Respuesta :
Answer:
The common angular speed of the reels is 1 rad/s.
Explanation:
Given:
Total length of the tape (d) = 212 m
Total time of run (t) = 2.1 hours
1 hour = 3600 s
So, 2.1 hours = 2.1 × 3600 = 7560 s
So, total time of run (t) = 7560 s
Inner radius (r) = 11 mm = 0.011 m
Outer radius (R) = 45 mm = 0.045 m
Now, linear speed of the tape (v) = [tex]\frac{d}{t}=\frac{212}{7560}=0.028\ m/s[/tex]
Let the same angular speed be [tex]\omega[/tex].
Now, average radius of the reel is given as the sum of the two radii divided by 2.
So, average radius is, [tex]R_{avg}=\frac{R+r}{2}=\frac{0.045+0.011}{2}=\frac{0.056}{2}=0.028\ m[/tex]
Now, common angular speed is given as the ratio of linear speed and average radius of the tape. So,
[tex]\omega=\dfrac{v}{R_{avg}}\\\\\\\omega=\dfrac{0.028}{0.028}\\\\\\\omega=1\ rad/s[/tex]
So, the common angular speed of the reels is 1 rad/s.
