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13 Nov 2019
A mass of 1 kg is attached to the end of a spring immersed in a fluid with damping constant c-2. To stretch the spring 2 m beyond its equilibrium position, it takes a force of 10 N. External vibrations create a force represented by F(t)- 17 sin (2t). The spring is compressed in the negative x direction x(0)- -2 m from its equilibrium with zero initial velocity. Find the equation for the position of the mass at any time t x(t) =
A mass of 1 kg is attached to the end of a spring immersed in a fluid with damping constant c-2. To stretch the spring 2 m beyond its equilibrium position, it takes a force of 10 N. External vibrations create a force represented by F(t)- 17 sin (2t). The spring is compressed in the negative x direction x(0)- -2 m from its equilibrium with zero initial velocity. Find the equation for the position of the mass at any time t x(t) =
Reid WolffLv2
31 Mar 2019