How do you solve the separable differential equation dy/dx=(cosx)e^(y+sin x)?

pilinyir1

pilinyir1

Answered question

2022-09-18

How do you solve the separable differential equation d y d x = ( cos x ) e y + sin x ?

Answer & Explanation

rae2721

rae2721

Beginner2022-09-19Added 8 answers

We have
d y d x = ( cos x ) e y + sin x
d y d x = ( cos x ) e y e sin x
Which is a First Order Separable Differential Equation, which we can rewrite as:
1 e y d y d x = ( cos x ) e sin x
We can then "separate the variables" to get:
  e - y   d y =   ( cos x ) e sin x   d x
Which we can directly (and easily) integrate to get:
- e - y = e sin x + B
e - y = A - e sin x
- y = ln ( A - e sin x )
y = - ln ( A - e sin x )
y = ln ( 1 A - e sin x )

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