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Sequences and series
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Geometric sequence or
progression
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A sequence of numbers in
which the ratio r
of each two successive terms an /
an
-1
is constant or whose each term is r
times the preceding.
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For example, in the
sequence 1, 3, 9, 27,
.
. . ,
each term is 3
times the preceding,
that is r
= 3.
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Therefore,
a
geometric
sequence can be written as
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a1,
a2, a3,
a4,
. . . , an
-1,
an, . . .
or a1,
a1 · r, a1 · r2,
a1 · r3, . . . , an
-1,
an, . . .
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where, a2
= a1 · r, |
a3 = a1 · r2, |
a4 = a1 · r3,
and so on.
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So,
the formula for the nth
term, or the general term of a
geometric sequence
is, an
= a1 · rn -1. |
A
geometric
sequence is said to be convergent if
-1
< r <
1 that
is,
an
approaches zero as n
becomes infinitely large thus, the limit of the sequence is 0. |
An
infinite sequence that has no a finite limit is called a divergent
sequence. |
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The sum of the first n terms of a finite geometric
sequence, geometric series
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The
sum of numbers in a geometric sequence we call the geometric series and
write, |
Sn = a1 + a2 + a3 +
. . . + an
-1 +
an, |
that is
Sn
= a1 + a1 · r + a1
· r2 + . . . + a1 · rn -2
+ a1 · rn -1, |
or
Sn
= a1 · (1 + r + r2
+ . . . + rn -2 +
rn -1) |
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the
sum of the first n terms of a finite geometric sequence or
series. |
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Recall, by factoring binomial
xn
-
yn
= (x
-
y) · (xn -1 +
xn -2y +
xn -3y2 +
. . . + xyn -2 +
y n -1)
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so that,
rn
-
1n
= (r
-
1) · (rn -1 +
rn -2 +
rn -3 +
. . . + r2
+ r + 1). |
Or,
we can use following method to derive the same formula, |
Sn
= a1 + a1 · r + a1
· r2 + . . . + a1 · rn -2
+ a1 · rn -1, |
and
r · Sn
= a1 · r + a1 · r2
+ a1 · r3 + . . . + a1
· rn -1
+ a1 · rn, |
then
r
·
Sn
-
Sn
= a1 · rn
-
a1
or
Sn
· (r
-
1) = a1 · (rn
-
1) => Sn
=
a1 · (rn -
1) /
(r
-
1). |
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Geometric sequences examples
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Example:
Find
the first term a1
and the number of
terms n
in a geometric sequence
with the general term an
= 192, the sum
of the first n
terms Sn
=
381 and
the common ratio r
= 2. |
Solution:
Using
the formulas for an
and Sn
we get the system of two equations in two unknown,
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Therefore,
the geometric sequence is 3, 6, 12, 24, 48, 96, 192
. . .
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Example:
Write the geometric
sequence such that the sum of its first three terms is 21 and the
difference between the first and the second term is 12. |
Solution:
Given
are the equations,
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(1) a1 + a2 + a3
= 21
or a1
+ a1r + a1r2
= 21, a1
· (1 + r + r2)
= 21 |
and (2)
a1 -
a2
= 12,
a1 - a1r
= 12,
a1
· (1 -
r)
= 12
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Thus,
the two geometric sequences satisfy the given conditions,
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(a1)1 = 3
and r1
= -3
give 3, -9,
27
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(a1)2
= 16
and r2
= 1/4
give 16, 4, 1. |
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Contents F
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Copyright
© 2004 - 2020, Nabla Ltd. All rights reserved.
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