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 | A Proof for the Existence of God | 2:41 | 533 719 | 1 liste |
 | Volumes Using Cross Sectional Slices, Ex 1 | 10:43 | 76 681 | |
 | Trigonometric Substitution, Ex 4 - Rational Powers | 7:28 | 11 853 | |
 | Trigonometric Substitution + U-Sub, Definite Integral | 7:42 | 17 209 | |
 | Long Partial Fractions Problem - Repeated Irreducible Quadratic Factors, Part 2 | 10:52 | 11 691 | |
 | Long Partial Fractions Problem - Repeated Irreducible Quadratic Factors, Part 1 | 13:17 | 30 121 | |
 | Curve Sketching Using Calculus: f(x) = x / (x + 4) | 14:18 | 26 093 | |
 | Solving Quadratic Equations by Completing the Square | 13:55 | 9 675 | |
 | Properties of Logarithms - Logarithmic Functions | 20:39 | 73 289 | 1 liste |
 | What is a Sequence? Examples showing convergence and divergence of sequence. | 11:26 | 65 404 | |
 | Derivatives of Logarithmic Functions and Examples | 9:15 | 12 333 | |
 | Solving Linear Equations | 13:10 | 240 479 | |
 | Radicals - Notation and Simplifying - Radical and Exponential Notation | 13:54 | 14 365 | |
 | Factoring a Number | 10:39 | 2 660 | |
 | Direct Comparison Test / Limit Comparison Test for Series - Basic Info | 3:36 | 63 966 | |
 | More Examples Showing Sequences Converging or Diverging | 6:13 | 1 027 | |
 | Integral Test for Series - Example 2 | 10:52 | 40 857 | |
 | Solving Linear Inequalities | 8:42 | 2 207 | |
 | Multiplying and Dividing Functions - Function Notation | 5:30 | 5 369 | 1 liste |
 | Integral Test - Basic Idea | 3:27 | 69 421 | |
 | Fractions - Adding and Subtracting - Numerical and Variable Examples | 7:37 | 2 559 | |
 | L'Hospitals Rule - Indeterminate Powers | 9:40 | 598 | |
 | Logarithmic Differentiation - Basic Idea and Example | 7:33 | 3 014 | |
 | Part Two of a Geometric Series Problem that got Cut Off! | 2:55 | 842 | |
 | Alternating Series - Basic Example | 6:30 | 1 619 | |
 | L-Hospital's Rule - Indeterminate Differences | 7:50 | 3 711 | |
 | Fractions - Multiplying and Dividing - Numerical and Variable Examples | 6:35 | 9 163 | |
 | Basic Derivative Examples | 9:70 | 3 359 | |
 | More Complicated Derivative Examples | 9:21 | 6 562 | |
 | Increasing/Decreasing intervals of a functions + Local max and mins - Basic Idea | 5:19 | 6 438 | |
 | Trigonometric Substitution Example 1 Part 1 | 12:51 | 65 754 | |
 | Improper Integral with an Infinite Discontinuity at an Endpoint of the Interval | 4:52 | 2 223 | |
 | Adding and Subtracting Functions - Function Notation | 6:00 | 3 164 | 1 liste |
 | Absolute Value - Basic Examples | 5:42 | 8 726 | |
 | Negative Exponents and Fractional Exponents - Examples | 10:16 | 57 617 | 1 liste |
 | Finding Derivatives using the Chain Rule | 4:47 | 18 633 | |
 | Improper Integrals - A more complicated example | 9:57 | 3 199 | |
 | Derivatives Using the Quotient Rule | 4:26 | 14 354 | |
 | More Examples of Geometric Series and the Test for Divergence | 9:57 | 1 164 | |
 | Finding Local Maximums and Local Minimums using the Second Derivative Test | 11:27 | 2 518 | |
 | Using Implicit Differentiation to find a derivative | 7:70 | 18 375 | |
 | Limit Comparison and Direct Comparison Test for Series - More examples | 8:53 | 5 717 | |
 | Derivatives of Exponential Functions and Examples | 5:51 | 6 911 | |
 | Improper Integral - Infinity in upper and lower limit of integration | 7:55 | 3 154 | |
 | Derivatives using the Product Rule | 4:50 | 8 651 | |
 | Basic Integration Formulas | 2:19 | 20 872 | |
 | Basic Antiderivative Examples | 5:18 | 95 363 | |
 | Basic Description of Limits | 5:80 | 29 030 | |
 | Limits at Infinity with Radicals | 9:11 | 9 705 | |
 | L'Hospitals Rule - Indeterminate Products | 5:46 | 8 976 | |
 | Integral Test for Series Example 1 | 11:00 | 123 269 | |
 | Limits at Infinity - Basic Example and Shortcuts | 8:53 | 10 847 | |
 | Two Alternating Series Examples | 7:18 | 1 671 | |
 | Integration by U-Substitution (Indefinite Integral) | 5:55 | 30 554 | |
 | Calculating Limits by finding a Common Denominator | 4:54 | 14 493 | |
 | Partial Fraction Decompositions | 19:36 | 33 821 | |
 | Calculating a Limit by Expanding and Simplifying | 1:50 | 1 359 | |
 | Improper Integral - Basic Idea and Example | 6:24 | 12 682 | |
 | Basic Exponent Properties - Exponent Rules | 12:27 | 1 019 | |
 | Calculating Limits - Factor and Cancel | 3:17 | 20 040 | |
 | Calculating a Limit using: lim x-- 0 [ Sin(x)/(x) = 1] example | 6:30 | 15 287 | |
 | Trigonometric Substitution Example 1 Part 2 | 1:27 | 30 025 | |
 | Basic Definite Integrals | 3:48 | 100 796 | |
 | Limit Comparison Test and Direct Comparison Test - Basic Examples | 7:35 | 19 250 | |
 | Definite Integral using U-Substitution | 4:49 | 10 315 | |
 | Calculating Limits by Multiplying by a Conjugate | 4:10 | 1 484 | |
 | Completing the Square and Vertex Form of Quadratic Equations | 17:35 | 149 055 | |
 | Logarithmic Differentiation - Example 2 | 3:40 | 922 | |
 | Finding a derivative using the Product and Chain Rule, then simplifying | 2:54 | 3 131 | |
 | Increasing/Decreasing + Local Max and Mins using First Derivative Test | 10:20 | 113 429 | |
 | More examples of degrees and radians | 13:23 | 1 510 | |
 | Basic Introduction into degrees and radians and converting between them | 11:59 | 8 113 | |
 | Sine and Cosine Functions | 12:37 | 21 419 | |
 | Volumes of Revolution using Cylindrical Shells | 19:57 | 43 898 | |
 | Solving Quadratic Equations - Factoring and Using the Quadratic Formula | 13:50 | 6 580 | |
 | How to evaluate tangent, cotangent, secant and cosecant functions | 7:55 | 17 859 | |
 | Solving Quadratic Inequalities | 13:20 | 2 998 | 1 liste |
 | Derivatives involving Inverse Trigonometric Functions | 11:21 | 42 370 | |
 | Integrating using Inverse Trigonometric Functions | 13:35 | 35 365 | |
 | Composition of Functions | 8:10 | 2 368 | |
 | How to Find the Domain of a Function - Numerous Examples | 11:12 | 249 153 | |
 | Domain and Range - Basic Idea - Two Graph Examples | 7:22 | 3 681 | 1 liste |
 | Exponential Functions and Derivatives, More Example #1 | 4:57 | 12 648 | |
 | More Derivatives Involving Trigonometric Functions, Ex 2 | 2:20 | 26 105 | |
 | More Derivatives Involving Trigonometric Functions, Ex 1 | 3:24 | 83 643 | |
 | More Derivative Examples, #3 | 4:26 | 8 727 | |
 | More Derivative Examples, #2 | 6:51 | 6 188 | |
 | More Derivative Examples, #1 | 4:47 | 9 074 | |
 | More Chain Rule Examples #1 | 2:36 | 21 604 | |
 | More Chain Rule Examples #3 | 2:55 | 9 792 | |
 | More Chain Rule Examples #2 | 2:31 | 12 387 | |
 | Related Rates #8 - Cars Traveling from an Intersection - Rate of Change in Perimeter | 10:20 | 35 482 | |
 | Related Rates # 7 - Ladder Sliding Down Wall, Finding Rate of Change of Area Under Ladder | 11:55 | 81 019 | |
 | Related Rates #6 - Rate at Which the Circumference of a Circle is Changing | 5:36 | 35 322 | |
 | Optimization Problem #7 - Minimizing the Area of Two Squares With Total Perimeter of Fixed Length | 6:33 | 33 003 | 1 liste |
 | Optimization Problem #6 - Find the Dimensions of a Can To Maximize Volume | 8:20 | 55 527 | 1 liste |
 | Optimization Problem #5 - Max Volume of a Box Made From Square of Material | 10:58 | 95 874 | 1 liste |
 | Optimization Problem #4 - Max Area Enclosed by Rectangular Fence | 9:49 | 163 618 | 1 liste |
 | Dividing a Number by a Larger Number : Fractions/ Decimals / Percents | 9:10 | 51 159 | |
 | Good Luck on the AP Test!! | 0:41 | 7 735 | |
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