Three particles have the following masses and center of mass coordinates: m1 = 2.50 kg, (0.150...

Mass and coordinates of three particles are given: Mass, M1 = 3 kg, Coordinates: X =...

Mass and coordinates of three particles are given: Mass, M1 = 3 kg, Coordinates: X = 1, Y = 1 Mass, M2 = 2 kg, Coordinates: X = -1, Y = -1 Mass, M3 = 1 kg, Coordinates: X = 0, Y = 1 (a) Find the Moment of Inertia of the three particles about the X-axis (axis of rotation) (b) Find the Center of Mass of the three objects

Consider a system consisting of three masses on the x axis. Mass m1 = 1.50 kg...

Consider a system consisting of three masses on the x axis. Mass m1 = 1.50 kg is at x1 = 1.50 m ; mass m2 = 2.00 kg is at x2 = 2.30 m ; and mass m3 = 3.20 kg is at x3 = 2.70 m . What is the total gravitational potential energy of this system?

Three particles are placed in the xy plane. A m1 = 65 g particle is located...

Three particles are placed in the xy plane. A m1 = 65 g particle is located at (x1, y1), where x1 = 4.4 m and y1 = 1.7 m and a m2 = 58 g particle is located at (x2, y2), where x2 = −1.4 m and y2 = −6.6 m . A) What must be the x coordinate of the m3 = 42 g particle so that the center of mass of the three-particle system is at the origin?...

A particle with mass M0 is at rest. It decays into two particles with masses m1...

A particle with mass M0 is at rest. It decays into two particles with masses m1 = 6.64 × 10-27 kg and m2 = 5.20 × 10-26 kg. After the decay, m1 moves at 0.95 c. (a) What is the speed of m2 after the decay? (b) What is M0? Answers: (a) 1.09 × 10^8 m/s (b) 7.71 × 10^−26 kg

A system consists of two particles. The first particle has mass m1 = 2.0 kg and...

A system consists of two particles. The first particle has mass m1 = 2.0 kg and a velocity of (-5.0 i+1.0j) m/s, and the second particle has mass m2 = 1.00 kg and a velocity of (1.0i - 5.0j)    m/s. A:) What is the velocity of the center of mass of this system?   B:) what is the total momentum of this system?

Three blocks of masses m1=1.00 kg, m2=2.00 kg, and m3=3.00 kg are set at rest on...

Three blocks of masses m1=1.00 kg, m2=2.00 kg, and m3=3.00 kg are set at rest on a level air track from right to left. Then m3 is pushed toward m2 with a speed of 3.00 m/s. Assuming that all collisions are elastic, what are the final speeds of (a) m1, (b) m2, and (c) m3?

Let's consider a rigid system with three particles. Masses of these particles m1 = 3 kgs,...

Let's consider a rigid system with three particles. Masses of these particles m1 = 3 kgs, m2 = 4 kg, m3 = 2 kgs, and their positions are (1, 0, 1), (1, 1, -1) and Let it be (1, -1, 0). Locations are given in meters. a) What is the inertia tensor of the system? b) What are the main moments of inertia? c) What are the main axes?( this part is also important for me )

A rod of length l=1.1m and mass M= 5.5kg joins two particles with masses m1 =4.8kg...

A rod of length l=1.1m and mass M= 5.5kg joins two particles with masses m1 =4.8kg and m2 = 2.8kg, at its ends. The combination rotates in the xy-plane about a pivot through the center of the rod with the linear speed of the masses of v= 3.5 m/s. (Moment of inertia of a uniform rod rotating about its center of mass I= 1 12 M l2 ) angularmomentum a) Calculate the total moment of inertia of the system I...

A rod of length l=2.2m and mass M= 9.7kg joins two particles with masses m1 =12.9kg...

A rod of length l=2.2m and mass M= 9.7kg joins two particles with masses m1 =12.9kg and m2 = 5.0kg, at its ends. The combination rotates in the xy-plane about a pivot through the center of the rod with the linear speed of the masses of v= 12.9 m/s. (Moment of inertia of a uniform rod rotating about its center of mass I= 1 12 M l2 ) a) Calculate the total moment of inertia of the system I =...

A 2.92 kg particle has the xy coordinates (-1.90 m, 0.101 m), and a 4.04 kg...

A 2.92 kg particle has the xy coordinates (-1.90 m, 0.101 m), and a 4.04 kg particle has the xy coordinates (0.410 m, -0.405 m). Both lie on a horizontal plane. At what (a) x and (b) y coordinates must you place a 3.96 kg particle such that the center of mass of the three-particle system has the coordinates (-0.876 m, -0.309 m)?