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Each ball has a negligible size and a mass of 11.5 kg and is attached to the end of a rod whose mass may be neglected. The rod is subjected to a torque M = (t2+2) N⋅m, where t is in seconds. Each ball has a speed v = 2 m/s when t = 0.

Determine the speed of each ball when t = 3 s.

Express your answer to three significant figures and include the appropriate units.

Respuesta :

Olajidey

Answer:

3.31m/s

Explanation:

Angular momentum for 3s is

[tex]L = L_i_n_i + L_3_s[/tex]

[tex]L = 2(11.5kg) + \int\limits^ {3s}_ {0s} {(t^2 + 2)} \, dt[/tex]

[tex]L = 23kg+(\frac{t^3}{3} +2t)^ {3s}_ {0s}\\\\L=38kgm/s[/tex]

Moment if inertia is

[tex]I = 2ml^2[/tex]

[tex]I = 2(11.5)(0.5)^2\\\\I=5.75kgm^2[/tex]

Angular speed

ω = L/I

[tex]= 38 / 5.75\\\\=6.61[/tex]

The speed of each ball is

V = ωL

[tex]= 6.61\times0.5\\\\= 3.31m/s[/tex]

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