Respuesta :
Answer:
a)  Δt = 24.96 s , b)  τ = 0.078 N m
Explanation:
This is a rotational kinematics exercise
    θ = w₀ t - ½ α t²
Let's reduce the magnitudes the SI system
    θ = 60 rev (2π rad / 1 rev) = 376.99 rad
    w₀ = 7.0 rot / s (2π rad / 1 rpt) = 43.98 rad / s
   Â
   α = (w₀ t - θ) 2 / t²
let's calculate the annular acceleration
   α = (43.98 10 - 376.99) 2/10²
   α = 1,258 rad / s²
Let's find the time it takes to reach zero angular velocity (w = 0)
    w = w₀ - alf t
     t = (w₀ - 0) / α
     t = 43.98 / 1.258
     t = 34.96 s
this is the total time, the time remaining is
     Δt = t-10
     Δt = 24.96 s
To find the braking torque, we use Newton's law for angular motion
    τ = I α
the moment of inertia of a circular ring is
    I = M r²
we substitute
     τ = M r² α
we calculate
    τ = 0.625  0.315²  1.258
    τ = 0.078 N m
The total time taken by the wheel to come to rest is 25.18 s and the magnitude of the frictional torque is 25.18 N-m.
Given data:
The initial angular speed of wheel is, [tex]\omega = 7.0 \;\rm rps[/tex] Â (rps means rotation per second).
The time interval is, t' = 10.0 s.
The number of rotations made by wheel is, n = 60.0.
The mass of bike wheel is, m = 0.625 kg.
The radius of wheel is, r = 0.315 m.
The problem is based on rotational kinematics. So, apply the second rotational equation of motion as,
[tex]\theta = \omega t-\dfrac{1}{2} \alpha t'^{2}[/tex]
Here, [tex]\theta[/tex] is the angular displacement, and its value is,
[tex]\theta =2\pi \times 60\\\\\theta = 376.99 \;\rm rad[/tex]
And, angular speed is,
[tex]\omega = 2\pi n\\\omega = 2\pi \times 7\\\omega = 43.98 \;\rm rad/s[/tex]
Solving as,
[tex]376.99 = 43.98 \times 10-\dfrac{1}{2} \alpha \times 10^{2}\\\\\alpha = 1.25 \;\rm rad/s^{2}[/tex]
Apply the first rotational equation of motion to obtain the value of time to reach zero final velocity.
[tex]\omega' = \omega - \alpha t\\\\0 = 43.98 - 1.25 \times t\\\\t = 35.18 \;\rm s[/tex]
Then total time is,
T = t - t'
T = 35.18 - 10
T = 25.18 s
Now, use the standard formula to obtain the value of braking torque as,
[tex]T = m r^{2} \alpha\\\\T = 0.625 \times (0.315)^{2} \times 1.25\\\\T = 0.0775 \;\rm Nm[/tex]
Thus, we can conclude that the total time taken by the wheel to come to rest is 25.18 s and the magnitude of the frictional torque is 25.18 N-m.
Learn more about the rotational motion here:
https://brainly.com/question/1388042
