1.2 1.3 A mass of 1,5 kg hung on a light vertical spring stretches it 0,4 m. The mass is then pulled down 1 m and released. 1.2.1 Find the position and velocity of the mass at any time if a damping force numerically equal to 15 times the instantaneous speed is acting. Use g = 10 m s-². 4 1.2.2 State the nature of the damping and illustrate it graphically. Derive the equation for the conservation of total energy of a simple harmonic oscillator.
1.2 1.3 A mass of 1,5 kg hung on a light vertical spring stretches it 0,4 m. The mass is then pulled down 1 m and released. 1.2.1 Find the position and velocity of the mass at any time if a damping force numerically equal to 15 times the instantaneous speed is acting. Use g = 10 m s-². 4 1.2.2 State the nature of the damping and illustrate it graphically. Derive the equation for the conservation of total energy of a simple harmonic oscillator.
Related questions
Question
Any one qwestion ans please
Transcribed Image Text:1.2
1.3
A mass of 1,5 kg hung on a light vertical spring stretches it 0,4 m. The mass
is then pulled down 1 m and released.
1.2.1 Find the position and velocity of the mass at any time if a damping
force numerically equal to 15 times the instantaneous speed is acting.
Use g = 10 m s-².
4
1.2.2 State the nature of the damping and illustrate it graphically.
Derive the equation for the conservation of total energy of a simple harmonic
oscillator.
Expert Solution
This question has been solved!
Explore an expertly crafted, step-by-step solution for a thorough understanding of key concepts.
Step by step
Solved in 2 steps with 2 images
