How do I work out units of velocity from light years?

AI Thread Summary
To calculate the velocity of a spaceship traveling six light-years in 2.5 years, the equation derived gives a velocity of 2.4, but there is confusion regarding the units. The correct interpretation of the units is light years per year, which simplifies when considering the speed of light, denoted as c. By setting c to 1, the calculations align correctly, allowing for a straightforward comparison of velocities. The discussion emphasizes the importance of unit consistency in relativistic equations. Understanding these concepts is crucial for solving problems involving relativistic speeds.
chloeid
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Homework Statement


I'm currently working through the following question:

"A spaceship travels from Earth to the vicinity of the star that is measured by astronomers on Earth to be six light-years away. The spaceship and its occupants have a total rest mass of 32 000 kg. Assume that the spaceship travels at constant velocity. The time taken as measured by clocks on the spaceship is 2.5 years. Compute the velocity of the spaceship."

Homework Equations



I have derived this equation which gives a velocity of 2.4 but I am confused about the units of this.

lelYy.jpg


The Attempt at a Solution



I thought automatically that the units would be light years per year but that doesn't make any sense? Or do the units cancel out somehow?

Thank you!
 
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How did you get 2.4 from that equation?
 
PeroK said:
How did you get 2.4 from that equation?

As t' is 2.5 years and x is 6 light years I substituted them into the equation :)
 
chloeid said:
As t' is 2.5 years and x is 6 light years I substituted them into the equation :)
What about ##c##?
 
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Another way to do this is to reason it out by comparing it with something familiar. A car that takes 3 times as long as another car to go from A to B must be traveling by what fraction of the faster car's speed?
 
kuruman said:
Another way to do this is to reason it out by comparing it with something familiar. A car that takes 3 times as long as another car to go from A to B must be traveling by what fraction of the faster car's speed?
If I do this then I get a speed bigger than C!

PeroK said:
What about ##c##?

Ah thank you so much! I set c to 1 and got the right answer :)
 
chloeid said:
Ah thank you so much! I set c to 1 and got the right answer :)

If you go back to your original equation and divide by ##c## you get an expression for ##\frac{u}{c}##.

The key term on the right hand side is then:

##\frac{c^2t^2}{x^2}##

Now, if ##x## is measured in light years or light seconds, (and ##t## in years or seconds, as appropriate) then you can write this as ##c##.years or ##c##.seconds and the ##c^2## cancels out.

Alternatively, of course, you can imagine you are using ##c=1## units
 
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