A Synopsis of the Principal Formulae and Results of Pure Mathematics

(37.) The two following series will be found very useful in rendering the general term of a series integrable.

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a Pm (Us+am)

n+1 hn-m+1 m-1

=S.

n+1

n-s+1,n

P, (u2+ r− 1) · S ̧ (−1)m+* . ▲m−1¤a−1. C. (ar),

(38.) Recurring series. The general form of a recurring

by the integration of which the general term may be obtained, and thence the sum of the series.

By the following method the sum of a series may be obtained from its equation, without knowing the general term: for a write +1, and substitute

Uz + n − m + Az Uz + n − m

then (1) becomes

for u2+n-m+1?

0 = a ▲zUx+n+ (a + a1) ▲ ̧U2+n−1 + &c.

+(a + à1 + &c. + an−1) ▲ xux + 1 + (a + a1 + &c. +an)uz+

· Eu2+1=const.

au2+n+ (a + a1) U2+n−1 + &c. + (a + a1 + &c. + an − 1) Uz + 1 a + a1+ &c. + an

(Tr. L. App. 390—5.)`

(39.) Application of the integral calculus to series.

The sum either of an infinite or a limited number of terms of many series may be represented by a definite integral: the following methods are applicable to numerous classes of series, consisting of ascending powers of some quantity, the coefficients of which are composed of arithmetical factorials. Let the series be

s=at" + (a+b)tm+n+(a+2b) tm + 2n