[
prev
] [
prev-tail
] [
tail
] [
up
]
2.4
Nonlinear second order ode
2.4.1
Exact nonlinear second order ode \(F\left ( x,y,y^{\prime },y^{\prime \prime }\right ) =0\)
2.4.2
nonlinear and not exact second order ode
2.4.3
ode is Integrable as given
2.4.4
ode can be made Integrable \(F\left ( x,y,y^{\prime \prime }\right ) =0\)
2.4.5
Solved using Mainardi Liouville method
2.4.6
ode with missing independent variable \(x\) or missing dependent variable \(y\left ( x\right ) \)
2.4.7
Higher degree second order ode
[
prev
] [
prev-tail
] [
front
] [
up
]