A spring has an unstretched length of 12 cm. When an 80 g ball is hung from it, the length increases by 4.0 cm. Then the ball is pulled down another 4.0 cm and released. Draw a position-versus-time graph showing the motion of the ball for three cycles of the oscillation. Let the equilibrium position of the ball be y=0. Be sure to include appropriate units on the axes so that the period and the amplitude of the motion can be determined from your graph.
A spring has an unstretched length of 12 cm. When an 80 g ball is hung...
A spring has an unstretched length of 15 cm . When an 85 g ball is hung from it, the length increases by 3.0 cm . Then the ball is pulled down another 3.0 cm and released. Part A) What is the spring constant of the spring? Express your answer in newtons per meter. Part B )What is the period of the oscillation? Express your answer in seconds.
Part A A spring has an unstretched length of 15 cm. When an 85 g ball is hung from it, the length increases by 7.0 cm. Then the ball is pulled down another 7.0 cm and released. What is the spring constant of the spring? Express your answer in newtons per meter. N/m Submit Request Answer Part B What is the period of the oscillation? Express your answer in seconds. Submit Request Answer Provide Feedback
Review 1 Constants Part A A spring has an unstretched length of 14 cm. When an 84 g ball is hung from it, the length increases by 7.0 cm. Then the ball is pulled down another 7.0 cm and released What is the spring constant of the spring? Express your answer using two significant figures k= N/m Submit Part B What is the period of the oscillation? Express your answer using two significant figures T- Submit Request Answer
A spring with unstretched length Lo = 13 cm is hung vertically. You attach a mass m = 50 g to the bottom of the spring and find it now has a total length of 20 cm. You then pull down on the mass stretching it an additional s = 1 cm. (a) Draw and label a diagram, find the (b) position, (c) velocity, and (d) acceleration of the mass at time t-0.1 s. (e) Find the period of oscillation....
You attach a 150 g mass on a spring hung vertically. a. If the spring initially stretches 16 cm when you hang the mass on it, what is the spring constant? b. How long will one oscillation take? The spring is now oriented horizontally and attached to a glider on a frictionless airtrack. The glider also has mass of 150 g. You want to observe the oscillations of this horizontal springmass system in the lab with a motion detector. You...
A spring is hung from the ceiling. When a block is attached to its end, it stretches 2.0 cm before reaching its new equilibrium length. The block is then pulled down slightly and released. What is the frequency of oscillation?
A spring hangs ( unstretched) from a support. A 300 gram mass is suspended from the spring and allowed to reach equilibrium. If the mass is pulled below this equilibrium position and released, what is its period of oscillation? (the spring stretches to 30.0 cm) Please, show me.
A spring hanging from a hook has a relaxed length of 8.1 cm with no mass attached to it. When a 0.41 kg mass is hung from the spring the spring stretches to a new equilibrium length of 12 cm. The mass is then pulled downward an additional 5.8 cm from the equilibrium position and released from rest. How fast (in m/s) is the mass moving when it first passes through the original equilibrium position of the spring (the relaxed...
A weight of 25kg is hung from a spring. A pull of 45kg will stretch the spring to m. The body is pulled down tom below the static equilibrium position and then released. Find the displacement of the body from its equilibrium position at time t sec., the maximum velocity and the period of oscillation (g = 9.8 sea). 10 A weight of 25kg is hung from a spring. A pull of 45kg will stretch the spring to m. The...
A (B+25.0) g mass is hung on a spring. As a result the spring stretches (8.50+A) cm. If the object is then pulled an additional 3.00 cm downward and released, what is the period of the resulting oscillation? Give your answer in seconds with 3 significant figures. A=9, B=081