Dear all,
All that looks excellent.
Where is this marvelous document?
Thank you very much.
JPi
On Fri, Oct 22, 2010 at 9:19 PM, Dieter Kaiser <drdieterkaiser at web.de> wrote:
> Am Freitag, den 22.10.2010, 10:35 -0700 schrieb Edwin Woollett:
>> Maxima by Example, Ch. 6, Differential Calculus Update.
>>
>> The pdf file mbe6calc1.pdf has been extensively edited to
>> improve the presentation and the typography.
>>
>> The batch files cylinder.mac and sphere.mac have been
>> ? edited to adapt to some changes in Maxima
>> ? internals.
>>
>> The code file vcalc.mac and batch file vcalcdem.mac
>> ? are essentially unchanged.
>>
>> Chapter 6: Differential Calculus, ? Files:
>>
>> ? ?1. --mbe6calc1.pdf : Oct. 21, 2010, Maxima 5.21.1, 54 pages
>> ? ?2. --vcalc.mac : A Maxima package for Vector Calculus: Oct. 21, 2010,
>> ? ? ? ? ? ? ? ? Maxima 5.21.1
>> ? ?3. --vcalcdem.mac : Batch File Illustrating vcalc.mac: Oct. 21, 2010,
>> ? ? ? ? ? ? ? ? Maxima 5.21.1
>> ? ?4. --calc1code.txt : Copy and Paste Code: Oct. 21, 2010, Maxima 5.21.1
>> ? ?5. --cylinder.mac : Cylindrical Coordinates Batch File Derivation:
>> ? ? ? ? ? ? ? ?Oct.21, 2010, Maxima 5.21.1
>> ? ?6. --sphere.mac : Spherical Polar Coordinates Batch File Derivation:
>> ? ? ? ? ? ? ? ?Oct.21, 2010, Maxima 5.21.1,
>> ? ? ? ? ? ? ? ? (The sphere.mac curl derivation will not work with
>> ? ? ? ? ? ? ? ? ? ?ver. 5.22.1 due to a bug in that version)
>>
>> Chapter 6 Sections:
>>
>> 1. Differentiation of Explicit and Implicit Functions: diff and depends,
>> 2. Critical and Inflection Points of a Curve Defined by an Explicit
>> ? ? ? ? Function,
>> 3. Tangent and Normal of a Point of a Curve Defined by an Explicit Function,
>> 4. Maxima and Minima of a Function of Two Variables,
>> 5. Tangent and Normal of a Point of a Curve Defined by an Implicit Function,
>> 6. Limit Examples using Maxima's limit Function,
>> 7. Taylor and Laurent Series Expansions using Maxima's taylor Function,
>> 8. Vector Calculus Calculations using vcalc.mac,
>> 9. Maxima Derivation of Vector Calculus Formulas (Laplacian, Divergence,
>> ? ? ? ? ? ? ?Gradient, and Curl) in Cylindrical Coordinates,
>> 10. Maxima Derivation of Vector Calculus Formulas in Spherical ?Polar
>> ? ? ? ? Coordinates.
>
> Thank you very much for your work. I should have a much closer look at
> all your examples. This would help me to avoid the introduction of bugs.
>
> Dieter Kaiser
>
>
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>
--
M. Sc. Juan Pablo Carbajal
-----
PhD Student
University of Z?rich
www.ailab.ch/carbajal