to the ground. The height of the ball from the ground at time 't' is 'h', which is given by h=-16t^(2)+64t+80 What is the maximum height reached by the ball ?