How can i solve this separable differential equation with trigonometric function? The given Problem is separable differential equation: cos y dx+(1+e^(−x))sin y dy=0 y(0)=pi/4

Juan Lowe

Juan Lowe

Answered question

2022-11-03

How can i solve this separable differential equation with trigonometric function?
The given Problem is separable differential equation:
cos y   d x + ( 1 + e x ) sin y   d y = 0
y ( 0 ) = π 4

Answer & Explanation

Antwan Wiley

Antwan Wiley

Beginner2022-11-04Added 13 answers

1 ( 1 + e x ) d x = sin y cos y d y
e x ( 1 + e x ) d x = tan y d y
tan y d y = e x ( 1 + e x ) d x
tan y d y = e x ( 1 + e x ) d x
e x = t e x = d t d x d x = d t e x
log sec y = t ( 1 + t ) d t t
log sec y = t ( 1 + t ) d t t
log sec y = log ( 1 + t ) + log C
log sec y = log ( 1 + e x ) + log C
y ( 0 ) = π 4
log 2 = log 2 + log C
3 2 log 2 = log C C = 2 2
log sec y = log ( 1 + e x ) + 2 2
log sec π 4 = log 2 2 1 + e x
sec y = 2 2 1 + e x
Noe Cowan

Noe Cowan

Beginner2022-11-05Added 4 answers

the simplest way to solve this equation is to bring cosy under siny and ( 1 + e x ) beneath dx and solve the equation.
1 ( 1 + e X ) d x = sin y cos y d y
And now simply you could integrate the equations.

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