(************** Content-type: application/mathematica ************** Mathematica-Compatible Notebook This notebook can be used with any Mathematica-compatible application, such as Mathematica, MathReader or Publicon. The data for the notebook starts with the line containing stars above. To get the notebook into a Mathematica-compatible application, do one of the following: * Save the data starting with the line of stars above into a file with a name ending in .nb, then open the file inside the application; * Copy the data starting with the line of stars above to the clipboard, then use the Paste menu command inside the application. Data for notebooks contains only printable 7-bit ASCII and can be sent directly in email or through ftp in text mode. Newlines can be CR, LF or CRLF (Unix, Macintosh or MS-DOS style). NOTE: If you modify the data for this notebook not in a Mathematica- compatible application, you must delete the line below containing the word CacheID, otherwise Mathematica-compatible applications may try to use invalid cache data. For more information on notebooks and Mathematica-compatible applications, contact Wolfram Research: web: http://www.wolfram.com email: info@wolfram.com phone: +1-217-398-0700 (U.S.) Notebook reader applications are available free of charge from Wolfram Research. *******************************************************************) (*CacheID: 232*) (*NotebookFileLineBreakTest NotebookFileLineBreakTest*) (*NotebookOptionsPosition[ 2976585, 93966]*) (*NotebookOutlinePosition[ 2977287, 93991]*) (* CellTagsIndexPosition[ 2977243, 93987]*) (*WindowFrame->Normal*) Notebook[{ Cell[CellGroupData[{ Cell["From Spirograph to Fourier", "Subtitle"], Cell["\<\ Ivan Cnop Vrije universiteit Brussel icnop@vub.ac.be\ \>", "Subsubtitle"], Cell[CellGroupData[{ Cell["Robots with a single drive", "Section", CellAutoOverwrite->False], Cell[CellGroupData[{ Cell["Problem", "Subsection", CellAutoOverwrite->False], Cell[TextData[{ "A robot has an arm of length length1 moving around a fixed point, and \ at the end of this arm a second arm length length2 is fixed by some \ gears , making an angle which is a multiple, with a given constant c \ (times) the original angle t . 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