Respuesta :
Speed up to Mississippi Rive = 12 mph
Speed back to original port = 15 mph
Total time taken by the riverboat = 7.5 hours
Total distance covered = ?
We know that the distance covered each side would be the same.
So Distance up to Mississippi Rive = Distance back to original port
⇒ [tex]{\text} Speed up to Mississippi Rive * Time taken to reach Mississippi Rive = Speed back to the original port * Time back to the original port[/tex] .......... (i)
Let Time taken to reach Mississippi Rive = x .............. (ii)
⇒ Time taken to reach back to original port = 7.5 - x .......... (iii)
Substituting (ii) and (iii) in (i)
⇒ [tex]{\text} 12 * x = 15 * (7.5 - x) [/tex]
⇒ [tex]{\text} 12x = 112.5 - 15x [/tex]
⇒ [tex]{\text} 27x = 112.5 [/tex]
⇒ [tex]{\text} x = [tex]\frac{112.5}{27}[/tex] [/tex]
Using value of x to determine distance traveled:
Distance Traveled up to Mississippi Rive = [tex]{\text}Speed up to Mississippi Rive * Time taken to reach Mississippi Rive[/tex]
⇒ Distance Traveled up to Mississippi Rive = [tex]{\text}12 * \frac{112.5}{27}[/tex]
⇒ Distance Traveled up to Mississippi Rive = 50 miles
Hence, the riverboat traveled total of 50 + 50 = 100 miles
Since this is a round trip the journey covered the same distance.
Let [tex]t_1[/tex] represent the time and
[tex]d[/tex] represent the distance in the first.
We were told that the boat traveled at 12 mph
[tex]12=\frac{d}{t_1}[/tex]
[tex]\frac{d}{12}=t_1[/tex]
Let [tex]t_2[/tex] represent the time and
[tex]d[/tex] represent the distance in the return trip.
During this returned trip the boat travelled at 15mph
[tex]t_2=\frac{d}{15}[/tex]
Adding the total time should give us 7.5 hours
[tex]\frac{d}{15}+\frac{d}{12}=7.5[/tex]
[tex]\frac{3}{20}d=7.5[/tex]
[tex]d=\frac{7.5}{\frac{3}{20}}[/tex]
[tex]d=50[/tex]
The total distance traveled is
[tex]d+d=50+50=100[/tex] miles
