Time Speed Distance
November 26, 2010 | 
Author Here’s and example of a SMART MATH problem for TIME SPEED DISTANCE.
Problem
Two trains travel in the same direction at 50 and 32 km/hr. A man in the slower train observes that it takes 15 seconds for the faster train to completely pass him. What is the length of the slower train?
- 75 meters
- 100 meters
- 160 meters
- 200 meters
- 250 meters
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Tags: Math Tricks, Mental Math, Smart Math, Time Speed Distance | 
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Here’s and example of a SMART MATH problem for TIME SPEED DISTANCE.
Problem
If I walk at 3 mph (miles per hour), I miss the train by 2 minutes. If however, I walk at 4 mph, I reach the station 2 minutes before arrival of the train. How far do I walk to reach the station?
mile
mile
- 1 mile
miles
miles
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Here’s and example of a SMART MATH problem for TIME SPEED DISTANCE.
Problem
A and B have to go from X to Y which are at a distance of 230 kms from each other. A drives at a constant speed of 100 kms/hr for the first 115 kms and then at an average speed of 50 kms/hr for the remaining distance. B starts with an initial speed of 50 kms/hr at X and drives with constant acceleration such that when he reaches Y, his speed is 100 kms/hr. Which of the following statement is true?
- A reaches Y first
- B reaches Y first
- A and B reach Y together
- Cannot calculate from given data
- None of these
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Here’s and example of a SMART MATH problem for TIME SPEED DISTANCE.
Problem
If a man walks to his office at 3/4th of his usual rate, he reaches office 1/3rd of an hour later than usual. How much time does he usually take to reach his office?
- 1/2 hour
- 1 hour
- 1/4 hour
- 3/2 hours
- 2/3 hour
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Here’s and example of a SMART MATH problem for TIME SPEED DISTANCE.
Problem
My watch is 1 minute slow at 1.00 pm on Tuesday and 2 minutes fast at 1.00 pm on Thursday. When did it show the correct time?
- 1.00 am on Wednesday
- 5.00 am on Wednesday
- 1.00 pm on Thursday
- 5.00 pm on Wednesday
- 5.00 pm on Thursday
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