DIFFERENTIAL EQUATIONS
343
EXERCISES
1. Find one solution of the differential equation
^_3^ + 3^_ v = 0
dx 3 dx 2 dx
by the method of § 12, and prove by direct substitution that xe x and
x 2 e x are also solutions. What is the general solution?
Ans. y — (c 0 + c x x + c 2 x 2 )e x .
2. Find two solutions of the differential equation
dh/
da 4
+ 2
dry
dx 2
+ y = 0
by the method of § 12, and prove by direct substitution that x sin x
and x cos x are also solutions. What is the general solution ?
Ans. y = (a + bx) cos x + (c + dx) sin x.
Solve completely the following
3.
d 4 y . d 3 y _ q
dx 4 d.« 3
differential equations.
4 tfy , d^ =0
dx 4 da; 2
5.
dæ 3 da; 2 da;
6.
2^ + v = 0.
da; 6 da; 3
14. Small Oscillations of a System with n Degrees of Freedom.
We treat here only that part of the problem which relates to the
integration of the differential equations involved.* Let the kinetic
energy, T, and the force-function, U, be given by the equations :
t = X a i i q* ti + T » U =~X bi > qi q > + Uu {
The two quadratic forms are both definite, and a u , b {j are constants-
Lagrange’s Equations :
_dJT = dJJ
dt dq[ dq k dq k
give:
(1) «¡tiQ'l' -4 h UknQn = — (fikiQi H + b kn q n ).
By means of a suitable linear transformation,
(2) q k = p-aPi + ••• + y-knPn) k = l,-”,n.
the two quadratic forms can be reduced to the normal form : f
* Cf. Appell, Mécanique rationelle, voi. 2, p. 343.
t Bòcher, Algebra, Chap. 13.
