lated about the origin is: D. 18 C. 6.0 E. 23 Q.19: A 2-kg particle has its position in the XY-plane given by: F(1)={(21 +5)i +(1 - 31 +1)], where t is in seconds and r is in meters. The magnitude of the angular momentum (measured in kg.m/s Jof the particie with respect to the origin at t = 1 sec i: C. 8 A. 2 В. 6 D. 10 E. 12 Q.20: in the adjacent figure, a very light rope is MrIn R = 2 m. The wheel

Solve Q19

Transcribed Image Text:

Q.15: The angular position (s yall) of a swinging () rigid body is given by: 0(t) = (--43 + 2t² + 1001 + 5) rad The magnitude of the angular velocity (in rad/s) of this body at t = 1 sec is: В. 18 C. 23 D. 92 E. A. 9.8 Q.16: At t = 0, a wheel (Jae) rotating about a fixed axis at a constant angular acceleration hi angular speed of 2 rad/s. Two seconds later it has turned through 5 complete revolutions ( The magnitude of the angular acceleration (in rad/s) of this wheel is: (Hint: one revolution equals 2n rad). A. 2.65 Q.17: The disc in the adjacent figure has radius R and rotates () with an angular speed w al axle (J) passing through point o and perpendicular (sc) to the plane of the disc. Let w, a represent the angular speed, angular acceleration and linear speed, respectively (al gle). If points A, B, and C lie at the rim (a) of the disc, then which of the following statements is entirely (S) correct: A. VA> Va> Vc and wa = Wa = ws B. VA = Va = Vc and wa> wa> wc C. an >ag > ac and VA = Vg = Vc D. WA = Wg = wcand Vc> Vg > VA [. WA = Wa = we and VA = Va = Vc Q.18: A rigid body rotates around an axis that passes through the origin and perpendicular to its surface. A force F= (2i + i -k)N acts on the rigid body at the point (1, -1, 1) m. The magnitude of the torque (in N.m) due to this force calculated about the origin is: B. 5.0 C. 13.7 D. 9.8 E. A. 2.1 B. 4.2 C. 6.0 D. 18 E. 23 Q.19: A 2-kg particle has its position in the XY-plane given by: F(1) ={(24 + 5)i +(1 - 31 +1)], where t is in seconds andr is in meters. The magnitude of the angular momentum (measured in kg.m²/s Jof the particle with respect to the origin at t = 1 sec i A. 2 В. 6 С. 8 D. 10 E. 12 Q.20: in the adjacent figure, a very light rope is wrapped around a wheel of radius R = 2 m. The wheel can rotate around an axte that is passing through its center and perpendicular to its surface. A block of mass 14 kg is suspended (ilea) from -he end of the rope. When the system is reieased from rest it is observed that the -lock descends () with constant acceleration of magnitude 5 m/s. he moment of inertia (measured in kg.m) of the wheel relative to the rotation -ie is: 14 kg B. 37.2 E. 53.8 9.8 C. 12.8 24.3