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| + | {{User:Temperal/testtemplate|page 10}} |
| − | {| style='background:lime;border-width: 5px;border-color: limegreen;border-style: outset;opacity: 0.8;width:840px;height:300px;position:relative;top:10px;'
| + | ==<span style="font-size:20px; color: blue;">Complex Numbers</span>== |
| − | |+ <span style="background:aqua; border:1px solid black; opacity: 0.6;font-size:30px;position:relative;bottom:8px;border-width: 5px;border-color:blue;border-style: groove;position:absolute;top:50px;right:155px;width:820px;height:40px;padding:5px;">The Problem Solver's Resource</span>
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| − | | style="background:lime; border:1px solid black;height:200px;padding:10px;" | {{User:Temperal/testtemplate|page 10}}
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| − | ==<span style="font-size:20px; color: blue;">Integrals</span>== | |
| − | This section will cover integrals and related topics, the Fundamental Theorem of Calculus, and some other advanced calculus topics.
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| − | The there are two types of integrals:
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| − | ===Indefinite Integral===
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| − | 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 integral of a constant is <math>0</math>.
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| − | ====Notation====
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| − | *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>.
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| − | *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.
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| − | ====Rules of Indefinite Integrals====
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| − | *<math>\int c\,dx=0</math> for a constant <math>c</math>.
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| − | *<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 \sin x\,dx = -\cos x + c</math>
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| − | *<math>\int \cos x\,dx = \sin x + c</math>
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| − | *<math>\int\tan x\,dx = \ln |\cos x| + c</math>
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| − | *<math>\int \sec x\,dx = \ln |\sec x + \tan x| + c</math>
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| − | *<math>\int \csc \, dx =\ln |\csc x + \cot x| + c</math>
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| − | *<math>\int \cot x\,dx = \ln |\sin x| + c</math>
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| | [[User:Temperal/The Problem Solver's Resource9|Back to page 9]] | [[User:Temperal/The Problem Solver's Resource11|Continue to page 11]] | | [[User:Temperal/The Problem Solver's Resource9|Back to page 9]] | [[User:Temperal/The Problem Solver's Resource11|Continue to page 11]] |
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