Difference between revisions of "Forest Relativity Notes"
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== Proper Length== | == Proper Length== | ||
− | ; Proper Length<math> (c\Tau)</math>: | + | ; Proper Length<math> (c\Tau)</math>: The length of an object in the object's rest frame. |
=Invariant Length= | =Invariant Length= |
Revision as of 17:06, 30 October 2007
Lorentz Transformations
The picture below represents the relative orientation of two different coordinate systems
. is at rest (Lab Frame) and is moving at a velocity v to the right with respect to frame .The relationship between the coordinate
of an object in frame to the same object described using the coordinates in frame is geven by the Lorentz transformation:where
- example
- Or in matrix form the tranformation looks like
- Note
- Einstein's summation convention drops the symbols and assumes it to exist whenever there is a repeated subscript and uperscript
- ie;
- in the example above the symbol is repeated thereby indicating a summation over .
Trig Method
Another way to represent the lorentz transformation is by using the substitution
- The Matrix form pf the tranformation looks like
- Or the reverse transformation
- Notice that you just needed to change the signs for the inverse matrix
Proper Time and Length
Proper Time
- Proper Time
- The time measured in the rest frame of the clock. The time interval is measured at the same x,y,z coordinates because the clock chose is in a frame which is not moving (rest frame).
The time given in any frame (t) =
- Note
- since you expect the Proper time interval to be the smallest
Proper Length
- Proper Length
- The length of an object in the object's rest frame.