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 | | durée | vues | |
 | Newton's Method - How it Can FAIL - More Examples Part 3 of 3 | 3:48 | 21 350 | |
 | Newton's Method - More Examples Part 2 of 3 | 5:14 | 40 954 | |
 | Newton's Method - More Examples Part 1 of 3 | 6:54 | 70 573 | |
 | Tangent Line Approximation / Linearization - Ex 1 | 4:49 | 38 907 | |
 | Implicit Differentiation - Basic Example 3 / 3 | 3:40 | 8 580 | |
 | Implicit Differentiation - Basic Example 2 / 3 | 2:27 | 9 666 | |
 | Implicit Differentiation - Basic Example 1 / 3 | 2:11 | 14 354 | |
 | Derivatives of Logarithm Functions - 2 of 2 | 4:46 | 11 364 | |
 | Derivatives of Logarithm Functions - 1 of 2 | 2:33 | 14 137 | |
 | Derivatives of Exponential Functions | 4:36 | 55 548 | |
 | Deriving the Integration by Parts Formula - Easy! | 5:37 | 25 248 | |
 | Derivative Using the Definition, Example 2 | 5:12 | 45 368 | |
 | A Proof that 0 = 1 (Can You Spot the Mistake?) | 3:33 | 150 847 | |
 | Continuity - Piecewise Function Example | 6:51 | 95 819 | |
 | The Limit Definition of Continuity - Making Sense of the Definition | 7:25 | 41 912 | |
 | The Squeeze Theorem for Limits, Example 3 | 5:44 | 59 124 | |
 | The Squeeze Theorem for Limits, Example 2 | 2:43 | 65 100 | |
 | One Sided Limits, Example 3 | 2:44 | 28 375 | |
 | One Sided Limits, Example 2 | 2:54 | 30 845 | |
 | One Sided Limits, Example 1 | 6:56 | 77 710 | |
 | Limit Laws to Evaluate a Limit , Example 3 | 2:45 | 24 681 | |
 | Limit Laws to Evaluate a Limit , Example 2 | 1:40 | 32 303 | |
 | Limit Laws to Evaluate a Limit , Example 1 | 3:10 | 56 275 | |
 | Taylor / Maclaurin Series Expansion - Proof of the Formula | 13:45 | 63 693 | |
 | Hydrostatic Force - Complete Example #2, Part 2 of 2 | 12:80 | 22 265 | |
 | Hydrostatic Force - Complete Example #2, Part 1 of 2 | 8:56 | 44 465 | |
 | Hydrostatic Force - Complete Example #1 | 15:52 | 81 979 | |
 | Hydrostatic Force - Basic Idea / Deriving the Formula | 9:49 | 35 748 | |
 | Deriving the Derivative of Inverse Tangent or y = arctan (x) | 6:17 | 93 135 | |
 | Deriving the Derivative Formulas for Tangent, Cotangent, Secant, Cosecant | 9:14 | 12 014 | |
 | The Inverse Laplace Transform - Example and Important Theorem | 5:36 | 128 115 | 1 liste |
 | Calculating the Laplace Transform of a Function Using Tables | 2:57 | 27 367 | |
 | Table of Laplace Transforms | 1:14 | 29 637 | 1 liste |
 | Laplace Transform is a Linear Operator - Proof | 3:36 | 16 148 | 1 liste |
 | The Laplace Transform - More Derivatives | 4:13 | 22 517 | 1 liste |
 | The Laplace Transform, Basic Properties - Definitions and Derivatives | 13:10 | 101 578 | 1 liste |
 | Laplace Transform - Calculating the Laplace Transform | 13:50 | 85 164 | |
 | The Laplace Transform - The Basic Idea of How We Use It | 1:33 | 47 794 | 1 liste |
 | 13 Calculus Apps Out - Free App available!! | 1:38 | 18 268 | |
 | Antiderivatives: Acceleration, Velocity, Position Functions - A Word Problem | 12:54 | 55 018 | |
 | Position, Velocity, Acceleration using Derivatives | 8:46 | 87 439 | |
 | Growth Rates of Functions and L'Hospital's Rule | 9:39 | 9 689 | |
 | Chebyshev's Theorem | 3:10 | 108 907 | |
 | The Correlation Coefficient - Part 1 | 8:42 | 39 096 | |
 | Permutations Involving Repeated Symbols - Example 2 | 3:36 | 5 468 | 1 liste |
 | iphone Apps are Out! | 2:43 | 26 173 | |
 | Permutations Involving Repeated Symbols - Example 1 | 5:17 | 13 101 | 1 liste |
 | Puzzle: The Monty Hall Problem | 2:26 | 13 817 | 1 liste |
 | Puzzle: What Happens? The Monkey and the Weight | 0:48 | 9 491 | 1 liste |
 | Multivariable Calculus - Showing a Limit DOES Exist Using Algebra (Conjugate) | 5:10 | 89 383 | |
 | Trigonometric Identities: How to Derive / Remember Them - Part 3 of 3 | 13:25 | 44 899 | |
 | Trigonometric Identities: How to Derive / Remember Them - Part 2 of 3 | 9:44 | 67 772 | |
 | Trigonometric Identities: How to Derive / Remember Them - Part 1 of 3 | 13:54 | 283 920 | |
 | Trigonometric Substitution - Example 1 | 14:90 | 294 122 | |
 | Graphing Special Polar Equations; How Many Petals Will a Graph Have? | 1:51 | 10 006 | 1 liste |
 | Graphing Special Polar Equations, Ex 1 | 2:60 | 4 697 | 1 liste |
 | Graphing Simple Polar Equations, Ex 3 | 3:24 | 8 429 | |
 | Graphing Simple Polar Equations, Ex 2 | 3:26 | 15 270 | 1 liste |
 | Graphing Simple Polar Equations, Ex 1 | 2:30 | 20 653 | |
 | Converting Between Polar and Rectangular Equations, Ex 3 | 4:26 | 67 129 | 2 listes |
 | Converting Between Polar and Rectangular Equations, Ex 2 | 4:48 | 66 619 | 2 listes |
 | Converting Between Polar and Rectangular Equations, Ex 1 | 1:48 | 69 622 | 2 listes |
 | Converting Between Polar and Rectangular (Cartesian) Coordinates, Ex 3 | 4:18 | 51 510 | 2 listes |
 | Intro to Polar Coordinates, Ex 1 | 3:49 | 3 010 | 2 listes |
 | Roots of Unity, Ex 2 | 5:48 | 6 744 | 2 listes |
 | Roots of Unity, Example 1 | 3:19 | 21 378 | 2 listes |
 | More Roots of Complex Numbers, Ex 2 | 9:43 | 5 227 | 3 listes |
 | More Roots of Complex Numbers, Ex 1 | 9:47 | 9 531 | 3 listes |
 | Roots of Complex Numbers, Ex 3 | 8:19 | 43 877 | 3 listes |
 | Roots of Complex Numbers, Ex 2 | 6:22 | 36 915 | 3 listes |
 | Roots of Complex Numbers, Ex 1 | 6:10 | 90 973 | 3 listes |
 | DeMoivre's Theorem: Raising a Complex Number to a Power, Ex 3 | 4:16 | 16 750 | 2 listes |
 | DeMoivre's Theorem: Raising a Complex Number to a Power, Ex 2 | 11:48 | 52 772 | 2 listes |
 | DeMoivre's Theorem: Raising a Complex Number to a Power, Ex 1 | 2:18 | 67 038 | 2 listes |
 | Complex Numbers: Multiplying and Dividing in Polar Form, Ex 2 | 3:17 | 13 428 | 3 listes |
 | Complex Numbers: Multiplying and Dividing in Polar Form, Ex 1 | 3:27 | 30 189 | 3 listes |
 | Complex Numbers: Convert From Polar to Complex Form, Ex 1 | 2:18 | 46 451 | 3 listes |
 | Expressing a Complex Number in Trigonometric or Polar Form, Ex 3 | 4:38 | 34 156 | 2 listes |
 | Expressing a Complex Number in Trigonometric or Polar Form, Ex 2 | 2:40 | 32 968 | 2 listes |
 | Expressing a Complex Number in Trigonometric or Polar Form, Ex 1 | 3:31 | 90 757 | 2 listes |
 | Complex Numbers: Graphing and Finding the Modulus, Ex 2 | 3:51 | 11 158 | 3 listes |
 | Complex Numbers: Graphing and Finding the Modulus, Ex 1 | 3:40 | 26 702 | 3 listes |
 | Word Problems Involving Velocity or Other Forces (Vectors), Ex 3. | 2:10 | 16 949 | 3 listes |
 | Word Problems Involving Velocity or Other Forces (Vectors), Ex 2 | 11:29 | 28 989 | 3 listes |
 | Word Problems Involving Velocity or Other Forces (Vectors), Ex 1 | 3:10 | 28 555 | 3 listes |
 | Finding a Unit Vector, Ex 2 | 4:55 | 33 959 | 3 listes |
 | Finding a Unit Vector, Ex 1 | 2:70 | 105 582 | 3 listes |
 | Finding the Components of a Vector, Ex 2 | 6:34 | 28 852 | 3 listes |
 | Finding the Components of a Vector, Ex 1 | 2:38 | 69 306 | 3 listes |
 | Vector Addition and Scalar Multiplication, Example 2 | 3:52 | 23 802 | 3 listes |
 | Vector Addition and Scalar Multiplication, Example 1 | 3:24 | 41 335 | 3 listes |
 | Magnitude and Direction of a Vector, Example 3 | 6:50 | 33 230 | 3 listes |
 | Magnitude and Direction of a Vector, Example 2 | 3:46 | 58 640 | 3 listes |
 | Magnitude and Direction of a Vector, Example 1 | 3:58 | 174 188 | 3 listes |
 | When Are Two Vectors Considered to Be the Same? | 2:30 | 12 852 | 3 listes |
 | An Introduction to Vectors, Part 1 | 4:46 | 57 163 | 3 listes |
 | Law of Cosines, Word Problem #1 | 4:30 | 8 787 | 2 listes |
 | Law of Cosines, Example 6 | 3:48 | 6 302 | 2 listes |
 | Law of Cosines, Example 5 | 2:60 | 7 078 | 2 listes |
 | Law of Cosines, Example 4 | 4:27 | 12 583 | 2 listes |
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