Respuesta :
Answer:
Explanation:
Given that,
Speed of space ship
V= 3730km/hr relative to earth
Motor speed is v(mc)= 85km/hr relative to command nodule
Let mass of command module be m
Motor mass is 4 times module=4m
Let command module be V(ce)
Note, the space vehicle contain the command module and the motor
Applying conservation of linear momentum
Pi = Pf
Momentum is given as p=mv
For command module p= mv(ce)
For motor module p=4mV(me)
Initial momentum before Pi = MV
M is the total mass of both the command module and motor module
M=m+4m =5m
Pi = Pf
MV = m•v(ce)+ 4m•V(me)
v(ce) velocity of command relative to the earth
V(me) velocity of motor relative earth
V(me) = v(mc) +v(ce)
5mV = mv(ce) + 4m(v(mc)+v(ce))
Divide through by m
5V = v(ce) + 4v(mc)+4v(ce)
5V- 4v(mc) = 5v(ce)
5v(ce) = 5V - 4 v(mc)
5v(ce) = 5 × 3730 - 4 ×85
5v(ce) = 18310
v(ce)= 18310/5
v(ce) = 3662km/hr
To m/s v(ce) = 3662×1000/3600
v(ce) = 1017.22 m/s
command module relative to Earth just after the separation is 3662km/h or 1017.22 m/s
Answer:
the speed of the command module relative to Earth = 1017.22 m/s
Explanation:
We are given;
Speed space vehicle is traveling at relative to Earth; Vi= 3730 km/h = (3730 x 10)/36 m/s = 1036.111 m/s
Rocket motor speed;Vmc = 85km/h = (85x10)/36 = 23.611 m/s
From conservation of linear momentum, we know that;
Initial momentum = final momentum.
Thus,
MV_i = 4m(V_me) + mV_ce
Where ;
M = the mass of the space vehicle which is the sum of the motor's mass and command mass
V_i = initial speed
V_me = speed of the motor relative to the earth
V_ce = speed of command relative to the earth
m = the command module mass
4m = the mass of the motor
Now, M = the sum of the motor's mass and command mass
Thus; M = 4m + m = 5m
So,we now have;
5mV_i = 4m(V_me) + mV_ce
Now, the velocity of the motor relative to the earth is;
V_me = V_mc + V_ce
Thus, we now have;
5mV_i = 4m(V_mc + V_ce) + mV_ce
This gives;
5mV_i = 4mV_mc + 5mV_ce
Divide through by m to get;
5V_i = 4V_mc + 5V_ce
Let's make V_ce the subject;
5V_i - 4V_mc = 5V_ce
Divide through by 5;
V_ce = V_i - (4/5)V_mc
Plugging in the relevant values;
V_ce = 1036.111 - (4/5)•23.611 = 1017.22 m/s
