A cylinder has inner and outer radii of $2 c m$ $2 cm$ and $5 c m$ $5 cm$ , respectively, and a mass of $5 k g$ $5 kg$ . If the cylinder's frequency of counterclockwise rotation about its center changes from $12 H z$ $12 Hz$ to $9 H z$ $9 Hz$ , by how much does its angular momentum change?

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A cylinder has inner and outer radii of $2 c m$ $2 cm$ and $5 c m$ $5 cm$ , respectively, and a mass of $5 k g$ $5 kg$ . If the cylinder's frequency of counterclockwise rotation about its center changes from $12 H z$ $12 Hz$ to $9 H z$ $9 Hz$ , by how much does its angular momentum change?

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Answer 1 · 2018-04-28T17:53:09

Let's assume this cylinder is uniform (which is very important).

Recall for a solid cylinder,

$I = \frac{1}{2} m r^{2}$ $I = 1/2mr^2$

Moreover, recall angular momentum,

$L = I ω$ $L = Iomega$

Now, let's derive the moment of inertia of this circular body,

$I = \frac{1}{2} m r^{2} \approx 5 kg \cdot m^{2}$ $I = 1/2mr^2 approx 5"kg"*"m"^2$

which is generally constant in our calculations.

Now, recall,

$ω = 2 π f$ $omega = 2pif$

Hence,

$I_{1} 2 π f_{1} \approx \frac{75 kg \cdot m^{2}}{s}$ $I_(1)2pif_1 approx (75"kg"*"m"^2)/"s"$ , and

$I_{2} 2 π f_{2} \approx \frac{57 kg \cdot m^{2}}{s}$ $I_(2)2pif_2 approx (57"kg"*"m"^2)/"s"$

$therefore DeltaL = L_2 - L_1 approx (18"kg"*"m"^2)/"s"$

is the change in angular momentum given your data.

Answer 2 · 2018-04-29T06:30:17

The change in angular momentum is $=0.137kgm^2s^-1$

Explanation:

The angular momentum is $L=Iomega$

where $I$ is the moment of inertia

and $omega$ is the angular velocity

The mass of the cylinder is $m=5kg$

The radii of the cylinder are $r_1=0.02m$ and $r_2=0.05m$

For the cylinder, the moment of inertia is $I=m((r_1^2+r_2^2))/2$

So, $I=5*((0.02^2+0.05^2))/2=0.00725kgm^2$

The change in angular velocity is

$Delta omega=Deltaf*2pi=(12-9) xx2pi=6pirads^-1$

The change in angular momentum is

$DeltaL=IDelta omega=0.00725xx6pi=0.137kgm^2s^-1$

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A cylinder has inner and outer radii of $2 c m$ $2 cm$ and $5 c m$ $5 cm$ , respectively, and a mass of $5 k g$ $5 kg$ . If the cylinder's frequency of counterclockwise rotation about its center changes from $12 H z$ $12 Hz$ to $9 H z$ $9 Hz$ , by how much does its angular momentum change?

2 Answers

Explanation:

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A cylinder has inner and outer radii of 2 cm2cm2 cm and 5 cm5cm5 cm, respectively, and a mass of 5 kg5kg5 kg. If the cylinder's frequency of counterclockwise rotation about its center changes from 12 Hz12Hz12 Hz to 9 Hz9Hz9 Hz, by how much does its angular momentum change?

2 Answers

Explanation:

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A cylinder has inner and outer radii of $2 c m$ $2 cm$ and $5 c m$ $5 cm$ , respectively, and a mass of $5 k g$ $5 kg$ . If the cylinder's frequency of counterclockwise rotation about its center changes from $12 H z$ $12 Hz$ to $9 H z$ $9 Hz$ , by how much does its angular momentum change?