SECTION 5.5 Differential Equations 311
whereM(x,y) andN(x,y) are both homogeneous of thesame degree.
These are important since they can always be reduced to the form (5.2).
Indeed, suppose that M and N are both homogeneous of degree k.
Then we work as follows:
dy
dx
= −
N(x,y)
M(x,y)
= −
xkN(1,y/x)
xkM(1,y/x)
= −
N(1,y/x)
M(1,y/x)
=F
Çy
x
å
which is of the form (5.2), as claimed. Note that Example 2 above is
an example of a homogeneous first-order ODE.
Exercises
In the following problems, find both the general solution as well as
the particular solution satisfying the initial condition.
- y′= 2xy^2 , y(0) =− 1
- yy′= 2x, y(0) = 1
- 3y^2 y′= (1 +y^2 ) cosx, y(0) = 1
- 2y′=y(y−2), y(0) = 1
- xyy′= 2y^2 −x^2 , y(1) = 1
- y′=
y
x
− 3
Çy
x
å 4 / 3
, y(2) = 1
- 3xy^2 y′= 4y^3 −x^3 , y(2) = 0