[This is a particularly challenging problem, incorporating momentum, conservation of energy, and centripetal force. If you find yourself getting annoyed, just remember that I could have turned the block into a projectile as well :-). Consider it a bonus.]
A bullet of mass m = 40 g, moving horizontally with speed v, strikes a clay block of mass M = 1.68 kg that is hanging on a light inextensible string of length L = 0.620. The bullet becomes embedded in the block, which was originally at rest. What is the smallest value of v which would cause the block-on-a-string to swing around and execute a complete vertical circle?
[This is a particularly challenging problem, incorporating momentum, conservation of energy, and centripetal force. If you...
See the picture (This is a particularly challenging problem, incorporating momentum, conservation of energy, and centripetal force. If you find yourself getting annoyed, just remember that I could have turned the block into a projectile as well :-). Consider it a bonus.) A bullet of mass m = 40 g, moving horizontally with speed u, strikes a clay block of mass M = 1.45 kg that is hanging on a light inextensible string of length L = 0.770. The bullet...
A bullet of mass m = 40 g, moving horizontally with speed v, strikes a clay block of mass M=1.33 kg that is hanging on a light inextensible string of length L=0.767. The bullet becomes embedded in the block, which was originally at rest. What is the smallest value of vv which would cause the block-on-a-string to swing around and execute a complete vertical circle?
A bullet of mass m = 40 g, moving horizontally with speed v, strikes a clay block of mass M = 1.73 kg that is hanging on a light inextensible string of length = 0.774. The bullet becomes embedded in the block, which was originally at rest. What is the smallest value of v which would cause the block-on-a-string to swing around and execute a complete vertical circle? Please enter a numerical answer below. Accepted formats are numbers or "e"...
OAL Combine the concepts of conservation of energy and conservation of momentum in inelastic collisions. In figure a, a bullet and a wooden block are shown in two configurations. In the first configuration, the block, labeled m2, hangs vertically from a ceiling. A bullet, labeled m1, approaches the block horizontally from the left. A rightward arrow points from the bullet and is labeled vector v1i. A rightward arrow, shorter than the first, points from the block and is labeled vector...
please provide steps. Conservation of Linear Momentum and Centripetal Force See Figure 7. A block of mass 1 kg starts from rest and slides down a curved track. The block a vertical height of 5 m before striking a 3-kg pendulum bob, drops at the end of the track which is initially at rest. An elastic collision takes place. The pendulum has a length of 1m, and the mass of the pendulum is only at the bob. Find the tension...