Answer:
The distance of the star is [tex]3.40x10^{16}[/tex] meters
Explanation:
It is known that the speed of light has a value of [tex]3x10^{8}m/s[/tex] in vacuum. That is, it travels [tex]3x10^{8]m[/tex] in one second, according with the following equation:
[tex]v = \frac{x}{t}[/tex]
Where v is the speed, x is the distance and t is the time.
[tex]x = v\cdot t[/tex] (1)
Equation 1 can be used to determine the distance that the light travels in 1 year:
It is necessary to find how many seconds are in 1 year (365.25 days).
[tex]365.25 days \cdot \frac{86400s}{1 day}[/tex] ⇒ [tex]31557600s[/tex]
[tex]x = (3x10^{8}m/s)(31557600s)[/tex]
[tex]x = 9.46x10^{15}m[/tex]
Therefore, in 1 year, light travels [tex]9.46x10^{15}[/tex] meters.
If the distance to a star is 3.6 light-years, what is this distance in meters?
A simple conversion between units can be used to get the distance in meters
[tex]x_{star} = 3.6ly \cdot \frac{9.46x10^{15}m}{1ly}[/tex] ⇒ [tex]3.40x10^{16}m[/tex]
Hence, the distance of the star is [tex]3.40x10^{16}[/tex] meters.
