PROGRESSION
A succession of numbers formed and arranged in a definite order
according to certain definite rule, is called a progression.
1. Arithmetic Progression (A.P.) : If
each term of a progression differs from its preceding term by a constant, then
such a progression is called an arithmetical progression. This constant
difference is called the common difference of the A.P.
An A.P. with first term a and common difference d is given by a, (a
+ d), (a + 2d),(a + 3d),.....
The nth term of this A.P. is given by Tn =a (n - 1) d.
The sum of n terms of this A.P.
Sn = n/2 [2a + (n - 1) d] = n/2 (first term + last term).
SOME IMPORTANT RESULTS :
(i) (1 + 2 + 3 +…. + n) =n(n+1)/2
(ii) (l2 + 22 + 32 + ... + n2)
= n (n+1)(2n+1)/6
(iii) (13 + 23
+ 33 + ... + n3) =n2(n+1)2
2. Geometrical Progression
(G.P.) : A progression of numbers in which every
term bears a constant ratio with its preceding term, is called a geometrical
progression.
The constant ratio is called the common ratio of the G.P. A G.P.
with first term a and common ratio r is :
a, ar, ar2,
In this G.P. Tn = arn-1
sum of the n terms, Sn= a(1-rn)
(1-r)
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