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Question
Obtain the differential equations by eliminating arbitrary constants from the following equations.
y = c1e 3x + c2e 2x
Solution
y = c1e 3x + c2e 2x
Dividing throughout by e2x , we get
ye -2x = c1e x + c2
Differentiating w.r.t. x, we get
`-2ye^ -2x + e^-2x dy/dx = c_1e^ x`
∴ `e^-2x(dy/dx-2y) = c_1e^x`
Dividing throughout by ex , we get
`e^-3x(dy/dx - 2y) = c_1`
Again, differentiating w.r.t. x, we get
`e^-3x((d^2y)/dx^2 - 2 dy/dx) - 3e^(-3x)(dy/dx- 2y ) = 0`
∴ `e^-(3x)((d^2y)/dx^2 - 2 dy/dx-3 dy/dx+ 6y ) = 0`
∴ `(d^2y)/dx^2- 5dy/dx + 6y = 0`
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