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22 May 2021, 04:22
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C
Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
Difficulty:
95%
(hard)
Question Stats:
43% (02:23) correct
57%
(02:42)
wrong
based on 145
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Two boats on the opposite shores of a river start moving towards each other. When they pass each other they are 750 yards from one shoreline. They each continue to the opposite shore, immediately turn around and start back. When they meet again they are 250 yards from the other shoreline. Each boat maintains a constant speed throughout. How wide is the river?
(A) 2400 yards
(B) 3000 yards
(C) 2000 yards
(D) 4000 yards
(E) None of these
(A) 2400 yards
(B) 3000 yards
(C) 2000 yards
(D) 4000 yards
(E) None of these
22 May 2021, 05:56
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Attachment:
Untitled111.png [ 42.41 KiB | Viewed 20552 times ]
Let the boats be B1 and B2 starting form two ends A and B respectively.
The movement of B1 is shown by blue lines, while that of B2 is shown by brown lines.
Boats meet two times, first at C and then at D, as shown n the sketch.
1) At C
B1 has traveled x and B2 has traveled 750.
As the time both took is the same, the ratio of the speed of B1:B2=x:750
2) At D
B1 has traveled (750)+(x+500) or x+1250, and B2 has traveled x+250.
Similarly here ratio of speed of B1:B2=(x+1250):(x+250)
TWO APPROACHES from here on
(I) LOGICAL but simpler
First time they meet, B2 has traveled 750 in a combined total of one width of river.
Next time they meet, they have covered three times the width of river within themselves, so B2 will cover 750 for each width and hence 750*3=2250 yards when they meet at D.
But the distance B2 travels is also equal to the width + 250 yards.
Hence width+250=2250 or width=2250-250=2000
(II) Taking RATIO of speeds
Thus x:750=x+1250:x+250
\(\frac{x}{750}=\frac{x+1250}{x+250}\)
\(x^2+250x=750x+750*1250\)
\(x^2-500x-750*1250=0\)
\(x^2-1250x+750x-750*1250=(x-1250)(x+750)=0\)
So x is 1250 or -750, but x>0, so x=1250.
Width of river = x+750=1250+750=2000
General Discussion
22 May 2021, 12:44
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There are two variables here we need to watch out for:
(1) Ratio of their speeds
(2) Width of the river.
The ratio of their speed determines at which point they meet, so their individual speeds are not as important.
Another hint, all the choices are above 2000 so we know 750 marks the distance of the slower boat if we want to find an answer within the choices.
Set the width of the river as W and the ratio of their speeds as r, where r < 1.
The first time they meet: \(\frac{r}{1 + r} = \frac{750}{W - 750}\)
Second time they meet: \(\frac{r}{1 + r} = \frac{W + 250}{W + (W - 250)}\)
\(\frac{750}{W - 750} = \frac{W + 250}{W + (W - 250)}\)
\(750*(2W - 250) = W^2 - 500W - 250*750\)
\(W^2 - 2000W= 0\)
\(W = 2000\)
Ans: C
