Suppose we have \frac{dy}{dx}+f(x)y=r(x) and it has two solutions y_1(x) and P

iristh3virusoo2

iristh3virusoo2

Answered question

2022-02-16

Suppose we have
dydx+f(x)y=r(x)
and it has two solutions y1(x) and y2(x) then how to prove that solution of differential equation
dydx+f(x)y=2r(x)
Will be y1(x)+y2(x)? I think given differential equations is linear first order equation so its solution will be
y.ef(x)dx=r.ef(x)dxdx
now do I establish two solution as y1 and y2 out of this equation?

Answer & Explanation

Asa Buck

Asa Buck

Beginner2022-02-17Added 8 answers

I dont

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