Step-by-step explanation:
Let average velocity of outgoing trip = x mph
The average velocity on the return trip is 15 miles per hour slower than the average velocity on the outgoing trip.
Average velocity of return trip = (x-15) mph
Distance to vacation place = 420 miles
Distance to vacation place = Time for outgoing trip x average velocity of outgoing trip
[tex]420=t_1\times x\\\\t_1=\frac{420}{x}[/tex]
Distance to vacation place = Time for return trip x average velocity of return trip
[tex]420=t_2\times (x-15)\\\\t_2=\frac{420}{(x-15)}[/tex]
We have total time T = t₁ + t₂
That is
[tex]T=\frac{420}{x}+\frac{420}{(x-15)}[/tex]
Time required to complete the round trip [tex]T=\frac{420}{x}+\frac{420}{(x-15)}[/tex] where x is average velocity on the outgoing trip.
