Answer:
the position is 7 10⁹ m
Explanation:
Since the position is the integral of the velocity with respect to time and the equation of velocity is given in the problem
v (t) = -gt - ve ln m - rt m
v = dx / dt
dx = v dt
x = ∫ v dt
x = ∫ [-gt -ve ln m -rtm] dt
x = -g t² / 2 - veln m t - rm t² / 2
Evaluated between t = 0 and t = 60 s
x = -g ½ (60² -0) - veln m (60-0) - rm ½ (60²-0)
x = - 9.8 1800 - 2700 ln 30000 60 - 130 30000 1800
x = -17640 - 1670050 -7020000
x = 7.02 10⁹ m
x = 7 10⁹ m
This is the position of the rocket 1 minute after clearance
Answer:
The height of the rocket after one minute will be -7 × 10^9 m
Explanation:
In the question expression for velocity is given. If we take the integral of that expression for time interval 0 to 60s, we will get expression for the height of rocket So,
X = ∫〖(-gt - ve ln(m) - rtm)〗 dt (Over a interval 0 to 60 s)
X = -g (60^2-0) / 2 – veln(m) (60-0) - rm (60^2-0) / 2
By putting all the values we get:
X = - (9.8)(3600)/2 – (2700) (ln(30000)) (60) – (130)(30000)(3600)/2
X = -7.02 × 10^9 m
After rounding off
X = -7 × 10^9 m
The negative sign shows that direction of the rocket motion is opposite to the velocity of ejected gases.
