Answer:
1) The initial velocity equals [tex]u=\frac{h}{t}+\frac{gt}{2}[/tex]
2) The velocity with which the keys were caught equals [tex]v=\frac{h}{t}-\frac{gt}{2}[/tex]
Explanation:
Let the keys be thrown with a speed 'u' vertically upwards. Since the keys are caught after time 't' while covering a distance 'h' we can use second equation of kinematics to relate these terms.
According to second equation of kinematics the displacement of an object in 't' time is given by
[tex]\Delta y=ut+\frac{1}{2}at^{2}[/tex]
Applying the corresponding values and solving for the initial speed 'u' we get
[tex]h=ut-\frac{1}{2}gt^{2}\\\\2h+gt^{2}=2ut\\\\\therefore u=\frac{h}{t}+\frac{gt}{2}[/tex]
The change in velocities while covering a distance 's' can be found from first equation of kinematics
Thus we have
[tex]v=u+at[/tex]
Applying corresponding values we get
[tex]v=u-gt\\\\v=\frac{h}{t}+\frac{gt}{2}-gt\\\\=\frac{h}{t}-\frac{gt}{2}[/tex]
