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D. Arithmetico-Geometric Series

A series each term of which is formed by multiplying the corresponding term of an AP & GP is called the Arithmetico-Geometric Series . e.g. 1 + 3x + 5x2 + 7x3 + .....

Here 1, 3, 5, .... are in AP & 1, x, x2, x..... are in GP .

Sum of n terms of an Arithmetico-Geometric Series

Let Sn = a + (a + d) r + (a + 2 d) r² + ..... + [a + (n - 1)d]  rn-1

then Sn = Arithmetico Geometric Series and Harmonic Series | Applied Mathematics for Class 11 - Commerce , Arithmetico Geometric Series and Harmonic Series | Applied Mathematics for Class 11 - Commerce

Sum To Infinity : If |r| < 1 & n → ∞ then 

Arithmetico Geometric Series and Harmonic Series | Applied Mathematics for Class 11 - Commerce rn = 0 . S = Arithmetico Geometric Series and Harmonic Series | Applied Mathematics for Class 11 - Commerce.

Ex.25 Find the sum to n terms of the series Arithmetico Geometric Series and Harmonic Series | Applied Mathematics for Class 11 - Commerce

Also find the sum if it exist if n → ∞.

Sol. S = Arithmetico Geometric Series and Harmonic Series | Applied Mathematics for Class 11 - Commerce ....(1)

Arithmetico Geometric Series and Harmonic Series | Applied Mathematics for Class 11 - Commerce = Arithmetico Geometric Series and Harmonic Series | Applied Mathematics for Class 11 - Commerce ....(2)

Arithmetico Geometric Series and Harmonic Series | Applied Mathematics for Class 11 - Commerce = Arithmetico Geometric Series and Harmonic Series | Applied Mathematics for Class 11 - Commerce

= Arithmetico Geometric Series and Harmonic Series | Applied Mathematics for Class 11 - Commerce - Arithmetico Geometric Series and Harmonic Series | Applied Mathematics for Class 11 - Commerce = Arithmetico Geometric Series and Harmonic Series | Applied Mathematics for Class 11 - Commerce

Sn = 2Arithmetico Geometric Series and Harmonic Series | Applied Mathematics for Class 11 - Commerce = Arithmetico Geometric Series and Harmonic Series | Applied Mathematics for Class 11 - Commerce

If n → ∞ then S = Arithmetico Geometric Series and Harmonic Series | Applied Mathematics for Class 11 - Commerce = 2

 Ex.26 If positive square root of, Arithmetico Geometric Series and Harmonic Series | Applied Mathematics for Class 11 - Commerce ..... ∞ is Arithmetico Geometric Series and Harmonic Series | Applied Mathematics for Class 11 - Commerce , find the value of  ' a '.

Sol.Arithmetico Geometric Series and Harmonic Series | Applied Mathematics for Class 11 - Commerce . Arithmetico Geometric Series and Harmonic Series | Applied Mathematics for Class 11 - Commerce = Arithmetico Geometric Series and Harmonic Series | Applied Mathematics for Class 11 - Commerce

now Arithmetico Geometric Series and Harmonic Series | Applied Mathematics for Class 11 - CommerceArithmetico Geometric Series and Harmonic Series | Applied Mathematics for Class 11 - Commerce = Arithmetico Geometric Series and Harmonic Series | Applied Mathematics for Class 11 - Commerce 

and Arithmetico Geometric Series and Harmonic Series | Applied Mathematics for Class 11 - Commerce = Arithmetico Geometric Series and Harmonic Series | Applied Mathematics for Class 11 - Commerce ( use A G P)

Arithmetico Geometric Series and Harmonic Series | Applied Mathematics for Class 11 - CommerceArithmetico Geometric Series and Harmonic Series | Applied Mathematics for Class 11 - Commerce = Arithmetico Geometric Series and Harmonic Series | Applied Mathematics for Class 11 - Commerce = . 23 ⇒ 

a = Arithmetico Geometric Series and Harmonic Series | Applied Mathematics for Class 11 - Commerce

E. Harmonic Progression (HP)

A sequence is said to HP if the reciprocals of its terms are in AP .

If the sequence a1, a2, a3, .... , an is an HP then 1/a1, 1/a2, .... , 1/an is an AP & converse. Here we do not have the formula for the sum of the n terms of an HP . For HP whose first term is a & second term is b, the nth term is tn = Arithmetico Geometric Series and Harmonic Series | Applied Mathematics for Class 11 - Commerce. If a, b, c  are in HP           

⇒ b = Arithmetico Geometric Series and Harmonic Series | Applied Mathematics for Class 11 - Commerceor 

 Arithmetico Geometric Series and Harmonic Series | Applied Mathematics for Class 11 - Commerce = Arithmetico Geometric Series and Harmonic Series | Applied Mathematics for Class 11 - Commerce.

 Ex.27 If a, b, c are in H.P. then prove that a3b3 + b3c3 + c3a3 = (9 ac - 6 b2) a2c2 .

Sol.Arithmetico Geometric Series and Harmonic Series | Applied Mathematics for Class 11 - Commerce = Arithmetico Geometric Series and Harmonic Series | Applied Mathematics for Class 11 - Commerce ⇒ Arithmetico Geometric Series and Harmonic Series | Applied Mathematics for Class 11 - Commerce - = 0 .

Use p + q + r = 0   ⇒  p3 + q3 + r3 = 3 pqr

Ex.28 If Arithmetico Geometric Series and Harmonic Series | Applied Mathematics for Class 11 - Commerce prove that a, b, c are in HP unless b = a + c.

 

Sol.Arithmetico Geometric Series and Harmonic Series | Applied Mathematics for Class 11 - Commerce= 0                        

Arithmetico Geometric Series and Harmonic Series | Applied Mathematics for Class 11 - Commerce = 0

Let a + c = λ Arithmetico Geometric Series and Harmonic Series | Applied Mathematics for Class 11 - CommerceArithmetico Geometric Series and Harmonic Series | Applied Mathematics for Class 11 - Commerce+Arithmetico Geometric Series and Harmonic Series | Applied Mathematics for Class 11 - Commerce = 0  

Arithmetico Geometric Series and Harmonic Series | Applied Mathematics for Class 11 - Commerce= 0

acλ – bλ2 + b2λ + acλ - 2abc = 0  

⇒  2ac(λ - b) - bλ (λ - b) = 0

⇒ (2ac - bλ) (λ - b) = 0

Arithmetico Geometric Series and Harmonic Series | Applied Mathematics for Class 11 - Commerce

Arithmetico Geometric Series and Harmonic Series | Applied Mathematics for Class 11 - Commerce

Arithmetico Geometric Series and Harmonic Series | Applied Mathematics for Class 11 - Commerce

⇒a, b, c are in H.P. or a + c = b.

Ex.29 The value of x y z is 55 or 354/55 according as the series  a, x, y, z, b  is an A.P. or H.P. Find the values of  a & b given that they are positive integers.

Sol. 

Let   a, x, y, z, b  are in A.P. ⇒   b = a + 4 d  

⇒ d = b-a/4

Arithmetico Geometric Series and Harmonic Series | Applied Mathematics for Class 11 - Commerce

Arithmetico Geometric Series and Harmonic Series | Applied Mathematics for Class 11 - Commerce

Similarly  when  a, x, y, z, b  are in H.P.    Arithmetico Geometric Series and Harmonic Series | Applied Mathematics for Class 11 - Commerce

Arithmetico Geometric Series and Harmonic Series | Applied Mathematics for Class 11 - Commerce

In the 1st case 

Arithmetico Geometric Series and Harmonic Series | Applied Mathematics for Class 11 - Commerce

In the 2nd case 

Arithmetico Geometric Series and Harmonic Series | Applied Mathematics for Class 11 - Commerce

dividing  a3 b3 = 73 ⇒   a = 7  ;  b = 1   or  a = 1  ;  b = 7

 

The document Arithmetico Geometric Series and Harmonic Series | Applied Mathematics for Class 11 - Commerce is a part of the Commerce Course Applied Mathematics for Class 11.
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FAQs on Arithmetico Geometric Series and Harmonic Series - Applied Mathematics for Class 11 - Commerce

1. What is an arithmetico-geometric series?
An arithmetico-geometric series is a series in which each term is the product of a progression of terms from both an arithmetic and geometric series. It can be represented as S = a + ar + ar^2 + ar^3 + ..., where 'a' is the initial term, 'r' is the common ratio of the geometric series, and 'r' also determines the difference between consecutive terms of the arithmetic series.
2. How can we determine the sum of an arithmetico-geometric series?
To find the sum of an arithmetico-geometric series, we can use the formula S = a/(1 - r) + (d/(1 - r)) * (b - ar), where 'a' is the initial term of the arithmetic series, 'd' is the common difference of the arithmetic series, 'r' is the common ratio of the geometric series, 'b' is the first term of the geometric series, and 'S' is the sum of the series.
3. What is a harmonic series?
A harmonic series is a series in mathematics that is formed by taking the reciprocals of a sequence of numbers. It can be represented as H = 1 + 1/2 + 1/3 + 1/4 + ..., where each term is the reciprocal of a positive integer.
4. How can we determine the sum of a harmonic series?
The sum of a harmonic series diverges, meaning it does not have a finite sum. However, there is a formula known as the harmonic series divergence test that states if the terms of a series do not approach zero, the series diverges. Therefore, the sum of a harmonic series is infinite.
5. What are the applications of arithmetico-geometric series and harmonic series in real life?
Arithmetico-geometric series have applications in finance, physics, and computer science. They can be used to calculate the present value of annuities, model population growth, and determine the convergence of algorithms. Harmonic series have applications in music theory, electrical engineering, and statistics. They can be used to analyze musical intervals, design filters, and estimate probabilities.
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