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An arithmetic progression (AP), also known as an arithmetic sequence, is a sequence of numbers in which the difference between consecutive terms is constant. This constant difference is called the "common difference."
Various formulas on arithmetic progression are:
Nth term of an AP | an = a1 + (n-1)d |
|---|---|
Sum of first n terms of an AP | Sn = n/2(a1 + an) Sn = n/2[2a1 + (n-1)d] |
Nth Term from Sum of an AP | an = Sn - Sn-1 |
Number of Terms in an AP | n = (an - a1)/d + 1 |
where,
Question 1: Write the first three terms in each of the following sequences defined by
Solution :
For An = 5n + 2(n - 1)
Put n = 1, we get
a1 = 5 · 1 + 2(1 - 1) = 5+ 0 = 5Put n = 2, we get
a2 = 5 · 2 + 2(2 - 1) = 10 + 2 = 12Put n = 3, we get
a3 = 5 · 3 + 2 (3 - 1) = 15 + 4 = 19So first three terms are 5, 12, 19.
For An= 2n + 4(n - 2)Put n = 1, we get
a1 = 2 · 1 + 4(1 - 2) = 2 - 4 = -2Put n = 2, we get
a2 = 2 · 2 + 4(2 - 2) = 4+ 0 =4Put n = 3,we get
a3 = 2 · 3 + 4(3 - 2) = 6 + 4 = 10So the first three terms are -2, 4, 10.
Question 2: Find the 20th Term of the given expression An = (n - 1)(2 - n)(3 + n).
Solution:
For An = (n - 1)(2 - n)(3 + n)
Put n = 20 in given expression,
a20 = (20 - 1)(2 - 20)(20 + 3)
⇒ a20 = 19 × (-18) × (23)
⇒ a20 = -7886.
Solution:
In the given AP,
First term a1 = 6
Last term an = 216
Common difference = 7Now, to find the number of terms, n = (an - a1)/d + 1
n = (216 - 6)/7 + 1
n = 210/7 + 1
n = 30 + 1
n = 31So, middle term is (n + 1) / 2
= (31 + 1)/2
= 16Now to calculate the middle term
a16 = a1 + 15 × d
a16 = 6 + 15 × 7
a16 = 6 + 105 = 111So the middle term of the given AP is 111
Question 4: Find the sum of all natural numbers lying between 100 and 1000 (inclusive of both 100 and 1000) which are multiples of 5.
Solution:
Solve: first term to be 100 and last terms is 1000 and common difference is 5.
So our formula is Sn = (n/2)[2a + (n - 1) × d] .
Using an = a1 + (n - 1)d
⇒ 1000 = 100 + (n - 1)5
⇒ 900 = (n - 1)5
⇒ 180 = n - 1
⇒ n = 181Thus, there are 181 such number. Now for sum of all the 181 terms of sequence can be calculated as follows:
S181 = (181/2)[2 · 100 + (181 - 1) × 5].
⇒ S181 = (181/2)[200 + 180 × 5]
⇒ S181 = (181/2) × 1100
⇒ S181 = 181 × 550
= 99,550
Question 5: If a, b, c are in GP and log a − log 2b, log 2b − log 3c and log 3c − log a are in AP, then a, b, c are the lengths of the sides of a triangle which is? [NIMCET - 2019]
A) Acute Angle
B) Obtuse Angled
C) Right Angled
D) Equilateral
Solution:
If a, b, c are in GP:
b = √ac
Given that:
log a − log 2b, log 2b − log3c, and log 3c − log a are in AP:or
or 8b3 = 27c3
2b = 3c . . . . . . . (i)
a, b, c are in GP:
b2 = ac . . . . . . . (ii)
form (i) and (ii)
a = (9/4)c , b = (3/2)c, c= c
sides are 9c/4, 6c/4, 4c/4
Side C is the greatest side so
CosA =
Since A is an Obtuse angle and if any angle of a triangle is obtuse it is called an obtuse angled triangle.
Question 6: If the 2nd, 5th, and 9th terms of a non-constant A.P. are in G.P., then the common ratio of this G.P. is? [JEE(Main)-2016]
A) 7/4
B) 8/5
C) 4/3
D) 1
Solution:
Let a be the first term of an AP and d be the common difference, then:
- 2nd term: a2 = a + d
- 5th term: a5 = a + 4d
- 9th term: a9 = a + 8d
Given: a2, a5, a9 are in G.P., so:
(a + 4d)2 = (a +d)(a + 8d)
d(8d - a) = 0
8d = aHence the common ratio of G.P
Question 7: For three positive integers p, q, r, and r = pq + 1 such that 3, 3 logyx, 3 logzy, 7 logxz are in A.P. with common difference 1/2. Then r - p - q is equal to? [JEE(Main)-2023 January]
A) 12
B) -6
C) 2
D) 6
Solution:
Given:
- r = pq + 1,
- 3, 3logyx, 3logzy, 7logxz are in A.P. with a common difference of 1/2.
3 logyx =7/2, 3 logzy = 4, 7 logxz = 9/2
x = y7/6, y = z4/3, z = x9/2
(7/6)pq2 = qr = (3/4)p2r
7pq = 6r, 4q = 3p2
r = pq + 1
r = (6r/7)+ 1
r = 7
pq = 6p =2, q = 3
r - p - q = 7 - 5 = 2
Question 8: If 3, a, b, c are in A.P. and 3, a - 1, b - 1, b + 1 be in G.P. Then, the arithmetic mean of a, b, and c is? [JEE(Main)-2024 February]
A) -4
B) -1
C) 13
D) 11
Solution:
We are given two conditions:
- 3, a, b, c are in A.P
a = 3 + d, b = 3 + 2d, c = 3 + 3d
- 3, a − 1, b + 1, c + 9 are in G.P
3, 2 + d, 4 + 2 d, 12 + 3 d
GP condition:
- Common ratio:
(a - 1)/3 = (b + 1) / (a - 1)
(2 + d)2 = 3(4 + 2d)
d2 − 2d − 8 = 0
d = 4 or d = -2(Rejected for positive G.P. values)If d = 4 G.P ⇒ 3, 6, 12, 24 .
a = 7
b = 11
c = 15
Arithemetic Mean:(a + b + c)/3 = 7 + 11 + 15/3 = 11
Question 1: If the sum of the first n terms of an A.P. is 3n2 + 2n, find the common difference and the first term.
Question 2: The 5th term of an A.P. is 18, and the sum of its first 7 terms is 105. Find the first term and the common difference.
Question 3: Three numbers a, b, c are in A.P. If the sum of their squares is 70 and their product is 120, find a, b, and c.
Question 4: The 3rd, 8th, and 15th terms of an A.P. form a geometric progression (G.P.). If the first term is 2, find the common difference and the value of the 20th term.
Question 5: In an A.P., the sum of the first 10 terms is equal to the sum of the next 5 terms. If the first term is 4, find the common difference.
Question 6: The sum of all the terms of an A.P. (up to the n-th term) is equal to the sum of all the terms up to the (n + 4)-th term. Prove that the common difference of the A.P. is zero.
Question 7: A sequence a1, a2, a3,… is in A.P. The sum of the first n terms is 240. The sum of the first 2n terms is 960. Find the common difference of the sequence.
Question 8: If the sum of the first n terms of an A.P. is given as Sn = 2n2 + 3n, find the first term and the common difference.
Answer Key
- First term a = 5, Common difference d = 6.
- First term a = 6, Common difference d = 3.
- a = 2, b = 4,c = 6.
- Common difference d = 2, 20th term a20 = 40.
- Common difference d = 4/3
- Common difference d = 0.
- Common difference d = 8.
- First term a = 5, Common difference d = 4.
