Answer:
a) 1111.0 seconds
b) 833.3 s
c) Because of proportions
Explanation:
a) Total time of round trip is the sum of time upriver and time downriver
[tex]t_{total}=t_{up}+t_{down}[/tex]
Time upriver is calculated with the net speed of student and 0.500 km:
[tex]t_{up}=\frac{d_{istance}}{|v_{swimmer}|} ;\\v_{swimmer}=v_{relative to river}+v_{river}=-1.2+0.6=-0.6 m/s\\t_{up}=\frac{500 m}{0.6 m/s}=833.3 s[/tex]
(Becareful with units 0.5 km= 500m) Similarly of downriver:
[tex]t_{down}=\frac{d_{istance}}{|v_{swimmer}|} ;\\v_{swimmer}=1.2+0.6=1.8 m/s\\t_{down}=\frac{500 m}{1.8 m/s}=277.7 s[/tex]
So the sum is:
[tex]t_{total}=1111.0s[/tex]
b) Still water does not affect student speed, so total time would be simply:
[tex]t_{total}=\frac{1000 m}{1.2 m/s}=833.3 s[/tex]
c) For the upriver trip, student moved half the distance in half speed of the calculation in b), so it kept the same ratio and therefore, same time. So the aditional time is actually the downriver.
