Answer: Option B
:
B
Method 1:
Assume that the distance between the towns is x km. The first time the cars pass each other, the first car (from town A) has gone 70 km and the other has gone
(x-70)km. These distance were covered in the same time, so the ratio of the speeds of the cars is $\frac{70}{x-70}.$
The next time they meet, the first car has travelled (x+40) km and the second car has travelled (2x-40) km.Thus the ratio of the speeds is also equal to $\frac{(x+40)}{2x-40}.$ We can equate the two ratios to get $\frac{70}{x-70}=\frac{(x+40)}{2x-40}$, so 70(2x-40)=(x+40)(x-70). This gives $140x-2800=x^2-30x-2800$, so, x(x-170) =0. The towns are 170 km apart.
Method 2:Reverse Gear:
Go from answer options,
Since the time is constant in both cases, the distance ratios should also remain the same. Assuming that option (b) is correct
$\frac{70}{100}=\frac{210}{300}$
Hence,Distance Ratio 1 (first Meeting =Distance Ratio(Second Meeting) Our Assumption is correct. Answer os option (b)).