Find the sum of :

(i) 20 terms of the series 2 + 6 + 18 + …

(ii) 10 terms of the series 1 + $\sqrt{3}$ + 3 + ….

(iii) 6 terms of the G.P. 1, $-\dfrac{2}{3}, \dfrac{4}{9},$ ….

(iv) 5 terms and n terms of the series 1 + $\dfrac{2}{3} + \dfrac{4}{9} + ….$

(i) Sum = 2 + 6 + 18 + ….. + (20th term)

The above list of numbers is a G.P. with first term a = 2 and common ratio = r = $\dfrac{6}{2} = 3.$

By formula,

$S$n = \dfrac{a(r^n - 1)}{r - 1} \\[1em] \therefore S{20} = \dfrac{2((3)^{20} - 1)}{3 - 1} \\[1em] = \dfrac{2(3^{20} - 1)}{2} \\[1em] = 3^{20} - 1.

Hence, the sum of the series is 3²⁰ - 1.

(ii) Sum = 1 + $\sqrt{3}$ + 3 + …. + (10th term)

The above list of numbers is a G.P. with first term a = 1 and common ratio = r = $\sqrt{3}.$

By formula,

$S$n = \dfrac{a(r^n - 1)}{r - 1} \\[1em] \therefore S{10} = \dfrac{1((\sqrt{3})^{10} - 1)}{\sqrt{3} - 1} \\[1em] = \dfrac{((3)^{10/2} - 1)}{\sqrt{3} - 1} \\[1em] = \dfrac{3^5 - 1}{\sqrt{3} - 1}

Multiplying numerator and denominator by $\sqrt{3}$ + 1,

$= \dfrac{3^5 - 1}{\sqrt{3} - 1} \times \dfrac{\sqrt{3} + 1}{\sqrt{3} + 1} \\[1em] = \dfrac{242(\sqrt{3} + 1)}{(\sqrt{3} - 1)(\sqrt{3} + 1)} \\[1em] = \dfrac{242(\sqrt{3} + 1)}{3 + \sqrt{3} - \sqrt{3} - 1} \\[1em] = \dfrac{242(\sqrt{3} + 1)}{2} \\[1em] = 121(\sqrt{3} + 1).$

Hence, the sum of the series is $121(\sqrt{3} + 1)$.

(iii) Sum = 1, $-\dfrac{2}{3}, \dfrac{4}{9},$ ….(6th term)

The above list of numbers is a G.P. with first term a = 1 and common ratio = r = $-\dfrac{2}{3}.$

By formula,

$S$n = \dfrac{a(r^n - 1)}{r - 1} \\[1em] \therefore S{6} = \dfrac{1\Big[\Big(-\dfrac{2}{3}\Big)^6 - 1\Big]}{-\dfrac{2}{3} - 1} \\[1em] = \dfrac{\dfrac{2^6}{3^6} - 1}{\dfrac{-2 -3}{3}} \\[1em] = \dfrac{\dfrac{2^6}{3^6} - 1}{-\dfrac{5}{3}} \\[1em] = \dfrac{3(2^6 - 3^6)}{3^6 \times -5} \\[1em] = \dfrac{64 - 729}{3^5 \times -5} \\[1em] = \dfrac{-665}{-1215}

On dividing numerator and denominator by -5 we get,

$= \dfrac{133}{243}.$

Hence, the sum of the series is $\dfrac{133}{243}$.

(iv) Sum upto 5 terms = 1 + $\dfrac{2}{3} + \dfrac{4}{9} + ….$ + 5th term

The above list of numbers is a G.P. with first term a = 1 and common ratio = r = $\dfrac{2}{3}.$

By formula,

$S$n = \dfrac{a(r^n - 1)}{r - 1} \\[1em] \therefore S5 = \dfrac{1\Big[\Big(\dfrac{2}{3}\Big)^5 - 1\Big]}{\dfrac{2}{3} - 1} \\[1em] = \dfrac{\dfrac{2^5}{3^5} - 1}{\dfrac{2 -3}{3}} \\[1em] = \dfrac{\dfrac{2^5}{3^5} - 1}{-\dfrac{1}{3}} \\[1em] = \dfrac{3(2^5 - 3^5)}{3^5 \times -1} \\[1em] = \dfrac{32 - 243}{3^4 \times -1} \\[1em] = \dfrac{-211}{-81}

On dividing numerator and denominator by -1 we get,

$= \dfrac{211}{81}$

Sum of n terms = $S_n = \dfrac{1\Big[\Big(\dfrac{2}{3}\Big)^n - 1\Big]}{\dfrac{2}{3} - 1}$

$= \dfrac{\Big(\dfrac{2}{3}\Big)^n - 1}{\dfrac{2 - 3}{3}} \\[1em] = \dfrac{3\Big[\Big(\dfrac{2}{3}\Big)^n - 1\Big]}{-1} \\[1em] = -3\Big[\Big(\dfrac{2}{3}\Big)^n - 1\Big] \\[1em] = 3\Big[1 - \Big(\dfrac{2}{3}\Big)^n\Big].$

Hence, the sum of the series upto 5 terms is $\dfrac{211}{81}$ and upto n terms is $3\Big[1 - \Big(\dfrac{2}{3}\Big)^n\Big]$.