Problem 5: (a) For a driven, damped harmonic oscillator, the peak of the amplitude(and therefore the maximum potential energy) occurs for a driving frequency of w=w₂ =√3 - 2/3². Determine the driving frequency at which the kinetic energy of the system isa maximum. (b) Make a "resonance peak" plot of kinetic energy versus driving frequency,for various values of ß. [You may assume that wo = 1 rad/s, or equivalently you can chooseto measure driving frequency w and damping / as fractions or multiples of wo. Choose aconvenient value for the driving force.]

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Answered: Problem 5: (a) For a driven, damped…

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