derivation of unit vectors in curvilinear coordinates
We can combine the above three equations into a single vector equation that gives the position vector of any point in space as a function of the coordinates :
If we held fixed s.t. then the position vector becomes the parametric equation of the surface (called the coordinate surface) where play the role of parameters. Furthermore, if we held both and fixed s.t and , then the position vector becomes the parametric equation of the curve (called the coordinate curve) formed by the intersection of the surfaces and , in which acts as a parameter along the curve.
Now, how do we find the tangent vectors? Well, what is the meaning of a tangent vector? A tangent vector is a vector which is tangent to a coordinate curve formed by the intersection of the two coodinate surfaces. In other words, it is a vector which indicates the direction in which one of the coordinates, say , increases while the other two coordinates (i.e. and ) are held fixed. Sound familiar? Yes, of course, partial derivatives! A partial derivative with respect to would take the derivative of the position vector along the coordinate curve formed by the intesection of the surfaces and and hence return you a tangent vector along that curve! Hence, by taking the partial derivative of one by one with respect to all three coordinates, we would get all the three tangent vectors which are tangent to their respective coordinate curves. Thus, we arrive at the following three tangent vectors:
However, these are only tangent vectors. Most often we are interested in unit tangent vectors (a.k.a. standard basis vectors for ). So we divide them by their respective lengths. Therefore,
(2) |
But this is very cumbersome to write, so we instead write them as
where
and, similarly, where are known as scale factors (or metric coefficients).
Title | derivation of unit vectors in curvilinear coordinates |
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Canonical name | DerivationOfUnitVectorsInCurvilinearCoordinates |
Date of creation | 2013-03-22 17:02:05 |
Last modified on | 2013-03-22 17:02:05 |
Owner | swapnizzle (13346) |
Last modified by | swapnizzle (13346) |
Numerical id | 10 |
Author | swapnizzle (13346) |
Entry type | Topic |
Classification | msc 53A45 |