Don uses his small motorboat to go 4 miles upstream to his favorite fishing spot. Against the current, the trip takes $\frac{1}{2}$ $1/2$ hour. With the current, the trip takes $\frac{1}{4}$ $1/4$ hour. How fast can the boat travel in still water? What is the current's speed?

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Don uses his small motorboat to go 4 miles upstream to his favorite fishing spot. Against the current, the trip takes $\frac{1}{2}$ $1/2$ hour. With the current, the trip takes $\frac{1}{4}$ $1/4$ hour. How fast can the boat travel in still water? What is the current's speed?

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Answer 1 · 2018-01-15T11:19:23

Speed of boat=12 miles per hour
Speed of current = 4 miles per hour

Explanation:

Let speed of motorboat be x
Speed of current be y

During downstream,
Distance=4 miles.
Time = $\frac{1}{4}$ $1/4$ hours
Speed=x+y(with the current)
Distance/time = x+y
$\frac{4}{0.25} = x + y$ $4/0.25 = x+y$
16 = x+y

During upstream,
Distance=4 miles
Time= $\frac{1}{2}$ $1/2$ hours
Speed=x-y(against the current)
$\frac{4}{0.5}$ $4/0.5$ = x-y
8 = x-y

From these two equations you can calculate the value of x and y that are 12 and 4 respectively .

Hope it helps you

Answer 2 · 2018-01-15T11:20:03

The boat's speed (on still water) is at $12$ $12$ miles per hour and the current speed is at $4$ $4$ miles per hour.

Explanation:

We know that distance equals to speed multiplied by time.

In the problem, Don has to go $4$ $4$ miles upstream. Thus, the distance traveled is $4$ $4$ .

While going upstream, the time taken is $\frac{1}{2}$ $1/2$ hours. Suppose that his speed is $d$ $d$ and the current's speed is $c$ $c$ . Since he is going against the current, the net speed is $d - c$ $d-c$ . Thus, $4 = \frac{1}{2} \cdot (d - c)$ $4=1/2*(d-c)$ .

While going downstream, the time takes $\frac{1}{4}$ $1/4$ hours. Supposing again that his speed is $d$ $d$ and the current's speed is $c$ $c$ , going with the current means that the net speed is $d + c$ $d+c$ . Thus, $4 = \frac{1}{4} \cdot (d + c)$ $4=1/4*(d+c)$ .

So now we have two simultaneous equations:
${(4=1/2*(d-c)=1/2*d-1/2*c),(4=1/4*(d+c)=1/4*d+1/4*c):}$

Multiply both sides of the second equation by $2$ and add the first and second equation, eliminating the constant $c$ :
$4+4*2=1/2*d-1/2*c+2*(1/4*d+1/4*c)$
$12=d$

Since the first equation states that $4=1/2*d-1/2*c)$ , substituting the known value $d=12$ reveals that $4=1/2*12-1/2*c$ , or $c=4$ .

Thus, we have the boat's speed (on still water) at $12$ miles per hour and the current speed at $4$ miles per hour.

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Don uses his small motorboat to go 4 miles upstream to his favorite fishing spot. Against the current, the trip takes $\frac{1}{2}$ $1/2$ hour. With the current, the trip takes $\frac{1}{4}$ $1/4$ hour. How fast can the boat travel in still water? What is the current's speed?

2 Answers

Explanation:

Explanation:

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2 Answers

Explanation:

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Don uses his small motorboat to go 4 miles upstream to his favorite fishing spot. Against the current, the trip takes $\frac{1}{2}$ $1/2$ hour. With the current, the trip takes $\frac{1}{4}$ $1/4$ hour. How fast can the boat travel in still water? What is the current's speed?