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Löse y' = y durch Variablentrennung

Löse die Differentialgleichung y' = y mit Variablentrennung, integriere beide Seiten und überprüfe die allgemeine Exponentiallösung y = Ce^x.

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Problem

Solve the differential equation

y=y.y' = y.

Step 1: Read the Derivative Condition

The equation says that the derivative of yy with respect to xx is equal to yy itself:

dydx=y.\frac{dy}{dx} = y.

In other words, the function must grow or shrink at a rate that matches its current value.

Step 2: Separate the Variables

Write the derivative as dydx\frac{dy}{dx}, then move the yy expression with dydy and the xx expression with dxdx:

dydx=y.\frac{dy}{dx} = y.

Dividing by yy and multiplying by dxdx gives

1ydy=dx.\frac{1}{y}\,dy = dx.

Step 3: Integrate Both Sides

Now take the antiderivative of both sides:

1ydy=dx.\int \frac{1}{y}\,dy = \int dx.

The antiderivative of 1y\frac{1}{y} is lny\ln|y|, and the antiderivative of 11 is xx, so

lny=x+C.\ln|y| = x + C.

Step 4: Rewrite in Exponential Form

Use the exponential function to isolate yy:

y=ex+C.|y| = e^{x+C}.

The constant can be absorbed into one arbitrary constant, giving

y=Cex.y = Ce^x.

Step 5: Check the Solution Family

Differentiate y=Cexy = Ce^x, where CC is any constant:

y=Cex.y' = Ce^x.

Since this is the same as yy,

y=y.y' = y.

Therefore, the general solution is

y=Cex.\boxed{y = Ce^x}.

Konzepte

Introduction to Differential Equations

Equations involving a function and its derivatives. Separable differential equations can be solved by moving all yy terms to one side and all xx terms to the other, then integrating both sides. Initial conditions determine the specific solution.

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