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Class 11th Sequence and Series

102. Shamshad Ali buys a scooter for Rs 22000. He pays Rs 4000 cash and agrees to pay the balance in annual instalment of Rs 1000 plus 10% interest on the unpaid amount. How much will the scooter cost him?

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Payal Gupta

Contributor-Level 10

102. Given, cost of scooter = ?22,000

Amount paid =? 4000

Amount unpaid =? 22,000 -? 4000 =? 18,000

Now, Number of installments =Amount unpaid/Amount of each instalment

As he per 10% interest on up unpaid amount and ?1000 each installment

Amount of 1st instalment =? 1000 +? $\frac{18000 * 10 * 1}{100}$ = ?1000 + ?1800 =? 2800

Amount of 2nd installment =? 1000 +? $\frac{(18000 - 1000) * 10 * 1}{100}$ =? 1000 +? 1700 =? 2700

Similarly,

Amount of 3rd installment =? 1000 +? $\frac{(17000 - 1000) * 10 * 1}{100}$ =? 1000 +? 1600 =? 2600

So, Total installment paid =? 2800 +? 1600 =? 2600 + …… upto 18 installment

$= \frac{18}{2} [2 * 2800 + (18 - 1) (- 100)]$

= 9 [5600 - 1700]

= 9 * 3900

=? 35,000

Total cost of scooter = Amount + Total instal

...more

102. Given, cost of scooter = ?22,000

Amount paid =? 4000

Amount unpaid =? 22,000 -? 4000 =? 18,000

Now, Number of installments =Amount unpaid/Amount of each instalment

As he per 10% interest on up unpaid amount and ?1000 each installment

Amount of 1st instalment =? 1000 +? $\frac{18000 * 10 * 1}{100}$ = ?1000 + ?1800 =? 2800

Amount of 2nd installment =? 1000 +? $\frac{(18000 - 1000) * 10 * 1}{100}$ =? 1000 +? 1700 =? 2700

Similarly,

Amount of 3rd installment =? 1000 +? $\frac{(17000 - 1000) * 10 * 1}{100}$ =? 1000 +? 1600 =? 2600

So, Total installment paid =? 2800 +? 1600 =? 2600 + …… upto 18 installment

$= \frac{18}{2} [2 * 2800 + (18 - 1) (- 100)]$

= 9 [5600 - 1700]

= 9 * 3900

=? 35,000

Total cost of scooter = Amount + Total installment paid

=? 4000 +? 35,100

=? 39100

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6 months ago

Class 11th Sequence and Series

101. A farmer buys a used tractor for Rs 12000. He pays Rs 6000 cash and agrees to pay the balance in annual instalments of Rs 500 plus 12% interest on the unpaid amount. How much will the tractor cost him?

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Payal Gupta

Contributor-Level 10

101. Given,

cost of tractor =? 12,000

Amount paid =? 62,000

Amount unpaid =? 12000 -? 6000 =? 6000

So, number of instalments =

$=$ ? $\frac{6000}{500}$

= 12 = n

Now, interest on 1st installment = interest on unpaid amount ( i.e.? 6000) for 1 Year.

=? $\frac{6000 * 12 * 1}{100}$ = ?720

Similarly,

Interest on 2nd installment = interest on (? 6000 -? 500) for the next 1 year

=? $\frac{5500 * 12 * 1}{100}$ = ?660

And,

Interest on 2nd installment =? $\frac{(5500 - 500) * 12 * 1}{100}$

=? 600

Here, Total (interest per) installment paid =? (720 + 660 + 600 + ……. upto 12 terms)

$= \frac{12}{2} [2 (720) + (12 - 1) (- 60)]$ { $?$ 720 + 660 + 600 …….is an A.P. of a = 720, d = 660 - 720 = - 60}

= 6 [ 1440 -

...more

101. Given,

cost of tractor =? 12,000

Amount paid =? 62,000

Amount unpaid =? 12000 -? 6000 =? 6000

So, number of instalments =

$=$ ? $\frac{6000}{500}$

= 12 = n

Now, interest on 1st installment = interest on unpaid amount ( i.e.? 6000) for 1 Year.

=? $\frac{6000 * 12 * 1}{100}$ = ?720

Similarly,

Interest on 2nd installment = interest on (? 6000 -? 500) for the next 1 year

=? $\frac{5500 * 12 * 1}{100}$ = ?660

And,

Interest on 2nd installment =? $\frac{(5500 - 500) * 12 * 1}{100}$

=? 600

Here, Total (interest per) installment paid =? (720 + 660 + 600 + ……. upto 12 terms)

$= \frac{12}{2} [2 (720) + (12 - 1) (- 60)]$ { $?$ 720 + 660 + 600 …….is an A.P. of a = 720, d = 660 - 720 = - 60}

= 6 [ 1440 - 660]

= 6 * 780

=? 4680

So, the total cost of tractor = cost price + installments

=? 12,000 +? 4680

=? 16680

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New answer posted

6 months ago

Class 11th Sequence and Series

100. Show that $\frac{1 * 2^{2} + 2 * 3^{2} + ? + n {(n + 1)}^{2}}{1^{2} * 2 + 2^{2} + 3 + ? + n^{2} (n + 1)} = \frac{3 n + 5}{3 n + 1}$

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Payal Gupta

Contributor-Level 10

100. Given, $\frac{1 * 2^{2} + 2 * 3^{2} + ? + n {(n + 1)}^{2}}{1^{2} * 2 + 2^{2} + 3 + ? + n^{2} (n + 1)}$

For numerator,

a (n^th term) = n (n + 1)² = n (n + 1)² = n (n² + 2n +1) = n³ + 2n² + n

So, $S_{n} = \sum_{}^{} a_{n} = \sum_{}^{} n^{3} + 2 \sum_{}^{} n^{2} + \sum_{}^{} n$

$= \frac{n^{2} (n + 1)^{2}}{4} + \frac{2 \cdot (n + 1) (2 n + 1) n}{6} + \frac{n (n + 1)}{2}$

$= \frac{n (n + 1)}{2} [\frac{n (n + 1)}{2} + \frac{2 (2 n + 1)}{3} + 1]$

$= \frac{n (n + 1)}{2} [\frac{3 n (n + 1) + 2 * 2 (2 n + 1) + 6}{6}]$

$= \frac{n (n + 1)}{12} [3 n^{2} + 3 n + 8 n + 4 n + 6]$

$= \frac{n (n + 1)}{12} [3 n^{2} + 11 n + 10]$

$= \frac{n (n + 1)}{12} [3 n^{2} + 6 n + 5 n + 10]$

$= \frac{n (n + 1)}{12} [(33 n (n + 2) + 5 (n + 2)]$

$= \frac{n (n + 1) (n + 2) (3 n + 5)}{12}$

For denominator,

a_n (n^th term) = n² (n + 1) = n³ + n²

So,

$S_{n} = \sum_{}^{} a_{n} = \sum_{}^{} n^{3} + \sum_{}^{} n^{2}$

$= \frac{n^{2} (n + 1)^{2}}{4} + \frac{n (n + 1) (2 n + 1)}{6}$

$= \frac{n (n + 1)}{2} [\frac{n (n + 1)}{2} + \frac{(2 n + 1)}{3}]$

$= \frac{n (n + 1)}{2} [\frac{3 n (n + 1) + 2 (2 n + 1)}{6}]$

$= \frac{n (n + 1)}{2} [\frac{3 n^{2} + 3 n + 4 n + 2}{6}]$

$= \frac{n (n + 1)}{2} [\frac{3 n^{2} + 6 n + 1 n + 2}{6}]$

$= \frac{n (n + 1)}{2} [\frac{3 n (n + 2) + (n + 2)}{6}]$

$= \frac{n (n + 1) (n + 2) (3 n + 1)}{12}]$

So, $\frac{1 * 2^{2} + 2 * 3^{2} + ? + n {(n + 1)}^{2}}{1^{2} * 2 + 2^{2} * 3 + ? + n^{2} (n + 1)} = \frac{\frac{n (n + 1) (n + 2) (3 n + 5)}{12}}{\frac{n (n + 1) (n + 2) (3 n + 1)}{12}}$

$= \frac{3 n + 5}{3 n + 1}$

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New answer posted

6 months ago

Class 11th Sequence and Series

99. Find the sum of the following series up to n terms: $\frac{1^{3}}{1} + \frac{1^{3} + 2^{3}}{1 + 3} + \frac{1^{3} + 2^{3} + 3^{3}}{1 + 3 + 5} + \dots$

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Payal Gupta

Contributor-Level 10

99. The given series is.

$\frac{1^{3}}{1} + \frac{1^{3} + 2^{3}}{1 + 3} + \frac{1^{3} + 2^{3} + 3^{3}}{1 + 3 + 5}$ +…………. upto nth term,

The nth term is ,

$a_{n} = \frac{1^{3} + 2^{3} + 3^{3} + . . . . . . . . + n^{3}}{1 + 3 + 5 + . . . . . . . . + n . . . t e r m s}$ { A.P. of n terms and a = 1, d = 5-3 = 2}

$a_{n} = \frac{{[\frac{n (n + 1)}{2}]}^{2}}{\frac{n}{2} [2 * 1 + (n - 1) 2]}$

$a_{n} = \frac{\frac{n^{2} (n + 1)^{2}}{4}}{\frac{n}{2} [2 + (n - 1) 2]} = \frac{\frac{n^{2} (n + 1)^{2}}{4}}{n [1 + n - 1]}$

$a_{n} = \frac{\frac{n^{2} (n + 1)^{2}}{4}}{n^{2}} = \frac{{(n + 1)}^{2}}{4}$

$a_{n} = \frac{n^{2} + 2 x + 1}{4} = \frac{n^{2}}{4} + \frac{n}{2} + \frac{1}{4}$

$∴ S n = \sum_{}^{} a n = \frac{1}{4} \sum_{}^{} x^{2} + \frac{1}{2} \sum_{}^{} n + \sum_{}^{} 1$

$= \frac{1}{4} * \frac{9 (n + 1) (2 n + 1)}{6} + \frac{1}{2} * \frac{n (x + 1)}{2} + \frac{1}{4} * n$

$= \frac{n}{4} [\frac{(n + 1) (2 n + 1)}{6} + (n + 1) + 1]$

$= \frac{n}{4} [\frac{2 n^{2} + n (n + 1) (2 n + 1) + 6 (x + 1) + 6}{6}]$

$= \frac{n}{4} [\frac{2 n^{2} + n + 2 n + 1 + 6 n + 6 + 6}{6}]$

$= \frac{n}{4} [\frac{2 n^{2} + 9 n + 13}{6}]$

$= \frac{n (2 n^{2} + 9 n + 13)}{24}$

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New answer posted

6 months ago

Class 11th Sequence and Series

98. If S₁, S₂, S₃ are the sum of first n natural numbers, their squares and their cubes, respectively, show that 9 S₂² = S₃ (1 + 8S₁).

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Payal Gupta

Contributor-Level 10

98. Given,

S₁ = 1 + 2 + 3 + ………. + n $= n + \frac{(n + 1)}{2}$

S₂ = 1² + 2² + 3² + ………… + n² $= \frac{n (n + 1) (2 n + 1)}{6}$

S₃= 1³ + 2³ + 3³ + …………. + n³ = ${[\frac{n (n + 1)}{2}]}^{2}$

So, L.H.S. $= 9 S_{2}^{2} = 9 * {[\frac{n (n + 1) (2 n + 1)}{6}]}^{2}$

$= \frac{9 * n^{2} (n + 1)^{2} (2 n + 1)^{2}}{36}$

$= \frac{n^{2} (n + 1)^{2} (2 n + 1)^{2}}{4}$

R.H.S. $= S_{3} (1 + 8 S_{1}) = {[\frac{n (n + 1)}{2}]}^{2} [1 + 8 * \frac{n (n + 1)}{2}]$

$= \frac{n^{2} (n + 1)^{2}}{4} * [1 + 4 n (n + 1)]$

$= \frac{n^{2} (n + 1)^{2}}{4} [1 + 4 n^{2} + 4 n]$

$= \frac{n^{2} (n + 1)^{2}}{4} [{(2 n)}^{2} + 2 (2 n) 1 + 1^{2}]$

$= \frac{n^{2} (n + 1)^{2}}{4} {(2 n + 1)}^{2} =$ L.H.S.

So, 9(S₂)² = S₃ ( 1 + 8S₁)

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New answer posted

6 months ago

Class 11th Sequence and Series

97. Find the sum of the first n terms of the series: 3+ 7 +13 +21 +31 +…

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Payal Gupta

Contributor-Level 10

97. The given series is 3+7+13+21+31+ ……. upto n terms

So, Sum, S_n = 3+7+13+21+31+ ………….+ a_n-1 + a_n

Now, taking,

S_n = S_n = [ 3 + 7 + 13 + 21 + 31 + ………. a_n-1 + a_n ] [ 3+ 7 + 21 + 31 + … a_n-1+ a_n]

0 = [ 3+ (7 - 3) + (13 - 7) + (13 - 7) + (21 - 13) + …….+ (a_n a_n-1) - a_n]

0 = 3 + [ 4 + 6 + 8 +…….+ (n-1) terms] a_n

$\Rightarrow a_{n} = 3 + {\frac{n - 1}{2} [2 * 4 + [(n - 1) - 1] 2]}$ { $?$ 4 + 6 + 8 + ……. is sum of A.P. of n 1 terms with a = 4, d = 6- 4 = 2}

$\Rightarrow a_{n} = 3 + {\frac{n - 1}{2} [8 + (n - 2) 2]}$

$\Rightarrow a_{n} = 3 + {\frac{n - 1}{2} * 2 [4 + n - 2]} = 3 + (n - 1) (n + 2)$

a_n = 3 + n² + (1 + 2) n + (-1) (2) { $?$ (a + b) (a + b) = a2 + (b + c) a + bc }

a_n = 3 + n² + n- 2 = n² + n +1

sum of series, $S_{n} = \sum_{}^{} a_{n} = \sum_{}^{} n^{2} + \sum_{}^{} n + \sum_{}^{} 1$

$= \frac{n (n + 1) (2 n + 1)}{6} + \frac{n (x + 1)}{2} + n$

$= n [\frac{(n + 1) {(2 n + 1)}^{}}{6} + \frac{n + 1}{2} + 1]$

$= n [\frac{(n + 1) (2 n + 1) + 3 (n + 1) + 6}{6}]$

$= n [\frac{2 n^{2} + n + 2 n + 1 + 3 n + 3 + 6}{6}]$

$= n [\frac{2 n^{2} + 6 n + 10]}{6}]$

$= n [\frac{2 (n^{2} + 3 n + 5)}{6}]$

$= \frac{n (n^{2} + 3 n + 5)}{3}$

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New answer posted

6 months ago

Class 11th Sequence and Series

96. Find the 20th term of the series 2 * 4 + 4 * 6 + 6 * 8 + . + n terms.

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Payal Gupta

Contributor-Level 10

96. Given, series is $2 * 4 + 4 * 6 + 6 * 8 + \dots + n$ terms.

So, a₂₀ = ( 20th term of A.P. 2, 4, 6 ….) ( 20th term of A.P. 4,6,8 ………)

i.e. a = 2, d = 4 -2 = 2 i.e. a =4, d = 6- 4 = 2

= [2 + (20- 1)2] [4 + (20-1)2]

= [2+19*2] [4 +19 *2]

= (2+38) (4+38)

= 40*42 = 1680

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New answer posted

6 months ago

Class 11th Sequence and Series

95. Find the sum of the following series up to n terms:

(i) 5 + 55 +555 + …

(ii) .6 +. 66 +. 666+…

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Payal Gupta

Contributor-Level 10

95. (i) Sn = 5+55+555+…………… upto n term

=5(1+11+111+ …………….upto n term )

Multiplying and dividing by 9 we get

$= \frac{5}{9} (9 + 99 + 999 + \dotsupto nterms)$

$= \frac{5}{9} [(10 - 1) + (100 - 1) + (000 - 1) + \dots . upto nterms]$ $= \frac{5}{9} [(10 + 100 + 1000 + ? n) - (1 + 1 + 1 . . . upto nterms]$

$= \frac{5}{9} [(10 + 1 0^{2} + 1 0^{3} + ? upto nterms$
$- n * 1]$

$= \frac{5}{9} [\frac{10 (1 0^{n} - 1)}{10 - 1} - n]$ { $? 10 + 1 0^{2} + 1 0^{3} + \dots ntermsisaG.Pof a = 10, r = 10 > 1 nterms$ }

$= \frac{5}{9} * [\frac{10}{9} (1 0^{n} - 1) - n]$

$= \frac{50}{81} (1 0^{n} - 1) - \frac{5 n}{9}$

(ii) $S_{n} = 0.6 + 0.66 + 0.666 + \dots n$

$= 6 [0.1 + 0.11 + 0.111 + ?uptonterms$ $]$

$= \frac{6}{9} [0.9 + 0 \cdot 99 + 0.999 + ? uptonterms]$ {multiplying and dividing by 9}

$= \frac{6}{9} [(1 - 0.1) + (1 - 0.01) + (1 - 0.001) + ? uptonterms]$

$= \frac{6}{9} [(1 + 1 + 1 \dots n) - (0.1 + 0.01 + 0.001 + \dots uptonterms)]$

$= \frac{6}{9} [n * 1 - (\frac{1}{10} + \frac{1}{100} + \frac{1}{1000} + ? uptonterms)]$

$= \frac{6}{9} [n - (\frac{1}{10} + \frac{1}{10} * \frac{1}{10} + \frac{1}{10} * {(\frac{1}{10})}^{2} + ? uptonterms)]$

$= \frac{6}{9} [n - \frac{\frac{1}{10} (1 - {(\frac{1}{10})}^{n})}{1 - \frac{1}{10}}]$

$= \frac{6}{9} [n - \frac{1 - {(\frac{1}{10})}^{n}}{10 - 1}]$

$= \frac{6}{9} [x - \frac{1}{9} (1 - \frac{1}{1 0^{n}})]$

$= \frac{6}{9} * \frac{1}{9} [9 x - (1 - \frac{1}{1 0^{n}})]$

$= \frac{2}{27} [9 n - (1 - \frac{1}{1 0^{n}})]$

$= \frac{2}{27} [9 n - 1 + \frac{1}{1 0^{n}}]$

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New answer posted

6 months ago

Class 11th Sequence and Series

94. If a, b, c are in A.P.; b, c, d are in G.P. and $\frac{1}{c}, \frac{1}{d}, \frac{1}{e}$ are in A.P. prove that a, c, e are in G.P.

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Payal Gupta

Contributor-Level 10

94. As a, b, c are in A.P. we can write,

$b - a = c - b$

$\Rightarrow b + b = a + c$

$\Rightarrow 2 b = a + c$ I

As b, c, d are in G.P. we can write,

$\frac{c}{b} = \frac{d}{c}$

$\Rightarrow c^{2} = b d$ II

And ar $\frac{1}{c}, \frac{1}{d}, \frac{1}{e}$ are in A.P. we can write,

$\Rightarrow \frac{1}{d} - \frac{1}{c} = \frac{1}{e} - \frac{1}{d}$

$\Rightarrow \frac{1}{d} + \frac{1}{d} = \frac{1}{c} + \frac{1}{e}$

$\Rightarrow \frac{2}{d} = \frac{e + c}{c e}$

$\Rightarrow \frac{d}{2} = \frac{c e}{e + c}$

$\Rightarrow d = \frac{2 c e}{c + e}$ …………. III

Now, $c^{2} = B d$ from II

$\Rightarrow = \frac{a + c}{2} * \frac{2 c e}{c + c}$ {from 1 and 3}

$\Rightarrow c^{2} = \frac{(a + c) c e}{c + e}$

$\Rightarrow c = \frac{(a + c) e}{(c + e)}$

$\Rightarrow c (c + e) = (a + c) e$

$\Rightarrow c^{2} + c e = a c + c e$

$\Rightarrow c^{2} = a e$

$\Rightarrow \frac{c}{a} = \frac{e}{c}$

i.e., a, c and e are in G.P.

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New question posted

6 months ago

Class 11th Sequence and Series

93. The ratio of the A.M. and G.M. of two positive numbers a and b, is m : n. Show that a:b =

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