How to Identify and Solve Problems with Consecutive Numbers
Before understanding consecutive numbers, let us look into consecutive meanings in maths. Consecutive means following each other continuously in a series or a sequence. In Mathematics, numbers that follow each other in a series are termed consecutive numbers. Consecutive numbers meaning is “The numbers which continuously follow each other in the order from smallest to largest.”
Consecutive Numbers Examples:
Consecutive numbers from 1 to 8 are 1, 2, 3, 4, 5, 6, 7, and 8. Here, the difference between each number is 1.
Consecutive numbers from 80 to 90 with differences as 2 are 80, 82, 84, 86, 88, and 90. Here, the difference between each number is 2. This type of consecutive number system where each number is an even number and the difference between each number is 2 is called consecutive even integers which we will discuss in detail in the latter part of this chapter.
Consecutive numbers from -1 to 7 are -1, 0, 1, 2, 3, 4, 5, 6, and 7. Here, the difference between each number is 1.
What does Consecutive Natural Numbers Mean?
Natural numbers are the numbers that are used for counting and ordering. Natural numbers include all whole numbers except 0.
In the mathematical form, the natural numbers are written as follows:
N = {1, 2, 3, 4, 5, 6, 7, 8, 9, ……}
So consecutive natural numbers are the numbers that continuously follow each other in order from the smallest number to the largest number.
For example, the consecutive natural numbers from 10 to 15 are 10, 11, 12, 13, 14, and 15.
The consecutive numbers from -5 to -1 are not consecutive natural numbers because these numbers don't fall under natural numbers. These numbers are integers.
What is Meant by Consecutive Numbers with Even Integers?
An even number is one that is divisible by two and leaves a 0 as a remainder.
So Consecutive Numbers with Even integers or simply called consecutive even integers is a sequence where the numbers continuously follow each other in the order from the smallest number to the largest number with the difference between each number is 2 and each number is divisible by 2.
Consecutive integers examples:
2, 4, 6, 8, 10, and 12 are consecutive even integers between the numbers 2 and 12.
-8, -6, -4, and -2 are consecutive even integers between the numbers -8 and -2.
What is Meant by Consecutive Numbers with Odd Integers?
A number that is not divisible by 2 is called an odd number. In the case of an odd number, the remainder is always 1. So consecutive odd integers is a sequence where the numbers continuously follow each other in the order from the smallest number to the largest number with the difference between each number is 2 and each number not divisible by 2.
Consecutive integers examples:
The consecutive odd integers between 1 and 15 are 1, 3, 5, 7, 9, 11, 13, and 15.
The consecutive odd integers between -11 and -1 are -11, -9, -7, -5, -3, and -1.
Properties of Consecutive Numbers
Any pair of predecessors and successors have a fixed difference. If we denote the first number as n, then n, n+1, n+2, n+3, n+4, and so on will be the consecutive numbers in the sequence. The difference between any two consecutive odd numbers is 2. For example, in the sequence of consecutive odd integers 3, 5, 7, 9, and 11, the difference between any two consecutive odd numbers is 2 i.e. 5 - 3 = 2, 7 - 5 = 2, and so on.
The difference between any two consecutive even numbers is 2. For example, in the sequence of consecutive even integers 12, 14, 16, 18, and 20, the difference between any two consecutive odd numbers is 2 i.e. 14 - 12 = 2, 16 - 14, = 2 and so on.
The sum of n consecutive numbers is divisible by n if n is an odd number. For example, let us consider a consecutive odd number sequence 5, 7, 9, 11, 13, 15, 17 which has 7 numbers in the sequence. So according to the property, the sum of this consecutive odd number sequence should be divisible by 7.
5+7+9+11+13+15+17 = 77.
77/7 = 11 which satisfies this property.
Here, we have to note that this property applies only when n is an odd number i.e. only if the sequence is made of odd numbers.
The sum of two consecutive numbers is always an odd number. For example, consider a consecutive number sequence 1, 2, 3, 4, 5, 6, 7, 8, 9. Here, the sum of the two consecutive numbers will always be an odd number. 1+2 = 3, 2+3 = 5, 3+4 = 7, and so on.
The sum of two consecutive odd numbers is always an even number. For example, consider a consecutive odd number sequence 5, 7, 9, 11, 13, 15, 17. Here, the sum of two consecutive odd numbers will always be an even number. 5+7 = 12, 7+9 = 16, 9+11 = 20, and so on.
The sum of two consecutive even numbers is always an even number. For example, consider a consecutive even number sequence 12, 14, 16, 18, 20, 22, 24. Here, the sum of two consecutive even numbers will always be an even number. 12+14 = 26, 14+16 = 30, 16+18 = 34, and so on.
Problems with Consecutive Numbers
1) What is a consecutive number in maths for natural numbers between 1 and 25?
Ans: The consecutive numbers for the natural numbers between 1 and 25 are as follows:
1, 2, 3, 4, 5, 6, 7, 8, 9, 10, 11, 12, 13, 14, 15, 16, 17, 18, 19, 20, 21, 22, 23, 24, 25.
2) Write the consecutive even integers between 20 and 40.
Ans: The consecutive even integers between 20 and 40 are as follows:
20, 22, 24, 26, 28, 30, 32, 34, 36, 38, 40.
3) Find the sum of two consecutive numbers 8 and 9.
Ans: The sum of two consecutive numbers is 8+9 = 17.
Important Concepts of Numbers and Consecutive Numbers
Consecutive numbers are the numbers that differ from each other by 1. Adding 1 to a number will give you the consecutive number after the original number. Similarly, subtracting 1 to a number will give you the consecutive number after the original number.
The concept of consecutive numbers is useful in the chapter of arithmetic progression where each number differs its successive number by a certain difference called a common difference.
For three numbers in Arithmetic progression with common difference 1, we can define these numbers as {a, a + 1, a+2}, where ‘a’ is a number.
The above example can also be written as {a -1, a, a+1}, where ‘a’ is a number.
There can be consecutive even numbers. Consecutive even numbers are the numbers that differ from their predecessor number by the ‘2’. All these numbers are also even numbers that mean they are divisible by 2 as well or they leave no remainder (or 0 remainders) when divided by 2. For example, 0, 2, 4, 6, 8, 10, 12, 14, etc.
Similar to consecutive even numbers, we have consecutive odd numbers. Here, the difference between the two numbers is 2 as well but these numbers are not divisible by 2. That means these numbers will leave a remainder (remainder = 1) when divided by two. That means the numbers in a series of consecutive odd numbers will be odd in nature. The examples of odd consecutive numbers are 1, 3, 5, 7, 9, 11, 13, 15, 17, etc.
Conclusion
Just remember that the sequence of a consecutive number series depends on the first number which we are representing. Say if we are representing the first number as n, then the consecutive numbers will be n+1, n+2, n+3, n+4, and so on.
The general form to represent consecutive even numbers is 2n where n is an integer.
The general form to represent consecutive odd numbers is 2n+1 where n is an integer.
FAQs on Consecutive Numbers Explained with Examples
1. What are consecutive numbers in Maths? Explain with examples.
Consecutive numbers are integers that follow each other in order, from smallest to largest, without any gaps. The key characteristic is that the difference between any two successive numbers is always 1. For example, the numbers 14, 15, and 16 are consecutive. Similarly, -3, -2, and -1 are also consecutive integers.
2. What is the difference between consecutive even numbers and consecutive odd numbers?
The main difference lies in their properties and the gap between them.
- Consecutive even numbers are even numbers that follow each other. The difference between them is always 2. For example: 8, 10, 12.
- Consecutive odd numbers are odd numbers that follow each other. The difference between them is also 2. For example: 17, 19, 21.
3. How can you represent consecutive numbers using algebra?
Algebraic representation is essential for solving word problems involving consecutive numbers. If we assume the first number is 'n', we can represent different types of consecutive numbers as follows:
- Consecutive integers: n, n + 1, n + 2, ...
- Consecutive even integers: 2n, 2n + 2, 2n + 4, ... (This ensures the first number is always even). Alternatively, if 'n' is stated to be an even number, they can be written as n, n + 2, n + 4, ...
- Consecutive odd integers: 2n + 1, 2n + 3, 2n + 5, ... (This ensures the first number is always odd). Alternatively, if 'n' is stated to be an odd number, they can be written as n, n + 2, n + 4, ...
4. Why is the sum of any two consecutive integers always an odd number?
The sum of two consecutive integers is always odd because any such pair consists of one even number and one odd number. The sum of an even number and an odd number is fundamentally always odd. For example, take 8 (even) and 9 (odd). Their sum is 17 (odd). Algebraically, if the first number is 'n', the next is 'n + 1'. Their sum is n + (n + 1) = 2n + 1. Since '2n' is always even, '2n + 1' will always be odd.
5. How can you find the sum of a series of consecutive numbers quickly using a formula?
To quickly find the sum of a series of consecutive numbers (which form an arithmetic progression), you can use the formula:
Sum = (n/2) * (first number + last number)
Where 'n' is the total count of numbers in the series.
For example, to find the sum of integers from 1 to 50:
- n = 50
- First number = 1
- Last number = 50
6. Are negative numbers and fractions considered when talking about consecutive numbers?
This is a common point of confusion. The concept of 'consecutive' primarily applies to integers. Therefore, negative numbers are included. For instance, -4, -3, and -2 are a set of consecutive integers. However, fractions are generally not referred to as consecutive in this context, because the definition relies on a succession with a difference of exactly 1, which is a property of integers in the number system.
7. Where are consecutive numbers used in real-life problems?
The concept of consecutive numbers is applied in various real-world scenarios and mathematical problems, such as:
- Problem Solving: Finding the ages of people that differ by one year.
- Calendars and Dates: Days of the week or dates in a month are consecutive.
- Numbering: Page numbers in a book, house numbers on a street, or seat numbers in a row are often consecutive.
- Puzzles and Logic Games: Many brain teasers and logic puzzles are based on finding a sequence of consecutive numbers that meet certain conditions.
