Sum – Definition, Examples & Formulas

Sum in Maths: In mathematics, the term “sum” refers to the result of adding two or more numbers or quantities together. It’s a fundamental arithmetic operation used to find the total of multiple values. For example, when you add 5 and 7, the sum is 12.

In this article, we will learn the concept of Sum in mathematics, along with its definition, some examples, and properties of Sum.

What is Sum in Maths? 

The sum is the fundamental arithmetic operation that combines two or more quantities by adding them together to find their total. It can be used to add numbers as well as variables. Also, the sum operation is not limited to just numerical values; it can also be applied to algebraic expressions and mathematical variables.

For example, if Ram buys 20 Rs worth of bananas, 40 Rs worth of apples, and 50 Rs worth of oranges, then the total can be found by using the sum operation between 20, 40, and 50

Sum Definition

The term “sum” refers to the result obtained by adding two or more numbers or quantities together.

It represents the total value obtained when multiple values are combined through addition.

Sum Notation | Symbol for Sum (+)

The symbol for Sum is +. This is used when we add the numbers together. For a list of numbers in a sequence, we use the uppercase Greek letter sigma (Σ).

For example:

• 2 + 5 represents the addition of 2 and 5 which results in 7.
• a + b means the sum of two variables, a and b.
• For series with terms a₁​, a₂​, . . . ,a_n, their sum is represented as [Tex]\sum_{i=0}^{n} a_i[/Tex].

Sum of Numbers

When two or more numbers are added as a set of numbers that gives a total amount this process is called the addition of summation of numbers. For example, the sum of 3, 5, and 7 is 15 because 3 + 5 + 7 = 15.

In general, the sum of n numbers a₁​, a₂​, . . . ,a_n​ is calculated by adding all the individual values together,

Sum = a₁​ + a₂​ + . . . + a_n

Using sum operator we can add:

• One-Digit Numbers
• Two-Digit Numbers
• Square Numbers

Let’s discuss the sum of each types of numbers as follows:

Sum of One-Digit Numbers

In decimal system, there are 10 digits i.e., 0, 1, 2, 3, 4, 5, 6, 7, 8, and 9. We can add these numbers very easily using counting. Let’s consider an examples for sum of one-digit numbers.

Example: Find sum of one-digit numbers are 5, 3, 6 and 7.

Solution:

Sum = 5 + 3 + 6 + 7

⇒ Sum = 21

So, the sum of the one-digit numbers 5, 3, 6, and 7 is 21.

Note: The sum of all one-digit numbers from 0 to 9 is 0 + 1 + 2 + 3 + 4 + 5 + 6 + 7 + 8 + 9 = 45.

Sum of Two-digit Numbers

The numbers that are greater than 10 and less than 100, can be added by any numbers between them and their summation will be the total of original numbers obtained as a Sum of Two two-digit numbers.

Let’s consider another example with three two-digit numbers.

Example: Find sum of two-digit numbers 15, 33 and 26.

Solution:

Sum = 15 + 33 + 26

⇒ Sum = 74

Note: The sum of all two-digit numbers from 10 to 999 is 10 + 11 + 12 + 13 + . . .+ 99 = 4905.

Sum of Square Numbers

Sum of Square Numbers refers to the sum of two numbers, each of which is raised to the power of 2 (squared). Mathematically, if we have two numbers a and b, the sum of their squares can be represented as a² + b².

For example, if a = 3 and b = 4, then the sum of their squares would be:

3² + 4² = 9 + 16 = 25

So, the sum of the squares of 3 and 4 is 25.

Sum of Numbers on Number Line

The total distance travelled from one point on a number line to another is represented by the sum of the numbers on the number line.

For Example: Take the numbers 2, 5 on a number line.

• Step 1: On the number line, find the first number (2).
• Step 2: Then, Shift 5 units to the right or add 5.

Thus, we only need to add these numbers together to determine their total:

= 2 + 5
= 7

Sum of First n Natural Numbers

The sum of the first n natural numbers is a classic problem in mathematics, and it can be solved elegantly with a simple formula. The sum of the first n natural numbers is given by the formula:

S_n = n(n+1)/2​

Where:

• S_n​ is the sum of the first n natural numbers.
• n is the number of terms in the sequence.

Sigma Notation for Sum 

Sigma notation, represented by the Greek letter Σ (sigma), is a concise way to represent a sum of terms in mathematics. It is typically written in the form [Tex]\sum_{i=0}^{n} a_i[/Tex]. This notation denotes the sum of the terms a_i​ as i ranges from m to n.

Let’s consider an example for sigma notation sum.

Example: Find ∑³_n=1 3n² + 9.

Solution:

∑³_n=1 3n² + 9.

= [3(1)² + 9] + [3(2)² + 9] + [3(3)² + 9]

= ( 12) + (21) + ( 36)

= 69.

Therefore, the given sum evaluates to 69.

Properties of Sum

There are various properties which hold true for sum (addition), some of these properties are:

Property	Description
Closure Property	The sum of any two real numbers is always a real number.
Commutative Property	Changing the order of the numbers being added does not change the sum.
Associative Property	The way numbers are grouped in addition does not affect the sum.
Identity Element	The sum of any number and zero is the number itself.
Inverse Element	For every real number, there exists an additive inverse (negative) that, when added to the number, gives zero.
Distributive Property	Multiplying a number by the sum of two other numbers is the same as multiplying the number by each of the two numbers and then adding the results.

Read More about Additive Identity Vs Multiplicative Identity.

Sum Formulas

Some of the common sum formaulas are:

Sequence	Formula for Sum
Natural Numbers	1 + 2 + 3 + … + n = n(n+1)​/2
Even Numbers	2 + 4 + 6 + … + 2n = n(n+1)​
Odd Numbers	1 + 3 + 5 + … + (2n − 1) = n2
Square Numbers	12 + 22 + 32 + … + n2 = n(n+1)(2n+1)​/6
Cubic Numbers	13 + 23 + 33 + … + n3 = [n(n+1)/2​]2
Geometric Series	a + ar + ar2 + … + arn−1 = a[(1-rn)/(1-r)]

Practice Problems – Sum in Maths

Problem: Calculate the sum of the first 10 terms of the arithmetic series where the first term, a₁ is 5 and the common difference, d is 3.

Problem: Find the sum of the first 5 terms of a geometric series where the first term is 2 and the common ratio is 3.

Problem: Find the sum of all integers from 1 to 100.

Problem: Evaluate the sum of the series: 3+6+9+⋯+3n for n terms.

Conclusion – What is Sum in Maths

In conclusion, addition is the mathematical operation that helps us combine two numbers, variables, or expressions. Using addition operations, we can calculate the total bill for groceries, determine interest on a principal amount, and manage accounts. Addition is the most fundamental operation. In this article, we have explored this operation in detail, including its symbols and other methods to represent it.

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FAQs on What is Sum in Maths

What does Sum means in Maths?

In mathematics, “sum” refers to the result of adding numbers or terms together. It represents the total obtained by combining individual quantities.

What is an Example of Sum?

An example of a sum is ∑_n=1⁵ ​n, which represents the sum of the first five natural numbers: 1 + 2 + 3 + 4 + 5 = 15.

What is the Symbol for Sum?

The symbol for sum is Σ (sigma). It represents the addition of a sequence of numbers or terms.

How to find sum of natural numbers?

The sum of natural numbers can be found using the formula for the sum of an arithmetic series: S = n(n+1)/2​, Where n is the last term.

What is the sum of an arithmetic series?

The sum of an arithmetic series can be found using the formula S = n/2 × (a + l), where a is the first term of series and l is the last term.

Can we find sum of Infinite Series?

Yes, some infinite series can be summed using mathematical techniques like convergence tests or specialized methods such as geometric series or telescoping series.