Q. 9

Question

Give precise mathematical definitions or descriptions of each of the concepts that follow. Then illustrate the definition with a graph or algebraic example, if possible.

What does it mean for a differential equation to be separable?

Step-by-Step Solution

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Answer

A differential equation is separable if the variables can be separated. The equation can be written in the form $y' = f (x) g (y)$ .

1Step 1. Given Information.

The objective is to explain what does it mean for a differential equation to be separable.

2Step 2. A differential equation is separable.

A differential equation is separable if the variables can be separated. The equation can be written in the form $y' = f (x) g (y)$ .

A separable equation is as follows,

$F (y) d y = G (x) d x$ .

It is a method in which we separate the variables and then integrate.

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