Difference between revisions of "Math 22 Exponential and Logarithmic Integrals"

Revision as of 07:43, 15 August 2020

Integrals of Exponential Functions

 Let  $u$  be a differentiable function of  $x$ , then
  $\int e^{x}dx=e^{x}+C$ 
 
  $\int e^{u}{\frac {du}{dx}}dx=\int e^{u}du=e^{u}+C$

Exercises 1 Find the indefinite integral

1) $\int 3e^{x}dx$

Solution:
$\int 3e^{x}dx=3\int e^{x}=3e^{x}+C$

2) $\int 3e^{3x}dx$

Solution:
Let $u=3x$ , so $du=3dx$ , so $dx={\frac {du}{3}}$
Consider $\int 3e^{3x}dx=\int 3e^{u}{\frac {du}{3}}=\int e^{u}du=e^{u}+C=e^{3x}+C$

3) $\int (3e^{x}-6x)dx$

Solution:
$\int (3e^{x}-6x)dx=\int (3e^{x})dx-\int 6xdx=3e^{x}-3x^{2}+C$

4) $\int e^{2x-5}dx$

Solution:
Let $u=2x-5$ , so $du=2dx$ , so $dx={\frac {du}{2}}$
Consider $\int e^{2x-5}dx=\int e^{u}{\frac {du}{2}}={\frac {1}{2}}\int e^{u}du={\frac {1}{2}}e^{u}+C={\frac {1}{2}}e^{2x-5}+C$

Using the Log Rule

 Let  $u$  be a differentiable function of  $x$ , then
  $\int {\frac {1}{x}}=\ln |x|+C$ 
 
  $\int {\frac {1}{u}}{\frac {du}{dx}}dx=\int {\frac {1}{u}}du=\ln |u|+C$

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This page were made by Tri Phan

@@ Line 41: / Line 41: @@
 ==Using the Log Rule==
    Let <math>u</math> be a differentiable function of <math>x</math>, then
-   <math>\int\frac{1}{x}=\ln\abs{x}+C</math>
+   <math>\int\frac{1}{x}=\ln|x|+C</math>
-   <math>\int\frac{1}{u}\frac{du}{dx}dx=\int\frac{1}{u}du=\ln\abc{u}+C</math>
+   <math>\int\frac{1}{u}\frac{du}{dx}dx=\int\frac{1}{u}du=\ln|u|+C</math>
 [[Math_22| '''Return to Topics Page''']]
 '''This page were made by [[Contributors|Tri Phan]]'''

Difference between revisions of "Math 22 Exponential and Logarithmic Integrals"

Revision as of 07:43, 15 August 2020

Integrals of Exponential Functions

Using the Log Rule

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