Solutions 257
Analyzing the motion of the second ball, we
neglect the influence of the first released ball.
Then
q 2 1 1 1
2 4neo k a l^ (1^3 + • • '^ 'i.e. one of the nearest neighbours is missing in the
parentheses. Therefore,
mu 2 mill 0
K— i —
2 2 4neoa 'orq= lI4neoKa.3.18. According to the momentum conservation law,mu (m M) u,where m is the mass of the accelerated particle,
M is the mass of the atom, and u is their velocity
immediately after the collision.
We denote by W 10 „ the ionization energy and
write the energy conservation law in the form,mu 2 , (m +M) u 2
2 = vv ion 2Eliminating the velocity u from these equations,
we obtain
mui , m(^2) = ( 1 -r —m.
If m is the electron mass, then m/ili < 1, and the
kinetic energy required for the ionization is
mu'
2
When an atom collides with an ion of mass
m x M, mv 2 /2 x 2Wion, i.e. the energy of the
ion required for the ionization must be twice as
high as the energy of the electron.
Wion•
17-0771