Consider the following equation. −kx − bdxdt = md2x dt2 Show that it i

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Consider the following equation. −kx − bdxdt = md2x dt2 Show that it is a solution of the following provided that b2 < 4mk. x = Ae(−b/2m)tcos⁡(ωt + θ) (Submit a file with a maximum size of 1 MB. ) Choose File No file chosen This answer has not been graded yet.

Consider the following equation. −kx − bdxdt = md2x dt2 Show that it is a solution of the following provided that b2 < 4mk. x = Ae(−b/2m)tcos⁡(ωt + θ) (Submit a file with a maximum size of 1 MB. ) Choose File No file chosen This answer has not been graded yet.

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Consider the following equation.

- k x - b \frac{d x}{d t} = m \frac{d^{2} x}{d t^{2}}

Show that it is a solution of the following provided that

b^{2} < 4 m k

.

x = A e^{(- b / 2 m) t} \cos (ω t + θ)

(Submit a file with a maximum size of

1 M B

. ) Choose File No file chosen This answer has not been graded yet.

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