196 3 Real Analysisz(t)=(a+ib)exp(
− 1 +
√
5
2
it)
+(c+id)exp(
− 1 −
√
5
2
it)
,
for arbitrary real numbersa, b, c, d. Sincexandyare, respectively, the real and complex
parts of the solution, they have the general formx(t)=acos− 1 +
√
5
2
t−bsin− 1 +
√
5
2
t+ccos− 1 −
√
5
2
t−dsin− 1 −
√
5
2
t,y(t)=asin− 1 +
√
5
2
t+bcos− 1 +
√
5
2
t+csin− 1 −
√
5
2
t+dcos− 1 −
√
5
2
t.The problem is solved. Our second example is an equation published by M. Ghermanescu in the ̆ Mathematics
Gazette, Bucharest. Its solution combines several useful techniques.Example.Solve the differential equation2 (y′)^3 −yy′y′′−y^2 y′′′= 0.Solution.In a situation like this, where the variablexdoes not appear explicitly, one can
reduce the order of the equation by takingyas the variable andp=y′as the function.
The higher-order derivatives ofy′′arey′′=
d
dxy′=
d
dyp
dy
dx=p′p,y′′′=d
dxy′′=(
d
dypp′)
dy
dx=
(
(p′)^2 +pp′′)
p.We end up with a second-order differential equation2 p^3 −yp^2 p′−y^2 pp′′−y^2 p(p′)^2 = 0.A family of solutions isp=0, that is,y′=0. This family consists of the constant
functionsy=C. Dividing the equation by−p, we obtain
y^2 p′′+y^2 (p′)^2 +ypp′− 2 p^2 = 0.The distribution of the powers ofyreminds us of the Euler–Cauchy equation, while the
last terms suggests the substitutionu=p^2. And indeed, we obtain the Euler–Cauchy
equationy^2 u′′+yu′− 4 u= 0 ,