Answer:
[tex]\dfrac{12}{4c}+\dfrac{12}{6c}=\dfrac{5}{2}[/tex] - choice B
Step-by-step explanation:
Let c miles per hour be the rate of the river current. If the rate at which the boat travels in still water is 5 times the rate of the river current, then the rate of the boat is 5c miles per hour.
1. Upstream the rate of the boat is 5c-c=4c miles per hour. To overcome 12 miles upstream it is needed
[tex]\dfrac{12}{4c}=\dfrac{3}{c}\ hours.[/tex]
2. Downstream the rate of the boat is 5c+c=6c miles per hour. To overcome 12 miles downstream it is needed
[tex]\dfrac{12}{6c}=\dfrac{2}{c}\ hours.[/tex]
2. The total time is
[tex]\dfrac{3}{c}+\dfrac{2}{c}=\dfrac{5}{c}\ hours.[/tex]
If the excursion boat on the river takes 2½ hours to make the trip to a point 12 miles upstream and to return, then
[tex]\dfrac{5}{c}=2\dfrac{1}{2}.[/tex]
Solve this equation:
[tex]\dfrac{5}{c}=\dfrac{5}{2},\\ \\c=2\ mi/h.[/tex]
This equation was obtained as
[tex]\dfrac{12}{4c}+\dfrac{12}{6c}=\dfrac{5}{2}.[/tex]
Answer:
3.[12/(4c)] + [12/(6c)] = 2.5
Step-by-step explanation:
let,
c = current rate
And
5c = boat rate in the still water
so,
5c - c = 4c is the effective upstream speed
And
5c + c = 6c is the effective downstream speed
We write an equation for time:
time = distance/rate
up time + down time = 2.5 hrs
The equation we use to solve this is:
[12/(4c)] + [12/(6c)]= 2.5 .
now
multiply whole equation(left hand side and right hand side both) by 12c:
[12/(4c)] + [12/(6c)]*12c= 12c*(2.5)
and you will get following equation:
3(12) + 2(12) = 30c
36 + 24 = 30c
60 = 30c
c = 60/30
the rate of of the current is:
c = 2
