Unravelling Metrics of Spacetime

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In a space time with metrics :
ds^2=f(t)(-dt^2+dx^2+dy^2+dz^2)

which is the unit that measures time t?

second?, meter of time?
 
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For dimensional consistency it would have to be the same units that dx, dy, and dz are measured in.
 
DaleSpam said:
For dimensional consistency it would have to be the same units that dx, dy, and dz are measured in.

then , if dx,dy and dz are in meters, then t is in meters of time?
 
alejandrito29 said:
then , if dx,dy and dz are in meters, then t is in meters of time?
A "metre of time" is the time it takes for light to travel one metre, i.e. (1/299792458) seconds.

Or you could measure dx, dy and dz in light-seconds and then dt is in seconds.
 
to be explicit, a c^2 should appear before dt^2 to explicitly convert time into units of distance. But, in relativistic units c=1 so we just omit the c and it's understood.
 

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