Number Series
Types of Series
1. Arithmetic (Difference/Sum based) : An arithmetic series is obtained by adding or subtracting the same value each time. These types of series will have fixed difference between the two consecutive terms.
Example: 1, 4, 7, 10, 13, 16, 19, 22, 25, …
This sequence has a difference of 3 between each number. The pattern is continued by adding 3 to the last number each time. Hence, the next term will be 25+3 = 28
The value added each time is called the “common difference”.
2. Geometric (Multiplication/Division based) : The pattern will be identified by multiplying or dividing the term by some number to obtain the next term.
Example: 1, 3, 9, 27, 81, 243, …
If you closely observe the next term can be obtained by multiplying by 3.
3= 1*3 , 9 = 3*3, 81= 27*3, similarly 243 = 81*3. Hence next term will be 243*3 = 729.
The value multiplied or divided each time is called “common ratio”.
3. Exponential Series : These series as the name suggest will be of form a^n. These could be perfect squares or perfect cubes etc.
Example: 4, 16, 64, 256, 1024…
If you closely observe the numbers are increasing at a very fast rate. This is the basic characteristic to identify if a series can be done by exponents. In this case we can see 16 = 2^4 , 64 = 2^6 , 256= 2^8 , 1024 = 2^10. Clearly the next term will be 2^12 = 4096
4. Alternating Series : Every alternate term forms a part of series. Here you need to look for the pattern among the alternate numbers.
Example: 3, 9, 5, 15, 11, 33, 29, ?
Now for the given series the pattern that follows is -
3 * 3 = 9
9 - 4 = 5
5 * 3 = 15
15 - 4 = 11
11 * 3 = 33
33 - 4 = 29
So, the next term is - 29 * 3 = 87
An easy way to identify such series is that the numbers might not increase consistently. They usually increase and decrease continuously.
5. Special Number Series -
(a) Prime Numbers: Prime numbers are special numbers who are divisible only by 1 and itself, which means it is not possible to factorize the prime numbers.
(b) Fibonacci Series: Fibonacci series are special series where current value is determined by adding previous two values.
Consider the series 1, 1, 2, 3, 5, 8, 13, …
13 = 8+5, 8 = 5+3, 5 = 3+2. Hence next term = 13+8 = 21
6. Single stage difference-
3, 23, 63, ?, 303 , 623 (Ans:- 143)
Pattern is:
+ 20, + 40, + 80, + 160, ………
240, 205, 177, 156, 142, ? (Ans:- 135)
Pattern is:
- 35, - 28, - 21, - 14, ………
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The patterns provided here are the most common type of patterns on which the series may be based. However, a lot many more patterns may be possible by varying the parameters provided above.
Points to remember -
- Identifying patterns solely depends on how quickly you can categorize the series. This needs practice and after a while solving series questions becomes instinctive. Try to identify how the series grows, this should help you categorize your series.
- If you fail to categorize a series into some category consider finding the special series in them. We have mentioned about Prime and Fibonacci numbers. There can be other types of number like Armstrong numbers etc.
- Do not give much time to series, If you are not able to establish relations between terms in a minute, it’s better to leave the question as a new kind of series can consume a lot of time that can be used elsewhere.