Answer:
Step-by-step explanation:
The particles are in x-y plane with coordinates of masses as follows
m₂ at (0,0 ) m₁ at ( 0,2 ), m₄ at ( 2,2 ) and m₃ at (2,0 )
Moment of inertia about z axis
I_z = 0 + 3 x 2² + 4 x (2√2)² + 3 x 2²
= 12 + 32 + 12
= 56 kgm²
Now let us find out moment of inertia about axis through CM
According to theorem of parallel axis
I_z = I_g + m x r²
Here m is total mass that is 14 kg and r is distance between two axis which is √2 m
56 = I_g + 14 x (√2)²
I_g = 56 - 28
= 28 kgm²
We can directly compute I_g as follows
I_g = 4 x (√2)² +3 x (√2)² +4 x (√2)²+3 x (√2)²
= 8 +6 +8 +6
= 28 kgm²
So the result obtained earlier is correct.