Write a model in simplified form for the total time t (in hours) of the trip:
[tex]Total\ time\ taken = \frac{3}{r} + \frac{4}{0.5r} + \frac{1}{r+1}\\[/tex]
It takes 2.95 hours when r is 4 miles per hour
Solution:
Given that,
You travel 3 miles downstream in a kayak at a speed of r miles per hour
Downstream:
Speed = r miles per hour
Distance = 3 miles
Time taken is given as:
[tex]Downstream\ time = \frac{distance}{speed}\\\\Downstream\ time = \frac{3}{r} ------- eqn\ 1[/tex]
You turn around and travel 4 miles upstream at a speed of 0.5r miles per hour
Upstream:
Speed = 0.5r miles per hour
Distance = 4 miles
Therefore,
[tex]Upstream\ time = \frac{4}{0.5r} -------- eqn 2[/tex]
Finally, you turn around and return to your original starting point at a speed of r + 1 miles per hour
Therefore,
[tex]time = \frac{1}{r+1} ----------- eqn\ 3[/tex]
a)Write a model in simplified form for the total time t (in hours) of the trip
The total time taken is:
eqn 1 + eqn 2 + eqn 3
[tex]Total\ time\ taken = \frac{3}{r} + \frac{4}{0.5r} + \frac{1}{r+1}\\[/tex]
b)How long does your trip take when r is 4 miles per hour?
Substitute r = 4
[tex]Total\ time\ taken = \frac{3}{4} + \frac{4}{0.5 \times 4} + \frac{1}{4+1}\\\\Total\ time\ taken = 0.75 + 2 + 0.2\\\\Total\ time\ taken = 2.95[/tex]
Thus it takes 2.95 hours when r is 4 miles per hour
