(11 intermediate revisions by 6 users not shown)
Line 1: Line 1:
 +
[[Category:Formulas]]
 +
[[Category:integral]]
 +
 +
<center><font size= 4>
 +
'''[[Collective_Table_of_Formulas|Collective Table of Formulas]]'''
 +
</font size>
 +
 +
'''Definite Integrals'''
 +
 +
click [[Collective_Table_of_Formulas|here]] for [[Collective_Table_of_Formulas|more formulas]]
 +
 +
</center>
 +
 +
----
 +
 
{|
 
{|
 
|-
 
|-
Line 11: Line 26:
 
|<math> \int_{a}^{\infty} d x = \lim_{n \to \infty} \int\limits_{a}^{b} f ( x ) d x </math>
 
|<math> \int_{a}^{\infty} d x = \lim_{n \to \infty} \int\limits_{a}^{b} f ( x ) d x </math>
 
|-
 
|-
|<math> \int_{-\infty}^{\infty} f ( x ) d x = \lim_{a \to - \infty \ b \to \infty} \int\limits_{a}^{b} f ( x ) d x</math>
+
|<math> \int_{-\infty}^{\infty} f ( x ) d x = \lim_{a \to - \infty \atop b \to \infty} \int\limits_{a}^{b} f ( x ) d x</math>
 
|-
 
|-
 
|<math> \int_{a}^{b} f ( x ) d x = \lim_{\epsilon \to \infty} \int\limits_{a}^{b - \epsilon} f ( x ) d x</math>
 
|<math> \int_{a}^{b} f ( x ) d x = \lim_{\epsilon \to \infty} \int\limits_{a}^{b - \epsilon} f ( x ) d x</math>
Line 29: Line 44:
 
|<math> \int_{a}^{b} f ( x ) d x = \int_{a}^{c} f ( x ) d x + \int_{c}^{b} f ( x ) d x </math>
 
|<math> \int_{a}^{b} f ( x ) d x = \int_{a}^{c} f ( x ) d x + \int_{c}^{b} f ( x ) d x </math>
 
|-
 
|-
|<math> \int_{a}^{b} f ( x ) d x = ( b - a ) f ( c ) \qquad c \ is \ a \ number \ between \ a \ and \ b \ as \ long \ as \ f ( x ) \ is \ continous \ between \ a \ and \ b </math>
+
|<math> \int_{a}^{b} f ( x ) d x = ( b - a ) f ( c ), \quad \text{where } c \text{ is a number between } a \text{ and } b \text{ as long as } f(x) \text{ is continous between } a \text{ and } b. </math>
 
|-
 
|-
|<math> \int_{a}^{b} f ( x ) g ( x ) d x = f ( c ) \int\limits_{a}^{b} g ( x ) d x \qquad c \ is \ a \ number \ between \ a \ and \ b \ as \ long \ as \ f ( x ) \ is \ continous \ between \ a \ and \ b </math>
+
|<math> \int_{a}^{b} f ( x ) g ( x ) d x = f ( c ) \int\limits_{a}^{b} g ( x ) d x, </math>
 
|-
 
|-
|<math> \ and \ g ( x ) \ge 0 </math>
+
|<math> \text{where } c \text{ is a number between } a \text{ and } b \text{ as long as } f(x) \text{ is continous between } a \text{ and } b, \text{ and } g(x) \ge 0 </math>
 
|-
 
|-
 
! style="background-color: rgb(238, 238, 238); background-image: none; background-repeat: repeat; background-attachment: scroll; background-position: 0% 0%; -moz-background-size: auto auto; -moz-background-clip: -moz-initial; -moz-background-origin: -moz-initial; -moz-background-inline-policy: -moz-initial; font-size: 110%;" colspan="2" | Leibnitz rule for derivation
 
! style="background-color: rgb(238, 238, 238); background-image: none; background-repeat: repeat; background-attachment: scroll; background-position: 0% 0%; -moz-background-size: auto auto; -moz-background-clip: -moz-initial; -moz-background-origin: -moz-initial; -moz-background-inline-policy: -moz-initial; font-size: 110%;" colspan="2" | Leibnitz rule for derivation
Line 43: Line 58:
 
|<math>\int_{a}^{\infty} \frac {d x}{x^2 + a^2} = \frac{\pi}{2a}</math>
 
|<math>\int_{a}^{\infty} \frac {d x}{x^2 + a^2} = \frac{\pi}{2a}</math>
 
|-
 
|-
|<math>\int_{0}^{\infty} \frac{x^{p-1} d x}{1 + x} = \frac{\pi}{\sin p \pi} \qquad 0 \ < \ p < \ 1</math>
+
|<math>\int_{0}^{\infty} \frac{x^{p-1} d x}{1 + x} = \frac{\pi}{\sin p \pi} \qquad 0<p<1</math>
 
|-
 
|-
|<math>\int_{0}^{\infty} \frac{x^m d x}{x^n + a^n} = \frac{\pi a^{m+1-n}}{n \sin [ \frac{( m + 1 ) \pi}{n} ] } \qquad 0 \ < \ m+1 \ < \ n</math>
+
|<math>\int_{0}^{\infty} \frac{x^m d x}{x^n + a^n} = \frac{\pi a^{m+1-n}}{n \sin [ \frac{( m + 1 ) \pi}{n} ] } \qquad 0<m+1<n</math>
 
|-
 
|-
 
|<math>\int_{0}^{\infty} \frac{x^m d x}{1 + 2 x \cos \beta + x^2} = \frac{\pi}{\sin m \pi} \frac{\sin m \beta}{\sin \beta}</math>
 
|<math>\int_{0}^{\infty} \frac{x^m d x}{1 + 2 x \cos \beta + x^2} = \frac{\pi}{\sin m \pi} \frac{\sin m \beta}{\sin \beta}</math>
Line 55: Line 70:
 
|<math> \int_{0}^{a} x^m ( a^n - x^n )^p d x = \frac{a^{m+1+np} \Gamma [ \frac{m+1}{n} ] \Gamma ( p + 1 )}{n \Gamma [ \frac{m+1}{n} + p + 1 ]}</math>
 
|<math> \int_{0}^{a} x^m ( a^n - x^n )^p d x = \frac{a^{m+1+np} \Gamma [ \frac{m+1}{n} ] \Gamma ( p + 1 )}{n \Gamma [ \frac{m+1}{n} + p + 1 ]}</math>
 
|-
 
|-
|<math> \int_{0}^{a} \frac{x^m d x}{( a^n + x^n )^r} = \frac{ (-1)^{r-1} \pi a^{m+1-nr} \Gamma [ \frac{m+1}{n} ] }{n \sin [ \frac{(m+1)\pi}{n} ] ( r - 1 ) ! \Gamma [ \frac{m+1}{n} - r + 1]} \qquad 0 \ < \ m+1 \ < \ nr</math>
+
|<math> \int_{0}^{a} \frac{x^m d x}{( a^n + x^n )^r} = \frac{ (-1)^{r-1} \pi a^{m+1-nr} \Gamma [ \frac{m+1}{n} ] }{n \sin [ \frac{(m+1)\pi}{n} ] ( r - 1 ) ! \Gamma [ \frac{m+1}{n} - r + 1]} \qquad 0<m+1<nr</math>
 +
|-
 +
|-
 +
! style="background-color: rgb(238, 238, 238); background-image: none; background-repeat: repeat; background-attachment: scroll; background-position: 0% 0%; -moz-background-size: auto auto; -moz-background-clip: -moz-initial; -moz-background-origin: -moz-initial; -moz-background-inline-policy: -moz-initial; font-size: 110%;" colspan="2" | Definite Integral containing circular functions
 +
|-
 +
|<math> \int_{0}^{\pi} \sin mx \sin nx dx = \begin{cases} 0, & m=n \\ \frac{\pi}{2}, & m \neq n \end{cases}.</math>
 +
|-
 +
|<math> \int_{0}^{\pi} \cos mx \cos nx dx = \begin{cases} 0, & m=n \\ \frac{\pi}{2}, & m \neq n \end{cases}.</math>
 +
|-
 +
|<math> \int_{0}^{\pi} \sin mx \cos nx dx = \begin{cases} 0, & \text{if m+n is an odd number}\\ \frac{2m}{m^2-n^2}, & \text{if m+n is an even number} \end{cases} . </math>
 +
|-
 +
|<math> \int_{0}^{\frac{\pi}{2}} \sin^2 x d x = \int_{0}^{\frac{\pi}{2}} \cos^2 x d x = \frac{\pi}{4}</math>
 +
|-
 +
|}
 +
----
 +
[[Collective_Table_of_Formulas|Back to Collective Table of Formulas]]

Latest revision as of 11:21, 24 February 2015


Collective Table of Formulas

Definite Integrals

click here for more formulas


Table of Definite Integrals
Definition of Definite Integral
$ \int_{a}^{b} f ( x ) d x = \lim_{n \to \infty} { f ( a ) \Delta x + f ( a + \Delta x ) \Delta x + f ( a + 2 \Delta x ) + \cdot \cdot \cdot + f ( a + ( n - 1 ) \Delta x ) \Delta x } $
$ \int_{a}^{b} f ( x ) d x = \int_{a}^{b} \frac{d}{dx} g ( x ) d x = g ( x ) |_{a}^{b} = g ( b ) - g ( a ) $
$ \int_{a}^{\infty} d x = \lim_{n \to \infty} \int\limits_{a}^{b} f ( x ) d x $
$ \int_{-\infty}^{\infty} f ( x ) d x = \lim_{a \to - \infty \atop b \to \infty} \int\limits_{a}^{b} f ( x ) d x $
$ \int_{a}^{b} f ( x ) d x = \lim_{\epsilon \to \infty} \int\limits_{a}^{b - \epsilon} f ( x ) d x $
$ \int_{a}^{b} f ( x ) d x = \lim_{\epsilon \to \infty} \int\limits_{a + \epsilon}^{b} f ( x ) d x $
General Rules for Definite Integral
$ \int\limits_{a}^{b} { f ( x ) \pm g ( x ) \pm h ( x ) \pm \cdot \cdot \cdot } d x = \int\limits_{a}^{b} f ( x ) d x \pm \int\limits_{a}^{b} g ( x ) d x \pm \int\limits_{a}^{b} h ( x ) d x \pm \cdot \cdot \cdot $
$ \int_{a}^{b} c f ( x ) d x = c \int_{a}^{b} f ( x ) d x $
$ \int_{a}^{a} f ( x ) d x = 0 $
$ \int_{a}^{b} f ( x ) d x = - \int_{b}^{a} f ( x ) d x $
$ \int_{a}^{b} f ( x ) d x = \int_{a}^{c} f ( x ) d x + \int_{c}^{b} f ( x ) d x $
$ \int_{a}^{b} f ( x ) d x = ( b - a ) f ( c ), \quad \text{where } c \text{ is a number between } a \text{ and } b \text{ as long as } f(x) \text{ is continous between } a \text{ and } b. $
$ \int_{a}^{b} f ( x ) g ( x ) d x = f ( c ) \int\limits_{a}^{b} g ( x ) d x, $
$ \text{where } c \text{ is a number between } a \text{ and } b \text{ as long as } f(x) \text{ is continous between } a \text{ and } b, \text{ and } g(x) \ge 0 $
Leibnitz rule for derivation
$ \frac{d}{d \alpha} \int_{\Phi_1 ( \alpha )}^{\Phi_2 ( \alpha ) } F ( x , \alpha ) d x = \int_{\Phi_1 ( \alpha )}^{\Phi_2 ( \alpha ) } \frac{\partial F}{\partial \alpha} d x + F ( \Phi_2 , \alpha ) \frac{d \Phi_1}{d \alpha} - F ( \Phi_1 , \alpha ) \frac{d \Phi_2}{d \alpha} $
Definite Integral containing rational and irrational expressions
$ \int_{a}^{\infty} \frac {d x}{x^2 + a^2} = \frac{\pi}{2a} $
$ \int_{0}^{\infty} \frac{x^{p-1} d x}{1 + x} = \frac{\pi}{\sin p \pi} \qquad 0<p<1 $
$ \int_{0}^{\infty} \frac{x^m d x}{x^n + a^n} = \frac{\pi a^{m+1-n}}{n \sin [ \frac{( m + 1 ) \pi}{n} ] } \qquad 0<m+1<n $
$ \int_{0}^{\infty} \frac{x^m d x}{1 + 2 x \cos \beta + x^2} = \frac{\pi}{\sin m \pi} \frac{\sin m \beta}{\sin \beta} $
$ \int_{0}^{a} \frac{dx}{\sqrt{a^2 - x^2}} = \frac {\pi}{2} $
$ \int_{0}^{a} \sqrt{a^2 - x^2} d x = \frac{\pi a^2}{4} $
$ \int_{0}^{a} x^m ( a^n - x^n )^p d x = \frac{a^{m+1+np} \Gamma [ \frac{m+1}{n} ] \Gamma ( p + 1 )}{n \Gamma [ \frac{m+1}{n} + p + 1 ]} $
$ \int_{0}^{a} \frac{x^m d x}{( a^n + x^n )^r} = \frac{ (-1)^{r-1} \pi a^{m+1-nr} \Gamma [ \frac{m+1}{n} ] }{n \sin [ \frac{(m+1)\pi}{n} ] ( r - 1 ) ! \Gamma [ \frac{m+1}{n} - r + 1]} \qquad 0<m+1<nr $
Definite Integral containing circular functions
$ \int_{0}^{\pi} \sin mx \sin nx dx = \begin{cases} 0, & m=n \\ \frac{\pi}{2}, & m \neq n \end{cases}. $
$ \int_{0}^{\pi} \cos mx \cos nx dx = \begin{cases} 0, & m=n \\ \frac{\pi}{2}, & m \neq n \end{cases}. $
$ \int_{0}^{\pi} \sin mx \cos nx dx = \begin{cases} 0, & \text{if m+n is an odd number}\\ \frac{2m}{m^2-n^2}, & \text{if m+n is an even number} \end{cases} . $
$ \int_{0}^{\frac{\pi}{2}} \sin^2 x d x = \int_{0}^{\frac{\pi}{2}} \cos^2 x d x = \frac{\pi}{4} $

Back to Collective Table of Formulas

Alumni Liaison

Correspondence Chess Grandmaster and Purdue Alumni

Prof. Dan Fleetwood