Key Concepts and Formulas:

• Train Passing a Stationary Object (Pole, Man, Electric Post):

  • When a train passes a stationary object that has negligible length (like an electric post, a pole, or a standing man), the distance covered by the train is equal to its own length.

  • Formula: Distance = Speed × Time. If L is the length of the train and S is its speed, and T is the time taken to pass the object, then L = S × T.

• Two Trains Passing Each Other (Opposite Directions):

  • When two trains move towards each other (in opposite directions), their speeds add up to give the relative speed.

  • The total distance covered for them to completely pass each other is the sum of their individual lengths.

  • Formula: If Train 1 has length L1 and speed S1, and Train 2 has length L2 and speed S2, and they take time T to pass each other, then (L1 + L2) = (S1 + S2) × T.

Step-by-Step Derivation:

• Let S1 be the speed of the first train and L1 be its length.

• Let S2 be the speed of the second train and L2 be its length.

• From the first condition: The first train passes an electric post in 20 seconds.

  • The distance covered by the first train is its own length, L1.

  • Therefore, L1 = S1 × 20.

• From the second condition: The second train passes an electric post in 30 seconds.

  • The distance covered by the second train is its own length, L2.

  • Therefore, L2 = S2 × 30.

• From the third condition: Both trains pass each other in 23 seconds while moving in opposite directions.

  • The relative speed when moving in opposite directions is the sum of their speeds: S1 + S2.

  • The total distance covered for them to pass each other is the sum of their lengths: L1 + L2.

  • Therefore, (L1 + L2) = (S1 + S2) × 23.

• Substitute the values of L1 and L2 into the third equation:

  • (20S1 + 30S2) = (S1 + S2) × 23

  • 20S1 + 30S2 = 23S1 + 23S2

• Rearrange the terms to group S1 and S2:

  • 30S2 - 23S2 = 23S1 - 20S1

  • 7S2 = 3S1

• Find the ratio of their speeds (S1 : S2):

  • Divide both sides by S2 and by 3:

  • S1 / S2 = 7 / 3

  • Hence, the ratio of the speeds of the trains is 7 : 3.