Coursera - Calculus One (2013)

1.59 GB | 00:05:32 | mp4 | 960X540 | 16:9
Genre:eLearning |Language:English

Files Included :
1 - 1 - 1 00 Who will help me [146] (6.62 MB)
1 - 11 - 1 10 What is the limit of a product [213] (9.34 MB)
1 - 3 - 1 02 When are two functions the same [557] (21.29 MB)
1 - 4 - 1 03 How can more functions be made [325] (11.53 MB)
10 - 1 - 10 00 What does it mean to antidifferentiate [220] (10.46 MB)
10 - 10 - 10 09 What is the antiderivative of f(mxb) [518] (22.45 MB)
10 - 11 - 10 10 Knowing my velocity what is my position [316] (14 MB)
10 - 12 - 10 11 Knowing my acceleration what is my position [424] (18.47 MB)
10 - 13 - 10 12 What is the antiderivative of sine squared [318] (13.47 MB)
10 - 14 - 10 13 What is a slope field [456] (22.71 MB)
10 - 3 - 10 02 What is the antiderivative of a sum [342] (14.5 MB)
10 - 5 - 10 04 What is the most general antiderivative of 1-x [414] (18.9 MB)
10 - 7 - 10 06 What are antiderivatives of ex and natural log [244] (11.3 MB)
10 - 9 - 10 08 What is an antiderivative for e(-x2) [449] (19.61 MB)
11 - 1 - 11 00 If we are not differentiating what are we going to do [257] (12.83 MB)
11 - 12 - 11 11 When is the accumulation function increasing Decreasing [444] (19.41 MB)
11 - 13 - 11 12 What sorts of properties does the integral satisfy [442] (20.31 MB)
11 - 14 - 11 13 What is the integral of sin x dx from -1 to 1 [315] (13.41 MB)
11 - 2 - 11 01 How can I write sums using a big Sigma [510] (22.93 MB)
11 - 4 - 11 03 What is the sum of the first k odd numbers [415] (18.42 MB)
12 - 1 - 12 00 What is the big deal about the fundamental theorem of calculus [213] (7.98 MB)
12 - 10 - 12 09 In what way is summation like integration [231] (11.11 MB)
12 - 12 - 12 11 Physically why is the fundamental theorem of calculus true [400] (17.66 MB)
12 - 2 - 12 01 What is the fundamental theorem of calculus [532] (23.05 MB)
12 - 4 - 12 03 What is the integral of sin x dx from x 0 to x pi [332] (15.91 MB)
12 - 5 - 12 04 What is the integral of x4 dx from x 0 to x 1 [415] (20.05 MB)
12 - 6 - 12 05 What is the area between the graphs of y sqrt(x) and y x2 [626] (21.27 MB)
12 - 7 - 12 06 What is the area between the graphs of y x2 and y 1 - x2 [630] (22.94 MB)
12 - 9 - 12 08 Why does the Euler method resemble a Riemann sum [429] (16.57 MB)
13 - 1 - 13 00 How is this course structured (7.08 MB)
13 - 10 - 13 09 What is d-dx integral sin t dt from t 0 to t x2 [351] (18.06 MB)
13 - 12 - 13 11 Without resorting to the fundamental theorem why does substitution work [347] (17.01 MB)
13 - 4 - 13 03 How should I handle the endpoints when doing u-substitution [513] (21.35 MB)
13 - 5 - 13 04 Might I want to do u-substitution more than once [422] (19.54 MB)
13 - 8 - 13 07 What is the integral of x - (x1)(1-3) dx [354] (16.91 MB)
13 - 9 - 13 08 What is the integral of dx - (1 cos x) [416] (18.84 MB)
14 - 1 - 14 00 What remains to be done [129] (5.3 MB)
14 - 2 - 14 01 What antidifferentiation rule corresponds to the product rule in reverse [504] (21.52 MB)
14 - 3 - 14 02 What is an antiderivative of x ex [413] (18.64 MB)
14 - 4 - 14 03 How does parts help when antidifferentiating log x [202] (8.19 MB)
14 - 6 - 14 05 What is an antiderivative of e(sqrt(x)) [324] (13.13 MB)
14 - 7 - 14 06 What is an antiderivative of sin(2n1) x cos(2n) x dx [550] (22.33 MB)
15 - 1 - 15 00 What application of integration will we consider [145] (7.41 MB)
15 - 10 - 15 09 On the graph of y2 x3 what is the length of a certain arc [414] (16.56 MB)
15 - 11 - 15 10 This title is missing a question mark [115] (4.6 MB)
15 - 4 - 15 03 What does volume even mean [447] (22.76 MB)
15 - 6 - 15 05 How do washers help to compute the volume of a solid of revolution [519] (22.7 MB)
15 - 9 - 15 08 What does length even mean [416] (19.94 MB)
2 - 1 - 2 00 Where are we in the course [122] (5.33 MB)
2 - 10 - 2 09 What is the difference between potential and actual infinity [249] (11.45 MB)
2 - 12 - 2 11 How fast does water drip from a faucet [521] (18.47 MB)
2 - 13 - 2 12 BONUS What is the official definition of limit [334] (12.55 MB)
2 - 14 - 2 13 BONUS Why is the limit of x2 as x approaches 2 equal to 4 [459] (18.4 MB)
2 - 15 - 2 14 BONUS Why is the limit of 2x as x approaches 10 equal to 20 [217] (7.85 MB)
2 - 2 - 2 01 What is a one-sided limit [345] (15.6 MB)
2 - 3 - 2 02 What does continuous mean [501] (19.67 MB)
2 - 4 - 2 03 What is the intermediate value theorem [223] (8.59 MB)
2 - 6 - 2 05 Why is there an x so that f(x) x [512] (22.23 MB)
2 - 8 - 2 07 What is the limit f(x) as x approaches infinity [443] (20.86 MB)
3 - 1 - 3 00 What comes next Derivatives [137] (5.98 MB)
3 - 12 - 3 11 What is the derivative of x3 x2 [507] (21.86 MB)
3 - 13 - 3 12 Why is the derivative of a sum the sum of derivatives [448] (18.21 MB)
3 - 3 - 3 02 What is a tangent line [328] (15.32 MB)
3 - 4 - 3 03 Why is the absolute value function not differentiable [238] (12.99 MB)
3 - 5 - 3 04 How does wiggling x affect f(x) [329] (14.7 MB)
3 - 7 - 3 06 What information is recorded in the sign of the derivative [413] (18.69 MB)
3 - 9 - 3 08 What is the derivative of a constant multiple of f(x) [453] (21.71 MB)
4 - 1 - 4 00 What will Week 4 bring us [121] (4.92 MB)
4 - 12 - 4 11 Do all local minimums look basically the same when you zoom in [355] (14.13 MB)
4 - 5 - 4 04 What is the quotient rule [409] (17.74 MB)
4 - 8 - 4 07 What does the sign of the second derivative encode [426] (17.29 MB)
4 - 9 - 4 08 What does d-dx mean by itself [405] (18.97 MB)
5 - 1 - 5 00 Is there anything more to learn about derivatives [100] (3.35 MB)
5 - 11 - 5 10 How can logarithms help to prove the product rule [328] (13.47 MB)
5 - 12 - 5 11 How do we prove the quotient rule [501] (20.99 MB)
5 - 5 - 5 04 What is the folium of Descartes [440] (20.17 MB)
5 - 8 - 5 07 What is logarithmic differentiation [424] (18.66 MB)
6 - 1 - 6 00 What are transcendental functions [203] (7.24 MB)
6 - 10 - 6 09 Why do sine and cosine oscillate [439] (18.7 MB)
6 - 11 - 6 10 How can we get a formula for sin(ab) [415] (17.51 MB)
6 - 12 - 6 11 How can I approximate sin 1 [325] (12.88 MB)
6 - 13 - 6 12 How can we multiply numbers with trigonometry [411] (18.82 MB)
6 - 2 - 6 01 Why does trigonometry work [312] (14.98 MB)
6 - 3 - 6 02 Why are there these other trigonometric functions [448] (22.66 MB)
6 - 6 - 6 05 What are the derivatives of the other trigonometric functions [535] (21.89 MB)
6 - 7 - 6 06 What is the derivative of sin(x2) [436] (18.56 MB)
6 - 8 - 6 07 What are inverse trigonometric functions [432] (19.4 MB)
7 - 1 - 7 00 What applications of the derivative will we do this week [122] (5.62 MB)
7 - 11 - 7 10 How quickly does a balloon fill with air [345] (13.05 MB)
7 - 5 - 7 04 How long until the gray goo destroys Earth [346] (14.21 MB)
7 - 6 - 7 05 What does a car sound like as it drives past [357] (14.46 MB)
7 - 7 - 7 06 How fast does the shadow move [511] (19.41 MB)
7 - 8 - 7 07 How fast does the ladder slide down the building [350] (14.35 MB)
7 - 9 - 7 08 How quickly does a bowl fill with green water [407] (18.33 MB)
8 - 1 - 8 00 What sorts of optimization problems will calculus help us solve [138] (5.55 MB)
8 - 11 - 8 10 How short of a ladder will clear a fence [403] (15.37 MB)
8 - 4 - 8 03 Why do we have to bother checking the endpoints [415] (19.36 MB)
8 - 7 - 8 06 How large can xy be if x y 24 [542] (20.36 MB)
9 - 1 - 9 00 What is up with all the numerical analysis this week [134] (5.18 MB)
9 - 11 - 9 10 Why does f(x) 0 imply that f is increasing [510] (22.92 MB)
9 - 12 - 9 11 Should I bother to find the point c in the mean value theorem [427] (20.1 MB)
9 - 6 - 9 05 What does dx mean by itself [538] (22.31 MB)]
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