Answer: v3 = 1.6*10^7 m/s , and the direction is the same as the initial direction of movement of the spaceship
Step-by-step explanation:
The initial mass is M = 2.0*10^6kg
the velocity is V = 5.0*10^6m/s
then, the initial moment is P = M*V = 1.0*10^13m*kg/s
now, we must have that the momentum before and afther must be equal, after we have:
one part with:
m1 = 5.0*10^5kg, v1 = -2.0*10^6m/s
then p1 = -1.0*10^12kh*m/s
other part has:
m2 = 8.0*10^5kg, v2 = 1.0*10^6m/s
p2 = 8*10^11kg*m/s
then, the third object must have a momentum:
p3 = P - p1 - p2 = 10.0*10^12 - 0.8*10^12 + 2.0*10^12 = 11.2*10^12
then m3*v3 = 11.2*10^12 kg*m/s so from this we know that the velocity is in the same direction than the initial velocity.
now, we can find m3 by:
M = m1 + m2 + m3
m3 = M - m1 - m2 = 2.0*10^6kg - 0.5*10^6kg - 0.8*10^6kg = 0.7*10^6kg
then v3 = (11.2*10^12)/(07*10^6) m/s = (11.2/0.7)*10^(12 - 6) m/s = 16.0*10^6 m/s
v3 = 1.6*10^7 m/s