Let the speed of the water current be v.
total travel time = time to go upstream + time to return downstream to the starting point
Hence, 8 = time in hours = 6 / (4-v) + 6 / (4 +v) = 6*8/(16-v^2)
Hence, 16 - v^2 = 6, or v^2 = 10 or v = √10 miles / hour
Answer:
The correct option is: c. 3.16 miles per hour.
Step-by-step explanation:
Suppose, the rate of the current [tex]= x[/tex] mph.
Speed of the boat is [tex]4[/tex] mph in still water.
So, speed of the boat in upstream [tex]= (4-x)[/tex] mph and speed of the boat in downstream [tex]=(4+x)[/tex] mph
We know, [tex]Time= \frac{Distance}{Speed}[/tex]
For upstream, distance [tex]= 6[/tex] miles and speed [tex]=(4-x)[/tex] mph
So, the time taken in upstream [tex]=\frac{6}{4-x}[/tex] hours
For downstream, distance [tex]= 6[/tex] miles and speed [tex]=(4+x)[/tex] mph
So, the time taken in downstream [tex]= \frac{6}{4+x}[/tex] hours
Now the total time taken for upstream and downstream is [tex]8[/tex] hours, so the equation will be.....
[tex]\frac{6}{4-x}+\frac{6}{4+x}= 8\\ \\ \frac{24+6x+24-6x}{(4-x)(4+x)}=8\\ \\ \frac{48}{16-x^2}=8\\ \\ 8(16-x^2)=48\\ \\ 16-x^2=\frac{48}{8}\\ \\ 16-x^2=6\\ \\ -x^2=6-16\\ \\ -x^2=-10\\ \\ x^2=10\\ \\ x=\sqrt{10}\approx 3.16[/tex]
So, the rate of the current is 3.16 miles per hour.
