Is a first order differential equation categorized by f ( y &#x2032; </msup>

Paiellorbkzp

Paiellorbkzp

Answered question

2022-06-01

Is a first order differential equation categorized by f ( y , y , x ) = 0 or y = f ( y , x )?
In the case of the second, why sin y + 3 y + x + 5 = 0 isnt a first order differential equation?

Answer & Explanation

Jesse Sheppard

Jesse Sheppard

Beginner2022-06-02Added 2 answers

The first criterion is the same:
y = f ( y , x ) g ( y , y , x ) y f ( y , x ) = 0
If you expand a sine in a Taylor power series, you get arbitrary high powers of y'.
Reginald Hanna

Reginald Hanna

Beginner2022-06-03Added 1 answers

Now i understand, any function in the form of f(y',y,x) = 0 can be solved for y' and writen in y'=f(y,x) .
In the case i mentioned, in the form of f(y',y,x) = 0 we would have why siny' + 3y + x +5 = 0 and in the form of y'=f(y,x) we would have y' = arcsin(-3y-x-5).

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