To solve this problem, we need to determine the relationship between the variables given: the boy's speed before reduction (p km/h), the reduction in speed due to slippery ground (q km/h), and the time taken to cover the distance (r hours).
The boy's effective speed after reduction is (p - q) km/h. Given that the boy covers a distance of 1 km, we can use the formula:
Time = Distance / Speed
Substituting the given values into this equation, we have:
r = 1 / (p - q)
Rearranging the equation, we get:
1 / r = (p - q)
Thus, the correct condition is that the reciprocal of the time taken is equal to the effective speed after reduction, which matches the option:
A flight, traveling to a destination 11,200 kms away, was supposed to take off at 6:30 AM. Due to bad weather, the departure of the flight got delayed by three hours. The pilot increased the average speed of the airplane by 100 km/hr from the initially planned average speed, to reduce the overall delay to one hour.
Had the pilot increased the average speed by 350 km/hr from the initially planned average speed, when would have the flight reached its destination?