Sum
The sum of two numbers is their value added together. This operation is called additive summation or addition. There are many ways of writing sums, including:
- Addition ()
- Summation ()
- Code:
- Sum = 0
- For I = M to N
- Sum = Sum + X(I)
- Next I (in Visual BASIC)
Sigma notation
[change | change source]Sigma notation is a mathematical notation to write long sums in a short way. Sigma notation uses the Greek letter Sigma (), and takes upper and lower bounds which tell us where the sum begins and where it ends. The lower bound usually has a variable (called the index, often denoted by , or [1]) along with a value, such as "". This tells us that the summation begins at 2, and goes up by 1 until it reaches the number on the top.[2]
Properties
[change | change source]Applications
[change | change source]Sums are used to represent series and sequences. For example:
The geometric series of a repeating decimal can be represented in summation. For example:
The concept of an integral is a limit of sums, with the area under a curve being defined as:
Related pages
[change | change source]References
[change | change source]- ↑ "Compendium of Mathematical Symbols". Math Vault. 2020-03-01. Retrieved 2020-08-16.
- ↑ Weisstein, Eric W. "Sum". mathworld.wolfram.com. Retrieved 2020-08-16.
- ↑ 3.0 3.1 3.2 "Calculus I - Summation Notation". tutorial.math.lamar.edu. Retrieved 2020-08-16.
Further reading
[change | change source]- Nicholas J. Higham, "The accuracy of floating point summation", SIAM J. Scientific Computing 14 (4), 783–799 (1993).
Other websites
[change | change source]- Media related to Summation at Wikimedia Commons
- Sigma Notation Archived 2015-09-21 at the Wayback Machine on PlanetMath
- Derivation of Polynomials to Express the Sum of Natural Numbers with Exponents Archived 2013-02-18 at the Wayback Machine