Answer:
Step-by-step explanation:
Given a space ship of mass
M = 2.1 × 10^6 kg
The space ship is moving at
V = 5.8 × 10^6 m/s
This space ship blows into three
The first part is blown backward I.e. in the negative direction
Then, mass of first part and it's velocity is
M1 = 4.6 × 10^5 kg
V1 = -2.5 × 10^6 m/s
The second part continues in forward motion, I.e positive direction
Then, mass of the second part and it's velocity is
M2 = 7.9 × 10^5 kg
V2 = 1.3 × 10^6 m/s
A. What is the speed of the third piece?
So, we need to know the mass of the third part
M1 + M2 + M3 = M
M3 = M-M1-M2
M3 = 2.1 × 10^6 - 4.6 × 10^5 - 7.9 × 10^5
M3 = 8.5 × 10^5 kg
So, applying conservation of momentum
Momentum before explosion = momentum after explosion
MV = M1•V1 + M2•V2 + M3•V3
2.1 × 10^6 × 5.8 × 10^6 = 4.6 × 10^5 × -2.5 × 10^6 + 7.9 × 10^5 × 1.3 × 10^6 + 8.5×10^5•V3
1.218 × 10¹³ = -1.15 × 10¹² + 1.027 × 10¹² + 8.5 × 10^5•V3
1.218 × 10¹³ + 1.15 × 10¹² - 1.027 × 10¹² = 8.5 × 10^5•V3
1.2303 × 10^13 = 8.5 × 10^5 V3
V3 = 1.2303 × 10¹³ / 8.5 × 10^5
V3 = 1.45 × 10^7 m/s
B. The direction is straight forward since the velocity of the part is positive