A projectile of mass m is shot into a block of mass M. The block is initially at rest at the edge of a frictionless table. The table top is a height h above the floor. The projectile hits and sticks to the block. After impact the masses land a distance d from the edge of the table. Determine the expression for the initial speed of the projectile.
Let u be initial speed.Now we assume m hits M horizontally .
Let us find speed just after collision.
A projectile of mass m is shot into a block of mass M. The block is...
A bullet of mass m id fired into a block of mass M initially at rest at the edge of a frictionless table of height h (figure). The bullet remains in the block, and after impact the block lands a distance d from the bottom of the table. Determine the initial speed of the bullet. (Use any variable or symbol stated above along with the following as necessary)
A bullet of mass m = 5.00 g is fired into a block of mass M = 500 g initially at rest at the edge of a frictionless table of height h = 1.20 m. The bullet remains in the block, and after impact the block lands a distance d = 0.80 m from the bottom of the table. Determine the initial speed of the bullet.
HW 5.4. A bullet of mass m is fired into a block of mass M initially at rest at the edge of a frictionless table of height h. The bullet remains in the block, and after impact the block lands a distance d from the bottom of the table. Determine the initial speed of the bullet and the magnitude and direction of the impulse from the bullet on the block.
HW 5.4. A bullet of mass m is fired into a block of mass M initially at rest at the edge of a frictionless table of height h. The bullet remains in the block, and after impact the block lands a distance d from the bottom of the table. Determine the initial speed of the bullet and the magnitude and direction of the impulse from the bullet on the block т М
A bullet of mass m is fired at a block of mass M initially at rest on the edge of a frictionless table of height h, see figure. The bullet remains in the block and, after hitting the block, lands at a distance d from the lowest part of the table. Determine the initial speed of the bullet.
m 2S0 A block of mass m1-3.80 kg initially at rest on top of a frictionless, horizontal table is attached by a lightweight string to a second block of mass m2 2.90 kg hanging vertically from the edge of the table and a distance h 0.430 m above the floor (as shown in the figure below). If the edge of the table is assumed to be frictionless, what is the speed with which the first block leaves the edge of...
(3) (20%) A bullet of mass m is fired into a block of mass M initially at rest at the edge of a frictionless table of height h (figure). The bullet remains in the block, and after impact the block lands a distance d from the bottom of the table. Determine the initial speed of the bullet. (Use any variable or symbol stated acove along with the following as necessary) byacon watal as shownhe te ob minthe ork don the...
A bullet of mass m is moving horizontally with speed vo when it hits a block of mass 100m that is at rest on a horizontal frictionless table. The surface of the table is a height h above the floor The bullet passes through the block at a speed of 1/2 vo Derive an expression for the velocity of the block immediately after the collison (before leaving the table) in terms of m and vo
A bullet of mass m = 15 g is fired into a wooden block of mass M = 2.0 kg resting initially at the edge of a frictionless table of height h = 1.2 m. The bullet gets imbedded in the block, and after impact the block+bullet lands on the floor a horizontal distance d = 1.8 m from the bottom of the table. What was the initial speed of the bullet? A. 367 m/s B. 489 m/s C. 133...
Please help with this problem: Energy and Collisions 100m 53. A bullet of mass m is moving horizontally with speed vo when it hits a block of mass 100m that is at rest on a horizontal frictionless table, as shown above. The surface of the table is a height h above the floor. After the impact the bullet and the block slide off the table and hit the floor a distance x from the edge of the table. Derive expressions...