4.2 Separable equations
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Separable equations

Lessons

Notes:
A separable differential equation is in the following form:

f(y)dydx=g(x)f(y)\frac{dy}{dx}=g(x)

Where:
1. f(x)f(x) is a function in terms of yy.
2. g(x)g(x) is a function in terms of xx.

We want to convert the equation to the following form:
f(y)dy=g(x)dxf(y)dy=g(x)dx
so that we can integral both sides, and solve for yy.

  • 2.
    Separable Equations without Initial Conditions
    Find the general solution of the following differential equations:
  • 3.
    Initial Value Problems
    Solve the following differential equations:
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Separable equations

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