Answer:
Total angle through which the wheel has turned 58.9s after it begins rotating is 1709.52 rad
Explanation:
The image attached would offer a better explanation
Answer:
The answer to the question is;
The total angle through which the wheel has turned 58.9 s after it begins rotating is approximately 1709.67 rad.
Explanation:
To solve the question we note the equation for the motion of the flywheel as
ω₂ = ω₁ + α·t
Where:
ω₁ = Initial angular velocity = 0 rad/s as the body is initially at rest
ω₂ = Final angular velocity
α = angular acceleration = 1.35 rad/s²
t = Time = 28.3 s
Plugging in the values, we find ω₂
ω₂ = 0 + 1.35 rad/s²× 28.3 s = 38.205 rad/s
Since the acceleration is constant, only the mean velocity is required to determine the angle traveled during the first 28.3 seconds thus
Average velocity
ω[tex]_{average}[/tex]= [tex]\frac{Final .Velocity +Initial . Velocity}{2} = \frac{\omega_2+\omega_1}{2} = \frac{38.205 rad/s+0 rad/s}{2}[/tex]
= 19.1025 rad/s
The total angle traveled in 28.3 s is ω[tex]_{average}[/tex] × time
= 19.1025 rad/s × 28.3 s = 540.60075 rad
After this the remaining time left is
58.9 s - 28.3 s = 30.6 s
Since the flywheel is moving at a constant velocity of 38.205 rad/s during the last 30.6 s we have
Angle traveled in 30.6 s at an angular velocity of 38.205 rad/s is given by
Angle traveled = Time × Angular velocity = 30.6 s × 38.205 rad/s
= 1169.073 rad
Therefore, the total angle traveled by the flywheel in 58.9 s is given by
540.60075 rad + 1169.073 rad = 1709.67375 rad ≈1709.67 rad.
the total angle traveled by the flywheel in 58.9 s ≈ 1709.67 rad.
