Answer:
15 miles
Step-by-step explanation:
Let [tex]x[/tex] be the miles in the circular park path, [tex]t_{L}[/tex] the time Louisa takes to finish and [tex]t_{C}[/tex] the time Calvin takes to finish both in hours.
Then [tex]x[/tex], the longitude is equal to the velocity times the time used to finish. So
[tex]x=5t_{L}[/tex]
[tex]x=6t_{C}[/tex]
And the difference between Louisa's time and Calvin' time is 30 minutes, half an hour. So:
[tex]t_{C}=t_{L}-0.5[/tex]
Three equations, three unknowns, the system can be solved.
Equalizing the equation with x :
[tex]5t_{L}=6t_{C}[/tex]
In this last equation replace [tex]t_{C}[/tex] with the other equation and solve:
[tex]5t_{L}=6(t_{L}-0.5)\\ 5t_{L}=6t_{L}-3\\ 3=6t_{L}-5t_{L}\\ 3=t_{L}\\ t_{L}=3[/tex]
With Louisa's time find x:
[tex]x=5t_{L}\\ x=5(3)\\ x=15[/tex]
