its (a) Problem 2- Elastic collision between a bullet and a rod (a) A bullet with mass m and initial speed v along the horizontal direction collides elastically against a long uniform rod of length L and mass M>> m, pivoted at its upper end. The collision occurs at a distance L/2 from the rod's upper end, with the rod initially at rest with its axis along the vertical direction. Assume that L=1m, v= 100m/s, m = 1g and M = 1kg. Estimate the maximum angle, between the vertical axis and the rod axis, reached by the rod. (Hint: use cos 8max 10max/2). (b) Estimate the time it takes for the rod, from the time. the initial collision with the bullet, to reach the position of maximum angle. (c) Suppose that we take the rod to a distant planet, whose mass is twice that of the Earth and whose radius is also twice that of the Earth. Estimate the period of small oscillations of the rod on this distant planet? (Hint: approximate g = 10 m/s² on Earth; in parts (b) and (c) one significant digit is enough)

I attached the question and the answer What I don’t understand in part a is the part after we find angular velocity how was the semplification made to find the maximum angle just the simplification And in part b I don’t understand where pi/4 comes from

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(Hint: in points (a) and (b), approximate g = 10 m/s²) Problem 2- Elastic collision between a bullet and a rod (a) A bullet with mass m and initial speed v along the horizontal direction collides elastically against a long uniform rod of length L and mass M>> m, pivoted at its upper end. The collision occurs at a distance L/2 from the rod's upper end, with the rod initially at rest with its axis along the vertical direction. Assume that L=1m, v = 100m/s, m = 1g and M = 1kg. Estimate the maximum angle, between the vertical axis and the rod axis, reached by the rod. (Hint: use. cos max 1- /2). Omax/ (b) Estimate the time it takes for the rod, from the time of the initial collision with the bullet, to reach the position of maximum angle. (c) Suppose that we take the rod to a distant planet, whose mass is twice that of the Earth and whose radius is also twice that of the Earth. Estimate the period of small oscillations of the rod on this distant planet? (Hint: approximate g = 10 m/s² on Earth; in parts (b) and (c) one significant digit is enough)

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1 m/v²-v₁² ) = uhrad, but n is oo = M,V Problem 2- Elastic collision, bullet and rod Conseration of argular momentum gives: mv v 1/2 = -mv = 2 + [win where I= is the rod's moment of ML² inertia, and win its angular relocity immediately after the collision. Then, Win = mvL I The numerical value of Win is 20 Ano = 3 = (1-(05@max) 3m V ML des tant planet, where h = L/2. The time, AT, it takes to reach maximum angle is T/4. Thus: IV 33,14. (15) 0.6 DT = Tt O (c) The acceleration of gravity on the Eerth is GME g= and on the r2 W₁₁ = 0.35! I Mah GMP ·湖·5米· = The period of oscillation of the rod on the distant planet is T= 2πTV = Problem 3- Satellites 2x 1/2 27 (1) 2s MIM U.. with W₁ = Mg (1-cosman) and a we obtain 1-cosmex = 1-cos@man = st=_3 1m max 6x 10 With reference to the figure, using the work- (b) The period of small oscillations of energy principle in the form Wg = 1 / 1 (1) - W²23) the rod is I MgL Substituting numbers, and usy gs107/11, we obtain 10 m/s OM/ st inflate Lw² W₁ = 3g 9x105²3x103 Finally, using cos@mex ≈ 1-Omer, oblan man T= 2 = 21 n 0.25 = 0,08 rad (b) The mechanical energy of a satellite on