To solve this problem, we will need the standard kinematics equation
[tex]distance=v_0t+\frac{1}{2}at^2[/tex]
where
v0=initial velocity (positive upwards) m/s
t=time in seconds
a=acceleration due to gravity (positive upwards) = -9.81 m/ ²
Substituting values,
distance = 0 (when it falls back on earth)
v0=42 m/s
a=-9.81 (negative means towards earth, downwards)
[tex]distance=v_0t+\frac{1}{2}at^2[/tex]
[tex]0=42t+\frac{1}{2}(9.81)t^2[/tex]
factor and solve
[tex]t(42+\frac{1}{2}(-9.81)t)=0[/tex]
=>
t=0 (beginning of launch), or
42-(1/2)*9.81t=0 => t=2*42/9.81=8.563 s.
Time to return = 8.6 seconds (to the nearest tenth of a second)
