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?

  1. A.

    46

  2. B.

    48

  3. C.

    36

  4. D.

    52

  5. E.

    Question not attempted

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:

  1. Let T (hours) be the time needed to reach exactly on time, and D (km) the distance to the office.

  2. 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).

  3. 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).

  4. 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).

  5. Substitute back: D = 30(13/12 + 1/4) = 30 × 4/3 = 40 km.

  6. 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.

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