TSD's basic ideas are used to solve problems involving motion in a straight line, relative motion, circle motion, trains, boats, clocks, races, and so on. Aside from that, these ideas can also be used to make new kinds of problems. Your ability to figure out how to solve these problems will only rest on how well you understand them.
Typically, 4-6 problems are asked on CAT exam every year. In addition to the CAT, nearly every aptitude test includes queries on TSD concepts.
Understanding Motion
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When a body goes from point A to point B at a distance of D, it takes some time (T) and a certain speed (S) to cross that distance.
Here's how T, S, and D are connected: T × S = D i.e., Time × Speed = Distance
Time = \(\frac{Distance}{Speed}\)
Average Speed = \(\frac{Toatal \ Distance}{Total\ Time\ Taken}\)
When Distances are equal:
Average speed= \(\frac{2xy}{x+y}\) (x & y are speeds)
Average speed= \(\frac{3xyz}{xy+yz+zx}\) (x, y & z are speeds)
If t1 and t2 be the original and changed time and S1 and S2 be the original and changed speeds, then
S1 x S2 = \(\frac{Distance\ * (S_1\sim S_2)}{(t_1 \sim t_2) }\)
t1x t2 = \(\frac{Distance\ * (t_1\sim t_2)}{(S_1 \sim S_2) }\)
Relative Motion with Two or More Bodies
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- When two bodies move in the same direction: If the speeds of the two bodies A and B be SA and SB, then their relative speed = SA −SB or SB −SA i.e., in the same direction the relative speed or effective speed between two bodies is the difference of their speeds. (The difference is always considered as positive)
-
When two bodies move in the opposite direction: If the speeds of the two bodies A and B be SA andSB, then their relative speed = S A + SB .
i. e. , in the opposite direction the relative speed or effective speed between two bodies is the sum of their speeds. - Remember If speed of A is SA and speed of B is SB and A takes tA time to cover MQ and B takes tB time to cover
MP, then \(\frac{S_A}{S_B}\) = \(\sqrt\frac{t_B}{t_A}\)
To and Fro Motion in a Straight Line
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This idea is merely an extension of the notion of relative motion between multiple dynamic (or moving) bodies.
(a) When two bodies start moving towards each other
If the initial distance (or gap) between two bodies A and B is D, and their respective velocities are SA and SB, then A and B must cover D units of distance to meet for the first time, regardless of their respective speeds.
- To meet, they travel distances proportional to their individual velocities.
- If the initial distance (or separation) between two bodies A and B is D, then A and B must travel D units of distance to meet for the first time.
- For each successive meeting (e.g., second, third, fourth, etc.), both A and B must travel an additional 2D distance; for example, to meet for the fourth time, they must travel a total of D + (3 x 2D) = 7D units of distance. For the seventh meeting, they must travel D + (6 x 2D) = 13D units of distance together. Therefore, for each successive meeting, they must travel an additional 2D distance.
NOTE:
Individually, they will cover the distances in proportion to their respective velocities regardless of the number of meetings. Thus, the total distance travelled for the nth meeting is equal to (2n – 1)D.
- When two bodies start moving towards the same direction
If the two bodies A and B begin at the same end of the track, their respective velocities are SA and SB, and the length of the track is D, then A and B must cover 2D units of distance to meet for the first time, regardless of their individual speeds.
- If the distance between two specific points (or locations) is D unit, they must traverse 2D distance for their initial meeting after beginning to travel. Since the quicker body reaches the next (or opposite) end before the slower body, and since the faster body begins its return before the slower body reaches the same opposite end, the two bodies meet somewhere between the two ends after travelling their respective distances at their individual velocities.
- For each consecutive meeting, they must travel 2D units further than the previous meeting. Therefore, for the nth rendezvous, they must traverse (n 2D) units of distance together.
- At any instant, the distances travelled by the bodies are proportional to the ratio of their velocities.
Concept Based on Trains
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- If two trains (or people) are going in different directions, their relative speed will be the same as the sum of their individual speeds.
- When two trains are going in the same direction, the difference between their speeds will be their relative speed.
- The distance between two points is always the same as the sum of their lengths.
- The distance to be travelled, such as a bridge, station, etc., is always equal to the sum of the length of the train and the length of the object.
- The distance between a pole, a person, a tree, etc., and the train is always equal to the length of the train.
- If a man is riding a train, the distance he has to go to cross another train is equal to the length of the train that is going or crossing him. In this case, the speeds of both trains will be taken into account.
Concept Based on Boats and Rivers (or streams)
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- When the boat and the river's stream (or current) move in the same direction, the boat's relative speed is the sum of the speeds of the boat and the river. This is what is called "downstream speed."
- When the boat goes against the flow of the river, or in the opposite way, its speed is the difference between its speed and the speed of the stream. It's called "upstream speed."
Let B be the speed of the boat in still water and C be the speed of the river current.
If B>C;
Downstream Speed D = (B + C)
Upstream Speed U = (B – C)
Speed of the boat in still water/ Speed of river B = \(\frac{D+ U}{2}\)
Speed of current (or stream) C = \(\frac{D-U}{2}\)
When the distance a boat travels upstream (against the flow of water) is the same as the distance it travels downstream (with the flow of water), then,
\(\frac{Time \ Taken \ by \ Boat \ in\ DS}{Time \ Taken\ by\ Boat\ in \ US}\) = \(\frac{Upstream \ Speed}{Downstream \ Speed}\)
Races
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Terminology
(i) Startup or headstart - When a runner lets another runner stay ahead of them in the same race, this is called a startup in the race.
(ii) Dead heat - When two or more runners cross the finish line at the same time, they are considered to have "finished" the race in a "dead heat."
Some More Useful Concepts
- When it is said that A can give B a start of x metres in a race of y meters, it means that in the same amount of time, B runs x metres less than A.
- In a race of y meters, if A beats B by t seconds, B is the loser and A is the winner. When A crosses the finish line, B is still a ways behind A. So, it takes B t seconds to go the rest of the way. So, we can figure out how fast loser (B) is going.
- Throughout the race there is always a certain relationship among runners i.e., they always maintain the ratio of speeds.
Circular Motion
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- When the entities are moving in opposite directions, their relative velocity equals the sum of their individual velocities.
- When two objects are travelling in the same direction, the speed between them is equal to the difference in their absolute speeds.
First Meeting
Let A and B be two runners
Time taken by them to meet for the first time = \(\frac{Length \ of \ Circular\ Track}{Relative\ Speed}\)
If A is the quickest runner and A meets B after tAB hours, A meets C after tAC hours, A meets D after tAD seconds/hours, etc., then A has met all the other runners for the first time. The LCM of the times it takes for A, B, C, D, etc. to finally meet for the first time is tAB.
First Meeting at the Starting Point
Assume that runner A is the quickest of all the runners and that he or she will meet runner B for the first time in tAB hours, runner C for the first time in tAC hours, runner D for the first time in tAD seconds/hours, and so on. The LCM of tAB, tAC, tAD, etc. is the time it takes for all of them to meet for the first time.
Previous Year Questions
Ques 1: Ram, Shyam and Hari went out for a 100 km journey. Ram and Hari started the journey in Ram’s car at the rate of 25 km/h, while Shyam walked at 5 km/h. After sometime, Hari got off and started walking at the rate of 5 km/h and Ram went back to pick up Shyam. All three reached the destination simultaneously. What was the number of hours required for the trip? (CAT 2016)
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Ans: Let us consider AB = x, BC = y and CD = z
Since it takes Ram the same amount of time to cover x + y + z at a speed of 25 km/h as it does for Shyam to cover x at a speed of 5 km/h, it follows that
In the same way, the time it takes Ram to travel x, y, and z at a speed of 25 km/h is the same as the time it takes Hari to travel z at a speed of 5 km/h.
So, we have y = 2x = 2z or x : y : z = 1 : 2 : 1
It implies that x = 25 km, y = 50 km and z = 25 km
=200/25= 8h
Ques 2: The distance through which a freely falling body drops is directly proportional to the square of the time for which it drops. If a body falls through 320 m in 8 s, then find the distance that the body falls through ...... m in the next 2 s. (CAT 2015)
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Ans: According to the question
d ∝ t 2 (d= distance, t= time)
d2/t2=d1/t1
d2/102=320/82
Distance travelled in the 9th and 10th second
= Distance travelled in 10 s − Distance travelled in 8 s
= 500 m − 320 m = 180 m
Ques 3: A ferry carries passengers to Rock of Vivekananda and back from Kanyakumari. The distance of Rock of Vivekananda from Kanyakumari is 100 km. One day, the ferry started for Rock of Vivekananda with passengers on board, at a speed of 20 km/h. After 90 min, the crew realised that there is a hole in the ferry and 15 gallons of sea water had already entered the ferry. Sea water is entering the ferry at the rate of 10 gallons/h. It requires 60 gallons of water to sink the ferry.
At what speed should the driver now drive the ferry, so that it can reach the Rock of Vivekananda and return back to Kanyakumari just in time before the ferry sinks? (Given, current of the sea water from Rock of Vivekananda to Kanyakumari is 2km/hr (CAT 2015)
- 40 km/h towards the Rock returning to Kanyakumari
- 41 km/h towards the Rock returning to Kanyakumari
- 42 km/h towards the Rock returning to Kanyakumari
- 35 km/h towards the Rock returning to Kanyakumari
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Ans: (C)
60 gallons of water is the maximum capacity that the ferry can hold. Only 45 gallons of water will sink the ferry as 15 gallons are already filled.
Water is entering at the rate of 10L/h. So the time taken before the ferry sinks = 45/10 = 4.5hrs
Since the boat was going against the current, it went 27 km in the first 1.5 hours.
i.e. (1.5x(20 – 2))
So, in the next 4.5 hours, the boat has to go 73 km (=100 - 27) to get to V and 100 km
to get back to K from V.
Using trial and error with all the options available:-
Option (a) , + = 4.36
Option (b), , + = 4.37
Option (c), , + = 4.46
Option (d), , + = 4.63
Option (d) is wrong because if it takes longer than 4.5 hours, the boat will sink.
According to (a) and (b), the ferry gets there too early to save time, which isn't
required since the ferry has 4.5 hours to make the trip.
So, (c) is the best answer.
Ques 4: P, Q and R start from the same place X at a km/h, (a + b) km/h and (a + 2b) km/h, respectively. If Q starts p h after P, then how many hours after R should start, so that both Q and R overtake P at the same time, where (a > 0, b > 0)? (CAT 2014)
- \(\frac{pa}{a+b}\)
- \(\frac{a}{p(a+b)}\)
- \(\frac{p(a+b)}{a+2b}\)
- \(\frac{pa}{a+2b}\)
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Ans: (D)
Distance covered by P in t hours.
X = at.
The time when Q overtakes P,
(a+b)(t-p)=at-ap+bt-bp
at-ap+bt-bp=at
t= \(\frac{p(a+b)}{b}\) --------(i)
When R starts q hours after Q has started.
Distance covered by R when he overtakes P
(a + 2b)(t - p - q) = at ---------(ii)
Substituting the value t from Eq (i) in Eq. (ii)
q= \(\frac{pa}{a+2b}\)
Ques 5: Two cars left simultaneously from two places P and Q and headed for Q and P, respectively. They crossed each other after x h. After that, one of the cars took y h to reach its destination while the other took z h to reach its destination. Which of the following always holds true? (CAT 2014)
- x= \(\frac{y+z}{z}\)
- x= \(\frac{2yz}{y+z}\)
- x= \(\sqrt{ yz}\)
- x= \(\frac{y^2+Z^2}{y+z}\)
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Ans: (C)
Let the speeds of the cars leaving P and Q be p km/h and q km/h, respectively.
Then, px = qy ---------(i)
and pz = qx ---------(ii)
After dividing Eq. (i) by Eq. (ii), we get
\(\frac{x}{z}\) = \(\frac{y}{x}\)
=> x = \(\sqrt yz\)
Ques 6: A car A starts from a point P towards another point Q. Another car B starts (also from P) 1 h after the first car and overtakes it after covering 30% of the distance PQ. After that, the cars continue. On reaching Q, car B reverses and meets car A, after covering 23of the distance QP. Find the time taken by car B to cover the distance PQ (in hours). (CAT 2012)
- 3
- 4
- 5
- 3\(\frac{1}{3}\)
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Ans: (D)
Let the distance between P and Q is x
When B overtakes A, the distance covered by them is \(\frac{3x}{10}\)
In the next meeting,
B covered a distance of (\(\frac{7x}{10} \ + \frac{7x}{30}\)) or (\(\frac{28x}{30}\))
A covered a distance of (\(\frac{23x}{30}- \frac{9x}{30}\)) or (\(\frac{14x}{30}\))
So, comparing the distance travelled in the same time.
B is twice as fast as A.
A starts after 1hr after B and catches up within 1hr.
So, B covers 0.3 hr in 1hr or x distance in 3(1/3) hrs
Ques 7: Two cars A and B start from two points P and Q respectively towards each other simultaneously. After travelling some distance, at a point R, car A develops engine trouble. It continues to travel at 2/3rd of its usual speed to meet car B at a point S, where PR = QS. If the engine trouble had occurred after car A had travelled double the distance it would have met car B at a point T, where ST = SQ / 9. Find the ratio of speeds of A and B. (CAT 2011)
- 4 : 1
- 2 : 1
- 3 : 1
- 3 : 2
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Ans:
Case (i)
Let a and b be the speeds of cars A and B , respectively.
Car A travelled a distance of x with a speed of ‘a’ and a distance of y at a speed of 2a /3.
In the time car B has covered SQ (i.e., x), car A at (2a/3) will cover a distance of 2/3(PR) + RS
i.e., 2x/3+y
Ratio of their speeds
= \(\frac{\frac{2a}{3}}{b}- \frac{\frac{2x}{3}+y}{x}= \frac{2x+3y}{3x}\)
Case (ii)
Car A travelled PM (or 2x) at a and MT at 2a while 3
carBtravelledQT=8x atb. 9
In the time car B covered a distance QT, car A at a speed of 2a /3, would cover 23 (PM ) + MT
9 = 9y + 4x 8x 8x
... (ii)
81
[(90 − 54) + (72 − 54)]
∴The ratio of their speeds
2a 4x + (y − x) + x
i.e., 4x + (y − x) + x
Ques 8: In a race of 200 m, A beats S by 20 m and N by 40 m. If S and N are running a race of 100 m with exactly the same speed as before, then by how many metres will S beat N? (CAT 2010)
- 11.11 m
- 10 m
- 12 m
- 25 m
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Ans: (A)
(a) In the time that A takes to run 200 m, S runs 180 m and N runs 160 m. So, in the time
S takes to run 200 m, N runs 200 (160/180) =177.77 m or is beaten by 22.22 m.
So, in 100 m, N is beaten by 11.11 m.
Ques 9: The difference between the time taken by two cars to travel a distance of 350 km is 2h 20 min. If the difference between their speeds is 5 km/h, then the speed of the fastest car is. (CAT 2009)
- 30 km/h
- 35 km/h
- 40 km/h
- 45 km/h
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Ans: (A)
Assuming the speed of faster car is 5km/hr
Speed of slower car (S – 5) km/hr
Time taken by faster car = (350/S)
Time taken by slower car = (350/(S – 5))
S(S – 5)=750
Putting all the options in place of S, we get 750 at S=30km/h
Ques 10: Rahim plans to drive from city A to station C, at the speed of 70 km/h, to catch a train arriving there from B. He must reach C at least 15 min before the arrival of the train. The train leaves B, located 500 km South of A, at 8:00 am and travels at a speed of 50 km/h. It is known that C is located between West and North-West of B, with BC at 60° to AB. Also, C is located between South and South-West of A with AC at 30° to AB. The latest time by which Rahim must leave A and still catch the train is closest to __ (CAT 2008)
- 6:15 am
- 6:30 am
- 6:45 am
- 7:00 am
- 7:15 am
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Ans: (B)
Since, ∠A=30°and∠B = 60°
∠C = 90°
BC = 250 km and AC = 250 km
Time taken by train to reach from A to C = 250/50= 5 hrs
Train will reach C at 13:00 hours
Time required by Rahim to reach C =250 /70
= 433/70 h = 6 h 12 min
The time by which Rahim must start from A =13:00−0:15−6:12 =6:33
So the answer is 6 : 30 am.
Ques 11: Arun, Barun and Kiranmala start from the same place and travel in the same direction at speeds of 30, 40 and 60 km/h, respectively. Barun starts two hours after Arun. If Barun and Kiranmala overtake Arun at the same instant, how many hours after Arun did Kiranmala start? (CAT 2006)
- 3
- 3.5
- 4
- 4.5
- 5
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Ans: (C)
Speed of Arun, Barun and Kiranmala are 30 km/h, 40 km/h and 60 km/h, respectively.
Barun starts when Arun has already travelled for 2 h
and covered = 2 × 30 = 60 km
Time taken by Barun to cover Arun with a relative
speed of (40 − 30 = 10) km/h = 60 = 6 h 10
So, when Barun overtakes Arun, Arun has travelled for 8 h and Barun for 6 h.
According to the question,
Barun and Kiranmala overtake Arun at the same instance. It means when Kiranmala overtakes Arun, both of them will have covered the same distance.
Assuming Kiranmala takes t hours to cover the same as covered by Arun in 8 h.
Therefore, 8 ×30 = t ×60 ⇒ t=4h
Kiranmala started after (8 − 4 = 4) h, when Arun started.
Ques 12: If a man cycles at 10 km/h, then he arrives at a certain place at 1 pm. If he cycles at 15 km/h, he will arrive at the same place at 11 am. At what speed must he cycle to get there at noon ? (CAT 2004)
- 11 km/h
- 12 km/h
- 13 km/h
- 14 km/h
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Ans: (B)
If it takes the man t hours to cover the distance by 1 p.m., then it will take him (t - 2) hours to cover the distance by 11 a.m. As the distance travelled in both the cases is same.
10(t)=15(t – 2)
t =6
Distance covered= 10 x 6 = 60km
The man should travel (60/t – 1= 60/5 = 12km/h) to reach by noon
Ques 13: Two boats, travelling at 5 km/h and 10 km/h, head directly towards each other. They begin at a distance of 20 km from each other. How far apart are they (in km) one minute before they collide? (CAT 2004)
- 1/12
- 1/6
- 1/4
- 1/3
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Ans: (C)
Just before collision , in the final minute.
Boat number 1 travelled = 5 x = 1/12 km
Boat number 2 travelled = 10 x = 1/6 km
As they move in opposite directions,
distance between the boats one minute before collision is
1/12 + 1/6 = 1/4 km
Ques 14: Karan and Arjun run a 100 m race, where Karan beats Arjun by 10 m. To do a favour to Arjun, Karan starts 10 m behind the starting line in a second 100 m race. They both run at their earlier speeds. Which of the following is true in connection with the second race ? (CAT 2004)
- Karan and Arjun reach the finishing line simultaneously
- Arjun beats Karan by 1 m
- Arjun beats Karan by 11 m
- Karan beats Arjun by 1 m
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Ans: (D)
When Karan runs for 100m in the first race, Arjun runs only 90m.
Ratio between speeds of Arjun and Karan = = 9:10
Karan has to run 110m in the second race while Arjun runs = x110=99m.
So, Karan beats Arjun by 1m.
Ques 15: In Nuts and Bolts factory, one machine produces only nuts at the rate of 100 nuts per minute and needs to be cleaned for 5 min after production of every 1000 nuts. Another machine produces only bolts at the rate of 75 bolts per minute and needs to be cleaned for 10 min after production of every 1500 bolts. If both the machines start production at the same time, what is the minimum duration required for producing 9000 pairs of nuts and bolts? (CAT 2004)
- 130 min
- 170 min
- 135 min
- 180 min
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Ans: (B)
In reality, it takes the nuts machine 10 minutes to make 1000 nuts.
After every 10 minutes, or 1000 nuts, it takes 5 minutes to clean. The machine needed 130 minutes to make 9000 nuts, which is (10) (9) + (5)(8)
In the same way, it takes (6) (20) + (5) (10) = 170 minutes to make 9000 bolts.
∴If you don't count any other delays, it takes at least 170 minutes to make 9000 pairs of nuts and bolts, which is the longer of the two times estimated above.
How to Prepare Time, Speed and Distance Questions for CAT?
- Being the most important topic in arithmetic, firstly go through all the formulae.
- Relative motion between two bodies will require more logic than formulae. So to attempt questions in CAT, practice enough questions on this topic.
- Understanding of ratios between Speed-distance, distance-time and speed-time will help students to solve early in the exam.
- Circular motion just require the basic understanding of the bodies moving in circles and how and when they meet.
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