- #1
theneedtoknow
- 176
- 0
The spacetime interval s between two events is s^2 = c^2*t^2 - x^2 where t is the time between the 2 events and x is the distance between the 2 events in a given frame of reference.
What is the general condition on s such that two events cannot be simultaneous in any
frame?
I don't really understand the question..
What am i supposed to do?
I mean...the shortest possible time between 2 events is 0, so picking a reference frame in which they are simultaneous, the spacetime interval between them would simply be the distance x between them
or
s = root (-x^2)
which is not a real number...(even though I think the spacetie interval can be imaginary)
So if the time between any 2 events is more than 0, then the spacetime interval would be greater than root (-x^2) since we'd be substracting -x^2 from a number larger than zero...so is the restriction that if s is less than root (-x^2), then 2 events can' tbe simultaneous in any frame?
Can someone please tell me if I am on the right track at all??
What is the general condition on s such that two events cannot be simultaneous in any
frame?
I don't really understand the question..
What am i supposed to do?
I mean...the shortest possible time between 2 events is 0, so picking a reference frame in which they are simultaneous, the spacetime interval between them would simply be the distance x between them
or
s = root (-x^2)
which is not a real number...(even though I think the spacetie interval can be imaginary)
So if the time between any 2 events is more than 0, then the spacetime interval would be greater than root (-x^2) since we'd be substracting -x^2 from a number larger than zero...so is the restriction that if s is less than root (-x^2), then 2 events can' tbe simultaneous in any frame?
Can someone please tell me if I am on the right track at all??