Summary Patterns, Sequences and Series - Mathematics Grade 12 (IEB)

Sequences and Series
Terminology
Sequence: Numbers ordered according to a specific rule.

Term: Each number in the sequence.

n: Position of the term.

Tn : Value of the term.

General term: Shows the relationship between n and Tn.

a: The first term.

d: The constant difference.

r: The constant ratio.

l: The last term.

Series: Refers to the sum of a sequence. (Sn)

Sigma: Shorthand notation to describe the sum of.( )

notation: Notation to describe the sum of a series of terms, obeying a general rule.



Number pattern revision
Well known patterns

Even numbers: 2; 4; 6; 8; 10; …
. Tn = 2n

Odd numbers: 1; 3; 5; 7; 9; …
. Tn = 2n – 1

The squares: 1; 4; 9; 16; 25; …
. Tn = n2

Triangular numbers: 1; 3; 6; 10; 15; …
𝑛 (𝑛+1)
. Tn =
2

The cubes: 1; 8; 27; 64; 125; …
. Tn = n3

Powers of 2: 2; 4; 8; 16; 32; …
. Tn = 2n

,Linear
(1st difference constant)

Tn = an + b
Common difference = a
Sub one value and it’s n into equation and solve = b

Quadratic
(2nd difference constant)

Tn = an2 + bn + c
Common difference = 2a
T0 = c
Sub in a and c, but in value and it’s n into equation and solve = b

Cubic
(3rd difference constant)

Tn = an3 + bn2 + cn + d

, Arithmetic Sequences
e.g. 2; 5; 8; 11; 14; …

Constant difference = d
d = Tn – Tn-1
. = T2 – T1
. = T3 – T2

Linear formula:
T1 = a
T2 = a + d
T3 = a + 2d

Tn = a + (n – 1) d

Type 1: Find the value of a term

Determine the 30th term of the sequence 45; 50; 55; …

Tn = a + (n – 1) d
a = 45
d=5

T30 = 45 + (30 – 1) 5
. = 190

Type 2 : Find the number of terms

How many terms are there in the sequence 13; 10; 7; …; - 44

Tn = a + (n – 1) d
a = 13
d=-3

-44 = 13 + (n – 1) - 3
. n = 20

Type 3: Find the sequence

Find the sequence if the 10th term is 31 and the 15th term is 46

31 = a + (10 – 1) d 46 = a + (15 – 1) d
31 = a + 9d 46 = a + 14d
. a = 31 – 9d . a = 46 – 14d

31 – 9d = 46 – 14d a = 31 – 9(3)
d=3 a=4

Tn = 4 + (n – 1) 3
4; 7; 10; …