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| Summary |
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- (i) Let X be a set of numbers and f : Nn
→ X be a function, then the ordered set {f(1), f(2),...., f(n)} is called a finite sequence in X.
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| (ii) Let X be a set of numbers and f : N
→ X be a function, then the ordered set {f(1), f(2),....} is called
an infinite sequence in X. |
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- If {Tn} is a sequence, then the sum T1 +T2 + T3.... is called the series corresponding to the sequence {Tn}. A series is called finite or infinite according as the corresponding sequence is finite or infinite.
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- There are three methods of describing a sequence:
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| (i) A sequence may be described by writing first few terms of a sequence till the rule for writing down the other
terms of the sequence become evident. |
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| (ii) A sequence may be described by giving a formula for its nth term. |
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| (iii) A sequence may be described by specifying its first few terms and a formula to determine the other terms
of
the sequence in terms of its proceeding terms. |
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- A sequence is said to be a progression if its terms numerically increases (respectively decreases).
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- (i) A sequence {Tn} is said to be an arithmetic progression (A.P) if
there exists a number, say d such that Tn+1
- Tn = d, n ≥1
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| The constant number 'd' mentioned above is called the common difference of the corresponding A.P. |
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| (ii) If 'a' and 'd' be the first term and common difference of the A.P.  |
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| (iii) If 'a' and 'd' be the first term and common difference of the A.P. {Tn}, then the sum of first n terms, Sn is
given by |
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| The form (a) is used when common difference 'd' is known and the form (b) is used when the last term 'l' is
known. |
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| (iv) T1 = S1 and for n > 1, we have Tn = Sn - Sn-1. |
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| (v) If the sequence a, A1, A2,.....,An, b is an A.P., then the numbers A1, A2,.....,An are called the n arithmetic
means between a and b. |
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| (vii) The sum of n A.M.s between given numbers a and b is equal to n times the A.M. between a and b. |
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| (viii) If a, b, c are in A.P., then for any k: |
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| (a) a+k, b+k, c+k are in A.P. |
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| (b) a-k, b-k, c-k are in A.P. |
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| (c) ka, kb, kc are in A.P. |
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(d) a/k, b/k, c/k are in A.P. (k¹0). |
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| (ix) (a) If the sum of three numbers in A.P. is given, then the numbers should be taken as a-d, a, a+d. |
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| (b) If the sum of four numbers in A.P. is given, then the numbers should be taken as a-3d, a-d, a+d,
a+3d. |
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- (i) A sequence {Tn} of non-zero terms is said to be a geometric progression (G.P.) if there exists a number, say, r such that
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| The constant number 'r' mentioned above is called the common ratio of the corresponding G.P. |
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| (ii) If 'a' and 'r' be the first term and common ratio of the G.P. |
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| (iii) If 'a' and 'r' be the first term and common ratio of the G.P. {Tn}, then the sum of first n terms, Sn is given
by |
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| These formulae are used when 'last term' is given. |
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(v) If 'a' and 'r' be the first term and common ratio of a G.P. such  |
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| (vi) If the sequence a, G1, G2,....,Gn, b of positive numbers is a G.P., then the numbers G1, G2,....,Gn, are
called the n geometric means between a and b. |
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(vii) The G.M. between given positive numbers a and b is equal to  |
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| (viii) The product of n G.M.s between given positive numbers a and b is equal to nth power of the G.M.
between a and b. |
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| (ix) If a, b, c are in G.P, then for any non-zero k, |
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| (a) ka, kb, kc are in G.P. |
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| (b) a/k, b/k, c/k are in G.P. |
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| (x) (a) If the product of three numbers in G.P. is given, then the
numbers should be taken as a/r, a, ar. |
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| (b) If the product of four numbers in G.P. is given, then the
numbers should be taken as a/r3, a/r, ar, ar3 |
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- (i) A sequence of non-zero numbers is said to be a harmonic progression (H.P.) if the sequence of the reciprocals of its terms is an A.P.
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| (iii) There is no formula to find the sum of first n terms of a H.P. |
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| (iv) If the sequence a, H1, H2,.....,Hn, b of non-zero numbers is a H.P., then the numbers H1, H2,.....,Hn are
called n H.M.s between a and b. |
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- If A, G, H are the A.M., G.M., H.M. respectively between non-zero positive numbers a and b, then
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| (a) A, G, H are in G.P. |
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| (b) A>G>H. In particular, if a = b = c, then A = G = H. |
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- (i) A sequence is said to be an arithmeticco-geometric sequence if terms of the sequence are the products of corresponding terms of an A.P. and a G.P.
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| (ii) For the A.G. sequence a, (a+d)r, (a+2d)r2,…... We have |
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(iii) If for the A.G. sequence a, (a+d)r, (a+2d)r2,....., then
the sum up to infinity, S, given by  |
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