Difference between revisions of "Calculus"

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The discovery of the branch of [[mathematics]] known as '''calculus''' was motivated by two classical problems: how to find the [[slope]] of the [[tangent line]] to a curve at a [[point]] and how to find the [[area]] bounded by a curve. What is surprising is that these two problems are fundamentally connected and, together with the notion of limits, can be used to analyse instantaneous [[rate]]s of change, accumulations of change, [[volume]]s of irregular [[solid]]s, and much more.
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The discovery of the branch of [[mathematics]] known as '''calculus''' was motivated by two classical problems: how to find the [[slope]] of the [[tangent line]] to a curve at a [[point]] and how to find the [[area]] bounded by a curve. What is surprising is that these two problems are fundamentally connected and, together with the notion of limits, can be used to analyze instantaneous [[rate]]s of change, accumulations of change, [[volume]]s of irregular [[solid]]s, and many other types of problems in mathematics.
  
[[Limit]]s are heavily used in calculus.  The formal notion of a limit is what "differentiates" (hehe, pun) calculus from precalculus mathematics.
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[[Limit]]s are heavily used in calculus.  The formal notion of a limit is what differentiates calculus from precalculus mathematics.  
  
==History==
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The subject dealing with the rigorous foundations of calculus is called [[analysis]], specifically [[real analysis]].
Calculus was compiled into one mathematical science by [[Isaac Newton]] in 1665 and 1666. (Before this, some individual calculus ideas had been discovered by earlier mathematicians). However, [[Gottfried Leibniz]], whom did the same work independently a few years later, published his work earlier than Newton. This sparked an argument over who first discovered calculus. It is now known that Newton did discover calculus first, but Leibniz invented the majority of the notation we use today.  
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== Calculus in Math Competitions ==
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The use of calculus in pre-collegiate [[mathematics competitions]] is generally frowned upon. However, many [[Physics competitions | physics competitions]] require it, as does the [[William Lowell Putnam Mathematical Competition|William Lowell Putnam competition]].
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There are a number of high school math contests that have a calculus round, or require calculus. These include:
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- The Harvard-MIT Invitational Tournament (HMIT)
  
== Important Topics ==
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- The Johns-Hopkins Mathematics Tournament
The following topics provide a good sample of the subject of calculus:
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* [[Fundamental Theorem of Calculus]]
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- The Rocket City Math League
* [[Chain Rule]]
 
* [[Implicit differentiation]]
 
  
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- The Rice University Mathematics Tournament
  
== Calculus in Math Competitions ==
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- The Chandler-Gilbert Community College Excellence in Mathematics High School Competition, precalculus and above division, team competition, in Arizona
The use of calculus in pre-collegiate [[mathematics competitions]] is generally frowned upon. However, many [[Physics competitions | physics competitions]] require it, as does the [[William Lowell Putnam Mathematical Competition|William Lowell Putnam competition]].
 
  
None of the competitions leading up to the [[IMO]] require it, nor does the [[ARML]]. Online high school competitions, such as the [[iTest]], which occasionally require it, but generally not.
 
  
== Additional Note ==
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None of the [[AMC]] competitions leading up to the [[IMO]] require it, nor does the [[ARML]], even though calculus solutions are still permitted. Online high school competitions, such as the [[iTest]], will occasionally require it, but generally not.
The subject dealing with the rigorous foundations of calculus is called [[analysis]], specifically [[real analysis]].
 
  
== See also ==
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== Topics ==
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* [[Limit]]
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* [[Continuity]]
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* [[L'Hôpital's Rule]]
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* [[Rolle's Theorem]]
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* [[Squeeze Theorem]]
 
* [[Derivative]]
 
* [[Derivative]]
* [[Limit]]
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* [[Product Rule]]
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* [[Chain Rule]]
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* [[Quotient Rule]]
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* [[Optimization]]
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* [[Differential equation]]
 
* [[Integral]] (It is suggested that you look at derivative before this)
 
* [[Integral]] (It is suggested that you look at derivative before this)
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* [[Implicit differentiation]]
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* [[Fundamental Theorem of Calculus]]
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* [[Taylor series]]
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* [[Taylor polynomial]]
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[[Category:Calculus]]

Latest revision as of 18:47, 30 June 2024

The discovery of the branch of mathematics known as calculus was motivated by two classical problems: how to find the slope of the tangent line to a curve at a point and how to find the area bounded by a curve. What is surprising is that these two problems are fundamentally connected and, together with the notion of limits, can be used to analyze instantaneous rates of change, accumulations of change, volumes of irregular solids, and many other types of problems in mathematics.

Limits are heavily used in calculus. The formal notion of a limit is what differentiates calculus from precalculus mathematics.

The subject dealing with the rigorous foundations of calculus is called analysis, specifically real analysis.

Calculus in Math Competitions

The use of calculus in pre-collegiate mathematics competitions is generally frowned upon. However, many physics competitions require it, as does the William Lowell Putnam competition.

There are a number of high school math contests that have a calculus round, or require calculus. These include:

- The Harvard-MIT Invitational Tournament (HMIT)

- The Johns-Hopkins Mathematics Tournament

- The Rocket City Math League

- The Rice University Mathematics Tournament

- The Chandler-Gilbert Community College Excellence in Mathematics High School Competition, precalculus and above division, team competition, in Arizona


None of the AMC competitions leading up to the IMO require it, nor does the ARML, even though calculus solutions are still permitted. Online high school competitions, such as the iTest, will occasionally require it, but generally not.

Topics