Differential equation defining free damping vibration motion, It is given as m" (t) + µx ' (t) + kx = 0. In the critical case where =(4/ k), µ> O, where the roots of the characteristic equation are equal to 0^+, the solution of the equation is x(t)-(A+Bt)e^(-At /2). Show that for AA <2B, x(t) initially increases and reaches its maximum at the value t =(2/2 - A/B)

Advanced Engineering Mathematics
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ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
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Differential equation defining free damping vibration motion, It is given as m" (t) + µx' (t) + kx = 0. In the critical case where 2=(u/ k) , µ> O, where the
roots of the characteristic equation are equal to 0^+, the solution of the equation is x(t)=(A+Bt)e^(-at /2). Show that for AA <2B, x(t) initially increases and
reaches its maximum at the value t =(2/1 - A /B)
Transcribed Image Text:Differential equation defining free damping vibration motion, It is given as m" (t) + µx' (t) + kx = 0. In the critical case where 2=(u/ k) , µ> O, where the roots of the characteristic equation are equal to 0^+, the solution of the equation is x(t)=(A+Bt)e^(-at /2). Show that for AA <2B, x(t) initially increases and reaches its maximum at the value t =(2/1 - A /B)
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