Answer: 2250 tours
Explanation:
We have the following data:
Speed of light: [tex]c=3(10)^{8}m/s[/tex]
Circumference of the equador: [tex]r=4(10)^{4}km \frac{1000 m}{1 km}=4(10)^{7}m[/tex]
The time in which light turns around equator: [tex]t=5 min \frac{60 s}{1 min}=300 s[/tex]
We need to find how many tours does light do around the equator in [tex]t=300 s[/tex]
Let's begin by the expression of the speed, which is a relation between the traveled distance ([tex]d[/tex]) and time:
[tex]c=\frac{d}{t}[/tex] (1)
Isolating [tex]d[/tex]:
[tex]d=c.t[/tex] (2)
[tex]d=(3(10)^{8}m/s)(300 s)[/tex] (3)
[tex]d=9(10)^{10}m[/tex] (4) This is the distance light travels in 5 min.
Now we need to know to how many tours is this distance equivalent, we can know this by a Rule of three:
1 tour ---- [tex]r[/tex] (circumference of the equator)
? tour ---- [tex]d[/tex]
Then:
[tex]?=\frac{(1 tour)(d)}{r}[/tex]
[tex]?=\frac{(1 tour)(9(10)^{10}m)}{4(10)^{7}m}[/tex]
[tex]?=2250 tours[/tex] This is the count of tours in 5 minutes.
