What is the general solution of the differential equation? : #y'(coshy)^2=(siny)^2#
1 Answer
We have:
# y' cosh^2y=sin^2y #
This is a first order separable Differential equation so we can rearrange the equation as follows:
# y' cosh^2y/sin^2y = 1 #
So now we can "seperate the variables" to get:
# int \ cosh^2y/sin^2y \ dy = int \ dx #
The LHS integral is non-trivial and cannot be solved using analytical methods or expressed in terms of elementary functions, and therefore the full DE solution requires a numerical techniques to solve.
If however, the equation is incorrect and should instead read:
# y' cosh^2y=sinh^2y #
Then again we have a separable DE which this time yields:
# int \ cosh^2y/sinh^2y \ dy = int \ dx #
# :. int \ coth^2y \ dy = int \ dx #
# :. int \ csch^2y+1 \ dy = int \ dx #
Which we can now integrate to get:
# -cothy+y = x + c #
Which is the GS of the modified equation.
