4.2 Separable equations
Separable equations
Lessons
Notes:
A separable differential equation is in the following form:
$f(y)\frac{dy}{dx}=g(x)$
Where:
1. $f(x)$ is a function in terms of $y$.
2. $g(x)$ is a function in terms of $x$.
We want to convert the equation to the following form:
$f(y)dy=g(x)dx$
so that we can integral both sides, and solve for $y$.

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