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A fish takes the bait and pulls on the line with a force of 2.3 N. The fishing reel, which rotates without friction, is a uniform cylinder of radius 0.045 m and mass 0.82 kg. What is the angular acceleration of the fishing reel? How much line does the fish pull from the reel in 0.20 s?

Respuesta :

Explanation:

The given data is as follows.

     Pulling force on the reel is F = T = 2.3 N

     Mass of cylinder (m) = 0.82 kg

    Radius of cylinder (r) = 0.045 m

Formula for torque pulling force on the cylinder is as follows.

           [tex]\tau = Fr[/tex]

                     = [tex]I \times \alpha[/tex]

Moment of inertia of the cylinder (I) is as follows.

            I = [tex]\frac{mr^{2}}{2}[/tex]

  [tex]\alpha[/tex] = angular acceleration of the cylinder

Hence,

                    Fr = [tex](\frac{mr^{2}}{2}) \alpha[/tex]

or,   [tex]\alpha = \frac{2F}{mr}[/tex]

                   = [tex]\frac{2 \times 2.3 N}{0.82 kg \times 0.045 m}[/tex]

                   = 124.66 [tex]rad/s^{2}[/tex]

Amount of line pulled is h and it is in a times of 0.2 sec.

Now, linear acceleration is calculated as follows.

             a = [tex]r \alpha[/tex]

                = [tex]0.045 m \times 124.66 rad/s^{2}[/tex]

                 = 5.61 [tex]m/s^{2}[/tex]

Now, relation between h and acceleration as follows.

             h = [tex]v_{o}t + \frac{1}{2}at^{2}[/tex]

here,   [tex]v_{o}[/tex] = 0

Hence, calculate the value of h as follows.

             h = [tex]v_{o}t + \frac{1}{2}at^{2}[/tex]

                = [tex]0 + \frac{1}{2} \times 5.61 m/s^{2} \times (0.2s)^{2}[/tex]

                = 0.1121 m

Thus, we can conclude that acceleration of the fishing reel is 5.61 [tex]m/s^{2}[/tex] and it will pull 5.61 [tex]m/s^{2}[/tex] line from the reel in 0.20 s.

Answer:

[tex]\alpha=12.47\ rad.s^{-2}[/tex]

[tex]l=0.011223\ m=11.223\ mm[/tex]

Explanation:

Given:

  • radius of cylinder, [tex]r=0.045\ m[/tex]
  • mass of cylinder, [tex]m=0.82\ kg[/tex]
  • time observation, [tex]t=0.2\ s[/tex]
  • force of pull by the fish, [tex]F=2.3\ N[/tex]

Angular acceleration is given as:

[tex]\tau=I.\alpha[/tex] ............(1)

Now as, [tex]\tau=F.r[/tex] ...................(2)

where:

[tex]\tau=[/tex] torque

[tex]I=[/tex]moment of inertia

[tex]\alpha=[/tex] angular acceleration.

From eq (2)

[tex]\tau=2.3\times 0.045[/tex]

[tex]\tau=0.1035\ N.m[/tex]

For cylinder:

[tex]I=\frac{1}{2} m.r^{2}[/tex]

[tex]I=0.5\times 0.82\times 0.045^2[/tex]

[tex]I=8.3025\times 10^{-4}\ kg.m^2[/tex]

Now using eq. (1):

[tex]0.1035=8.3025\times 10^{-4}\times \alpha[/tex]

[tex]\alpha=12.47\ rad.s^{-2}[/tex]

Revolution made in 0.2 seconds:

[tex]\theta=\omega_i.t+\frac{1}{2} \alpha.t^2[/tex]

where:

[tex]\omega_i=[/tex] initial angular velocity = 0

[tex]\theta=0+0.5\times 12.47\times 0.2^2[/tex]

[tex]\theta=0.2494\ rad[/tex]

Hence the length of reel pulled out:

[tex]l=\theta \times r[/tex]

[tex]l=0.2494\times 0.045[/tex]

[tex]l=0.011223\ m=11.223\ mm[/tex]

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