Answer:
Distance of masses from the axis of rotation is now; 0.508 m
Step-by-step explanation:
We are given;
Initial angular velocity;ω_i = 2.97 rev/s
Final angular velocity;ω_f = 3.46 rev/s
Mass;m = 1.32 kg
Initial distance;r_i = 0.797 m
Combined moment of inertia of student and stool; I_c = 5.35 kgm²
Now, from conservation of angular momentum, we know that;
Initial angular momentum(L_i) = Final angular momentun(L_f)
Thus;L_i = L_f
So, we have; (I_i)•ω_i = (I_f)•ω_f
I_i would be calculated from;
I_i = I_c + 2m(r_i)²
So, I_i = 5.35 + 2(1.32*0.796²)
I_i = 7.023 kg.m²
So,from (I_i)•ω_i = (I_f)•ω_f, plugging in the relevant values, we have;
7.023 x 2.97 = (I_f) x 3.46
(I_f) = (7.023 * 2.97)/3.46
(I_f) = 6.03 kg.m²
Now we'll calculate the final distance(r_f) from;
I_f = I_c + 2m(r_f)²
Plugging in the relevant values, we'll obtain;
6.03 = 5.35 + 2*1.32*(r_f)²
2*1.32*(r_f)² = 6.03 - 5.35
2.64*(r_f)² = 0.68
(r_f)² = 0.68/2.64
r_f = √0.257576
r_f = 0.508 m