A ballistic pendulum, with a length of 1.5m and a mass of 3.0kg, is struck by...
A ballistic pendulum, with a length of 1.5m and a mass of 3.0kg, is struck by a bullet (m=15g) and deflected to an angle of 170 with the vertical. What was the initial speed of the bullet?
A ballistic pendulum with mass of 1.5kg is struck by a bullet of mass 0.1kg that was traveling at a velocity of 75m/s. After it is hit, the pendulum makes a maximum angle of 25 degrees with the vertical. What will the frequency f of the pendulum be?
A ballistic pendulum malfunctions, and the bullet collides elastically with the pendulum. The bullet has a mass of 5 grams and a speed of 100 m/s. The pendulum has a mass of 2 kg and a length of 0.5 m. To what angle (from vertical) does the pendulum swing?
1. A 35 g bullet is fired into the bob of a ballistic pendulum of mass 4.75 kg. When the bob is at its maximum height, the string makes an angle of 55 with the vertical. The length of the pendulum is 4.0 m. Find the speed of the bullet before impact. (Hint: Consider Momentum and Energy Conservation)
A bullet of mass 3.3 g strikes a ballistic pendulum of mass 1.3kg. The center of mass of the pendulum rises a vertical distance of6.6 cm. Assuming that the bullet remains embedded in the pendulum,calculate the bullet's initial speed.
mass One can measure the speed v of a bullet by using a ballistic pendulum. Let the mass of the bullet m=15g. The of the wooden pendulum is M=7 kg. The bullet is shot, and the system made of Wood + Bullet start swinging with an initial velocity V upward, as much as h=5 cm. a) (15 p) Via using the law of energy conservation and the law of linear momentum conservation, find the initial velocity of the bullet, in...
A bullet of mass 4.5 g strikes a ballistic pendulum of mass 1.7 kg. The center of mass of the pendulum rises a vertical distance of 6.3 cm. Assuming that the bullet remains embedded in the pendulum, calculate the bullet's initial speed.
A bullet of mass 3.1 g strikes a ballistic pendulum of mass 2.7 kg. The center of mass of the pendulum rises a vertical distance of 6.1 cm. Assuming that the bullet remains embedded in the pendulum, calculate the bullet's initial speed.
A bullet of mass 2.9 g strikes a ballistic pendulum of mass 4.7 kg. The center of mass of the pendulum rises a vertical distance of 15 cm. Assuming that the bullet remains embedded in the pendulum, calculate the bullet's initial speed.
A bullet of mass 20 g is fired into a ballistic pendulum of mass 5 kg. The center of gravity of the pendulum rises 10 cm after being struck. Find the initial velocity of the bullet.