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A solution of y' = -y is the function y(x)= . . .

A solution of y' = -y is the function y(x)= . . .
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A solution of y' = -y is the function y(x)= . . .

asked
User Arkantos
by
8.4k points

1 Answer

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Answer:


y(x)=Ce^(-x)

Explanation:

We are given that y'=-y

We have to find the solution of given differential equation


(dy)/(dx)=-y


(dy)/(y)=-dx

Integrating on both sides then we get


lny=-x+c


if\;lna=b then
a=e^b


y=e^(-x+c)=e^(-x)\cdot e^c


y=Ce^(-x) because
e^c=Constant=C

Hence,
y(x)=Ce^(-x) is the solution of given differential equation y'=-y

answered
User HexInteractive
by
8.0k points
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