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The problem statement:

Distance between two stations A and B is 230 km. Two motorcyclist starts simultaneously from A and B in opposite directions and the distance between them after 4 hours is 50 kms. Speed of each of them in km/hr is:

$$ (a) 40, 30 \quad \quad (b)27, 17 \quad \quad (c) 50,40 \quad \quad (d)None $$

The suggested answer is (a) and in the solution it is stated that "Total distance covered here is $280$ kms $(230+50)$ and not $180$ kms $(230-50)$".

But I am not getting this reasoning, could somebody explain me why are we adding instead of subtracting?

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There are two cases: either they haven't met - or they have met. If they haven't the total distance is $230-50 = 180$ and hence the sum of speed is $45$. No answer fits. While if we assume that they have met on their path - then they done these $50$km after they met - so we add them to $230$km they have done before they met and obtain $280$. As a result, the sum of speeds is $70$ - and we have an answer (a) which fits this result.

The case that they were going in the opposite directions, but not from $A$ to $B$ and from $B$ to $A$ cannot happen since after some time the distance has decreased. While it could happen on a sufficiently small sphere, though - it's unlikely that it was meant in this problem.

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    This was my reasoning when I first attempt the problem, but the problem setters (seem to) have a different point of view.2012-02-22
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    @Foool: Since you've posted your comment before I've put the whole version of the answer, I am not sure if your comment still applies.2012-02-22
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    Well, given the "None" as one of the option, this seems to be a very tricky problem that requires a student to take care of both cases before he/she chooses an option.2012-02-22
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    @Foool Think of $\begin{align} 4v_1+4v_2 &= 230 \pm 50\\ (v_1+v_2) &= 57.5 \pm 12.5\\ &= 70 \vee 45 \end{align}$2012-02-23