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Arithmetic Progression

Class 10th Mathematics Rajasthan Board Solution
Exercise 5.1
  1. 6, 9, 12, 15, …… Find the first term a and the common difference d for the following…
  2. -7, -9, -11, -13, …… Find the first term a and the common difference d for the…
  3. 3/2 , 1/2 , -1/2 , -3/2 , . Find the first term a and the common difference d…
  4. 1, -2, -5, -8, …… Find the first term a and the common difference d for the…
  5. -1 , 1/4 , 3/2 , l Find the first term a and the common difference d for the…
  6. 3, 1, -1, -3, …… Find the first term a and the common difference d for the…
  7. 3, -2, -7, -12, …… Find the first term a and the common difference d for the…
  8. a = -1, d = 1/2 If for any arithmetic progression first term a and the common…
  9. a = 1/3 , d = 4/3 If for any arithmetic progression first term a and the common…
  10. a = 0.6, d = 1.1 If for any arithmetic progression first term a and the common…
  11. a = 4, d = -3 If for any arithmetic progression first term a and the common…
  12. a = 11, d = -4 If for any arithmetic progression first term a and the common…
  13. a = -1.25, d = -0.25 If for any arithmetic progression first term a and the…
  14. a = 20, d = -3/4 If for any arithmetic progression first term a and the common…
  15. 2 , 5/2 , 3 , 7/2 , Check for an arithmetic progression in the following lists…
  16. -1/2 , -1/2 , -1/2 , -1/2 , l . Check for an arithmetic progression in the…
  17. a, a^2 , a^3 , a^4 , ….. Check for an arithmetic progression in the following…
  18. root 3 , root 6 , root 9 , root 12 , l Check for an arithmetic progression in…
  19. root 2 , root 8 , root 18 , root 32 , l . Check for an arithmetic progression…
  20. Check for an arithmetic progression in the following lists of numbers of any…
  21. 0.2, 0.22, 0.222, …. Check for an arithmetic progression in the following lists…
  22. 3 , 3 + root 2 , 3+2 root 2 , 3+3 root 2 , . Check for an arithmetic…
Exercise 5.2
  1. 10th term of arithmetic progression 2, 7, 12, …. Find out
  2. 18th term of arithmetic progression root 2 , 3 root 2 , 5 root 2 , . Find out…
  3. 24th term of arithmetic progression 9, 13, 17, 21, …. Find out
  4. Which term of the arithmetic progression 21, 18, 15,… is -81 ? Solve :…
  5. Which term of the arithmetic progression 84, 80, 76 … is zero ? Solve :…
  6. Is 301 any term of the sequence of numbers 5, 11, 17, 23… ? Solve :…
  7. Is -150 a term of the arithmetic progression 11, 8, 5, 2, .… ? Solve :…
  8. The sixth term and the 17th term of the arithmetic progression are 19 and 41…
  9. The third and ninth terms of an arithmetic progression are 4 and -8…
  10. The third term of an arithmetic progression is 16 and the 7th term is 12 more…
  11. How many three digit numbers are divisible by 7?
  12. Find the 11th term from the last term of the arithmetic progression 10, 7, 4,…
  13. Find the 8th term from end of the arithmetic progression 1, 4, 7, 10, …., 88.…
  14. There are 60 terms in an arithmetic progression. If its first and last term are…
  15. Four numbers are an arithmetic progression. If the sum of the numbers is 50 and…
Exercise 5.3
  1. 1, 3, 5, 7, …. upto 12 terms Find the sum of the following arithmetic…
  2. 8, 3, -2, … upto 22 terms. Find the sum of the following arithmetic…
  3. 1/15 , 1/12 , 1/10 , x 2 … upto 11 terms. Find the sum of the following…
  4. 3 + 11 + 19 + … + 803 Find the sum of the following:
  5. Find the sum of the following:
  6. How many terms of the arithmetic progression 9, 17, 25, … be taken so that…
  7. How many terms of the arithmetic progression 63, 60, 57, … be taken so that…
  8. an = 3 + 4n Find the sum of the first 25 terms of the following series whose…
  9. an = 7 - 3n Find the sum of the first 25 terms of the following series whose…
  10. Find the sum of the first 51 terms of an arithmetic progression in which second…
  11. The first and the last terms of an arithmetic progression are 17 and 350…
  12. Find the sum of all the odd numbers divisible by 3 between 1 and 1000.…
  13. The first term of an arithmetic progression is 8, nth term is 33 and sum of…
  14. A sum of 280 is to be used to give four prizes. If after first prize, each prize…
  15. A manufacture of TV sets produces 600 TV sets in the third year and 700 TV sets…
Miscellaneous Exercise 5
  1. The common difference of two arithmetic progression is the same. The first term…
  2. If 18, a, b, -3 are in the arithmetic progression then a + b = A. 19 B. 7 C. 11…
  3. If the 7th and the 13th terms of an arithmetic progression are 34 and 64…
  4. If an arithmetic progression’s first term is 2 and common difference 8 and sum…
  5. If the sum of n terms of an arithmetic progression in 3n^2 + 5n, then which term…
  6. If the sum of the first n terms of the arithmetic progression is Sn and S2n =…
  7. The first term and the last term of an arithmetic progression are 1 and 11…
  8. Write 5th term from end of the arithmetic progression 3, 5, 7, 9, …, 201.…
  9. If three consecutive terms of an arithmetic progression are 4/5 a, 2, then write…
  10. Find the sum of first 1000 positive integers.
  11. Is 299 any term in the sequence of numbers 5, 11, 17, 23, …?
  12. Which term of the arithmetic progression 19 1/4 , 18 1/2 , 17 3/4 , .. is the…
  13. Four numbers are in arithmetic progression. If their sum is 20 and the sum of…
  14. If the sum of a terms of an arithmetic progression is 3n^2/2 + 5n/2 then find…
  15. The houses of a row are numbered consecutively from 1 to 49. Show that there is…

Exercise 5.1
Question 1.

Find the first term a and the common difference d for the following arithmetic progressions -

6, 9, 12, 15, ……


Answer:

Comparing the given arithmetic progression with general form,
We get, a = 6
and common difference = difference of two consecutive term
i.e. 9 – 6 = 3, 12 – 9 = 3.


Hence, First term a = 6 and common arithmetic difference = 3.



Question 2.

Find the first term a and the common difference d for the following arithmetic progressions -

-7, -9, -11, -13, ……


Answer:

Comparing the given arithmetic progression with general form,
We get, a = -7
and common difference = difference of two consecutive term
i.e. (–9) – (-7) = 2, (-11) – (-9) = -2.


Hence, First term a = -7 and common arithmetic difference = -2.



Question 3.

Find the first term a and the common difference d for the following arithmetic progressions -



Answer:

Comparing the given arithmetic progression with general form,
We get, a =
and common difference = difference of two consecutive term
i.e.


Hence, First term a = and common arithmetic difference = -1.



Question 4.

Find the first term a and the common difference d for the following arithmetic progressions -

1, -2, -5, -8, ……


Answer:

Comparing the given arithmetic progression with general form,
We get, a = 1
and common difference = difference of two consecutive term
i.e. (–2) – (1) = -3, (-5) – (-2) = -3.


Hence, First term a = 1 and common arithmetic difference = -3.



Question 5.

Find the first term a and the common difference d for the following arithmetic progressions -



Answer:

Comparing the given arithmetic progression with general form,
We get, a = -1
and common difference = difference of two consecutive term
i.e.


Hence, First term a = -1 and common arithmetic difference = .



Question 6.

Find the first term a and the common difference d for the following arithmetic progressions -

3, 1, -1, -3, ……


Answer:

Comparing the given arithmetic progression with general form,
We get, a = 3
and common difference = difference of two consecutive term
i.e. (1) – (3) = -2, (-1) – (1) = -2.


Hence, First term a = 3 and common arithmetic difference = -2.



Question 7.

Find the first term a and the common difference d for the following arithmetic progressions -

3, -2, -7, -12, ……


Answer:

Comparing the given arithmetic progression with general form,
We get, a = 3
and common difference = difference of two consecutive term
i.e. (–2) – (3) = -5, (-7) – (-2) = -5.


Hence, First term a = 3 and common arithmetic difference = -5.



Question 8.

If for any arithmetic progression first term a and the common difference d are graph as follows, then write first four terms of that progression-

a = -1,


Answer:

Let the first four terms of arithmetic progression be a1, a2, a3, a4
Given, First term a = -1 and common difference d = .
⇒ a1 = a = -1.
⇒ a2 = a1 + d =
⇒ a3 = a2 + d =
⇒ a4 = a3 + d =


Hence, First four terms are .



Question 9.

If for any arithmetic progression first term a and the common difference d are graph as follows, then write first four terms of that progression-



Answer:

Let the first four terms of arithmetic progression be a1, a2, a3, a4
Given, First term a = and common difference d = .
⇒ a1 = a = .
⇒ a2 = a1 + d =
⇒ a3 = a2 + d =
⇒ a4 = a3 + d =


Hence, First four terms are



Question 10.

If for any arithmetic progression first term a and the common difference d are graph as follows, then write first four terms of that progression-

a = 0.6, d = 1.1


Answer:

Let the first four terms of arithmetic progression be a1, a2, a3, a4
Given, First term a = 0.6 and common difference d =1.1 .
⇒ a1 = a = 0.6
⇒ a2 = a1 + d = 0.6 + 1.1 = 1.7
⇒ a3 = a2 + d = 1.7 + 1.1 = 2.8
⇒ a4 = a3 + d = 2.8 + 1.1 = 3.9


Hence, First four terms are 0.6, 1.7, 2.8, 3.9.



Question 11.

If for any arithmetic progression first term a and the common difference d are graph as follows, then write first four terms of that progression-

a = 4, d = -3


Answer:

Let the first four terms of arithmetic progression be a1, a2, a3, a4
Given, First term a = 4 and common difference d = -3.
⇒ a1 = a = 4
⇒ a2 = a1 + d = 4 + (-3) = 1
⇒ a3 = a2 + d = 1 + (-3) = -2
⇒ a4 = a3 + d = (-2) + (-3) = -5


Hence, First four terms are 4, 1, -2, -5.



Question 12.

If for any arithmetic progression first term a and the common difference d are graph as follows, then write first four terms of that progression-

a = 11, d = -4


Answer:

Let the first four terms of arithmetic progression be a1, a2, a3, a4
Given, First term a = 11 and common difference d = -4.
⇒ a1 = a = 11
⇒ a2 = a1 + d = 11 + (-4) = 7
⇒ a3 = a2 + d = 7 + (-4) = 3
⇒ a4 = a3 + d = 3 + (-4) = -1


Hence, First four terms are 11, 7, 3, -1.



Question 13.

If for any arithmetic progression first term a and the common difference d are graph as follows, then write first four terms of that progression-

a = -1.25, d = -0.25


Answer:

Let the first four terms of arithmetic progression be a1, a2, a3, a4
Given, First term a = -1.25 and common difference d = -0.25.
⇒ a1 = a = -1.25
⇒ a2 = a1 + d = -1.25 + (-0.25) = -1.5
⇒ a3 = a2 + d = -1.5 + (-0.25) = -1.75
⇒ a4 = a3 + d = -1.75 + (-0.25) = -2.00


Hence, First four terms are -1.25, -1.5, -1.75, -2.00.



Question 14.

If for any arithmetic progression first term a and the common difference d are graph as follows, then write first four terms of that progression-

a = 20,


Answer:

Let the first four terms of arithmetic progression be a1, a2, a3, a4
Given, First term a = 20 and common difference d = .
⇒ a1 = a = 20
⇒ a2 = a1 + d =
⇒ a3 = a2 + d =
⇒ a4 = a3 + d =


Hence, First four terms are .



Question 15.

Check for an arithmetic progression in the following lists of numbers of any one of these as an arithmetic progression, then find its common difference and also write its next four terms—



Answer:

Let the arithmetic progression be a1, a2, a3, a4 ……. So here
a2 – a1 =
a3 – a2 =
a4 – a3 =
For each term difference is same . So this sequence is an arithmetic progression and its common difference is d = . Next four terms are :
⇒ a5 = a4 + d =
⇒ a6 = a5 + d =
⇒ a7 = a6 + d =
⇒ a8 = a7 + d =


Hence, Yes, Next four terms are .



Question 16.

Check for an arithmetic progression in the following lists of numbers of any one of these as an arithmetic progression, then find its common difference and also write its next four terms—



Answer:

Let the arithmetic progression be a1, a2, a3, a4 ……. So here
a2 – a1 =
a3 – a2 =
a4 – a3 =


For each term difference is same 0. So this sequence is an arithmetic progression and its common difference is d = 0. Next four terms are :
⇒ a5 = a4 + d =
⇒ a6 = a5 + d =
⇒ a7 = a6 + d =
⇒ a8 = a7 + d =


Hence, Yes, d = 0, Next four terms are .



Question 17.

Check for an arithmetic progression in the following lists of numbers of any one of these as an arithmetic progression, then find its common difference and also write its next four terms—

a, a2, a3, a4, …..


Answer:

Let the arithmetic progression be a1, a2, a3, a4 ……. So here
a2 – a1 = a2 – a = a(a - 1)
a3 – a2 = a3 – a2 = a2(a - 1)
a4 – a3 = a4 – a3 = a3(a - 1)
Here common difference in not same. So this sequence is not an arithmetic progression.


Hence, No.



Question 18.

Check for an arithmetic progression in the following lists of numbers of any one of these as an arithmetic progression, then find its common difference and also write its next four terms—



Answer:

Let the arithmetic progression be a1, a2, a3, a4 ……. So here
a2 – a1 = √6 - √3 = √3(√2) - √3 = √3(√2 - 1)
a3 – a2 = √9 - √6 = √3(√3) - √3(√2) = √3(√3 - √2)
a4 – a3 = √12 - √9 =√3(√4) - √3(√3) = √3(√4 - √3) = √3(2 - √3)


Here common difference in not same. So this sequence is not an arithmetic progression.


Hence, No.



Question 19.

Check for an arithmetic progression in the following lists of numbers of any one of these as an arithmetic progression, then find its common difference and also write its next four terms—



Answer:

Let the arithmetic progression be a1, a2, a3, a4 ……. So here
a2 – a1 = √8 - √2 = √2(√4) - √2 = 2√2 - √2 = √2
a3 – a2 = √18 - √8 = √2(√9) - √2(√4) = 3√2 - 2√2 = √2
a4 – a3 = √32 - √18 = √2(√16) - √2(√9) = 4√2 - 3√2 = √2


For each term difference is same √2. So this sequence is an arithmetic progression and its common difference is d =√2 . Next four terms are :
⇒ a5 = a4 + d = √32 + √2 = 4√2 + √2 = 5√2 = √25(√2) = √50
⇒ a6 = a5 + d = √50 + √2 = 5√2 + √2 = 6√2 = √36(√2) = √72
⇒ a7 = a6 + d = √72 + √2 = 6√2 + √2 = 7√2 = √49(√2) = √98
⇒ a8 = a7 + d = √98 + √2 = 7√2 + √2 = 8√2 = √64(√2) = √128


Hence, Yes, d = √2, Next four terms are √50, √72, √98, √128.



Question 20.

Check for an arithmetic progression in the following lists of numbers of any one of these as an arithmetic progression, then find its common difference and also write its next four terms— a, 2a, 3a, 4a ….


Answer:

Let the arithmetic progression be a1, a2, a3, a4 ……. So here
a2 – a1 = 2a – a = a
a3 – a2 = 3a – 2a = a
a4 – a3 = 4a – 3a = a
For each term difference is same i.e., a. So this sequence is an
arithmetic progression and its common difference is d = a. Next four terms are :
⇒ a5 = a4 + d = 4a + a = 5a
⇒ a6 = a5 + d = 5a + a = 6a
⇒ a7 = a6 + d = 6a + a = 7a
⇒ a8 = a7 + d = 7a + a = 8a


Hence, Yes, d = a, Next four terms are 5a, 6a, 7a, 8a.



Question 21.

Check for an arithmetic progression in the following lists of numbers of any one of these as an arithmetic progression, then find its common difference and also write its next four terms—

0.2, 0.22, 0.222, ….


Answer:

Let the arithmetic progression be a1, a2, a3, a4 ……. So here
a2 – a1 = 0.22 – 0.2 = 0.02
a3 – a2 = 0.222 – 0.22 = 0.002


For each term common difference is not same. So this sequence is not an arithmetic progression.


Hence, No



Question 22.

Check for an arithmetic progression in the following lists of numbers of any one of these as an arithmetic progression, then find its common difference and also write its next four terms—



Answer:

Let the arithmetic progression be a1, a2, a3, a4 ……. So here
a2 – a1 = (3+√2) – (3) = √2
a3 – a2 = (3+2√2) – (3+√2) = √2
a4 – a3 = (3+3√2) – (3+2√2) = √2


For each term difference is same √2. So this sequence is an arithmetic progression and its common difference is d =√2 . Next four terms are :
⇒ a5 = a4 + d = 3+3√2 + √2 = 3+4√2
⇒ a6 = a5 + d = 3+4√2 + √2 = 3+5√2
⇒ a7 = a6 + d = 3+5√2 + √2 = 3+6√2
⇒ a8 = a7 + d = 3+6√2 + √2 = 3+7√2


Hence, Yes, d = √2, Next four terms are 3+4√2, 3+5√2, 3+6√2, 3+7√2.




Exercise 5.2
Question 1.

Find out

10th term of arithmetic progression 2, 7, 12, ….


Answer:

The given arithmetic progression is 2, 7, 12, …
Its first term a = 2
Common difference = d = 7 – 2 = 5.
So nth term an of the given arithmetic progression is given by
an = a + (n -1)d


Where,


a = First term of AP
d = Common difference of AP
and no of terms is ‘n’



Thus 10th term a10 = 2 + (10 - 1) × 5.
⇒ a10 = 2 + 9 × 5 = 2 + 45 = 47


Hence, 10th term is 47.



Question 2.

Find out

18th term of arithmetic progression


Answer:

The given arithmetic progression is √2, 3√2, 5√2, …
Its first term a = √2
Common difference = d = 3√2 – √2 = 2√2.
So nth term an of the given arithmetic progression is given by
an = a + (n -1)d


Where,


a = First term of AP
d = Common difference of AP
and no of terms is ‘n’



Thus 18th term a18 = √2 + (18 - 1) × 2√2.
⇒ a18 = √2 + 17 × 2√2 = √2 + 34√2 = 35√2


Hence, 18th term is 35√2.



Question 3.

Find out

24th term of arithmetic progression 9, 13, 17, 21, ….


Answer:

The given arithmetic progression is 9, 13, 17, 21, …
Its first term a = 9
Common difference = d = 13 – 9 = 4.
So nth term an of the given arithmetic progression is given by
an = a + (n -1)d


Where,


a = First term of AP
d = Common difference of AP
and no of terms is ‘n’



Thus 24th term a24 = 9 + (24 - 1) × 4.
⇒ a24 = 9 + 23 × 4 = 9 + 92 = 101


Hence, 24th term is 101.



Question 4.

Solve :

Which term of the arithmetic progression 21, 18, 15,… is -81 ?


Answer:

Let the nth term of the progression be -81.
First term a = 21 and common difference = 18 – 21 = -3
Since, an = a + (n -1)d
∴ -81 = 21 + (n – 1) × (-3)
⇒ -81 = 21 -3n -3(-1)
⇒ -81 = 21 -3n + 3
⇒ -81- 24 = -3n
⇒ -105 = -3n


⇒ n = 35


Hence, -81 is the 35th term of the progression.



Question 5.

Solve :

Which term of the arithmetic progression 84, 80, 76 … is zero ?


Answer:

Let the nth term of the progression be 0.
First term a = 84 and common difference = 80 – 84 = -4
Since, an = a + (n -1)d


Where,


a = First term of AP
d = Common difference of AP
and no of terms is ‘n’



∴ 0 = 84 + (n – 1) × (-4)
⇒ 0 = 84 -4n -4(-1)
⇒ 0 = 84 -4n + 4
⇒ -88 = -4n
⇒ n = 22


Hence, Zero is the 22nd term of the progression.



Question 6.

Solve :

Is 301 any term of the sequence of numbers 5, 11, 17, 23… ?


Answer:

The arithmetic progression is 5, 11, 17, 23, ….
Here, First term a = 5 and common difference = 11 – 5 = 6
Let us assume that nth term an of the progression is 301.
Since, an = a + (n -1)d


Where,


a = First term of AP
d = Common difference of AP
and no of terms is ‘n’



∴ 301 = 5 + (n – 1) × (6)
⇒ 301 = 5 + 6n -6
⇒ 302 = 6n
⇒ n = 50.33
Here n is a fraction, But any term n should be an integer.
∴ 301 is not any term of the arithmetic progression.


Hence, 301 is not any term of the progression.



Question 7.

Solve :

Is -150 a term of the arithmetic progression 11, 8, 5, 2, .… ?


Answer:

The arithmetic progression is 11, 8, 5, 2, ….
Here, First term a = 11 and common difference = 8 – 11 = -3
Let us assume that nth term an of the progression is -150.
Since, an = a + (n -1)d


Where,


a = First term of AP
d = Common difference of AP
and no of terms is ‘n’



∴ -150 = 11 + (n – 1) × (-3)
⇒ -150 = 11 - 3n + 3
⇒ -150 -14 = -3n
⇒ -164 = -3n
⇒ n = 54.667
Here n is a fraction, But any term n should be an integer.
∴ -150 is not any term of the arithmetic progression.


Hence, -150 is not any term of the progression.



Question 8.

The sixth term and the 17th term of the arithmetic progression are 19 and 41 respectively. Then find the 40th term.


Answer:

Let first term be a and common difference be d.
We know that, an = a + (n - 1)d
∴ a6 = a + (6 - 1)d
⇒ 19 = a + 5d …(i)
and a17 = a + (17 - 1)d
⇒ 41 = a + 16d …(ii)


On solving eq. (i) and (ii), we get,
a = 9 and d = 2


⇒ a40 = a + (40 - 1)d
⇒ a40 = 9 + (40 - 1) × 2
⇒ a40 = 9 + 39× 2 = 9 + 78 = 87


Hence, 40th term is 87.



Question 9.

The third and ninth terms of an arithmetic progression are 4 and -8 respectively. Which term of this will be zero?


Answer:

Let first term be a and common difference be d.
We know that, an = a + (n - 1)d


Where,


a = First term of AP
d = Common difference of AP
and no of terms is ‘n’



∴ a3 = a + (3 - 1)d
⇒ 4 = a + 2d …(i)
and a9 = a + (9 - 1)d
⇒ -8 = a + 8d …(ii)


On solving eq. (i) and (ii), we get,
a = 8 and d = -2


Let the nth term be zero.
⇒ an = a + (n - 1)d
⇒ 0 = 8 + (n - 1) × (-2)
⇒ 0 = 8 – 2n -2(-1)
⇒ 0 = 8 – 2n + 2
⇒ -10 = – 2n
⇒ n = 5


Hence, 5th will be zero.



Question 10.

The third term of an arithmetic progression is 16 and the 7th term is 12 more than the 5th term. Find the arithmetic progression.


Answer:

Let first term be a and common difference be d.
We know that, an = a + (n - 1)d


Where,


a = First term of AP
d = Common difference of AP
and no of terms is ‘n’



∴ a3 = a + (3 - 1)d
⇒ 16 = a + 2d …(i)
and a7 = a + (7 - 1)d
⇒ a7 = a + 6d …(ii)
and a5 = a + (5 - 1)d
⇒ a5 = a + 4d …(iii)


Given, a7 = a5 + 12
⇒ a + 6d = a + 4d + 12 (From (ii) and (iii))


⇒ 6d – 4d = 12
⇒ 2d = 12
⇒ d = 6
Substituting the value of d in eq. (i), we get,
16 = a + 2(6)
⇒ a = 16 – 12 = 4


Hence first term a = 4 and common difference d = 6
∴ a1 = 4
⇒ a2 = a1 + d = 4 + 6 = 10
⇒ a3 = a2 + d = 10 + 6 = 16
⇒ a4 = a3 + d = 16 + 6 = 22


Hence, The arithmetic progression is 4, 10, 16, 2.



Question 11.

How many three digit numbers are divisible by 7?


Answer:

Smallest 3-digit number that is divisible by 7 is 105 and greatest 3-digit number that is divisible by 7 is 994.
Let the no. of three digits numbers that are divisible by 7 be n.


Thus, an = 994, first term a = 105 and common difference d = 7.


Since, an = a + (n - 1)d


Where,


a = First term of AP
d = Common difference of AP
and no of terms is ‘n’



⇒ 994 = 105 + (n - 1) × 7
⇒ 994 – 105 = 7 × (n - 1)
⇒ 889 = 7 × (n - 1)
⇒ 127 = n – 1
⇒ n = 128


Hence, Total 3-digit numbers that are divisible by 7 are 128.



Question 12.

Find the 11th term from the last term of the arithmetic progression 10, 7, 4, …., -62.


Answer:

Here last term of the progression l = -62.
First term a = 10 and common difference = 7 – 10 = -3
We know, In an AP, the nth term from last is


an = l – (n – 1)d


where an is nth term from last, l is last term and ‘d’ is common difference.


Thus 11th term from the end
= l – (11 -1)d
= -62 – (10) × (-3)
= -62 + 30
= -32


Hence, 11th term from the last is -32.



Question 13.

Find the 8th term from end of the arithmetic progression 1, 4, 7, 10, …., 88.


Answer:

Here last term of the progression l = 88.
First term a = 1 and common difference = 4 – 1 = 3
We know, In an AP, the nth term from last is


an = l – (n – 1)d


where an is nth term from last, l is last term and ‘d’ is common difference.


Thus 8th term from the end
= l – (8 -1)d
= 88 – (7) × (3)
= 88 - 21
= 67


Hence, 8th term from the last is 67.



Question 14.

There are 60 terms in an arithmetic progression. If its first and last term are respectively 7 and 125, then find its 32th term.


Answer:

Given, a = 7 and a60 = 125.
∴ an = a + (n – 1)d


Where,


a = First term of AP
d = Common difference of AP
and no of terms is ‘n’



⇒ a60 = 7 + (60 - 1)d
⇒ 125 = 7 + (59)d
⇒ 118 = 59 × d
⇒ d = 2


Now 32th term, a32 = a + (32 - 1)d


= 7 + 31 × 2
= 7 + 62
= 69


Hence, 32th term is 69.



Question 15.

Four numbers are an arithmetic progression. If the sum of the numbers is 50 and the greatest number is four times the smallest number, then find the numbers.


Answer:

Let the first number be a and common difference be d, Then arithmetic progression be a, a+d, a+2d, a+3d.


Given, a + a+d + a+2d + a+3d = 50
⇒ 4a + 6d = 50 …(i)
Also, a + 3d = 4(a)
⇒ 3d = 3a
⇒ a = d …(ii)


Solving eq. (i) and (ii), we get,
a = 5 and d = 5.


Hence the numbers are :
a1 = 5
a2 = a + d = 5 + 5 = 10
a3 = a + 2d = 5 + 2(5) = 5 + 10 = 15
a4 = a + 3d = 5 + 3(5) = 5 + 15 = 20.


Hence, The numbers are 5, 10, 15, 20.




Exercise 5.3
Question 1.

Find the sum of the following arithmetic progressions:

1, 3, 5, 7, …. upto 12 terms


Answer:

The arithmetic progression 1, 3, 5, 7, …. is given.
Here first term is 1 and common difference is 3 – 1 = 2.
Since the sum of n terms is
Sn =


Where,


a = First term of AP
d = Common difference of AP
and no of terms is ‘n’



So sum of first 12 terms S12
= 6[ 2 + 11×2]
= 6[2 + 22]
= 6 × 24
= 144


Hence, Sum of first 12 terms is 144.



Question 2.

Find the sum of the following arithmetic progressions:

8, 3, -2, … upto 22 terms.


Answer:

The arithmetic progression 8, 3, -2, …. is given.
Here first term is 8 and common difference is 3 – 8 = -5.
Since the sum of n terms is
Sn =


Where,


a = First term of AP
d = Common difference of AP
and no of terms is ‘n’



So sum of first 22 terms S22
]
= 11[ 16 + 21×(-5)]
= 11[16 - 105]
= 11 × (-89)
= -979


Hence, Sum of first 22 terms is -979.



Question 3.

Find the sum of the following arithmetic progressions:

… upto 11 terms.


Answer:

The arithmetic progression …. is given.
Here first term is and common difference is .
Since the sum of n terms is
Sn =


Where,


a = First term of AP
d = Common difference of AP
and no of terms is ‘n’


So sum of first 11 terms S11





Hence, Sum of first 11 terms is .



Question 4.

Find the sum of the following:

3 + 11 + 19 + … + 803


Answer:

The arithmetic progression 3, 11, 19, …., 803 is given.
Here first term is 3 and common difference is 11 – 3 = 8.
Last term l = 803


Let no. of terms be n.
So, an = a + (n - 1)d


Where,


a = First term of AP
d = Common difference of AP
and no of terms is ‘n’



⇒ 803 = 3 + (n - 1) × 8
⇒ 800 = (n - 1) × 8
⇒ 100 = n – 1
⇒ n = 101


Since the sum of n terms is
Sn =


Where,


a = First term of AP
d = Common difference of AP
and no of terms is ‘n’



So sum of 101 terms S101
]
= 50.5[ 6 + 100×(8)]
= 50.5[ 6 + 800]
= 50.5 × (806)
= 40703


Hence, Sum is 40703.



Question 5.

Find the sum of the following:



Answer:

The arithmetic progression is given.
Here first term is 7 and common difference is
Last term l = 84


Let no. of terms be n.
Since, an = a + (n - 1)d


Where,


a = First term of AP
d = Common difference of AP
and no of terms is ‘n’





⇒ 22 = n – 1
⇒ n = 23


Since the sum of n terms is
Sn =
So sum of 23 terms S23
]
= 11.5 [14 + 22 × 3.5]
= 11.5[ 14 + 77]
= 11.5 × (91)
= 1046.5


Hence, Sum is 1046.5 = .



Question 6.

Find the number of terms:

How many terms of the arithmetic progression 9, 17, 25, … be taken so that their sum is 636?


Answer:

Here first term a = 9 and common difference d = 17 – 9 = 8.
Also, Sn = 636
Since the sum of n terms is
Sn =


Where,


a = First term of AP
d = Common difference of AP
and no of terms is ‘n’




636 = n[ 9 + (n - 1)4]
636 = 9n + 4n(n - 1)
636 = 9n + 4n2 – 4n
636 = 4n2 + 5n
4n2 + 5n – 636 = 0
⇒ n = 12, n = -13.25 (which is not applicable ∵ n can neither be negative nor be in decimal)
∴ n = 12


Hence, 12 terms of the arithmetic progression must be taken to get sum as 636.



Question 7.

Find the number of terms:

How many terms of the arithmetic progression 63, 60, 57, … be taken so that their sum is 693?


Answer:

Here first term a = 63 and common difference d = 60 – 63 = -3.
Also, Sn = 693
Since the sum of n terms is
Sn =


Where,


a = First term of AP
d = Common difference of AP
and no of terms is ‘n’



693 × 2 = n[ 126 + (n - 1)(-3)]
1386 = 126n - 3n(n - 1)
1386 = 126n - 3n2 + 3n
1386 = -3n2 + 129n
3n2 - 129n + 1386 = 0
n2 - 43n + 462 = 0
⇒ n = 21, n = 22
∴ n = 21 or n = 22


Hence, Either 21 or 22 terms of the arithmetic progression must be taken to get sum as 693.



Question 8.

Find the sum of the first 25 terms of the following series whose nth term is given:

an = 3 + 4n


Answer:

General nth term an is given as:
an = a + (n - 1)d … (i)


Where,


a = First term of AP
d = Common difference of AP
and no of terms is ‘n’



and an = 3 + 4n
⇒ an = (7-4) + 4n
⇒ an = 7 + 4n – 4
⇒ an = 7 + 4(n – 1)
⇒ an = 7+ (n – 1)× 4 …(ii)


On comparing eq. (i) and (ii), we get,
a = 7 and d = 4


Here first term is 7 and common difference is 4.
Since the sum of n terms is
Sn =


Where,


a = First term of AP
d = Common difference of AP
and no of terms is ‘n’



So sum of first 25 terms S25
= 12.5 × [ 14 + 24×4]
= 12.5 × [ 14 + 96]
= 12.5 × 110
= 1375


Hence, Sum of first 25 terms is 1375.



Question 9.

Find the sum of the first 25 terms of the following series whose nth term is given:

an = 7 - 3n


Answer:

General nth term an is given as:
an = a + (n - 1)d … (i)


Where,


a = First term of AP
d = Common difference of AP
and no of terms is ‘n’



and an = 7 - 3n
⇒ an = (4 + 3) - 3n
⇒ an = 4 - 3n + 3
⇒ an = 4 + (-3) × (n – 1)
⇒ an = 4+ (n – 1)× (-3) …(ii)


On comparing eq. (i) and (ii), we get,
a = 4 and d = -3


Here first term is 4 and common difference is -3.
Since the sum of n terms is
Sn =


Where,


a = First term of AP
d = Common difference of AP
and no of terms is ‘n’



So sum of first 25 terms S25
= 12.5 × [ 8 + 24×(-3)]
= 12.5 × [ 8 - 72]
= 12.5 × (- 64)
= -800


Hence, Sum of first 25 terms is -800.



Question 10.

Find the sum of the first 51 terms of an arithmetic progression in which second and third terms are respectively 14 and 18.


Answer:

Common difference = 18 – 14 = 4
∴ a = a2 – d = 14 – 4 = 10
First term a = 10 and common difference d = 4


Since the sum of n terms is
Sn =


Where,


a = First term of AP
d = Common difference of AP
and no of terms is ‘n’



So sum of first 51 terms S51
= 25.5 × [ 20 + 50×4]
= 25.5 × [ 20 + 200]
= 25.5 × 220
= 5610


Hence, Sum of first 51 terms is 5610.



Question 11.

The first and the last terms of an arithmetic progression are 17 and 350 respectively. If the common difference is 9 then what is the number of terms in the arithmetic progression and what is their sum?


Answer:

Here first term is 17 and common difference is 9
Last term l = 350


Let no. of terms be n.
Since, an = a + (n - 1)d


Where,


a = First term of AP
d = Common difference of AP
and no of terms is ‘n’



⇒ 350 = 17 + (n - 1) × 9
⇒ 333 = (n - 1) × 9
⇒ 37 = n – 1
⇒ n = 38


Since the sum of n terms is
Sn =
So sum of 38 terms S38
= 19 [34 + 37 × 9]
= 19 × 367
= 6973


Hence, Number of terms is 38 and Sum is 6973.



Question 12.

Find the sum of all the odd numbers divisible by 3 between 1 and 1000.


Answer:

Starting from 1 the first odd number divisible by 3 is 3 then second odd number divisible by 3 is 9.
Greatest odd number till 1000 i.e. divisible by 3 is 999
Thus arithmetic progression is 3, 9, 15, …, 999
Here first term a = 3 and last term l = 999
and common difference = 9 – 3 = 6.


Let number of all odd number divisible by 3 be n.
Since, an = a + (n - 1)d


Where,


a = First term of AP
d = Common difference of AP
and no of terms is ‘n’



⇒ 999 = 3 + (n - 1) × 6
⇒ 996 = (n - 1) × 6
⇒ 166 = n – 1
⇒ n = 167


Since the sum of n terms is
Sn =
So sum of 167 terms S167
= 83.5 × [6 + 166 × 6]
=n
= 83.5 × 1002
= 83667


Hence, Sum is 83667.



Question 13.

The first term of an arithmetic progression is 8, nth term is 33 and sum of first n term is 123. Then find the n and common difference d.


Answer:

Here first term a = 8, nth term = 33 and sn = 123
General nth term an is given as:
an = a + (n - 1)d


Where,


a = First term of AP
d = Common difference of AP
and no of terms is ‘n’



33 = 8 + (n -1) × d
25 = (n - 1) × d … (i)


Since the sum of n terms is
Sn=


Where,


a = First term of AP
d = Common difference of AP
and no of terms is ‘n’



So sum of first 25 terms S25
]
246 = n [ 16 + (n - 1) × d]
246 – 16 n = (n) × (n - 1) × d … (ii)


On dividing eq. (ii) from (i), we get,

⇒ (246 – 16n) = 25n
⇒ 25n + 16n = 246
⇒ 41n = 246
⇒ n = 6


Substituting the value of n in eq. (i), we get,
d = 5


Hence, Value of n is 6 and common difference is 5.



Question 14.

A sum of 280 is to be used to give four prizes. If after first prize, each prize is 20 less than the preceding prize, then find the value of each of the prizes.


Answer:

Given,
Sn = 280, n = 4 and common difference is -20.


Let the first term be a.


Since the sum of n terms is
Sn =


Where,


a = First term of AP
d = Common difference of AP
and no of terms is ‘n’



So sum of 4 terms S4
]
280 = 2× [2a + 3 × (-20)]
140 = 2a – 60
2a = 140 + 60
2a = 200
a = 100


a1 = a = 100
a2 = a1 + d = 100 - 20 = 80
a3 = a2 + d = 80 - 20 = 60
a4 = a3 + d = 60 - 20 = 40


Hence, The value of prizes are 100, 80, 60 and 40.



Question 15.

A manufacture of TV sets produces 600 TV sets in the third year and 700 TV sets in seventh year. Assuming that the production increases, uniformly by a fixed number every year, find
(i) the production in the 1st year
(ii) the production in the 10th year
(iii) the total production in first 7 years.


Answer:

Given, a3 = 600 and a7 = 700


Let the first term be a and common difference be d.
Since, nth term an AP is given by :
an = a + (n - 1)d


Where,


a = First term of AP
d = Common difference of AP
and no of terms is ‘n’



⇒ a3 = a + (3 - 1)d
⇒ 600 = a + 2d … (i)


⇒ a7 = a + (7 - 1)d
⇒ 700 = a + 6d …(ii)


On solving eq. (i) and (ii), we get :
a = 550 and d =25


∴ production in first year a1 = a 550
and production in tenth year a10
= a + (10 - 1)d
= 550 + 9 × 25
= 550 + 225 = 775
∴ a10 = 775


Since the sum of n terms is
Sn =
Total production in first seven year S7
S7 =
S7 = 3.5 × [ (2× 550) + (6 × 25)]
S7 = 3.5 × [ 1100 + 150]
S7 = 3.5 × 1250
S7 = 4375


Hence, (i) the production in the 1st year is 550
(ii) the production in the 10th year is 775
(iii) the total production in first 7 years is 4375.




Miscellaneous Exercise 5
Question 1.

The common difference of two arithmetic progression is the same. The first term of one of them is 8 and of the second is 3. Then difference of their 30th term is :

A. 11

B. 3

C. 8

D. 5


Answer:

Since the common difference of both the term is same.
∴ each term will change by same number.
⇒ Difference of their 30th term is same as difference of their 1st term.
⇒ Difference of 30th term = Difference of 1st term = 8 – 3 = 5.


Question 2.

If 18, a, b, -3 are in the arithmetic progression then a + b =

A. 19

B. 7

C. 11

D. 15



Answer:

Since they are in arithmetic progression their common difference is same.
⇒ a – 18 = b – a = -3 – b
⇒ a – 18 = -3 – b
⇒ a + b = 18 – 3
⇒ a + b = 15.


Question 3.

If the 7th and the 13th terms of an arithmetic progression are 34 and 64 respectively, then its 18th term is :

A. 89

B. 88

C. 87

D. 90


Answer:

Let the first term be a and common difference be d.
Since, nth term an is given by :
an = a + (n - 1)d


Where,


a = First term of AP
d = Common difference of AP
and no of terms is ‘n’



⇒ a7 = a + (7 - 1)d
⇒ 34 = a + 6d … (i)


⇒ a13 = a + (13 - 1)d
⇒ 64 = a + 12d …(ii)


On solving eq. (i) and (ii), we get :
a = 4 and d = 5


⇒ a18 = a + (18 - 1)d
⇒ a18 = 4 + 17 × 5
⇒ a18 = 4 + 85
⇒ a18 = 89


Question 4.

If an arithmetic progression’s first term is 2 and common difference 8 and sum of n terms is 90 then value of n will be:

A. 3

B. 4

C. 5

D. 6


Answer:

Given, first term a = 2 and common difference d = 8 and Sn = 90.


Since the sum of n terms is
Sn =


Where,


a = First term of AP
d = Common difference of AP
and no of terms is ‘n’



90 =
⇒ 180 = n [4 + 8(n - 1)]
⇒ 180 = 4n + 8n(n – 1)
⇒ 180 = 4n + 8n2 – 8n
⇒ 180 = 8n2 – 4n
⇒ 45 = 2n2 – n
⇒ 2n2 – n – 45 = 0
⇒ n = 5, n = -4.5
Since, n is a number of terms, it cannot be negative.
∴ n = 5.


Question 5.

If the sum of n terms of an arithmetic progression in 3n2 + 5n, then which term of its is 164:

A. 12th

B. 15th

C. 27th

D. 20th


Answer:

Since the sum of n terms is
Sn =…(i)


Where,


a = First term of AP
d = Common difference of AP
and no of terms is ‘n’



Also Sn = 3n2 + 5n
⇒ Sn = n(3n + 5)
⇒ Sn = n(3n + 8 - 3)
⇒ Sn = n[8 + 3(n -1)]
⇒ Sn = n[8 + (n - 1)3]
⇒ Sn …(ii)


On comparing eq. (i) and (ii), we get :
a = 8 and d = 6


Since, nth term an is given by :


an= a + (n – 1)d


Where,


a = First term of AP
d = Common difference of AP
and no of terms is ‘n’



an = 8 + (n - 1)6
⇒ 164 = 8 + (n - 1) × 6
⇒ 156 = (n - 1) × 6
⇒ (n - 1) = 26
⇒ n = 27.


Question 6.

If the sum of the first n terms of the arithmetic progression is Sn and S2n = 3Sn, then S3n : Sn will be :

A. 10

B. 11

C. 6

D. 4


Answer:

Since the sum of n terms is
Sn =


Where,


a = First term of AP
d = Common difference of AP
and no of terms is ‘n’



⇒ S2n = 3Sn
⇒ 2[2a + (2n - 1)d] = 3[2a + (n - 1)d]


⇒ 4a + (2n - 1)2d] = 6a + (n - 1)3d
⇒ 4nd – 2d = 2a + 3nd – 3d
⇒ nd + d = 2a
⇒ (n + 1)d = 2a


S3n:Sn =
=
=
=
=
= 6
S3n : Sn = 6:1


Question 7.

The first term and the last term of an arithmetic progression are 1 and 11 respectively. If the sum of its terms is 36, then its number of terms will be:

A. 5

B. 6

C. 9

D. 11


Answer:

Given, first term a = 1, last term l = 11 and Sn = 36.
Since, nth term an is given by :
an = a + (n - 1)d


Where,


a = First term of AP
d = Common difference of AP
and no of terms is ‘n’



⇒ 11 = 1 + (n - 1)d
⇒ 10 = (n -1)d … (i)


Since the sum of n terms is
Sn =

⇒ 72 = n[ 2 + (n-1)d] …(ii)


From eq. (i) and (ii), we get,
⇒ 72 = n[ 2 + 10]
⇒ 72 = 12n
⇒ n = 6


Question 8.

Write 5th term from end of the arithmetic progression 3, 5, 7, 9, …, 201.


Answer:

Here last term of the progression l = 201.
First term a = 3 and common difference = 5 – 3 = 2
We know, In an AP, the nth term from last is


an = l – (n – 1)d


where an is nth term from last, l is last term and ‘d’ is common difference.


Thus 5th term from the end
= l – (5 -1)d
= 201 – (4) × (2)
= 201 - 8
= 193


Hence, 5th term from the last is 193.



Question 9.

If three consecutive terms of an arithmetic progression are a, 2, then write the value of a.


Answer:

We know that if three terms A, B and C are in AP then
2B = A + C




Hence, Value of a is .



Question 10.

Find the sum of first 1000 positive integers.


Answer:

Required arithmetic progression is 1, 2, 3, …, 1000
Here, first term a= 1 and common difference d = 1.


Since the sum of n terms is
Sn =


Where,


a = First term of AP
d = Common difference of AP
and no of terms is ‘n’



S1000 =
= 500 [ 2 + 999]


= 500 × 1001
= 500500


Hence, Sum of first 1000 positive integers is 500500.



Question 11.

Is 299 any term in the sequence of numbers 5, 11, 17, 23, …?


Answer:

The arithmetic progression is 5, 11, 17, 23, ….
Here, First term a = 5 and common difference = 11 – 5 = 6
Let us assume that nth term an of the progression is 301.
we know, an = a + (n -1)d


Where,


a = First term of AP
d = Common difference of AP
and no of terms is ‘n’



∴ 299 = 5 + (n – 1) × (6)
⇒ 299 = 5 + 6n -6
⇒ 300 = 6n
⇒ n = 5


Hence, Yes, 299 is the 5th term of the progression.



Question 12.

Which term of the arithmetic progression is the first negative term ?


Answer:

Here, first term a = 20 and common difference d We know that general term an = a + (n - 1)d


Where,


a = First term of AP
d = Common difference of AP
and no of terms is ‘n’



Since the common difference is negative we get the first negative term when -(n - 1)d > a


⇒ (n - 1) > 26.66
⇒ n > 26.66 + 1
⇒ n > 27.66
⇒ n = 28


Hence, 28th term of the arithmetic progression is first negative term.



Question 13.

Four numbers are in arithmetic progression. If their sum is 20 and the sum of their squares is 120, then find the numbers.


Answer:

Let the first term be a – 3d and common difference be 2d.
Thus arithmetic progression will be a - 3d, a - d, a + d, a+3d.


Given, Sum of terms = 20
⇒ (a - 3d) + (a - d) + (a + d) + (a + 3d) = 20
⇒ 4a = 20
⇒ a = 5 …(i)


Also,


Sum of their square = 120


(a – 3d)2 + (a – d)2 + (a + d)2 + (a + 3d)2 = 120


⇒ (5 – 3d)2 + (5 – d)2 + (5 + d)2 + (5 + 3d)2 = 120


⇒ (25 + 9d2 – 30d) + (25 + d2 – 10d) + (25 + d2 + 10d) + (25 + 9d2 + 30d) = 120


⇒ 100 + 20d2 = 120


⇒ 20d2 = 20


⇒ d2 = 1


⇒ d = ± 1


If d = 1


First term, a – 3d = 5 – 3 = 2 and common difference, 2d = 2 and four terms will be 2, 4, 6, 8


If d = -1


First term, a – 3d = 5 –(– 3) = 8 and common difference, 2d = -2 and four terms will be 8, 6, 4 and 2.



Question 14.

If the sum of a terms of an arithmetic progression is then find its 25th term.


Answer:

Since the sum of n terms is
Sn =…(i)


Where,


a = First term of AP
d = Common difference of AP
and no of terms is ‘n’



Also Sn =
⇒ Sn =
⇒ Sn =
⇒ Sn =
⇒ Sn = …(ii)


On comparing eq. (i) and (ii), we get:
a = 4 and d = 3


Also, nth term an is given by:
an = a + (n – 1)d


For given AP, we have


an = 4 + (n - 1)6
⇒ a25 = 4 + (25 - 1) × 3
⇒ a25 = 4 + 24 × 3
⇒ a25 = 4 + 72
⇒ a25 = 76


Hence, 25th term is 76.



Question 15.

The houses of a row are numbered consecutively from 1 to 49. Show that there is a value of x such that the sum of the numbers of the houses preceding the house numbered x is equal to the sum of the numbers of the houses following it. Find the values of x.


Answer:

Clearly, No of houses are in AP and


Given,


First term, a = 1


common difference d = 1


According to given statement: S1 to x- 1 = S(x+1) to 49
⇒ Sx+1 to 49 = S49 – Sx and S1 to x- 1 = Sx- 1


Since the sum of n terms is Sn =


Where,


a = First term of AP
d = Common difference of AP
and no of terms is ‘n’


Applying given condition:


S1 to x- 1 = S(x+1) to 49
⇒ Sx- 1 = S49 – Sx
⇒ Sx- 1 = S49 – Sx


⇒ (x - 1)(x) = 49(50) - x(x+1)
⇒ x2 – x = 49(50) – x2 -x
⇒ 2x2 = 49 × 50
⇒ x2 = 49 × 25
⇒ x = 35 and x = -35
Here since the x is a number between 1 to 49, ∴ x = 35.


Hence, The value of x is 35.