A 11 x 1 þA 12 x 2 ¼b 1
A 21 x 1 þA 22 x 2 ¼b 2Using determinants:x 1 ¼b 1 A 12
b 2 A 22
Dx 2 ¼A 11 b 1
A 21 b 2(^)
(^)
D
D¼
A 11 A 12
A 21 A 22
whereDis thedeterminant of the system.
Ifb 1 ¼b 2 ¼0 (the situation in the secular equations), then in the equations
forx 1 andx 2 the numerator is zero, and sox 1 ¼0/Dandx 2 ¼0/D. The only way
thatx 1 andx 2 can be nonzero in this case is that the determinant of the system be
zero, i.e.
D¼ 0
for thenx 1 ¼0/0 andx 2 ¼0/0, and 0/0 can have any finite value; mathematicians
call it indeterminate. This is easy to see:
Let
0
0
¼athen
a& 0 ¼ 0which is true for any finite value ofa.
So for the secular equations the requirement that thec’s be nonzero is that the
determinant of the system be zero:
D¼
H 11 "ES 11 H 12 "ES 12
H 21 "ES 21 H 22 "ES 22
¼ 0 (4.72)
4.3 The Application of the Schr€odinger Equation to Chemistry by H€uckel 147