Time and Distance
Time and distance are related to the speed of a moving object.
Properties of Time and Work
• Distance traveled is proportional to the speed of the object if the time is kept constant.
• Distance traveled is proportional to the time taken if the speed of the object is kept constant.
• Speed is inversely proportional to the time taken if the distance covered is kept constant.
• If the ratio of two speeds for the same distance is a:b then the ratio of time taken to cover the distance is b:a
Speed
Speed is defined as the distance covered by an object in unit time.
Basic Formulas
Speed = ( Distance / Time )Distance = Speed * Time
Time = ( Distance / Speed )
Example sum
A van covers a distance of 690 km in 30h. What is the average speed of the car?
Speed = ( Distance / Time )
= 690 / 30
= 23 km/h
Relative Speed
If two objects are moving in the same direction with speeds of x and y then their relative speeds (x - y)
If two objects are moving in the opposite direction with speeds of x and y then their
relative speed is ( x + y )
Example sum
Two trains travel in opposite directions at 36 kmph and 45 kmph and a man sitting in slower train passes the faster train in 8
seconds. Find the length of the faster train?
Relative Speed = ( 36 + 45 ) km/hr
= 81 km/hr
Basic Formulas
A boy goes from A to B. If speed is 30km/hr ,he is late by 10 minutes. If speed is 40 km/hr,he reaches 5 minutes earlier, then distance from A to B is given by?
Time and distance are related to the speed of a moving object.
Properties of Time and Work
• Distance traveled is proportional to the speed of the object if the time is kept constant.
• Distance traveled is proportional to the time taken if the speed of the object is kept constant.
• Speed is inversely proportional to the time taken if the distance covered is kept constant.
• If the ratio of two speeds for the same distance is a:b then the ratio of time taken to cover the distance is b:a
Speed
Speed is defined as the distance covered by an object in unit time.
Basic Formulas
Speed = ( Distance / Time )Distance = Speed * Time
Time = ( Distance / Speed )
Example sum
A van covers a distance of 690 km in 30h. What is the average speed of the car?
Speed = ( Distance / Time )
= 690 / 30
= 23 km/h
Relative Speed
If two objects are moving in the same direction with speeds of x and y then their relative speeds (x - y)
If two objects are moving in the opposite direction with speeds of x and y then their
relative speed is ( x + y )
Example sum
Two trains travel in opposite directions at 36 kmph and 45 kmph and a man sitting in slower train passes the faster train in 8
seconds. Find the length of the faster train?
Relative Speed = ( 36 + 45 ) km/hr
= 81 km/hr
= 81*(5/18) m/sec = (45/2) m/sec | |
Length of the train = ( 45 /2) *8 m | |
= 180 m | |
Basic Formulas | |
If some distance is traveled at x km/hr and the same distance is traveled at y km/hr
Average speed of the whole journey
=[(2xy ) / (x + y) ] kmph
Example sum
=[(2xy ) / (x + y) ] kmph
Example sum
A person travels from A to B at a speed of 40 km/hr and returns by increasing his speed by 50%. What is his average speed
for both the trips?
Speed with which he travels from A to B =40 km/hr
Speed with which he travels from B to A =
[40*(100+50)/100]
= 60 km/hr
Average speed = (2 * 40 * 60 ) / ( 40 + 60)
= 48 km/hr
Basic Formulas
When you are given two different speeds (s1 and s2) for traveling through a certain distance, and total time (t) for these two
journeys:
Distance = [ (s1*s2) / (sl +s2 ) ]*t
Example sum
A boy goes from A to B at 3 km/hr,back from B to A at 2 km/hr.Total time for these two journeys is 5 hours, then
distance from A to B is given by:
Distance = ( Product of speeds / Addition of speeds ) * Time
Distance= [(3*2)/(3+2)]*5
= [ 6/5]*5
= 6 km
= [ 6/5]*5
= 6 km
Basic Formulas
When you are given two different speed (s1 and s2) for travelling through a certain distance, and total difference in time (t) is
given for these two journeys: Distance = [ (s1*s2)/(s2 - sl ) ] *t
Example sum
A boy goes from A to B. If speed is 30km/hr ,he is late by 10 minutes. If speed is 40 km/hr,he reaches 5 minutes earlier, then distance from A to B is given by?
Difference in time = 10 - (-5) [ earlier 5 min = (-5) ]
= 15 minutes
= (15/60) hr
= 1/4 hr
Distance = ( Product of speed / Difference of speed ) * Difference in time
= [(30 * 40)/(40-30)]*(1/4)
= (1200/10)*(1/4)
= 120*(1/4)
= [(30 * 40)/(40-30)]*(1/4)
= (1200/10)*(1/4)
= 120*(1/4)
= 30 km
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