Difference between revisions of "Integral"
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The '''integral''' is one of the two base concepts of [[calculus]], along with the [[derivative]]. | The '''integral''' is one of the two base concepts of [[calculus]], along with the [[derivative]]. | ||
− | + | ==Beginner Level== | |
− | ==Indefinite Integral== | + | In introductory, high-school level texts, the integral is often presented in two parts, the '''indefinite integral''' and '''definite integral'''. Although this approach lacks mathematical formality, it has the advantage of being easy to grasp and convenient to use in most of its applications, especially in [[Physics]]. |
+ | |||
+ | ===Indefinite Integral=== | ||
The indefinite integral, or antiderivative, is a partial [[inverse]] of the [[derivative]]. That is, if the derivative of a [[function ]]<math>f(x)</math> is written as <math>f'(x)</math>, then the indefinite integral of <math>f'(x)</math> is <math>f(x)+c</math>, where <math>c</math> is a [[real]] [[constant]]. This is because the derivative of a constant is <math>0</math>. | The indefinite integral, or antiderivative, is a partial [[inverse]] of the [[derivative]]. That is, if the derivative of a [[function ]]<math>f(x)</math> is written as <math>f'(x)</math>, then the indefinite integral of <math>f'(x)</math> is <math>f(x)+c</math>, where <math>c</math> is a [[real]] [[constant]]. This is because the derivative of a constant is <math>0</math>. | ||
− | ===Notation=== | + | ====Notation==== |
*The integral of a function <math>f(x)</math> is written as <math>\int f(x)\,dx</math>, where the <math>dx</math> means that the function is being integrated in relation to <math>x</math>. | *The integral of a function <math>f(x)</math> is written as <math>\int f(x)\,dx</math>, where the <math>dx</math> means that the function is being integrated in relation to <math>x</math>. | ||
*Often, to save space, the integral of <math>f(x)</math> is written as <math>F(x)</math>, the integral of <math>h(x)</math> as <math>H(x)</math>, etc. | *Often, to save space, the integral of <math>f(x)</math> is written as <math>F(x)</math>, the integral of <math>h(x)</math> as <math>H(x)</math>, etc. | ||
− | ===Rules of Indefinite Integrals=== | + | ====Rules of Indefinite Integrals==== |
*<math>\int c\,dx=cx+C</math> for a constant <math>c</math> and another constant <math>C</math>. | *<math>\int c\,dx=cx+C</math> for a constant <math>c</math> and another constant <math>C</math>. | ||
*<math>\int f(x)+g(x)...+z(x)\,dx=\int f(x)\,dx+\int g(x)\,dx...+\int z(x)\,dx</math> | *<math>\int f(x)+g(x)...+z(x)\,dx=\int f(x)\,dx+\int g(x)\,dx...+\int z(x)\,dx</math> | ||
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*<math>\int cf(x)\, dx=c\int f(x)\,dx</math> | *<math>\int cf(x)\, dx=c\int f(x)\,dx</math> | ||
− | ==Definite Integral== | + | ===Definite Integral=== |
The definite integral is also the [[area]] under a [[curve]] between two [[points]] <math>a</math> and <math>b</math>. For example, the area under the curve <math>f(x)=\sin x</math> between <math>-\frac{\pi}{2}</math> and <math>\frac{\pi}{2}</math> is <math>0</math>, as are below the x-axis is taken as negative area. | The definite integral is also the [[area]] under a [[curve]] between two [[points]] <math>a</math> and <math>b</math>. For example, the area under the curve <math>f(x)=\sin x</math> between <math>-\frac{\pi}{2}</math> and <math>\frac{\pi}{2}</math> is <math>0</math>, as are below the x-axis is taken as negative area. | ||
− | ===Definition and Notation=== | + | ====Definition and Notation==== |
*The definite integral of a function between <math>a</math> and <math>b</math> is written as <math>\int^{b}_{a}f(x)\,dx</math>. | *The definite integral of a function between <math>a</math> and <math>b</math> is written as <math>\int^{b}_{a}f(x)\,dx</math>. | ||
*<math>\int^{b}_{a}f(x)\,dx=F(b)-F(a)</math>, where <math>F(x)</math> is the antiderivative of <math>f(x)</math>. This is also notated <math>\int f(x)\,dx \eval^{b}_{a}</math>, read as "The integral of <math>f(x)</math> evaluated at <math>a</math> and <math>b</math>." Note that this means in definite integration, one need not add a constant, as the constants from the functions cancel out. | *<math>\int^{b}_{a}f(x)\,dx=F(b)-F(a)</math>, where <math>F(x)</math> is the antiderivative of <math>f(x)</math>. This is also notated <math>\int f(x)\,dx \eval^{b}_{a}</math>, read as "The integral of <math>f(x)</math> evaluated at <math>a</math> and <math>b</math>." Note that this means in definite integration, one need not add a constant, as the constants from the functions cancel out. | ||
− | ===Rules of Definite Integrals=== | + | ====Rules of Definite Integrals==== |
*<math>\int^{b}_{a}f(x)\,dx=\int^{b}_{c}f(x)\,dx+\int^{c}_{a}f(x)\,dx</math> for any <math>c</math>. | *<math>\int^{b}_{a}f(x)\,dx=\int^{b}_{c}f(x)\,dx+\int^{c}_{a}f(x)\,dx</math> for any <math>c</math>. | ||
− | ==Other | + | ==Formal Use== |
+ | The notion of an '''integral''' is one of the key ideas in severel areas of higher mathematics including [[analysis]] and [[topology]]. The integral can be defined in several ways which can be applied to several different settings. However, the most common definition, and the one which most closely resembles the the 'definite integral' is the '''Reimann Integral''' | ||
+ | |||
+ | ===Reimann Integral=== | ||
+ | Let <math>f:[a,b]\rightarrow\mathbb{R}</math> | ||
+ | |||
+ | Let <math>L\in\mathbb{R}</math> | ||
+ | |||
+ | We say that <math>f</math> is '''Reimann Integrable''' on <math>[a,b]</math> if and only if | ||
+ | |||
+ | <math>\forall \epsilon>0\:\exists\delta>0</math> such that if <math>\mathcal{\dot{P}}</math> is a [[Partition|tagged partition]] on <math>[a,b]</math> with <math>\|\mathcal{\dot{P}}\|<\delta</math> <math>\implies</math> <math>|S(f,\mathcal{\dot{P}}-L|<\epsilon</math>, where <math>S(f,\mathcal{\dot{P}}</math> is the [[Reimann sum]] of <math>f</math> with respect to <math>\mathcal{\dot{P}}</math> | ||
+ | |||
+ | <math>L</math> is said to be the '''integral''' of <math>f</math> on <math>[a,b]</math> and is written as <math>L=\int_a^b f(x)dx=\int_a^b f</math> | ||
+ | {{image}} | ||
+ | |||
+ | Another integral commonly used in introductory texts is the '''Darboux Integral''' (which is often called the Reimann Integral) | ||
+ | ===Darboux Integral=== | ||
+ | Let <math>f:[a,b]\rightarrow\mathbb{R}</math> | ||
+ | |||
+ | We say that <math>f</math> is '''Darboux Integrable''' on <math>[a,b]</math> if and only if <math>\inf_{\mathcal{P}}U(f,\mathcal{P})=\sup_{\mathcal{P}}L(f,\mathcal{P})</math>, where <math>L(f,\mathcal{P})</math> and <math>U(f,\mathcal{P})</math> are respectively the [[Reimann sum|lower sum]] and [[Reimann sum|upper sum]] of <math>f</math> with respect to [[partition]] <math>\mathcal{P}</math> | ||
+ | |||
+ | The notation used for the Darboux integral is the same as that for the Reimann integral. | ||
+ | {{image}} | ||
+ | |||
+ | ===Other Definitions=== | ||
+ | Other important definitions of integration include the [[Reimann-Stieltjes integral]], [[Lebesgue integral]], [[Henstock-Kurzweil integral]] etc. | ||
+ | |||
+ | ==Disambiguation== | ||
*The word ''integral'' is the adjectival form of the noun "[[integer]]." Thus, <math>3</math> is integral while <math>\pi</math> is not. | *The word ''integral'' is the adjectival form of the noun "[[integer]]." Thus, <math>3</math> is integral while <math>\pi</math> is not. | ||
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*[[Derivative]] | *[[Derivative]] | ||
*[[Function]] | *[[Function]] | ||
− | *[[ | + | *[[Measure theory]] |
− | |||
[[Category:Calculus]] | [[Category:Calculus]] | ||
[[Category:Definition]] | [[Category:Definition]] |
Revision as of 23:55, 15 February 2008
The integral is one of the two base concepts of calculus, along with the derivative.
Contents
[hide]Beginner Level
In introductory, high-school level texts, the integral is often presented in two parts, the indefinite integral and definite integral. Although this approach lacks mathematical formality, it has the advantage of being easy to grasp and convenient to use in most of its applications, especially in Physics.
Indefinite Integral
The indefinite integral, or antiderivative, is a partial inverse of the derivative. That is, if the derivative of a function is written as , then the indefinite integral of is , where is a real constant. This is because the derivative of a constant is .
Notation
- The integral of a function is written as , where the means that the function is being integrated in relation to .
- Often, to save space, the integral of is written as , the integral of as , etc.
Rules of Indefinite Integrals
- for a constant and another constant .
- ,
Definite Integral
The definite integral is also the area under a curve between two points and . For example, the area under the curve between and is , as are below the x-axis is taken as negative area.
Definition and Notation
- The definite integral of a function between and is written as .
- , where is the antiderivative of . This is also notated $\int f(x)\,dx \eval^{b}_{a}$ (Error compiling LaTeX. Unknown error_msg), read as "The integral of evaluated at and ." Note that this means in definite integration, one need not add a constant, as the constants from the functions cancel out.
Rules of Definite Integrals
- for any .
Formal Use
The notion of an integral is one of the key ideas in severel areas of higher mathematics including analysis and topology. The integral can be defined in several ways which can be applied to several different settings. However, the most common definition, and the one which most closely resembles the the 'definite integral' is the Reimann Integral
Reimann Integral
Let
Let
We say that is Reimann Integrable on if and only if
such that if is a tagged partition on with , where is the Reimann sum of with respect to
is said to be the integral of on and is written as
An image is supposed to go here. You can help us out by creating one and editing it in. Thanks.
Another integral commonly used in introductory texts is the Darboux Integral (which is often called the Reimann Integral)
Darboux Integral
Let
We say that is Darboux Integrable on if and only if , where and are respectively the lower sum and upper sum of with respect to partition
The notation used for the Darboux integral is the same as that for the Reimann integral.
An image is supposed to go here. You can help us out by creating one and editing it in. Thanks.
Other Definitions
Other important definitions of integration include the Reimann-Stieltjes integral, Lebesgue integral, Henstock-Kurzweil integral etc.
Disambiguation
- The word integral is the adjectival form of the noun "integer." Thus, is integral while is not.