Answer:
Distance to halfway point=45 km
Wilson's Time=5hrs
Joseph's time=6.26hrs
Step-by-step explanation:
-Let x be the number of hours it takes for the two to meet halfway when Wilson starts his ride.
#The time already utilized prior to Wilson's start is:
[tex]Speed=\frac{Distance}{Time}\\\\Time=\frac{10}{7}\\\\=\frac{10}{7}\ hrs[/tex]
Joseph's remaining distance to the hallway point is less by 10km
Since, the distance to meet is equal, we equate their times as:
[tex]Time=\frac{Distance}{Speed}\\\\\frac{d-10}{7}=\frac{d}{9}\\\\9d-90=7d\\\\2d=90\\\\d=45\ km\\\\(d-10)=35\ km[/tex]
Hence, the distance ridden by each to the halfway point is 45 km
#We now use this distance to solve for individual times:
[tex]Time=\frac{Distance}{Speed}\\\\\#Joseph\\\\T_j=\frac{10}{7}+\frac{35}{7}\\\\=6\frac{3}{7}\ hrs \ or \ 6.26\ hrs\\\\\#Wilson\\\\T_w=\frac{45}{9}\\\\=5\ hrs[/tex]
Hence, Joseph takes 6.26hrs while Wilson takes 5hrs to get to the halfway point.
