Answer:
The angular speed is 0.83 rad/s.
Explanation:
Given that,
Mass of disk M=49 kg
Radius = 1.7 m
Mass of child m= 29 kg
Speed = 2.6 m/s
Suppose if the disk was initially at rest , now how fast is it rotating
We need to calculate the angular speed
Using conservation of momentum
[tex]m\omega_{i}=(mr^2+\dfrac{Mr^2}{2})\omega_{f}[/tex]
[tex]mvR=(mr^2+\dfrac{Mr^2}{2})\omega[/tex]
Put the value into the formula
[tex]29\times2.6\times1.7=(29\times1.7^2+\dfrac{49\times1.7^2}{2})\omega_{f}[/tex]
[tex]\omega_{f}=\dfrac{29\times2.6\times1.7}{(29\times1.7^2+\dfrac{49\times1.7^2}{2})}[/tex]
[tex]\omega_{f}=0.83\ rad/s[/tex]
Hence, The angular speed is 0.83 rad/s.
The angular speed is mathematically given as
wf=0.83rad/s
Question Parameter(s):
Generally, the equation for the conservation of momentum is mathematically given as
[tex]m\omega_{i}=(mr^2+\frac{Mr^2}{2})\omega_{f}[/tex]
Therefore
[tex]29\*2.6*1.7=(29\times1.7^2+\frac{49*1.7^2}{2})\omega_{f}[/tex]
wf=0.83rad/s
In conclusion, the angular speed is
wf=0.83rad/s
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