A mass of 0.301 kg is attached to a spring hanging from a ceiling. The mass...
A spring is hanging from a ceiling with 50g mass attached. When the mass is pulled down from the equilibrium and released, it oscillates with 0.4s period. The spring constant is equal to
An ideal spring is in equilibrium, hanging from a ceiling with a 1 kg mass at the end. At rest, the length of the hanging spring is 10 cm. Then, an additional 5 kg block is added to the spring, causing its length at rest to increase to 13 cm. The 5 kg block is then removed. Starting from rest, when the 5 kg block is removed, the spring begins to oscillate. What will the spring’s velocity be, the third...
Q2. A mass of 300 g is attached to a spring hanging from the ceiling. The spring stretches 20 cm when the mass is added. What is the spring constant of the spring? If the mass is now pulled 8 cm below it’s new equilibrium position, what will be the frequency of the oscillation What is the maximum speed of the mass? At what position will it have a speed that is one third of the maximum speed? What is...
A massless spring is hanging vertically from the ceiling. A mass m is attached to the bottom end of the spring and released from rest. How close to its final resting position is the mass when βt = 1 given that the mass finally comes to rest a distance d below the point from which it was released and the oscillator is critically damped.
A spring is hanging from the ceiling. When a 2 kg mass is hung from the spring, the spring has a total length of 50 cm. When a 5 kg mass is hung from the spring, the spring has a total length of 70 cm. Determine the spring's relaxed length and its spring's spring constant. (You should keep 4 decimals in your values to avoid rounding errors.)
A 0.490 kg mass suspended from a spring oscillates with a period of 1.50 s. How much mass must be added to the object to change the period to 2.00 s? kg
13b A 0.460 kg mass suspended from a spring oscillates with a period of 1.50 s. How much mass must be added to the object to change the period to 2.00 s? ___ kg
A 0.510 kg mass suspended from a spring oscillates with a period of 1.50 s. How much mass must be added to the object to change the period to 2.10 s? x kg 034
A mass weighing 96 lb is attached to a spring hanging from the ceiling and comes to rest at its equilibrium position. At time t = 0, an external force of F(t) = 3 cos 3t lb is applied to the system. If the spring constant is 15 lb/ft and the damping constant is 4 lb-sec/ft, find the steady-state solution for the system. Use g = 32 ft /sec. The steady-state solution is y(t) = | |
A block of mass mis attached to the lower end of a spring that is hanging from a ceiling, and the block is gently lowered a distance d to rest. If the mass now undergoes vertical SHM, the period of the SHM will be: 0 T = 270o 0 T = 27, 0 7 = 2y T = 20 mg 0