The acceleration of the rocket is [tex]1.92 m/s^2[/tex]
Explanation:
The impulse exerted by the gas expelled by the rocket is equal to the change in momentum of the gas. Mathematically:
[tex]F\Delta t = \Delta m v[/tex]
which can be rewritten as
[tex]F=\frac{\Delta m}{\Delta t}v[/tex]
F is the force exerted on the rocket
[tex]\frac{\Delta m}{\Delta t}=8.0 kg/s[/tex] is the amount of mass of gas expelled per second
[tex]v=2.20\cdot 10^3 m/s[/tex] is the velocity of the gas
Solving for F,
[tex]F=(8.0)(2.20\cdot 10^3)=17,600 N[/tex]
This force acts upward, but we also know that there is another force acting on the rocket, the force of gravity, acting downward. Its magnitude is
[tex]W=mg=(5000 kg)(1.6 m/s^2)=8000 N[/tex]
where
m = 5000 kg is the mass of the rocket
[tex]g=1.6 m/s^2[/tex] is the acceleration of gravity
Therefore, the net force on the rocket is:
[tex]F_{net}=F-W=17,600 - 8000 = 9600 N[/tex]
Now we can find the acceleration of the rocket by applying Newton's second law; we find:
[tex]F_{net}=ma\\a=\frac{F_{net}}{m}=\frac{9600}{5000}=1.92 m/s^2[/tex]
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