1.6 PROPERTIES OF BINOMIAL COEFFICIENTS
We have specifically included the second equality to emphasise the symmetrical
nature of the relationship with respect topandq.
Further identities involving the coefficients can be obtained by givingxandyspecial values in the defining equation (1.49) for the expansion. If both are set
equal to unity then we obtain (using the alternative notation so as to produce
familiarity with it)
(
n
0
)
+(
n
1)
+(
n
2)
+···+(
n
n)
=2n, (1.55)whilst settingx= 1 andy=−1 yields
(
n
0
)
−(
n
1)
+(
n
2)
−···+(−1)n(
n
n)
=0. (1.56)1.6.2 Negative and non-integral values ofnUp till now we have restrictednin the binomial expansion to be a positive
integer. Negative values can be accommodated, but only at the cost of an infinite
series of terms rather than the finite one represented by (1.49). For reasons that
are intuitively sensible and will be discussed in more detail in chapter 4, very
often we require an expansion in which, at least ultimately, successive terms in
the infinite series decrease in magnitude. For this reason, ifx>ywe consider
(x+y)−m,wheremitself is a positive integer, in the form
(x+y)n=(x+y)−m=x−m(
1+y
x)−m
.Since the ratioy/xis less than unity, terms containing higher powers of it will be
small in magnitude, whilst raising the unit term to any power will not affect its
magnitude. Ify>xthe roles of the two must be interchanged.
We can now state, but will not explicitly prove, the form of the binomialexpansion appropriate to negative values ofn(nequal to−m):
(x+y)n=(x+y)−m=x−m∑∞k=0−mC
k(yx)k
, (1.57)where the hitherto undefined quantity−mCk, which appears to involve factorials
of negative numbers, is given by
−mC
k=(−1)km(m+1)···(m+k−1)
k!=(−1)k(m+k−1)!
(m−1)!k!=(−1)km+k−^1 Ck.
(1.58)The binomial coefficient on the extreme right of this equation has its normal
meaning and is well defined sincem+k− 1 ≥k.
Thus we have a definition of binomial coefficients for negative integer valuesofnin terms of those for positiven. The connection between the two may not