56. Show that the ratio of the sum of first nterms of a G.P. to the sum of terms from(n + 1)^thto (2n)^th term is $\frac{1}{r^{n}}$

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Payal Gupta | Contributor-Level 10

9 months ago

56. Let a and r be the first term and common difference of the G.P

Thus, Sum of the first on term, $S_{n} = \frac{a (1 - r^{n})}{1 - r}$

Let Sn = sum of term from (n+1)^thto (2n)^th term

= $a r^{n} + a r^{n - 1} + . . . . . . + a r^{2 n - 1}$

= $\frac{a r^{n} [1 - r^{n}]}{1 - r}$

[ $?$ the above is a G.P. with first term ar^x and common ratio = $\frac{a r^{n + 1}}{a r^{n}} = r^{n + 1 - n} = r$

and number of term from (2n)^thto (n+1)^th= n

So, $\frac{S_{n}}{S_{n}} = \frac{\frac{a (1 - r^{n})}{1 - r}}{\frac{a r^{n} (1 - r^{n})}{1 - r}}$

= $\frac{a}{a r^{n}}$

= $\frac{1}{r^{n}}$

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1In an increasing arithmetic progression a₁, a₂,....a_n if a₅ = 2 and product of a₁, a₅ and a₄ is greatest, then the value of dis equal to

Alok Kumar Singh

First term = a

Common difference = d

Given: a + 5d = 2 . (1)

Product (P) = (a₁a₅a₄) = a (a + 4d) (a + 3d)

Using (1)

P = (2 – 5d) (2 – d) (2 – 2d)

-> = (2 – 5d) (2 –d) (– 2) + (2 – 5d) (2 – 2d) (– 1) + (– 5) (2 – d) (2 – 2d)

$\frac{d P}{d d}$ = –2 [ (d – 2) (5d – 2) + (d – 1) (5d – 2)

Alok Kumar Singh

a, ar, ar², ….ar⁶³

a+ar+ar² +….+ar⁶³ = 7 [a + ar² + ar⁴ +.+ar⁶²]

$\frac{a (1 - r^{64})}{(1 - r)} = 7 \frac{a (1 - r^{64})}{(1 - r^{2})}$

1 + r = 7

r = 6

Alok Kumar Singh

S₂₀ = $\frac{20}{2}$ [2a + 19d] = 790

2a + 19d = 79 . (1)

$S_{10} \frac{10}{2} [2 a + 9 d] = 145$

2a + 9d = 29 . (2)

from (1) and (2) a = –8, d = 5

$S_{15} - S_{5} = \frac{15}{2} [2 a + 14 d] - \frac{5}{2} [2 a + 4 d]$

$= \frac{15}{2} [- 16 + 70] - \frac{5}{2} [- 16 + 20]$

= 405 – 10

= 395

Alok Kumar Singh

3, 7, 11, 15, 19, 23, 27, . 403 = AP₁

2, 5, 8, 11, 14, 17, 20, 23, . 401 = AP₂

so common terms A.P.

11, 23, 35, ., 395

->395 = 11 + (n – 1) 12

->395 – 11 = 12 (n – 1)

$\frac{384}{12} = n - 1$

32 = n – 1

n = 33

Sum = $\frac{33}{2}$ [2×11+ (32)12]

= $\frac{33}{2}$ [22 + 384]

= 6699

Alok Kumar Singh

3, a, b, c are in A.P.

a – 3 = b – a

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56. Show that the ratio of the sum of first nterms of a G.P. to the sum of terms from(n + 1)th to (2n)th term is 1rn

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56. Show that the ratio of the sum of first nterms of a G.P. to the sum of terms from(n + 1)^thto (2n)^th term is $\frac{1}{r^{n}}$