Entdecken Sie, was Sie lernen können.
Mit Videokursen für Beruf, Studium und Freizeit.
Entdecken Sie, was Sie lernen können.
Mit Videokursen für Beruf, Studium und Freizeit.
Online courses in this area are focused on conquering Calculus.
Students will be prepared to achieve success in any calculus course and tackle differential equations as well as any other advanced math, engineering and science courses.
These are the courses:
What Is A Derivative
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25:27 |
The Derivative defined as a Limit
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21:51 |
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Differentiation Formulas
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35:01 |
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Derivatives Of Trig Functions
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35:24 |
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The Chain Rule
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28:30 |
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Higher Derivatives
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14:08 |
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Related Rates
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30:36 |
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Curve Sketching using Derivatives
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25:16 |
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Intro to Integrals
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31:13 |
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Solving Integrals
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28:26 |
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Integration by Substitution
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42:50 |
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Calculating Volume with Integrals
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14:03 |
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Derivatives and Integrals of Exponential Functions
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23:57 |
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Derivatives of Logarithms
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24:01 |
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Integration by Parts
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25:23 |
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Integration by Trig Substitution
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18:51 |
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Improper Integrals
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09:25 |
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Evaluating Simple Limits with Substitution, Part 1
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18:00 |
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Evaluating Simple Limits with Substitution, Part 2
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12:59 |
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Evaluating Limits by Factoring, Part 1
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22:41 |
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Evaluating Limits by Factoring, Part 2
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23:02 |
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Limits involving Trig Functions
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20:54 |
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Tangent Lines, Velocity and Limits
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30:34 |
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Formal Definition of a Limit
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18:54 |
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Limit Laws
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17:21 |
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Using the Limit Laws
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19:33 |
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The Squeezing Theorem
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16:04 |
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Left Hand and Right Hand Limits, Part 1
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19:12 |
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Left Hand and Right Hand Limits, Part 2
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17:05 |
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Continuity
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11:43 |
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Basic Derivatives Part 1
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34:40 |
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Basic Derivatives Part 2
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31:19 |
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Product Rule of Differentiation Part 1
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25:51 |
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Product Rule of Differentiation Part 2
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28:15 |
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Quotient Rule of Differentiation Part 1
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21:15 |
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Quotient Rule of Differentiation Part 2
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24:39 |
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Derivatives of Trig Functions Part 1
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28:09 |
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Derivatives of Trig Functions Part 2
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23:29 |
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The Chain Rule - Part 1
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30:38 |
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The Chain Rule - Part 2
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30:46 |
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Higher Order Derivatives - Part 1
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31:35 |
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Related Rates - Part 3
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34:01 |
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Higher Order Derivatives - Part 2
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33:11 |
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Implicit Differentiation - Part 1
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32:52 |
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Implicit Differentiation - Part 2
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26:52 |
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Related Rates - Part 1
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35:58 |
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Related Rates - Part 2
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52:11 |
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Derivatives of the Natural Log Function
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24:29 |
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Derivatives of the Natural Exponential Function
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17:45 |
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Derivatives of General Exponential and Log Functions
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39:32 |
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What is an Integral
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36:13 |
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Fundamental Theorem of Calculus
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23:05 |
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Properties of the Integral
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19:45 |
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Integrating Polynomials, Part 1
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19:52 |
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Integrating Polynomials, Part 2
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12:48 |
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Integrating Polynomials, Part 3
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16:08 |
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Integration of Trig Functions
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25:06 |
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Integrating Trig Functions, Part 3
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21:18 |
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Integration by Substitution, Part 1
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19:28 |
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Integration by Substitution, Part 2
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20:15 |
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Integration by Substitution, Part 3
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16:56 |
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Integration by Substitution, Part 4
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16:45 |
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Logarithm as an Integral, Part 1
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15:00 |
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Logarithm as an Integral, Part 2
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12:12 |
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Logarithm as an Integral, Part 3
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16:13 |
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Integrals of Exponential Functions
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35:50 |
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Area Between Two Curves, Part 1
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11:17 |
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Area Between Two Curves, Part 2
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13:59 |
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Calculating Volume with Integrals using Cross-sections
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22:59 |
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Calculating Volume with the Disk Method, Part 1
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17:07 |
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Calculating Volume with the Disk Method, Part 2
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13:46 |
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Calculating Volume with the Disk Method, Part 3
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14:43 |
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Calculating Volume with the Washer Method, Part 1
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21:57 |
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Calculating Volume with the Washer Method, Part 2
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18:44 |
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Calculating Volume with the Washer Method, Part 3
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16:36 |
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Calculating Volume with the Shell Method, Part 1
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24:36 |
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Calculating Volume with the Shell Method, Part 2
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15:39 |
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Calculating Volume with the Shell Method, Part 3
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10:26 |
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Calculating the Surface Area of an Object
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25:42 |
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Integration by Parts, Part 1
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26:01 |
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Integration by Parts, Part 2
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19:59 |
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Integration by Parts, Part 3
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14:38 |
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Integration by Parts, Part 4
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13:32 |
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Integration by Parts, Part 5
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14:13 |
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Integration by Parts, Part 6
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12:55 |
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Integration by Parts, Part 7
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15:20 |
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Inverse Trig Functions
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54:20 |
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Derivatives of inverse Trig Functions
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25:10 |
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Hyperbolic Functions
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24:49 |
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Inverse Hyperbolic Functions
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20:38 |
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L'Hopitals Rule
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60:29 |
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Trigonometric Integrals
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34:45 |
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Integration by Partial Fractions
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62:01 |
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Arc Length
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38:42 |
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Area of a Surface of Revolution
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30:23 |
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Parametric Equations
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29:26 |
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Arc Length in Parametric Equations
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27:20 |
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Surface Area of Revolution in Parametric Equations
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28:36 |
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Polar Coordinates
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56:49 |
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Polar Equations
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21:48 |
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Area and Length in Polar Coordinates
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32:42 |
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Sequences
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57:09 |
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Series - Rendered Vegas
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52:15 |
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Integral Test
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47:40 |
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Comparison Tests
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43:10 |
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Alternating Series Test
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16:08 |
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Ratio and Root Test
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43:10 |
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3d Cartesian Coordinates
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17:57 |
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Intro to Vectors
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44:34 |
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The Dot Product
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37:30 |
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The Cross Product
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52:35 |
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Vector Valued Functions
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44:30 |
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Multivariable Functions and Partial Derivatives
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66:40 |
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Chain Rule for Partial Derivatives
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63:28 |
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The directional Derivative
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55:23 |
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The Gradient
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56:26 |
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Double Integrals
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78:54 |
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Double Integrals in Polar Coordinates
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94:09 |
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Triple Integrals
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84:34 |
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Triple Integrals Cylindrical
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69:24 |
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Triple Integrals Spherical
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61:53 |
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Divergence and Curl of Vector Fields
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64:13 |
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Line Integrals
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28:28 |
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Line Integrals in Vector Fields
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34:14 |
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Alternative Form of Line Integrals in Vector Fields
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45:31 |
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Fundamental Theorem of Line Integrals
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82:44 |
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Green's Theorem
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35:36 |
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Surface Integrals
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36:42 |
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Flux Integrals
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34:45 |
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Stokes Theorem
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33:18 |
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Divergence Theorem
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28:43 |
Jason Gibson is the founder of MathTutorDVD.com and the teacher in all of the videos.
He also released DVDs in Physics and Basic Math and offers his courses online. His ongoing project is a comprehensive Chemistry series and an Engineering Circuit Analysis course.
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