Answer:
18.75 rad/s²
Explanation:
Given that
Mass of the centrifuge, m = 3.45 kg
Time taken to spin, t = 100 s
Distance from axis of rotation, r = 8 cm = 0.08 m
Speed of the centrifuge, v = 150 m/s
First, we find the angular velocity
Angular velocity, w = v / r
w = 150 / 0.08
w = 1875 rad/s
And from the angular velocity, we get our angular acceleration.
Angular acceleration = angular velocity / time taken
Angular acceleration = 1875 rad/s / 100 s
Angular acceleration = 18.75 rad/s²
Therefore, the angular acceleration is 18.75 rad/s²
Answer:
The angular acceleration of the centrifuge as it spins up is 18.75 rad/s²
Explanation:
Given;
mass of centrifuge, m = 3.45 kg
time taken to spin, t = 100 s
distance from the axis of rotation, r = 8.00 cm = 0.08 m
final velocity of the centrifuge, v = 150 m/s
initial velocity of the centrifuge, u = 0
Determine the linear acceleration of the centrifuge at the given time;
[tex]a = \frac{v-u}{t} \\\\a = \frac{150-0}{100} \\\\a = 1.5 \ m/s^2[/tex]
Finally, determine the angular acceleration of the centrifuge as it spins up;
α = a/r
where;
α is the angular acceleration
α = 1.5 / 0.08
α = 18.75 rad/s²
Therefore, the angular acceleration (in rad/s2) of the centrifuge as it spins up is 18.75 rad/s²
