Find the general solution of the differential equation y′′+16y=17sec2(4t) 0<t<pi/8

Expert Solution

Colby Messinger answered 2 years ago

Find the general solution of this differential equation: y'''+y''+y'+y=4e^(-t)+4sin(t)

y'' + 16y = (8)(cos(4t)) y(0)=y'(0)= 0 Use Laplace Transforms to solve. Sketch the solution or...

y'' + 16y = (8)(cos(4t)) y(0)=y'(0)= 0 Use Laplace Transforms to solve. Sketch the solution or use matlab to show the graph.

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y'' + 16y = (8)(cos(4t)) y0)= 0 y'(0)= 8 Use Laplace Transforms to solve. Sketch the...

y'' + 16y = (8)(cos(4t)) y0)= 0 y'(0)= 8 Use Laplace Transforms to solve. Sketch the solution or use matlab to show the graph.

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