Track	Section	Reader	Length
01	00 - Preface to the Second Edition Prologue	Adam	2:02
02	01 - Chapter I: To Deliver You from the Preliminary Terrors	Adam	2:35
03	02 - Chapter II: On Different Degrees of Smallness	Mike Pelton	11:04
04	03 - Chapter III: On Relative Growings	katetastrophe	17:20
05	04 - Chapter IV: Simplest Cases	katetastrophe	17:36
06	05 - Exercises I Answers to Exercises I	Adam	3:57
07	06 - Chapter V: Next Stage. What to Do With Constants	Le	17:48
08	07 - Exercises II Answers to Exercises II	Le	11:25
09	08 - Chapter VI: Sums Differences Products and Quotients	Le	32:15
10	09 - Exercises III Answers to Exercises III	Paul E J King	10:10
11	10 - Chapter VII: Successive Differentiation	Paul E J King	5:27
12	11 - Exercises IV Answers to Exercises IV	Le	6:33
13	12 - Chapter VIII: When Time Varies - Part 1	Jargoniel	16:07
14	13 - Chapter VIII: When Time Varies - Part 2	Jargoniel	15:09
15	14 - Exercises V Answers to Exercises V	Bruce Kachuk	6:23
16	15 - Chapter IX: Introducing a Useful Dodge	Bruce Kachuk	25:28
17	16 - Exercises VI and VII Answers to Exercises VI and VII	realisticspeakers	11:08
18	17 - Chapter X: Geometrical Meaning of Differentiaton	Le	16:22
19	18 - Exercises VIII Answers to Exercises VIII	clarinetcarrot	5:40
20	19 - Chapter XI: Maxima and Minima - Part 1	clarinetcarrot	14:04
21	20 - Chapter XI: Maxima and Minima - Part 2	clarinetcarrot	17:10
22	21 - Exercises IX Answers to Exercises IX	clarinetcarrot	5:40
23	22 - Chapter XII: Curvature of Curves	clarinetcarrot	13:45
24	23 - Exercises X Answers to Exercises X	clarinetcarrot	7:15
25	24 - Chapter XIII: Other Useful Dodges - Part 1: Partial Fractions	clarinetcarrot	23:40
26	25 - Exercises XI Answers to Exercises XI	clarinetcarrot	8:14
27	26 - Chapter XIII: Other Useful Dodges - Part 2: Differential of an Inverse Function	clarinetcarrot	5:21
28	27 - Chapter XIV: On True Compound Interest and the Law of Organic Growth - Part 1 (A)	Paul E J King	18:53
29	28 - Chapter XIV: On True Compound Interest and the Law of Organic Growth - Part 1 (B)	Paul E J King	27:29
30	29 - Exercises XII Answers to Exercises XII	Paul E J King	6:47
31	30 - Chapter XIV: On True Compound Interest and the Law of Organic Growth - Part 2: The Logarithmic Curve	Le	2:46
32	31 - Chapter XIV: On True Compound Interest and the Law of Organic Growth - Part 3: The Die-away Curve	Le	21:47
33	32 - Exercises XIII Answers to Exercises XIII	Le	8:11
34	33 - Chapter XV: How to Deal With Sines and Cosines - Part 1	Son of the Exiles	8:53
35	34 - Chapter XV: How to Deal With Sines and Cosines - Part 2: Second Differential Coefficient of Sine or Cosine	Ielmie	6:35
36	35 - Exercises XIV Answers to Exercises XIV	Le	8:57
37	36 - Chapter XVI: Partial Differentiation - Part 1	clarinetcarrot	7:31
38	37 - Chapter XVI: Partial Differentiation - Part 2: Maxima and Minima of Functions of two Independent Variables	clarinetcarrot	4:32
39	38 - Exercises XV Answers to Exercises XV	clarinetcarrot	6:43
40	39 - Chapter XVII: Integration - Part 1	Bruce Kachuk	5:07
41	40 - Chapter XVII: Integration - Part 2: Slopes of Curves and the Curves themselves	Bruce Kachuk	6:40
42	41 - Exercises XVI Answers to Exercises XVI	Bruce Kachuk	2:08
43	42 - Chapter XVIII: Integrating as the Reverse of Differentiating - Part 1	Bruce Kachuk	8:59
44	43 - Chapter XVIII: Integrating as the Reverse of Differentiating - Part 2: Integration of the Sum or Difference of two Functions	Bruce Kachuk	1:51
45	44 - Chapter XVIII: Integrating as the Reverse of Differentiating - Part 3: How to Deal With Constant Terms	Bruce Kachuk	9:06
46	45 - Chapter XVIII: Integrating as the Reverse of Differentiating - Part 4: Some Other Integrals	Bruce Kachuk	5:56
47	46 - Chapter XVIII: Integrating as the Reverse of Differentiating - Part 5: On Double and Triple Integrals	Bruce Kachuk	4:18
48	47 - Exercises XVII Answers to Exercises XVII	Bruce Kachuk	6:34
49	48 - Chapter XIX: On Finding Areas by Integrating - Part 1	Bruce Kachuk	23:34
50	49 - Chapter XIX: On Finding Areas by Integrating - Part 2: Areas in Polar Coordinates	Bruce Kachuk	3:40
51	50 - Chapter XIX: On Finding Areas by Integrating - Part 3: Volumes by Integration	Bruce Kachuk	3:41
52	51 - Chapter XIX: On Finding Areas by Integrating - Part 4: On Quadratic Means	Bruce Kachuk	3:59
53	52 - Exercises XVIII Answers to Exercises XVIII	clarinetcarrot	7:41
54	53 - Chapter XX: Dodges Pitfalls and Triumphs	clarinetcarrot	14:47
55	54 - Exercises XIX Answers to Exercises XIX	clarinetcarrot	5:03
56	55 - Chapter XXI: Finding Some Solutions - Part 1	clarinetcarrot	14:57
57	56 - Chapter XXI: Finding Some Solutions - Part 2	clarinetcarrot	13:04
58	57 - Epilogue and Apologue	Rachel	3:25

Notes
Running Time: 10 hours and 3 minutes
Read by: Multiple readers
Book Coordinator: Rachel
Meta Coordinator: Availle
Proof Listener: TriciaG

Artwork
Inset: Calculus Made Easy by Silvanus Phillips Thompson, Fig. 4
Inset: Picture of English scientist, Silvanus Thompson, 1920, from Silvanus Thompson, His Life and Letters, Thompson and Thompson.

Recordings
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If you are one of the many people who are intimidated and baffled by mathematics, this book is for you. Calculus Made Easy: Being a Very-Simplest Introduction to Those Beautiful Methods of Reckoning which Are Generally Called by the Terrifying Names of the Differential Calculus and the Integral Calculus by Silvanus P. Thompson has been considered “a classic and elegant Introduction to the subject” of infinitesimal calculus ever since its initial publication in 1910. Written for British students, the concepts are presented in simple, clear terms in an accessible, conversational style with a dash of wry humor thrown in for good measure. Each chapter is accompanied by problem sets that further illuminate the concepts and that students seem to enjoy working through. Many report that they are awakened to the genius of calculus and thoroughly delighted by their ability to finally understand an often intimidating discipline.

From the Prologue…

Some calculus-tricks are quite easy. Some are enormously difficult. The fools who write the textbooks of advanced mathematics—and they are mostly clever fools—seldom take the trouble to show you how easy the easy calculations are. On the contrary, they seem to desire to impress you with their tremendous cleverness by going about it in the most difficult way. Being myself a remarkably stupid fellow, I have had to unteach myself the difficulties, and now beg to present to my fellow fools the parts that are not hard. Master these thoroughly, and the rest will follow. What one fool can do, another can.

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Item Info
EAN - DVD case	0701236969160
EAN - CD jacket	0687700169888
Media	MP3 CD
Package	DVD Case
Author	Silvanus P. Thompson (1851 - 1916)
Year	1910
Recording
Read by	Multiple readers
Length	10 hours and 3 minutes
Type of Reading	Collaborative