More worked examples of Sequence and Series

In the last lesson, we saw what a sequence is and how to find the nth term of a sequence. We also solved some given examples of a set of numbers in a sequence. Then we understood what a series is and how to find the series of a sequence. Now we will try to solve some examples in order to understand the subject more.

Example 1

Find the first five terms of a sequence whose nth term is given below:

Solution:
Given the nth term as (n + 1)(2n - 1)/4
Substituting n = 1 in the nth term, we have
T₁ = (1 + 1)(2x1 - 1)/4
T₁ = (1 + 1)(2 - 1)/4
T₁ = (1 + 1)(2 - 1)/4
Expanding the bracket, we have:
T₁ = 2x1/4
T₁ = 2/4
Dividing to the lowest term, we have
T₁ = 1/2

Substituting n = 2 in the nth term, we have
T₂ = (2 + 1)(2x2 - 1)/4
T₂ = (2 + 1)(4 - 1)/4
T₂ = (3)(3)/4
Expanding the bracket, we have:
T₂ = 9/4

Substituting n = 3 in the nth term, we have
T₃ = (3 + 1)(2x3 - 1)/4
T₃ = (3 + 1)(6 - 1)/4
T₃ = (4)(5)/4
Expanding the bracket, we have:
T₃ = 20/4
T₃ = 5

Substituting n = 4 in the nth term, we have
T₄ = (4 + 1)(2x4 - 1)/4
T₄ = (4 + 1)(8 - 1)/4
T₄ = (5)(7)/4
Expanding the bracket, we have:
T₄ = 35/4

Substituting n = 5 in the nth term, we have
T₅ = (5 + 1)(2x5 - 1)/4
T₅ = (5 + 1)(10 - 1)/4
T₅ = (6)(9)/4
Expanding the bracket, we have:
T₅ = 54/4
Dividing to the lowest term, we have
T₅ = 27/2

Therefore, the first 5 terms are: 1/2, 9/4, 5, 35/4, 27/2

Example 2

Find the sum of the second and third terms of a sequence whose nth term is denoted by:

Solution
Given the nth term as (-1)^n-2 2^n-1
Substituting n = 2 in the nth term, we have
T₂ = (-1)^2-2 2^2-1
T₂ = (-1)⁰ 2¹
Remember in law of indices that any number raised to the power of zero is 1. We then have:
T₂ = 1 x 2
T₂ = 2

Substituting n = 3 in the nth term, we have
T₃ = (-1)^2-3 2^3-1
T₃ = (-1)^-1 2²
Expanding the bracket, we have
T₃ = -1 x 4
T₃ = -4

The sum of the 2nd and 3rd terms is:
T₂ + T₃ = 2 + (-4)
T₂ + T₃ = 2 - 4
T₂ + T₃ = -2

Example 3

What is the sum of the first 6 terms of the sequence below:

Solution

Given the nth term as 3n - 2
Substituting n = 1 in the nth term, we have
T₁ = (3x1 - 2)
T₁ = (3 - 2)
T₁ = 1

Substituting n = 2 in the nth term, we have
T₂ = (3x2 - 2)
T₂ = (6 - 2)
T₂ = 4

Substituting n = 3 in the nth term, we have
T₃ = (3x3 - 2)
T₃ = (9 - 2)
T₃ = 7

Substituting n = 4 in the nth term, we have
T₄ = (3x4 - 2)
T₄ = (12 - 2)
T₄ = 10

Substituting n = 5 in the nth term, we have
T₅ = (3x5 - 2)
T₅ = (15 - 2)
T₅ = 13

Substituting n = 6 in the nth term, we have
T₆ = (3x6 - 2)
T₆ = (18 - 2)
T₆ = 16

Therefore, the sum of the first 6 terms will be:
T₁ + T₂ + T₃ + T₄ +T₅ + T₆ = 1+4+7+10+13+16 = 51

Conclusion

I believe with the example, the subject is now clearer and easier to understand. Once you have the nth term of the sequence, it will be possible to solve for the unknown positions in the sequence. Even if the nth term is unknown, the figures of the sequence will be used to determine the nth term.