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Limit of a function

From Simple English Wikipedia, the free encyclopedia

In calculus, a branch of mathematics, the limit of a function is the behavior of a certain function near a selected input value for that function. Limits are one of the main calculus topics, along with derivatives, integration, and differential equations.

Definition of the limit

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The definition of the limit is as follows:

If the function approaches a number as approaches a number , then

The notation for the limit above is read as "The limit of as approaches is ", or alternatively, as (reads " tends to as tends to "[1]). Informally, this means that we can make as close to as possible—by making sufficiently close to from both sides (without making equal to ).[2]

Imagine we have a function such as . When , is undefined, because and division by zero is undefined. On the Cartesian coordinate system, the function would have a vertical asymptote at . In limit notation, this would be written as:

The limit of as approaches is , which is denoted by

Right and left limits

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Consider the function , we can get as close to in the -values as we want, so long as we do not make equal to . For instance, we could make x=.00000001 or -.00000001, but never 0. Therefore, we can get as close as we want to or depending on if we approach 0 from the right side or the left side.[3] The left limit is the limit the function tends to if we only approach the target x-value from the left, for instance in the case of when getting close to the 0 x-value from the left side, by using x-values that are smaller than 0, the limit would approach . In the same way, the right limit is the limit the function tends to if we only approach the target x-value from the right, for instance in the case of when getting close to the 0 x-value from the right side, by using x-values that are larger than 0, the limit would approach .

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References

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  1. "List of Calculus and Analysis Symbols". Math Vault. 2020-05-11. Retrieved 2020-09-14.
  2. "Calculus I - The Limit". tutorial.math.lamar.edu. Retrieved 2020-09-14.
  3. "2.2: Limit of a Function and Limit Laws". Mathematics LibreTexts. 2018-04-11. Retrieved 2020-09-14.