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| 114 vidéos trouvées. |
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 | | durée | vues | |
 | Taylor's Remainder Theorem - Finding the Remainder, Ex 4 | 4:20 | 13 295 | |
 | Interval and Radius of Convergence for a Series, Ex 8 | 5:53 | 16 143 | |
 | Integrating a Function as a Power Series | 4:20 | 16 242 | |
 | Finding a Power Series Representation for a Logarithm Function | 9:40 | 51 382 | |
 | Finding a Function to Match a Given Power Series by Integrating | 3:37 | 7 046 | |
 | Finding a Power Series by Differentiation | 4:51 | 9 983 | |
 | Finding the Sum of a Series by Differentiating | 4:10 | 41 864 | |
 | Finding Power Series by Differentiation - 3 examples | 12:13 | 73 577 | |
 | Integrating a Power Series, Example 2 | 3:13 | 9 029 | |
 | Integrating a Power Series | 3:40 | 9 419 | |
 | Interval and Radius of Convergence for a Series, Ex 9 | 8:21 | 37 228 | |
 | Interval and Radius of Convergence for a Series, Ex 7 | 5:13 | 24 854 | |
 | Interval and Radius of Convergence for a Series, Ex 6 | 6:19 | 23 776 | |
 | Interval and Radius of Convergence for a Series, Ex 5 | 5:21 | 34 711 | |
 | Interval and Radius of Convergence for a Series, Ex 4 | 5:21 | 65 206 | |
 | Interval and Radius of Convergence for a Series, Ex 3 | 2:15 | 49 334 | |
 | Finding Interval of Convergence for a Given Power Series Representation | 3:14 | 33 295 | |
 | Finding a New Power Series by Manipulating a Known Power Series, Ex 2 | 7:70 | 12 099 | |
 | Finding a New Power Series by Manipulating a Known Power Series | 2:12 | 7 173 | |
 | Finding Power Series Representations by Manipulating 1/(1-x) - Another Ex 1 | 1:31 | 22 571 | |
 | Finding a Maclaurin Series Expansion - Another Example 1 | 4:50 | 74 238 | |
 | Taylor's Remainder Theorem - Finding the Remainder, Ex 3 | 4:37 | 27 693 | |
 | Taylor's Remainder Theorem - Finding the Remainder, Ex 2 | 3:44 | 44 216 | |
 | Taylor's Remainder Theorem - Finding the Remainder, Ex 1 | 2:22 | 84 342 | |
 | Finding a Maclaurin Polynomial - Ex 2 | 4:30 | 13 221 | |
 | Finding a Maclaurin Polynomial - Ex 1 | 3:40 | 16 259 | |
 | Finding a Taylor Polynomial to Approximate a Function, Ex 4 | 5:33 | 11 713 | |
 | Taylor Polynomial to Approximate a Function, Ex 3 | 5:80 | 22 521 | |
 | Finding a Taylor Polynomial to Approximate a Function, Ex 2 | 2:58 | 33 483 | |
 | Finding a Taylor Polynomial to Approximate a Function, Ex 1 | 5:27 | 78 061 | |
 | The Root Test - Another Example, #3 | 1:42 | 7 680 | |
 | The Root Test - Another Example, #2 | 3:46 | 10 019 | |
 | The Root Test - Another Example, #1 | 2:10 | 12 104 | |
 | The Ratio Test , Another Example #4 | 3:40 | 5 685 | |
 | The Ratio Test , Another Example #3 | 3:47 | 6 655 | |
 | The Ratio Test , Another Example #2 | 2:10 | 5 873 | |
 | The Ratio Test , Another Example #1 | 3:50 | 10 476 | |
 | Absolute Convergence, Conditional Convergence, Another Example 3 | 2:90 | 15 442 | |
 | Absolute Convergence, Conditional Convergence, Another Example 2 | 2:38 | 20 389 | |
 | Absolute Convergence, Conditional Convergence, Another Example 1 | 2:36 | 23 943 | |
 | Alternating Series - Error Estimation #2 | 1:16 | 9 912 | |
 | Alternating Series - Error Estimation | 2:26 | 40 089 | |
 | Alternating Series - Another Example 4 | 2:35 | 11 419 | |
 | Alternating Series - Another Example 3 | 2:10 | 12 728 | |
 | Alternating Series - Another Example 2 | 1:29 | 17 697 | |
 | Alternating Series - Another Example 1 | 2:00 | 14 153 | |
 | Limit Comparison Test for Series - Another Example 8 | 2:33 | 9 098 | |
 | Limit Comparison Test for Series - Another Example 7 | 4:54 | 12 036 | |
 | Limit Comparison Test for Series - Another Example 6 | 1:26 | 8 022 | |
 | Limit Comparison Test for Series - Another Example 5 | 2:53 | 10 883 | |
 | Limit Comparison Test for Series - Another Example 4 | 1:54 | 13 073 | |
 | Limit Comparison Test for Series - Another Example 3 | 4:10 | 19 106 | |
 | Limit Comparison Test for Series - Another Example 2 | 2:60 | 19 783 | |
 | Limit Comparison Test for Series - Another Example 1 | 3:40 | 36 811 | |
 | Direct Comparison Test - Another Example 5 | 3:31 | 7 513 | |
 | Direct Comparison Test - Another Example 4 | 3:40 | 10 269 | |
 | Direct Comparison Test - Another Example 3 | 2:29 | 11 853 | |
 | Interval and Radius of Convergence for a Series, Ex 2 | 5:26 | 118 086 | |
 | Direct Comparison Test - Another Example 2 | 3:80 | 18 102 | |
 | Direct Comparison Test - Another Example 1 | 2:34 | 31 568 | |
 | P-Series | 2:54 | 60 540 | |
 | Integral Test to Evaluate Series, Ex 4. | 4:90 | 8 398 | |
 | Integral Test to Evaluate Series, Ex 3 | 4:53 | 12 449 | |
 | Integral Test to Evaluate Series, Ex 2 | 5:37 | 8 549 | |
 | Integral Test to Evaluate Series, Ex 1 | 3:56 | 12 280 | |
 | Test for Divergence for Series, Two Examples | 3:37 | 92 605 | |
 | Telescoping Series ,Showing Divergence Using Partial Sums | 4:47 | 53 651 | |
 | Telescoping Series , Finding the Sum, Example 1 | 7:00 | 128 729 | |
 | Sum of an Infinite Geometric Series, Ex 3 | 3:40 | 42 654 | |
 | Sum of an Infinite Geometric Series, Ex 2 | 3:12 | 77 806 | |
 | Sum of an Infinite Geometric Series, Ex 1 | 1:37 | 158 540 | |
 | Writing a Geometric Series using Sigma / Summation Notation, Ex 2 | 3:70 | 12 688 | |
 | Finding a Formula for a Partial Sum of a Telescoping Series | 4:17 | 29 874 | |
 | Writing a Geometric Series using Sigma / Summation Notation | 2:12 | 22 476 | |
 | Intro to Summation Notation and Infinite Series, Ex 1 | 1:38 | 17 072 | |
 | Intro to Monotonic and Bounded Sequences, Ex 1 | 3:42 | 60 188 | |
 | The Squeeze Theorem and Absolute Value Theorem, #3 | 2:36 | 8 545 | |
 | The Squeeze Theorem and Absolute Value Theorem, #2 | 3:33 | 11 861 | |
 | The Squeeze Theorem and Absolute Value Theorem, #1 | 3:50 | 21 841 | |
 | Finding the Limit of a Sequence, 3 more examples | 3:24 | 83 715 | |
 | Using the Ratio Test to Determine if a Series Converges #3 (Factorials) | 7:90 | 78 325 | |
 | Taylor / Maclaurin Series for Sin (x) | 5:51 | 208 309 | 1 liste de plus |
 | Using Series to Evaluate Limits | 4:80 | 60 400 | 1 liste de plus |
 | Using Maclaurin/Taylor Series to Approximate a Definite Integral to a Desired Accuracy | 10:44 | 150 817 | 1 liste de plus |
 | Strategy for Testing Series - Series Practice Problems | 12:47 | 168 988 | 2 listes de plus |
 | Radius of Convergence for a Power Series | 1:48 | 228 319 | 2 listes de plus |
 | Absolute Convergence, Conditional Convergence and Divergence | 11:21 | 259 907 | 2 listes de plus |
 | More Alternating Series Examples | 7:19 | 125 386 | 2 listes de plus |
 | Geometric Series - Expressing a Decimal as a Rational Number | 7:17 | 63 396 | 2 listes de plus |
 | Geometric Series and the Test for Divergence - Part 2 | 2:55 | 170 255 | 2 listes de plus |
 | What is a Sequence? Basic Sequence Info | 11:26 | 372 704 | 2 listes de plus |
 | What is a Series | 12:24 | 225 413 | 2 listes de plus |
 | Remainder Estimate for the Integral Test | 7:46 | 76 594 | 2 listes de plus |
 | Showing a Series Diverges using Partial Sums | 7:37 | 125 057 | 1 liste de plus |
 | Using the Integral Test for Series | 8:20 | 280 733 | 2 listes de plus |
 | Telescoping Series Example | 4:39 | 150 180 | 1 liste de plus |
 | Summation Notation | 10:16 | 249 445 | 1 liste de plus |
 | Root Test for Series | 10:80 | 204 691 | 1 liste de plus |
 | The Binomial Series - Example 2 | 9:14 | 53 805 | 1 liste de plus |
 | The Binomial Series - Example 1 | 9:11 | 136 696 | 1 liste de plus |
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