References analysis of the Wikipedia article "மையவிலக்கு விசை" in the Tamil version

books.google.com

Edward Albert Bowser (1920). An elementary treatise on analytic mechanics: with numerous examples (25th ed.). D. Van Nostrand Company. p. 357.

Gerald James Holton and Stephen G. Brush (2001). Physics, the human adventure: from Copernicus to Einstein and beyond. Rutgers University Press. p. 126. ISBN 9780813529080.

Ervin Sidney Ferry (2008). A Brief Course in Elementary Dynamics. BiblioBazaar. pp. 87–88. ISBN 9780554609843.

Willis Ernest Johnson (2009). Mathematical Geography. BiblioBazaar. p. 15–16. ISBN 9781103199587.

Eugene A. Avallone, Theodore Baumeister, Ali Sadegh, Lionel Simeon Marks (2006). Marks' standard handbook for mechanical engineers (11 ed.). McGraw-Hill Professional. p. 15. ISBN 0071428674.{{cite book}}: CS1 maint: multiple names: authors list (link)

Richard Cammack, Anthony Donald Smith, Teresa K. Attwood, Peter Campbell (2006). Oxford dictionary of biochemistry and molecular biology (2 ed.). Oxford University Press. p. 109. ISBN 0198529171.{{cite book}}: CS1 maint: multiple names: authors list (link)

Joseph A. Angelo (2007). Robotics: a reference guide to the new technology. Greenwood Press. p. 267. ISBN 1573563374.

P. Grimshaw, A. Lees, N. Fowler, A. Burden (2006). Sport and exercise biomechanics. Routledge. p. 176. ISBN 185996284X.{{cite book}}: CS1 maint: multiple names: authors list (link)

Joel Dorman Steele (2008). Popular Physics (Reprint ed.). READ books. p. 31. ISBN 1408691345.

அறிமுகத்திற்கு, எடுத்துக்காட்டுக்கு Cornelius Lanczos (1986). The variational principles of mechanics (Reprint of 1970 University of Toronto ed.). Dover. p. 1. ISBN 0486650677. என்பதைக் காண்க

பொதுப்படுத்திய ஆய அச்சுகளின் விளக்கத்திற்கு, Ahmed A. Shabana (2003). "Generalized coordinates and kinematic constraints". Dynamics of Multibody Systems (2 ed.). Cambridge University Press. p. 90 ff. ISBN 0521544114. என்பதைக் காண்க

Christian Ott (2008). Cartesian Impedance Control of Redundant and Flexible-Joint Robots. Springer. p. 23. ISBN 3540692533.

Shuzhi S. Ge, Tong Heng Lee, Christopher John Harris (1998). Adaptive Neural Network Control of Robotic Manipulators. World Scientific. p. 47–48. ISBN 981023452X. In the above Euler–Lagrange equations, there are three types of terms. The first involves the second derivative of the generalized co-ordinates. The second is quadratic in

{\boldsymbol {\dot {q}}}

where the coefficients may depend on

{\boldsymbol {q}}

. These are further classified into two types. Terms involving a product of the type

{{\dot {q}}_{i}}^{2}

are called centrifugal forces while those involving a product of the type

{\dot {q}}_{i}{\dot {q}}_{j}

for i ≠ j are called Coriolis forces. The third type is functions of

{\boldsymbol {q}}

only and are called gravitational forces.{{cite book}}: CS1 maint: multiple names: authors list (link)

R. K. Mittal, I. J. Nagrath (2003). Robotics and Control. Tata McGraw-Hill. p. 202. ISBN 0070482934.

T Yanao & K Takatsuka (2005). "Effects of an intrinsic metric of molecular internal space". In Mikito Toda, Tamiki Komatsuzaki, Stuart A. Rice, Tetsuro Konishi, R. Stephen Berry (ed.). Geometrical Structures Of Phase Space In Multi-dimensional Chaos: Applications to chemical reaction dynamics in complex systems. Wiley. p. 98. ISBN 0471711578. As is evident from the first terms …, which are proportional to the square of

{\dot {\phi }}

, a kind of "centrifugal force" arises … We call this force "democratic centrifugal force". Of course, DCF is different from the ordinary centrifugal force, and it arises even in a system of zero angular momentum.{{cite book}}: CS1 maint: multiple names: editors list (link)

எடுத்துக்காட்டுக்கு, John R Taylor (2005). Classical Mechanics. Sausalito, Calif.: Univ. Science Books. pp. 299 ff. ISBN 189138922X. இல் சமன்பாடு 8.20 ஐக் காண்க

Francis Begnaud Hildebrand (1992). Methods of Applied Mathematics (Reprint of 1965 2nd ed.). Courier Dover Publications. p. 156. ISBN 0486670023.

V. B. Bhatia (1997). Classical Mechanics: With Introduction to Nonlinear Oscillations and Chaos. Alpha Science Int'l Ltd. p. 82. ISBN 8173191050.

கற்பனையான மையவிலக்கு விசை லெக்ராஞ்சியத்தில் உள்ள சாத்தியக்கூறுள்ள உறுப்புக்குரியதாக எவ்வாறு உள்ளது என்பதற்கான விளக்கத்திற்கு Edmond T Whittaker (1988). A treatise on the analytical dynamics of particles and rigid bodies (Reprint of 1917 2nd ed.). Cambridge University Press. pp. 40–41. ISBN 0521358833. ஐக் காண்க.

மையவிலக்கு விசை (Tamil Wikipedia)

books.google.com

villanova.edu

www34.homepage.villanova.edu