Explore BrainMass
Share

ODE - Bernoulli Equation : y'[x] - (1/x)*y'[x] = -(Ln[x]*(y[x])^2)

This content was STOLEN from BrainMass.com - View the original, and get the already-completed solution here!

I would like to see a step by step solution using the Bernoulli equation.

© BrainMass Inc. brainmass.com October 24, 2018, 7:08 pm ad1c9bdddf
https://brainmass.com/math/ordinary-differential-equations/ode-bernoulli-equation-58754

Solution Preview

Please see the attached file for the complete solution.
Thanks for using BrainMass.

y'[x] - (1/x)*y'[x] = -(Ln[x]*(y[x])^2)
________________________________________
I would ...

Solution Summary

An ordinary differential equationis solved using the Bernoulli Equation. The solution is detailed and well presented.

$2.19
See Also This Related BrainMass Solution

Solutions to Various First Order ODEs

Solve using integrating factor and Bernoullis.

View Full Posting Details