A man reaches his office late by 15 minutes if he drives his car at 30 km/hr,…
2025
A man reaches his office late by 15 minutes if he drives his car at 30 km/hr, and reaches his office early by 5 minutes if he drives his car at 40 km/hr. Which of the following is closest to the speed (in km/hr) at which he should drive to reach the office on time?
- A.
46
- B.
48
- C.
36
- D.
52
- E.
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Attempted by 54 students.
Show answer & explanation
Correct answer: C
Concept: In a “reach on time” speed-time-distance problem with two trial speeds (one giving a late arrival, one giving an early arrival), treat the on-time travel duration T and the distance D as unknowns. Each trial speed gives a travel time equal to T adjusted by the stated lateness/earliness, and distance = speed × time must be the SAME D in both cases — equating the two expressions for D pins down T and D, after which the required speed is simply D ÷ T.
Application:
Let T (hours) be the time needed to reach exactly on time, and D (km) the distance to the office.
At 30 km/hr he is 15 min (0.25 h) late, so his travel time is T + 0.25 h, giving D = 30(T + 0.25).
At 40 km/hr he is 5 min (1/12 h) early, so his travel time is T − 1/12 h, giving D = 40(T − 1/12).
Equate the two expressions for D: 30(T + 0.25) = 40(T − 1/12) → 30T + 7.5 = 40T − 3.333 → 10T = 10.833 → T = 13/12 h (65 minutes).
Substitute back: D = 30(13/12 + 1/4) = 30 × 4/3 = 40 km.
Required speed = D ÷ T = 40 ÷ (13/12) = 480/13 ≈ 36.92 km/hr.
Cross-check: using the second equation, D = 40(13/12 − 1/12) = 40 × 1 = 40 km, which matches — the distance and time are consistent both ways.
Note: 480/13 is not a whole number, so the exact required speed (≈ 36.92 km/hr) does not fall exactly on any offered whole-number option. Since the question asks for the value closest to the required speed, 36 km/hr is the intended answer — it differs from the exact figure by under 1 km/hr, whereas every other offered speed is off by roughly 9 km/hr or more.