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Time and Speed - Train and Boat

মোট প্রশ্ন১,৪৩৯এই পাতা১০০প্রতি পাতা১০০
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উত্তরিতবর্তমানপুনরায় দেখুনঅসম্পূর্ণ

Time and Speed - Train and Boat

PrepBank · পাতা / ১৫ · ১০১২০০ / ১,৪৩৯

১০১.
X and Y start walking towards each other at 10 am at speeds of 3 km/hr and 4 km/hr respectively. They were initially 17.5 km apart. At what time do they meet?
  1. ক) 2:30 pm
  2. খ) 11 :30 pm
  3. গ) 1:30 pm
  4. ঘ) 12 :30 pm
ব্যাখ্যা

Let after T hours they meet
Then, 3T+4T=17.5
T=2.5
Time = 10:00 am + 2.5 hour = 12:30 pm

১০২.
A bike rider starts at 60 km/hr and he increases his speed every 2 hours by 3 km/hr. Then the maximum distance covered by him in 24 hours is -
  1. 1000km
  2. 918km
  3. 899 km
  4. none of these
ব্যাখ্যা

বাইকারের যাত্রা শুরুর গতি = 60 কি.মি/ঘন্টা
প্রথম 2 ঘন্টায় যায় (60 × 2) = 120 কি.মি
পরের 2 ঘন্টায় যায় (63 × 2) = 126 কি.মি
আবার, পরের 2 ঘন্টায় যায় (66 × 2) = 132 কি.মি
এরকম 12 বার হবে।
সুতরাং, এটি একটি সমান্তর ধারা।

ধারাটি হবে, 120 + 126 + 132 + ------
এখানে ১ম পদ (a) = 120, সাধারণ অন্তর (d) = 6 ও পদসংখ্যা (n) = 12
∴ সমষ্টি (S) = (n/2) {2a + (n - 1)d}
= (12/2) { 2×120 + (12 - 1) × 6}
= 6 × 306
= 1836

সুতরাং, সঠিক উত্তর ঘ) none of these

১০৩.
A train overtakes two persons who are walking in the same direction to that of the train at 2 kmph and 4 kmph and passes them completely in 9 and 10 seconds respectively. What is the length of the train?
  1. ক) 65 meter
  2. খ) 60 meter
  3. গ) 55 meter
  4. ঘ) 50 meter
ব্যাখ্যা
Let the speed of the train be v km/hr.
(v - 2) : (v - 4) = 10 : 9 [speed and time are inversely proportional]
⇒ 9v - 18 = 10v - 40
⇒ v = 22 km/hr.
Length of the train
= (22 - 2) × (5/18) × 9
= 50 meter.
১০৪.
A man can row at 4 kmph in still water. If the velocity of the current is 2 kmph and it takes him 12 hours to row to a place and comes back, how far is the place?
  1. 12 km
  2. 14 km
  3. 16 km
  4. 18 km
ব্যাখ্যা
Question: A man can row at 4 kmph in still water. If the velocity of the current is 2 kmph and it takes him 12 hours to row to a place and comes back, how far is the place?

Solution:
Downstream speed = (4 + 2) = 6 kmph
Upstream speed = (4 - 2) = 2 kmph

Let, the required distance be = a km

ATQ,
(a/6) + (a/2) = 12
⇒ (a + 3a)/6 = 12
⇒ 4a = 72
⇒ a = 18
১০৫.
On my way from the office to the Live MCQ class, I drive at 30 kmph and on the return journey I drive at 45 kmph. What is my average speed of travel?
  1. 37.5 kmph
  2. 36 kmph
  3. 35.5 kmph
  4. 33 kmph
ব্যাখ্যা
Question: On my way from the office to the Live MCQ class, I drive at 30 kmph and on the return journey I drive at 45 kmph. What is my average speed of travel?

Solution:
Let the distance between the office and Live MCQ class be x km.

∴ Time taken on my onward journey = x/30 hours
and time taken on my return journey = x/45 hours

∴ The total time taken for my onward and return journey = x/30 + x/45 = 5x/90 hours.
The total distance traveled both ways = 2x km

∴ Average speed = 2x/(5x/90) = 36 kmph.
১০৬.
A man is running at a speed of 4 km/hr in the direction of the train whose length is 550 meters. If the train is moving at a speed of 64 km/hr then how many seconds will this train take to cross the man?
  1. ক) 31 sec
  2. খ) 32 sec
  3. গ) 33 sec
  4. ঘ) 34 sec
ব্যাখ্যা
Question: A man is running at a speed of 4 km/hr in the direction of the train whose length is 550 meters. If the train is moving at a speed of 64 km/hr then how many seconds will this train take to cross the man?

Solution: 
ট্রেন ও মানুষের আপেক্ষিক গতি = (64 - 4) km/hr
= 60 km/hr
= (60 x 1000)/3600 m/sec
= 50/3 m/sec

 মানুষটি পার হতে সময় লেগেছে = 550 x (3/50) sec
= 33 sec
১০৭.
A man walking at the rate of 4 km/hr crosses a bridge in 15 minutes. The length of the bridge (in meters) is-
  1. ক) 600
  2. খ) 750
  3. গ) 1000
  4. ঘ) 1250
ব্যাখ্যা

15min = 1/4hrs
1 hr → 4 kms
1/4hr → 4/4 kms
So, length of the bridge= 1 km = 1000 metres

১০৮.
A monkey climbs a slippery pole 12 m high. It rises 1 meter in every one minute and slips 1 /2 meter in every next minute. Find how soon it will reach the top?
  1. ক) 45 min
  2. খ) 40 min
  3. গ) 35 min
  4. ঘ) 48 min
  5. ঙ) 47 min
ব্যাখ্যা

In the first minute the monkey climbs 1 meter.
In the second minute it slips 1/2 meter.
For every two minute it climbs 1/2 meter.

So Average speed = 1 meter/4 minutes
For 11 meters, time taken = 44 minutes.

For the last 1 meter jump add 1 minute.
So time taken = 45 minutes.

১০৯.
A train, 150 meter long and running at a speed of 60 km per hour, takes 30 seconds to cross a bridge. What is the length (in meter) of the bridge?
  1. ক) 350
  2. খ) 450
  3. গ) 500
  4. ঘ) 650
ব্যাখ্যা
ট্রেনের গতিবেগ = 60 কিমি /ঘণ্টা 
                         
ট্রেনটি 3600 সেকেন্ড অতিক্রম করে (60 × 1000) মিটার 
ট্রেনটি 1 সেকেন্ড অতিক্রম করে (60 × 1000)/3600
ট্রেনটি 30 সেকেন্ড অতিক্রম করে (60 × 1000 × 30 )/3600 মিটার 
                                                    = 500 মিটার 

ট্রেনের দৈর্ঘ্য = 150 মিটার 
ব্রিজের দৈর্ঘ্য = (500 - 150) মিটার 
                    = 350 মিটার
১১০.
A truck covers a distance of 376 km at a certain speed in 8 hours. How much time would a car take at an average speed which is 18 kmph more than that of the speed of the truck to cover a distance which is 14 km more than that travelled by the truck?
  1. 6 hours
  2. 9 hours
  3. 8 hours
  4. 5 hours
  5. None of these
ব্যাখ্যা
Question: A truck covers a distance of 376 km at a certain speed in 8 hours. How much time would a car take at an average speed which is 18 kmph more than that of the speed of the truck to cover a distance which is 14 km more than that travelled by the truck?

Solution:
Speed of the truck = Distance/time
= 376/8 = 47 kmph

Now, speed of car = (speed of truck + 18) kmph
= (47 + 18) = 65 kmph

Distance travelled by car = 376 + 14 = 390 km

Time taken by car = Distance/Speed
= 390/65
= 6 hours.
১১১.
Two trains are moving in opposite directions at speeds of 60 km/h and 90 km/h. Their lengths are 800 m and 700 m respectively. Find the time taken to cross each other.
  1. 20 seconds
  2. 36 seconds
  3. 25 seconds
  4. 18 seconds
ব্যাখ্যা

Question: Two trains are moving in opposite directions at speeds of 60 km/h and 90 km/h. Their lengths are 800 m and 700 m respectively. Find the time taken to cross each other.

Solution:
Relative speed = (60 + 90) km/h
= 150 × (5/18) m/sec
= 125/3 m/sec

Distance covered = (800 + 700) m
= 1500 m

Required time
= 1500 ÷ (125/3) sec
= (1500 × 3)/125 sec
= 36 sec

∴ The required time is 36 seconds.

১১২.
A train is going at 1/3 of its usual speed and it takes an extra 30 minutes to reach its destination. Find its usual time to cover the same distance.
  1. ক) 15 min
  2. খ) 20 min
  3. গ) 25 min
  4. ঘ) 30 min
ব্যাখ্যা

প্রশ্ন: A train is going at 1/3 of its usual speed and it takes an extra 30 minutes to reach its destination. Find its usual time to cover the same distance.

সমাধান: 
Let,
The usual speed is x 
The distance is d 
The usual time is t min 

So, 
In usual speed, d = xt 

In 1/3 of usual speed, d = (x/3) × (t + 30) 

Now, We can say that,
xt = x(t + 30)/3 
⇒ t = (t + 30)/3
⇒ 3t = t + 30 
⇒ 2t = 30
∴ t = 15 

∴ The usual time to cover the same distance is 15 min.

১১৩.
The length of the bridge, which a train 130 meters long and travelling at 46.8 km/hr can cross in 30 seconds, is:
  1. ক) 260 m
  2. খ) 250 m
  3. গ) 245 m
  4. ঘ) 265 m
ব্যাখ্যা
Question: The length of the bridge, which a train 130 meters long and travelling at 46.8 km/hr can cross in 30 seconds, is:

Solution: 
Let,
The length of the bridge is x meter

∴ The train has to travel 130 + x meter to cross the bridge.

The velocity of the train 46.8 km/hr
= (46.8 × 1000)/3600 m/s
= 13 m/s

The train travels in 1 second 13 meters
∴ The train travels in 30 seconds (13 × 30) meters
= 390 meters

Now,
130 + x  = 390
⇒ x = 390 - 130
∴ x = 260 

∴The length of the bridge is  260 meters
১১৪.
A man can row upstream 10 kmph and downstream 20 kmph. Find the man rate in still water and rate of the stream.
  1. 0 kmph , 5 kmph 
  2. 5 kmph , 5 kmph 
  3. 15 kmph , 5 kmph 
  4. 10 kmph , 5 kmph 
  5. None of these
ব্যাখ্যা
Question: A man can row upstream 10 kmph and downstream 20 kmph. Find the man rate in still water and rate of the stream.

Solution:
If a is rate downstream and b is rate upstream 
Rate in still water = (a + b)/2 
Rate of current = (a - b)/2 

Rate in still water = (20 + 10)/2 = 15 kmph 
Rate of current = (20 - 10)/2 = 5 kmph 
১১৫.
A car takes 4 hours to cover a distance, if it travels at a speed of 40 mph. What should be its speed to cover the same distance in 1.5 hours?
  1. ক) 96.66 mph
  2. খ) 100 mph
  3. গ) 106.66 mph
  4. ঘ) 160 mph
ব্যাখ্যা
প্রশ্ন: A car takes 4 hours to cover a distance, if it travels at a speed of 40 mph. What should be its speed to cover the same distance in 1.5 hours?

সমাধান: 
Distance covered in 4 hours = 4 × 40 miles
= 160 miles

Speed required to cover the same distance in 1.5 hours = 160/1.5 mph
= 106.66 mph
১১৬.
The ratio between the speeds of two trains is 7 : 8 . If the second train runs 400 km in 4 hours, What is the speed of the first train?
  1. 86.5
  2. 87.5
  3. 88.5
  4. 89.5
  5. 90.5
ব্যাখ্যা

Let the speed of the trains be 7 x and 8 x respectively.
Speed of second train = 400 /4 = 100 km/hr
⇒ 8 x = 100
⇒ x = 100/8 = 12.5
Speed of the first train = 7x = 7 × 12.5
= 87.5 km/hr

১১৭.
একজন ব্যক্তি স্থির পানিতে ঘণ্টায় ৫ কি.মি. যেতে পারে। যদি স্রোতের বেগ ১ কি.মি/ঘণ্টা হয় তাহলে একটি নির্দিষ্ট স্থানে গিয়ে ফিরে আসতে ২ ঘণ্টা সময় লাগে। স্থানটির দূরত্ব কত? 
  1. ক) ৪.৮ কি.মি
  2. খ) ৩.৬ কি.মি
  3. গ) ২.৪ কি.মি
  4. ঘ) ৬.১২ কি.মি
ব্যাখ্যা
প্রশ্ন: একজন ব্যক্তি স্থির পানিতে ঘণ্টায় ৫ কি.মি. যেতে পারে। যদি স্রোতের বেগ ১ কি.মি/ঘণ্টা হয় তাহলে একটি নির্দিষ্ট স্থানে গিয়ে ফিরে আসতে ২ ঘণ্টা সময় লাগে। স্থানটির দূরত্ব কত? 

সমাধান: 
ধরি ,
স্থানটির দূরত্ব x  কি.মি. 

স্রোতের অনুকূলে গতিবেগ = ৫ + ১ = ৬ কি.মি./ঘণ্টা
স্রোতের প্রতিকূলে গতিবেগ = ৫ - ১ = ৪ কি.মি./ঘণ্টা

প্রশ্নমতে,
(x /৪) + (x /৬) = ২
(৩x  + ২x)/১২ = ২
৫x /১২ = ২
৫x = ২৪ 
x = ২৪ /৫ 
x  = ৪.৮ কি.মি। 
১১৮.
A motorboat takes 3 hour to travel 12 km upstream and 12 km downstream in a river with a current of 3 km/hr. What is the boat’s speed in still water?
  1. 8 km/hr
  2. 9 km/hr
  3. 12 km/hr
  4. 1 km/hr
  5. None of these
ব্যাখ্যা
Question: A motorboat takes 3 hour to travel 12 km upstream and 12 km downstream in a river with a current of 3 km/hr. What is the boat’s speed in still water?

Solution:
Let, still water speed = x
Then,
Upstream speed = x - 3
Downstream speed = x + 3

ATQ,
⇒ {12/(x - 3)} + {12/ (x + 3)} = 3
⇒ 12(x - 3 + x + 3)/(x2 - 9) = 3
⇒ 24x = 3x2 - 27
⇒ x2 - 8x - 9 = 0
⇒ x2 - 9x + x - 9 = 0
⇒ x(x - 9) + 1(x - 9) = 0
⇒ (x - 9)(x + 1) = 0
⇒ x = 9, - 1
∴ x = 9 (positive value only valid)

So the speed of the motorboat in still water is 9 km/hr.
১১৯.
The speed of three cars is in the ratio of 3 : 4 : 5. The ratio of the times taken by these cars to travel the same distance is- 
  1. 20 : 15 : 12
  2. 15 : 20 : 12
  3. 12 : 15 : 20
  4. 20 : 12 : 15
ব্যাখ্যা

Question: The speed of three cars is in the ratio of 3 : 4 : 5. The ratio of the times taken by these cars to travel the same distance is-

Solution:
যেহেতু দূরত্ব একই থাকে, তাই গতিবেগ সময়ের সাথে ব্যস্তানুপাতিক হয়।
⇒ গতিবেগ ∝ (1/সময়)
⇒ s ∝ (1/t)

∴ সময়ের অনুপাত = 1/3 : 1/4 : 1/5
= (1/3 × 60) : (1/4 × 60) : (1/5 × 60)
= 20 : 15 : 12

১২০.
A boat takes 30 minutes less to travel 12 miles downstream than to travel the same distance upstream. If the speed of the boat in still water is 10 mph, the speed of the stream is-
  1. 7 mph
  2. 5 mph
  3. 3 mph
  4. 2 mph
ব্যাখ্যা
Question: A boat takes 30 minutes less to travel 12 miles downstream than to travel the same distance upstream. If the speed of the boat in still water is 10 mph, the speed of the stream is-

Solution:
Let,
The speed of the stream = x mph

Then,
Speed downstream = (10 + x) mph
Speed upstream = (10 - x) mph

ATQ,
{12/(10 - x) - 12/(10 + x)} = 30/60
⇒ (24x × 60) = 30(100 - x2)
⇒ x2 + 48x - 100 = 0
⇒ (x + 50)(x - 2) = 0
∴ x = 2 mph
১২১.
The respective ratio between the speed of a car, a train, and a bus is 5 : 9 : 4. The average speed of the car, bus and train is 72 km/hr together. What is the average speed of the car and the train together?
  1. ক) 82 km/hr
  2. খ) 72 km/hr
  3. গ) 67kms/er
  4. ঘ) 84 km/hr
ব্যাখ্যা
Question: The respective ratio between the speed of a car, a train, and a bus is 5 : 9 : 4. The average speed of the car, bus and train is 72 km/hr together. What is the average speed of the car and the train together?

Solution:
Let the common ratio be x
Car speed= 5x
Train speed = 9x
Bus speed is 4x

∴ Average speed of Car, Train, Bus = (5x + 9x + 4x)/3 = 6x

ATQ,
6x = 72
x = 12

Car speed is = (5 × 12) km/hr = 60 km/hr
Train speed is = (9 × 12) km/hr = 108 km/hr

∴ Average speed of Car& train together is = (60 + 108)/2km/hr = 84 km/hr
১২২.
If kamal travels 20 km/hr, he reaches the office 10 minutes late and if he travels at 25 km/hr, he reaches the office 5 minutes earlier. The office is at a distance of.
  1. ক) 25 km.
  2. খ) 35 km.
  3. গ) 45 km.
  4. ঘ) 30 km.
ব্যাখ্যা
Question: If kamal travels 20 km/hr, he reaches the office 10 minutes late and if he travels at 25 km/hr, he reaches the office 5 minutes earlier. The office is at a distance of.

Solution: 
অফিসের দূরত্ব x হলে, 
কামাল x দূরত্ব যায় (x/20) এবং (x/25) সময়ে। 
The difference between the time = {5 - (-10)} ⇒ 15 minutes

ATQ,
Or, (x/20) - (x/25) = 15/60 
Or, (5x - 4x)/100 = 1/4
Or, x/100 = 1/4
Or, 4x = 100
Or, x = 25
১২৩.
Train A passes a lamp post in 9 seconds and 700 meter long platform in 30 seconds. How much time will the same train take to cross a platform which is 800 meters long?
  1. ক) 32 seconds
  2. খ) 31 seconds
  3. গ) 33 seconds
  4. ঘ) 30 seconds
ব্যাখ্যা

Let the length of the train is x m. and its speed is v. m/s.

Distance = Speed × time [S = V × T]
x = v × 9 .........(i).
(x+700) = v × 30 ........(ii).

Dividing the eqn. (i) by (ii).

x/(x+700)= 3/10.
⇒ 10x=3x + 2100.
⇒ 7x=2100.
⇒ x= 2100/7.
⇒ x= 300. m.

putting x = 300 in eqn. (1).
300 = v × 9
⇒ v = 300/9
⇒ v = 100/3 m/s.

Let the train crosses a 800 m. long platform in t seconds.
(x + 800) = v × t .........(iii) [ S = V × T]
⇒ (300 + 800) = (100/3) × t. [putting x= 300. and v= 100/3.]
⇒ t = (1100×3)/100
⇒ t = 33 seconds.

১২৪.
Two cars start towards each other from points 200 km apart. One car travels at 40 km/hr and the other travels at 35 km/hr. How far apart will the two cars be after four hours of continuous travelling?
  1. ক) 100 km
  2. খ) 75 km
  3. গ) 40 km
  4. ঘ) 20 km
ব্যাখ্যা


AC = 40 × 4
= 160 km
BD = 35 × 4
= 140 km
BC = 200 - 160
= 40 km
AD = 200 - 140
= 60 km
∴ CD = 200 - BC - AD
= 200 - 40 - 60
= 100 km
Hence, 100 km apart will the two cars be after four hours of continuous travelling.

১২৫.
A motorboat, whose speed in 18 km/h in still water goes 36 km downstream and comes back in a total of 4 hours 30 minutes. The speed of the stream is-
  1. 8 km/h
  2. 5 km/h
  3. 5.5 km/h
  4. 6 km/h
ব্যাখ্যা
Question: A motorboat, whose speed in 18 km/h in still water goes 36 km downstream and comes back in a total of 4 hours 30 minutes. The speed of the stream is-

Solution:
Let, the speed of the stream = x km/h
Then,
Speed downstream = (18 + x) km/h
Speed upstream = (18 - x) km/h

ATQ,
36/(18 + x) + 36/(18 - x) = 4.5
⇒ 36{(18 + x) + (18 - x)}/(18 + x)(18 - x) = 4.5
⇒ 1296/(324 - x2) = 9/2
⇒ 9(324 - x2) = 2 × 1296
⇒ 2916 - 2592 = 9x2
⇒ 9x2 = 324
⇒ x2 = 36 = 62
∴ x = 6

∴ The speed of the stream is 6 km/h
১২৬.
A bus was supposed to travel 240 km at its normal speed. But because of heavy traffic, it had to slow down by 10 km/h and therefore reached the destination 2 hours later than the scheduled time. What was the bus’s original (normal) speed?
  1. 50 km/hr
  2. 55 km/hr
  3. 40 km/hr
  4. 30 km/hr
ব্যাখ্যা

Question: A bus was supposed to travel 240 km at its normal speed. But because of heavy traffic, it had to slow down by 10 km/h and therefore reached the destination 2 hours later than the scheduled time. What was the bus’s original (normal) speed?

Solution:
Let, the original speed = x km/hr
Distance = 240 km

Time taken at original speed = 240 / x
Time taken at reduced speed = 240 / (x - 10)

According to the question:
240 / (x - 10) - 240 / x = 2

LCM: x(x - 10)
Now,
240x - 240(x - 10) = 2x(x - 10)
⇒ 240x - 240x + 2400 = 2x2 - 20x
⇒ 2x2 - 20x - 2400 = 0
⇒ x2 - 10x - 1200 = 0

Solve quadratic: x2 - 10x - 1200 = 0

Factors: (x - 40)(x + 30) = 0
x = 40 or -30 (speed cannot be negative)
So the speed is 40 km/hr.

১২৭.
A man can row 9 km/h in still water. It takes him twice as long to row up as to row down the river. Find the rate of stream?
  1. 6 km/h
  2. 5 km/h
  3. 3 km/h
  4. 2 km/h
ব্যাখ্যা
Question: A man can row 9 km/h in still water. It takes him twice as long to row up as to row down the river. Find the rate of stream?

Solution: 
Let,
the rate of stream = x km/h

∴ Downstream speed = 9 + x
∴ Upstream speed = 9 - x

ATQ,
9 + x = 2(9 - x)
⇒ 9 + x = 18 - 2x
⇒ x + 2x = 18 - 9
⇒ 3x = 9
∴ x = 3

∴ the rate of stream 3 km/h
১২৮.
Two trains of length 140 meters and 166 meters are moving towards each other on parallel tracks at a speed of 50 km/hr and 60 km/hr respectively. In what time the trains will cross each other from the moment they meet?
  1. 13 seconds
  2. 9 seconds
  3. 12 seconds
  4. 10 seconds
ব্যাখ্যা
Question: Two trains of length 140 meters and 166 meters are moving towards each other on parallel tracks at a speed of 50 km/hr and 60 km/hr respectively. In what time the trains will cross each other from the moment they meet?

Solution:
In this problem, both the trains are moving so we will find the relative speed of the train. They are moving in the opposite direction, so the relative speed will be sum of their individual speeds.
Relative speed: (50 + 60) = 110 km/hr
Relative speed in m/s = 110 × (5/18) = 550/18 = 275/9 m/s

Distance covered is equal to the sum of the length of trains: 140 + 166 = 306 meters

∴ Require time = (306 × 9)/275 seconds
= 10.01 seconds
≅ 10 seconds
১২৯.
From two places, 60 km apart, A and B start towards each other at the same time and meet each other after 6 hour. If A traveled with 2/3 of his speed and B traveled with double of his speed, they would have met after 5 hours. The speed of A is -
  1. ক) 4 km/hr
  2. খ) 6 km/hr
  3. গ) 10 km/hr
  4. ঘ) 12 km/hr
ব্যাখ্যা

Let the speed of A = x kmph and that of B = y kmph

According to the question,
(x × 6) + (y × 6) = 60
⇒ x + y = 10 --------- (i)
And,
(2x/3) × 5 + (2y × 5) = 60
⇒ 10x + 30y = 180
⇒ x + 3y = 18 ---------- (ii)
From equation (i) × 3 - (ii)
3x + 3y - x - 3y = 30 - 18
⇒ 2x = 12
Hence, x = 6 kmph.

১৩০.
A motorist travels to a place 150 km away at an average speed of 50 km and returns at 30 km per hour. His average speed for the whole journey in km per hour is-
  1. 33.8
  2. 34.6
  3. 38.9
  4. 37.5
  5. 40.5
ব্যাখ্যা
Average speed
= (2xy / x+y) km/hr
= (2×50×30 / 50+30) km/hr
= 37.5 km/hr
১৩১.
Two trains 115 meters and 95 meters long, run at the speeds of 50 kmph and 76 kmph respectively, in opposite directions on parallel tracks. The time which they take to cross each other, is-
  1. 7.8 sec
  2. 7 sec
  3. 6.6 sec
  4. 6 sec
ব্যাখ্যা
Question: Two trains 115 meters and 95 meters long, run at the speeds of 50 kmph and 76 kmph respectively, in opposite directions on parallel tracks. The time which they take to cross each other, is-

Solution:
Length of the 1st train = 115 m
Length of the 2nd train = 95 m
Relative speed of the trains = (50 + 76) = 126 kmph
= (126 × 5)/18 m/sec
= 35 m/sec

Time taken to cross each other = (Length of 1st train + length of 2nd train)/relative speed of the trains
= (115 + 95)/35 sec
= 210/35 sec
= 6 sec
১৩২.
Kobita runs 5/2 times as fast as Babita. In a race, if Kobita gives a lead of 40 m to Babita, find the distance from the starting point where both of them will meet (correct up to two decimal places).
  1. 66.67 m
  2. 60.33 m
  3. 76.16 m
  4. 69.77 m
ব্যাখ্যা

Question: Kobita runs 5/2 times as fast as Babita. In a race, if Kobita gives a lead of 40 m to Babita, find the distance from the starting point where both of them will meet (correct up to two decimal places).

Solution:
Given that,
Kobita runs 5/2 times as fast as Babita
Kobita gives a lead of 40 m to Babita 

We know,
Distance = Speed × Time

Let the speed of Babita be = 2x
Speed of Kobita = (5/2) × 2x = 5x

And,
Let the distance covered by Kobita be y meters
∴ Distance covered by Babita = (y - 40) meters

As time is constant, distance is directly proportional to speed,
2x/5x = (y - 40)/y
⇒ 2/5 = (y - 40)/y
⇒ 2y = 5y - 200
⇒ 3y = 200
⇒ y = 200/3
∴ y = 66.67 m

∴ The distance from the starting point where both of them will meet is 66.67 m.

১৩৩.
Two, trains, one from Rajshahi to Dhaka and the other from Dhaka to Rajshahi, start simultaneously. After they meet, the trains reach their destinations after 9 hours and 16 hours respectively. The ratio of their speeds is:
  1. 4 : 3
  2. 4 : 5
  3. 4 : 1
  4. 1 : 3
ব্যাখ্যা
Question: Two, trains, one from Rajshahi to Dhaka and the other from Dhaka to Rajshahi, start simultaneously. After they meet, the trains reach their destinations after 9 hours and 16 hours respectively. The ratio of their speeds is:

Solution: 
Let, their speed respectively x and y km/hr

ATQ,
16y/x = 9x/y
⇒ x2/y2 = 16/9
∴ x/y = 4/3
১৩৪.
Running at 5/4 of his usual speed, an athlete improves his timing by 10 minutes. The time he usually takes to run the same distance is:
  1. ক) 30 minutes.
  2. খ) 40 minutes.
  3. গ) 50 minutes
  4. ঘ) 25 minutes.
ব্যাখ্যা
Question: Running at 5/4 of his usual speed, an athlete improves his timing by 10 minutes. The time he usually takes to run the same distance is:

Solution:
When the athlete walks at 5/4 of his usual speed then he takes 4/5 of his usual time and he saves 10 minutes.

Now
→ Usual time - (4/5) × usual time = 10 minutes
→ Usual time {1 - (4/5)} = 10 minutes
→ (1/5) × Usual time = 10 minutes
→ Usual time = 50 minutes.
১৩৫.
An old man is walking on a foggy road at a speed of x km/hr. Due to low visibility, the old man see only up to 600 meters. If a car overtakes the man from behind with the speed of 15 km/hr then the man can see the car for 216 seconds. Find the speed of the man?
  1. 4 km/hr
  2. 5 km/hr
  3. 8 km/hr
  4. 10 km/hr
ব্যাখ্যা
Question: An old man is walking on a foggy road at a speed of x km/hr. Due to low visibility, the old man see only up to 600 meters. If a car overtakes the man from behind with the speed of 15 km/hr then the man can see the car for 216 seconds. Find the speed of the man?

Solution:
Distance up to old man see = 600/1000 = 0.6 km
Time for which the man can see the car = 216/ (60 × 60) = 0.06 hour

ATQ,
0.6/(15 - x) = 0.06
⇒ 15 - x = 10
⇒ x = 5

Hence, the correct answer is 5 km/hr.
১৩৬.
A train travels 90 km at a speed of 45 km/h. How much time would it take for the same train to travel 180 km at a speed of 60 km/h?
  1. 3 hours
  2. 4 hours
  3. 6 hours
  4. 7.5 hours
ব্যাখ্যা
Question: A train travels 90 km at a speed of 45 km/h. How much time would it take for the same train to travel 180 km at a speed of 60 km/h?

Solution:
Here, the distance is 180 km and the speed is 60 km/h

∴ Time = distance/speed
= 180/60
= 3 hour
১৩৭.
A biker travels at 60 km/h. If instead, he had traveled at 80 km/h for the same duration, he would have covered 100 km more. How far did he actually travel?
  1. 320 km
  2. 300 km
  3. 290 km
  4. 270 km
ব্যাখ্যা

Question: A biker travels at 60 km/h. If instead, he had traveled at 80 km/h for the same duration, he would have covered 100 km more. How far did he actually travel?

Solution:
Let, the actual distance travelled be x km.
Then,
x/60 = (x + 100)/80 
⇒ x/6 = (x + 100)/8
⇒ 6(x + 100) = 8x
⇒ 6x + 600 = 8x
⇒ 8x - 6x = 600
⇒ 2x = 600
⇒ x = 600/2
⇒ x = 300 km

১৩৮.
An inspector notices a thief from a distance of 200 meters after this thief starts running and the inspector chases him. The inspector and the thief run at the speed of 11 km/hr and 10 km/hr respectively. The distance between them after 6 minutes is?
  1. ক) 100m
  2. খ) 90m
  3. গ) 110m
  4. ঘ) 120m
ব্যাখ্যা
Question: An inspector notices a thief from a distance of 200 meters after this thief starts running and the inspector chases him. The inspector and the thief run at the speed of 11 km/hr and 10 km/hr respectively. The distance between them after 6 minutes is?

Solution:
চোর ও ইন্সপেক্টরের আপেক্ষিক গতি = (11 - 10) km/hr
= 1 km/hr
6 মিনিটে অতিক্রম করে = {(1/60) × 6}km
= 1/10 km
= 100 m

∴ চোর ও ইন্সপেক্টরের মধ্যবর্তী  দূরত্ব = (200 - 100) m
= 100 m
১৩৯.
Two trains, each 120 m long, moving in opposite directions, cross each other in 8 seconds. If one is moving twice as fast the other, then the speed of the faster train is:
  1. ক) 75 km/hr
  2. খ) 72 km/hr
  3. গ) 60 km/hr
  4. ঘ) 54 km/hr
ব্যাখ্যা
Let the speed of the slower train be x m/sec.
Then, speed of the faster train = 2x m/sec.
Relative speed = (x+2x) m/sec = 3x m/sec.
So,(120 + 120)/8 = 3x
⇒ 24x = 240
⇒ x = 10
So, speed of the faster train
= 20 m/sec
= (20) x (18/5) km/hr
=72 km/hr.
১৪০.
A man decided to cover a distance of 6 km in 84 minutes. He decided to cover two-thirds of the distance at 4 km/hr and the remaining at some different speed. Find the speed after the two-third distance has been covered:
  1. ক) 5 kmph
  2. খ) 7 kmph
  3. গ) 9 kmph
  4. ঘ) 3 kmph
ব্যাখ্যা

We are given that two-thirds of the 6 km was covered at 4 km/hr i.e. 4 km distance was covered at 4 km/hr.
Time taken to cover 4 km = 4 km/4 km/hr = 1 hr = 60 minutes.
Time left = 84 – 60 = 24 minutes

Now, the man has to cover the remaining 2 km in 24 minutes or 24/60 = 0.4 hours
Speed required for remaining 2 km = 2 km/0.4 hr = 5 km/hr

১৪১.
In still water, a boat can travel at 5 km/hr. It takes 1 hour to row to a place and come back. If the velocity of the stream is 1 km/hr, how far is the place?
  1. ক) 3.5 km
  2. খ) 2.6 km
  3. গ) 2.4 km
  4. ঘ) None
ব্যাখ্যা
Question: In still water, a boat can travel at 5 km/hr. It takes 1 hour to row to a place and come back. If the velocity of the stream is 1 km/hr, how far is the place?

Solution:
ধরি,
দূরত্ব = x কি.মি.
দেওয়া আছে,
স্রোতের অনুকূলে গতিবেগ = (5 + 1) কি.মি./ঘন্টা = 6 কি.মি./ঘন্টা
স্রোতের প্রতিকূলে গতিবেগ =  = (5 - 1) কি.মি./ঘন্টা = 4 কি.মি./ঘন্টা

প্রশ্নমতে,
 x/6 + x/4 = 1
বা, 2x + 3x = 12
বা, 5x = 12
∴ x = 2.4 km.
১৪২.
A train running at a speed of 90 km/hr crosses a platform double its length in 36 seconds. What is the length of the platform in meters?
  1. ক) 200
  2. খ) 300
  3. গ) 450
  4. ঘ) None of these
ব্যাখ্যা

Let the length of the train be x metres.
Then, length of the platform = 2x metres.
Speed of the train = 90× (5/18) m/sec
= 25m/sec
∴(x+2x)/25 = 36
⇒ 3x= 900
⇒ x= 300
Hence, length of platform
= 2x= (2×300)m= 600m

১৪৩.
A car travels at a speed that is 3/4th the speed of a bike. The bike covers 240 km in 4 hours. How much distance will the car cover in 30 minutes?
  1. 15 km
  2. 20.25 km
  3. 30 km 
  4. 22.5 km
ব্যাখ্যা

Question: A car travels at a speed that is 3/4th the speed of a bike. The bike covers 240 km in 4 hours. How much distance will the car cover in 30 minutes?

Solution:
Speed of the bike = distance/time
= 240/4 = 60 km/h

And speed of the car = 3/4 of the speed of the bike
= (3/4) × 60 = 45 km/h

∴ Time for the car = 30 minutes
= 30/60 = 1/2 hours

∴ Distance covered by the car = speed × time
= 45 × (1/2) = 22.5 km

So the car will cover 22.5 km in 30 minutes.

১৪৪.
A train travels a distance of 600 km at a constant speed. If the speed of the train is increased by 5 km/hr, the journey would take 4 h less. Find the speed of the train?
  1. ক) 30 km/hr.
  2. খ) 25 km/hr.
  3. গ) 32 km/hr.
  4. ঘ) 36 km/hr.
ব্যাখ্যা
Let the speed of the train be x km/hr.

Now
(600/x) - 600/(x + 5) = 4
{600(x + 5) - 600x}/x(x + 5) = 4
3000/x(x + 5) = 4
4x2 + 20x - 3000 = 0
4(x2 + 5x - 750) = 0
x2 + 5x - 750 = 0
x2 + 30x - 25x - 750 = 0
x(x + 30) - 25(x + 30) = 0
(x + 30)(x - 25) = 0 
∴ x = 25 

The initial speed of the train is 25 km/hr.
১৪৫.
Rajib travels 300m in 2 minutes, waited for 5 minutes and then returns the same distance in 3 minutes. What is his average velocity?
  1. ক) 10m/s
  2. খ) 5m/s
  3. গ) 2m/s
  4. ঘ) 1m/s
ব্যাখ্যা
Question: Rajib travels 300m in 2 minutes, waited for 5 minutes and then returns the same distance in 3 minutes. What is his average velocity?

Solution: 
average velocity = total distance / total time

total distance = 300m + 300m = 600m
total time = 2 + 5 + 3 = 10m =600s

∴ average velocity = 600/600 m/s
= 1 m/s
১৪৬.
A man's speed with the current of a river is 15 km/hr and the speed of the current is 2.5 km/hr. What is the man's speed against the current?
  1. 8.5 km/hr
  2. 9 km/hr
  3. 10 km/hr
  4. 12.5 km/hr
  5. None
ব্যাখ্যা
Question: A man's speed with the current of a river is 15 km/hr and the speed of the current is 2.5 km/hr. What is the man's speed against the current?

Solution:
Man’s speed with current = 15 km/hr
Speed of current = 2.5 km/hr

Man’s rate in still water = (15 - 2.5) km/hr = 12.5 km/hr

Man’s rate against the current = (12.5 - 2.5) km/hr = 10 km/hr

∴ The speed of man's speed against the current is 10 km/hr
১৪৭.
A train takes 10 seconds to cross a pole and 25 seconds to cross a platform of length 180m. What is the length of the train?
  1. 100 meters
  2. 96 meters
  3. 150 meters
  4. 120 meters
ব্যাখ্যা

Question: A train takes 10 seconds to cross a pole and 25 seconds to cross a platform of length 180m. What is the length of the train?

Solution:
মনে করি, ট্রেনটির দৈর্ঘ্য L মিটার।

আমরা জানি, একটি খুঁটি (pole) অতিক্রম করার সময় ট্রেনটি কেবল তার নিজের দৈর্ঘ্য অতিক্রম করে।
সুতরাং, ট্রেনের গতিবেগ = L/10 মি./সে.  [গতিবেগ = দূরত্ব/সময়]

আবার, প্ল্যাটফর্ম অতিক্রম করার সময় ট্রেনটি (নিজের দৈর্ঘ্য + প্ল্যাটফর্মের দৈর্ঘ্য) অতিক্রম করে।
শর্তমতে, গতিবেগ = (L + 180)/25 মি./সে.

যেহেতু গতিবেগ একই, তাই,
L/10 = (L + 180)/25
⇒ 25L = 10(L + 180)
⇒ 25L = 10L + 1800
⇒ 25L - 10L = 1800
⇒ 15L = 1800
⇒ L = 1800/15
∴ L = 120

∴ ট্রেনটির দৈর্ঘ্য 120 মিটার।

১৪৮.
A boat travels upstream from Q to P and downstream from P to Q in 3 hours. If the distance between P to Q is 4km and the speed of the stream is 1kmph, then what is the velocity of the boat in still water?
  1. 3 km/hr
  2. 4 km/hr
  3. 5 km/hr
  4. 7.2 km/hr
ব্যাখ্যা

Let the velocity or speed of the boat in still water is x km/hr.
And the Speed of the stream = 1km/hr

So, the speed of the boat along the stream = (x+1) km/hr.
The speed of the boat against the stream = (x-1) km/hr.

Note: time = Distance/Speed

So, [4/(x + 1)] + [4/(x - 1)] = 3 hrs.
⇒ [4 (x + 1 + x - 1)]/[(x + 1) (x - 1)] = 3
⇒ 8x = 3(x2 - 1)
⇒ 8x = 3x2 - 3
⇒ 3x2 - 8x - 3=0
⇒ 3x2 - 9x + x - 3 = 0
⇒ (x - 3) (3x + 1) = 0
Therefore x = 3 or, x = -1/3 (speed can't be -ve)

∴ Hence, the speed or velocity of the boat in still water is 3 km/hr.

১৪৯.
Two boys start from the same place walking at the rate of 5 kmph and 5.5 kmph respectively in the same direction. What time will they take to be 8.5 km apart?
  1. 17 hr
  2. 12 hr
  3. 19 hr
  4. 14 hr
ব্যাখ্যা

Relative speed = 5.5 - 5
= 0.5 kmph (because they walk in the same direction)
Distance = 8.5 km
Time = Distance/Speed
= 8.5/0.5
= 17 hr.

১৫০.
Two trains 180 m and 170 m long run at the speed of 60 km/hr and 40 km/hr respectively in opposite directions on parallel tracks. The time (in seconds) which they take to cross each other, is:
  1. ক) 10.8 sec
  2. খ) 12.6 sec
  3. গ) 11.8 sec
  4. ঘ) 13.4 sec
ব্যাখ্যা
Relative speed = (60 + 40) km/hr 
                        = 100 km/hr 
                       = 100 × (5/18) m/sec
                       = 250/9 m/sec

Distance covered in crossing each other = (180 + 170) m = 350 m

Required time = 350 × (9/250) 
                       = 12.6 sec
১৫১.
How long will a boy take to run round a square field of side 35 meters, If he runs at the rate of 9 km/hr?
  1. ক) 56 sec
  2. খ) 45 sec
  3. গ) 39 sec
  4. ঘ) 25 sec
ব্যাখ্যা
Speed = 9 km/hr = 9 x (5/18) m/sec = 5/2 m/sec
Distance = (35 x 4) m = 140 m
Time taken = 140 x (2/5) sec = 56 sec
১৫২.
A train has a length of 150 metres. It is passing a man who is moving at 2 km/hr in the same direction of the train, in 3 seconds. Find out the speed of the train?
  1. ক) 169 km/hr
  2. খ) 182 km/hr
  3. গ) 152 km/hr
  4. ঘ) 180 km/hr
  5. ঙ) 108 km/hr
ব্যাখ্যা

Length of the train = 150 m
Speed of the man = 2 km/hr
Relative speed = 150/3 = 50 m/s
= 50 × 18/5
= 180 km/hr
Relative speed = Speed of train - Speed of the man (as both are moving in the same direction).
Therefore,
Speed of the train = Relative speed + Speed of the man
= 180 + 2
= 182 km/hr

১৫৩.
How many seconds will a 500 metre long train take to cross a man walking with a speed fo 3 km/ hr in the direction of the moving train if the speed of the train is 63 km/hr?
  1. 25
  2. 30
  3. 40
  4. 45
ব্যাখ্যা

Question: How many seconds will a 500 metre long train take to cross a man walking with a speed fo 3 km/ hr in the direction of the moving train if the speed of the train is 63 km/hr?

Solution:
Speed of the train =(63 - 3)km/hr
= 60km/hr
= (60 × 1000)/3600 m/sec
= 50/3

Time taken to pass the man = 500/(50/3) sec
= 500 × (3/50) sec
= 30 sec

১৫৪.
Ashik and Ruby run a race with their speed in the ratio of 5 : 3. They prefer to run on a circular track of circumference 2 km. What is the distance covered by Ashik when he passes Ruby for the sixth time?
  1. 10.25 km
  2. 15 km
  3. 22 km
  4. 26.5 km
  5. 30 km
ব্যাখ্যা

Question: Ashik and Ruby run a race with their speed in the ratio of 5 : 3. They prefer to run on a circular track of circumference 2 km. What is the distance covered by Ashik when he passes Ruby for the sixth time?

Solution: 
Since the speeds of Ashik and Ruby are in the ratio 5 : 3 i.e., when Ashik covers 5 rounds, then Ruby covers 3 rounds
∴ Relative speed = 5 – 3 = 2 parts
 Now, the first time Ashik and Ruby meet, when Ashik completes (5/2 = 2.5) rounds, and Ruby completes 1/2 round.

∴ Ashik to pass Ruby for the sixth time, Ashik would have completed = (6 × 2.5) rounds
= 15 rounds

Since each round is 2 km,
Hence, the distance covered by Ashik = (15 × 2) km
= 30 km

১৫৫.
Walking at the rate of 4 kmph a man cover certain distance in 2 hr 45 min. Running at a speed of 16.5 kmph the man will cover the same distance in.
  1. ক) 49 min
  2. খ) 40 min
  3. গ) 34 min
  4. ঘ) 48 min
ব্যাখ্যা
Distance = Speed × time
Here time = 2hr 45 min = 11/4 hr
Distance = 4× (11/4)= 11 km
New Speed =16.5 kmph
Therefore time = D/S = 11/16.5 = 40 min
১৫৬.
A computer can perform 30 identical tasks in six hours. At that rate, what is the minimum number of computers that should be assigned to complete 80 tasks within three hours?
  1. ক) 12
  2. খ) 7
  3. গ) 9
  4. ঘ) 6
  5. ঙ) 8
ব্যাখ্যা

We Know
Total work = rate × Time

therefore
30 = Rate × 6
or Rate = 30/6 = 5

Now we need to find the number of computers
total work given = 80 and total time = 3 hrs

therefore
80 = 5 × 3 × No. of computers
or No. of computers = 80/15 = 5.333 , but no. of computers cannot be fraction i.e , so we have to consider as 1.

Total no. of computers = 5 + 1 = 6.

১৫৭.
The speed of a boat in still water is 8 kmph. If it can travel 1 km upstream in 1 hr, what time would it take to travel the same distance downstream?
  1. 2 minute
  2. 1 minute
  3. 4 minute
  4. 3 minute
ব্যাখ্যা

Speed of the boat in still water = 8 km/hr
Speed upstream = 1/1 = 1 km/hr.
Speed of the stream = 8 - 1 = 7 km/hr.
Speed downstream = (8 + 7) = 15 km/hr.
Time is taken to travel 1 km downstream = (1/15) hr
= (1 × 60)/15
= 4 minutes.

১৫৮.
A train 125 m long passes a man, running  in the same direction in which the train is going, in 10 seconds. The speed of the train is 50 km/hr, What is the speed of the man?
  1. ক) 4 km/hr
  2. খ) 5 km/hr
  3. গ) 6 km/hr
  4. ঘ) 7 km/hr
ব্যাখ্যা
Question: A train 125 m long passes a man, running  in the same direction in which the train is going, in 10 seconds. The speed of the train is 50 km/hr, What is the speed of the man?

Solution: 
ট্রেনের গতিবেগ 50 km/hr
ধরি, ব্যক্তিটির গতিবেগ x km/hr 

যেহেতু ট্রেন ও ব্যক্তিটির গতিবেগ একই দিকে। অতএব, ট্রেন ১২৫ মিটার বা ০.১২৫ কিমি অতিক্রম করে ৫০ - x km/hr বেগে 

প্রশ্নমতে,
০.১২৫/৫০ - x = ১০/৩৬০০
⇒ ৫০ - x = (১২৫ × ৩৬০০)/(১০ × ১০০০)
⇒ ৫০ - x = ৪৫ 
∴ x = ৫০ - ৪৫ 
= ৫ km/hr

ব্যক্তিটির গতিবেগ ৫ km/hr
১৫৯.
A man reaches his office 20 min late, if he walks from his home at 3 km per hour and reaches 30 min early if he walks 4 km per hour. How far is his office from his house?
  1. 20 km
  2. 16 km
  3. 14 km
  4. 10 km
  5. 12 km
ব্যাখ্যা
Question: A man reaches his office 20 min late, if he walks from his home at 3 km per hour and reaches 30 min early if he walks 4 km per hour. How far is his office from his house?

Solution:
Let distance = x km.
Time taken at 3 kmph : dist/speed = x/3 = 20 min late.
time taken at 4 kmph : x/4 = 30 min earlier
difference between time taken : 30 - (- 20) = 50 mins = 50/60 hours.
Here,
x/3 - x/4 = 50/60
⇒ x/12 = 5/6
∴ x = 10 km.
১৬০.
The average speed of a train is 20% less on the return journey than on the onward journey. The train halts for half an hour at the destination before starting the return trip. If the total time taken for the entire round trip (including the halt) is 23 hours, covering a distance of 1000km, the speed of the train on the return journey is-
  1. 40 km/h
  2. 45 km/h
  3. 50 km/h
  4. 60 km/h
ব্যাখ্যা
Question: The average speed of a train is 20% less on the return journey than on the onward journey. The train halts for half an hour at the destination before starting the return trip. If the total time taken for the entire round trip (including the halt) is 23 hours, covering a distance of 1000km, the speed of the train on the return journey is-

Solution:
Let,
the average speed on the onward journey be x km/h

Then,
the average speed on return journey = (80% of x) = 4x/5 km/h

ATQ,
500/x + 500/(4x/5) = 23 - (1/2)
⇒ 500/x + 625/x = 45/2
⇒ (500+ 625)/x = 45/2
⇒ 1125/x = 45/2
⇒ 45x = 1125 × 2
⇒ x = (1125 × 2)/45
∴ x = 50

∴ speed of return journey = (4× 50)/5 = 40 km/h
১৬১.
A train that is 300 meters long takes 30 seconds to pass a stationary pole. At the same constant speed, how much time will the train take to completely pass a platform that is 500 meters long?
  1. 50 seconds
  2. 80 seconds
  3. 70 seconds
  4. 90 seconds
ব্যাখ্যা

Question: A train that is 300 meters long takes 30 seconds to pass a stationary pole. At the same constant speed, how much time will the train take to completely pass a platform that is 500 meters long? 

Solution:
Length of the train = 300 m
Time taken to pass a pole = 30 seconds

So, speed of the train
= 300/30
= 10 m/s

Length to be covered while passing the platform
= Length of train + Length of platform
= 300 + 500
= 800 m

Time taken to pass the platform
= Total distance/Speed
= 800/10
= 80 seconds

Therefore, the train will take 80 seconds to pass the platform.

১৬২.
Two train running in parallel line in the same direction at 40km/h and 22km/h respectively completely pass one another in 75 seconds. If the length of the first train is 255 meters, how long will it take the second train to pass a platform that is 100 meters long?
  1. 18 seconds
  2. 20 seconds
  3. 30 seconds
  4. 36 seconds
ব্যাখ্যা
We know, Time = distance/speed
Time, t = 75 seconds
Let the length of second train be y meter
For 75 seconds, distance, s = (255 + y) meters
and speed, v = (40 - 22) km/h = (40 - 22) × 1000 m/3600s = (18 × 5/18) m/s = 5 m/s
75 = (255 + y)/5
or, 255 + y = 375
or, y = 120
The length of second train is 120m
Therefore, required time taken = (120 + 100)/(22 × 5/18) = 36 seconds
১৬৩.
Speed of a boat along and against the current are 14 kms/hr and 8 kms/hr respectively. If there is no current how much time will the boat take to travel 22km ?
  1. 3 hour
  2. 4 hour
  3. 2 hour
  4. 1.5 hour
ব্যাখ্যা
Question: Speed of a boat along and against the current are 14 kms/hr and 8 kms/hr respectively. If there is no current how much time will the boat take to travel 22km ?

Solution: 
Let the speed of the boat is S
the speed of the current is W

S + W = 14 . . . . . . (i)
S - W = 8 . . . . . . . .(ii)
_________________
from equation (i) & (ii)
S = 11 km/hr, W = 3 km/hr

so, time to travel 22km is = 22/11 hour
= 2 hour
১৬৪.
The speed of a boat when travelling downstream is 42 km/hr, whereas when travelling upstream it is 38 km/hr, what is the speed of the stream?
  1. ক) 2 km/hr
  2. খ) 4 km/hr
  3. গ) 3 km/hr
  4. ঘ) 6 km/hr
ব্যাখ্যা
Question: The speed of a boat when travelling downstream is 42 km/hr, whereas when travelling upstream it is 38 km/hr, what is the speed of the stream?

Solution: 
Here, The speed of a boat in downstream = 42 km/hr.
The speed of a boat in upstream = 38 km/hr,
∴ The speed of stream = (Speed downstream - Speed upstream) / 2
= (42 - 38)km/hr / 2
= (4/2) km/hr
= 2 km/hr
১৬৫.
The time taken for the tail end of a train to cross a pole is 43 seconds. If the length of the train is 110 m and speed of the train is 54 km/hr. find the initial distance of the pole from the front end of the train.
  1. ক) 435 m
  2. খ) 525 m
  3. গ) 535 m
  4. ঘ) 565 m
ব্যাখ্যা
⇒ Speed of train = 54 × (5/18) = 15m/s
⇒ Distance covered in 43 seconds = 15 × 43 = 645 m
⇒ Length of train = 110m

∴ The initial distance of the pole from the front end of the train = 645 - 110 = 535 m
১৬৬.
A train 150 meters long passes a signal post in 15 seconds. How long will it take to pass a bridge that is 450 meters long?
  1. 1 minute
  2. 3 minutes
  3. 1 minute 30 seconds
  4. 2 minutes
ব্যাখ্যা

Question: A train 150 meters long passes a signal post in 15 seconds. How long will it take to pass a bridge that is 450 meters long?

Solution:
Train's speed = Distance/Time
= 150/15 = 10 m/s

Total distance to pass the bridge,
= Length of train + Length of bridge
= 150 m + 450 m
= 600 m

∴ Required time = Distance/Speed
= 600/10
= 60 seconds
​= 1 minute

∴ The train will take 60 seconds or 1 minute to pass platform.

১৬৭.
An train travels 10 miles at a speed of 50 miles per hour. How fast must the train travel on the return trip if the round-trip travel time is to be 20 minutes?
  1. ক) 55 miles/hours
  2. খ) 75 miles/hours
  3. গ) 65 miles per hour
  4. ঘ) 78 miles per hour
ব্যাখ্যা
We know speed = distance/time
Given distance = 10 miles
Speed = 50 miles per hour
Time = distance/speed = ⅕ hours = 12 min
Total time = 20 min
Time left = 20 – 12 = 8 min = 2/15 hour

So the train has to cover 10 miles in 8 minutes.
Speed = distance/time
           = 10/(2/15)
           = 10(15/2)
           = 75 miles per hour

Hence option b is the answer.
১৬৮.
A train passes two bridges of length 800 m and 400 m in 100 seconds and 60 seconds respectively. The length of the train is-
  1. 100 m
  2. 200 m
  3. 250 m
  4. 300 m
ব্যাখ্যা
Question: A train passes two bridges of length 800 m and 400 m in 100 seconds and 60 seconds respectively. The length of the train is-

Solution: 
Let the length of the train is x m and speed is s.
ATQ,
s = (x + 800)/100 and,
s = (x + 400)/60

∴ (x + 800)/100 = (x + 400)/60
or, 60x + 48000 = 100x + 40000
or, 40x = 8000
or, x = 200 m
১৬৯.
A boat takes 4 hours to cover a certain distance running downstream, while running upstream it requires 8 hours 48 minutes to cover the same distance. Find the ratio between the speed of the current and the speed of the boat?
  1. ক) 1 : 2
  2. খ) 3 : 8
  3. গ) 2 : 3
  4. ঘ) 4 : 3
ব্যাখ্যা
Question: A boat takes 4 hours to cover a certain distance running downstream, while running upstream it requires 8 hours 48 minutes to cover the same distance. Find the ratio between the speed of the current and the speed of the boat?

Solution: 
ধরি 
দূরত্ব x  কি.মি.
নৌকার বেগ + স্রোতের বেগ = x/4................(1)
নৌকার বেগ - স্রোতের বেগ = x/{8(48/60)}
= x/(44/5)
= 5x/44 ...............(2)

2(নৌকার বেগ) = (x/4) + (5x/44)
= (11x + 5x)/44
= 16x/44
= 4x/11
(নৌকার বেগ) = 2x/11


2(স্রোতের বেগ ) =  (x/4) - (5x/44)
= (11x - 5x)/44
=6x/44
= 3x/22

(স্রোতের বেগ) =3x/44
স্রোতের বেগ : নৌকার বেগ = 3x/44 : 2x/11
= 3 : 8
১৭০.
Two bicycles start at the same time from points P and Q, moving toward each other. If the distance between P and Q is 120 km and their speeds are 12 km/h and 8 km/h respectively then after how much time will they meet each other?
  1. 6 hours
  2. 5.5 hours
  3. 6.5 hours
  4. 7 hours
ব্যাখ্যা
Question: Two bicycles start at the same time from points P and Q, moving toward each other. If the distance between P and Q is 120 km and their speeds are 12 km/h and 8 km/h respectively then after how much time will they meet each other?

Solution:
Given,
The distance between P and Q = 120 km
Speed of 1st bicycle = 12 km/h
Speed of 2nd bicycle = 8 km/h

The bicycles are moving toward each other,
So their relative speed = (Speed of 1st bicycle + Speed of 2nd bicycle)
= (12 + 8) km/h
= 20 km/h

Time = (Distance ÷ relative speed)
= (120 ÷ 20)
= 6 h
১৭১.
A train crosses platform in 50 seconds travelling with a speed of (x + 6) km/hr. If the length of the train be 250 m and the length of the platform be (x + 220) m, then find the value of x?
  1. 30
  2. 35
  3. 40
  4. 50
ব্যাখ্যা
Question: A train crosses platform in 50 seconds travelling with a speed of (x + 6) km/hr. If the length of the train be 250 m and the length of the platform be (x + 220) m, then find the value of x?

Solution:
Speed of train = (x + 6) km/hr
= (x + 6) × (5/18) m/s

Length of train = 250 m
Length of platform = (x + 220) m

Distance = Length of train + Length of platform
= (250 + x + 220) m
= (470 + x) m

Time = 50 seconds

ATQ,
(x + 6) × (5/18) = (470 + x)/50
⇒ 5 × 50 (x + 6) = 18(470 + x)
⇒ 125(x + 6) = 9(470 + x)
⇒ 125x + 750 = 4230 + 9x
⇒ 125x - 9x = 4230 - 750
⇒ 116x = 3480
⇒ x = 3480/116
⇒ x = 30

∴ The value of x is 30
১৭২.
সকাল 7 টায় দুটি ট্রেন 300 কিলোমিটার দূরত্বের দুটি স্টেশন থেকে একে অপরের দিকে যাত্রা শুরু করে। সকাল 11 টায় তারা একে অপরকে অতিক্রম করে। যদি দ্রুতগামী ট্রেনের গড় গতি ধীরগতির ট্রেনের তুলনায় 7 কিমি বেশি হয়, তবে দ্রুততর ট্রেনের গতি কিমি/ঘন্টায় কত?
  1. ক) 45 কি.মি./ঘণ্টা
  2. খ) 44 কি.মি./ঘণ্টা
  3. গ) 43 কি.মি./ঘণ্টা
  4. ঘ) 41 কি.মি./ঘণ্টা
ব্যাখ্যা
প্রশ্ন: সকাল 7 টায় দুটি ট্রেন 300 কিলোমিটার দূরত্বের দুটি স্টেশন থেকে একে অপরের দিকে যাত্রা শুরু করে। সকাল 11 টায় তারা একে অপরকে অতিক্রম করে। যদি দ্রুতগামী ট্রেনের গড় গতি ধীরগতির ট্রেনের তুলনায় 7 কিমি বেশি হয়, তবে দ্রুততর ট্রেনের গতি কিমি/ঘন্টায় কত?

সমাধান: 
ধরি 
দ্রুতগতির ট্রেন এর গতিবেগ = x কি.মি./ঘণ্টা 
ধীরগতির ট্রেন এর গতিবেগ =y কি.মি./ঘণ্টা 

যাত্রার মোট সময় = 11 - 7 = 4 ঘণ্টা 
এখানে
x + y = 300/4 = 75...............(1)
আবার 
x - y = 7 .................(2)

(1) + (2) ⇒
x + y + x - y = 75 + 7
2x =  82
x = 41 কি.মি./ঘণ্টা
১৭৩.
45 toymakers can prepare 30 toys per day. Rifat wants 360 toys. How many toymakers should he employ to get the job done in 12 days?
  1. 38
  2. 55
  3. 35
  4. 45
ব্যাখ্যা

Question: 45 toymakers can prepare 30 toys per day. Rifat wants 360 toys. How many toymakers should he employ to get the job done in 12 days?

Solution:
Let, the required number of toymakers x
45 toymakers make 30 toys per day
So, 1 toymaker makes = 30/45 = 2/3 toys per day
Each toymaker in 12 days makes = (2/3) × 12 = 8 toys
So, x toymakers will make = 8x toys

ATQ,
8x = 360
⇒ x = 360 × (1/8)
∴ x = 45

১৭৪.
A 280 metre long train crosses a platform thrice its length in 50 seconds. What is the speed of the train in km/hr?
  1. 85.54 km/h
  2. 80.64 km/h
  3. 82.75 km/h
  4. 79.25 km/h
ব্যাখ্যা
Question: A 280 metre long train crosses a platform thrice its length in 50 seconds. What is the speed of the train in km/hr?

Solution:
Given that,
Length of the train = 280 m
Length of the platform = 3 × 280 = 840 m

∴ Total distance to be covered
= Train length + Platform length
= 280 + 840
= 1120m
And, Time taken = 50 seconds

∴  Speed = Distance​/Time
= 1120/50
= 22.4 m/s
= 22.4 × 3.6  ;[1 m/s = 3.6 km/h]
= 80.64 km/h

∴ The speed of the train is 80.64 km/h.
১৭৫.
A beats B by 100 m and C by 150 m in a kilometer race. In the same race, by how many meters does B beat C in that race?
  1. 50.00 m
  2. 55.55 m
  3. 62.50 m
  4. 45.50 m
ব্যাখ্যা
Question: A beats B by 100 m and C by 150 m in a kilometer race. In the same race, by how many meters does B beat C in that race?

Solution:
Here,
A : B = 1000 : 900
A : C = 1000 : 850

B/C = B/A / C/A
= (B/A) × (A/C)
= (900/1000) × (1000/850)
= 900/850

in 900m B beats C by 50m
∴ in 1000m B beats C by = (50 × 1000)/900 = 50000/900 = 55.55m
১৭৬.
Nibir, while going to school, passes 200m in 2 minutes, waits for his friend for 5 minutes, and then crosses the next 600m in 4kmph. What is his average speed?
  1. 3 kmph
  2. 3.5 kmph
  3. 4 kmph
  4. 2.56 kmph
ব্যাখ্যা
Question: Nibir, while going to school, passes 200m in 2 minutes, waits for his friend for 5 minutes, and then crosses the next 600m in 4kmph. What is his average speed?

Solution: 
600m or, 0.6km was crossed with 4kmph
time = 0.6/4 h = (0.6/4)60 minutes = 9 minutes

total time = (9 + 2 + 5) minutes = 16 minutes

average speed = total distance/total time
= 800m/16 minutes
= 0.8/(16/60) kmph
= 3 kmph
১৭৭.
A motor-cycle covers 40 Km with a speed of 20 km/hr. Find the speed of the motor- cycle for the next 40 km journey so that the average speed of the whole journey will be 30 km/hr.
  1. ক) 70 km/hr
  2. খ) 52.5 km/hr
  3. গ) 60 km/hr
  4. ঘ) 60.5 km/hr
ব্যাখ্যা
Question: A motor-cycle covers 40 Km with a speed of 20 km/hr. Find the speed of the motor- cycle for the next 40 km journey so that the average speed of the whole journey will be 30 km/hr.

Solution:
Let,
The total distance = 40 + 40 = 80km 
The desired speed be x km/hr

ATQ,
40/20 + 40/x = 80/30
⇒ 2 + 40/x = 80/30
⇒ 40/x = (80/30) - 2
⇒ 40/x = 20/30
⇒ 20x = 1200
∴ x = 60

So, the desired speed is 60 km/hr
১৭৮.
A boy traveled from Dhaka to Comilla at 20kmph and from Comilla to Dhaka at 30kmph. What is his average speed?
  1. 25 kmph
  2. 26 kmph
  3. 24 kmph
  4. 35 kmph
ব্যাখ্যা
Question: A boy traveled from Dhaka to Comilla at 20kmph and from Comilla to Dhaka at 30kmph. What is his average speed?

Solution: 
Let,
Distance from Dhaka to Comilla = P
From Dhaka to Comilla,
speed = 20kmph
∴ time = P/20 hour

From Comilla to Dhaka,
speed = 30kmph
∴ time = P/30 hour

Average speed = total distance/total time
= 2P/(P/20 + P/30)
= 24 kmph
১৭৯.
If the speed of the boat in still water is 5 km/hr and the speed of the current is 10 km/hr, then find the time taken by the boat to travel 135 km with the current. 
  1. 6.67 hour
  2. 9.00 hour
  3. 8.50 hour
  4. 8.33 hour
ব্যাখ্যা
Question: If the speed of the boat in still water is 5 km/hr and the speed of the current is 10 km/hr, then find the time taken by the boat to travel 135 km with the current. 

Solution:
Relative speed = 5 + 10 
=15 km/hr 

Time = Distance/speed 
= 135/15 
= 9 hour
১৮০.
In covering a certain distance, the speed of A and B are in the ratio of 3 : 4. A takes 30 minutes more than B to reach the destination. The time taken by A to reach the destination is:
  1. ক) 1.0 hour
  2. খ) 1.5 hour
  3. গ) 2.0 hours
  4. ঘ) 2.5 hours
ব্যাখ্যা
A এবং B এর গতিবেগের অনুপাত =  3 : 4
A এর গতিবেগ =3x 
B এর গতিবেগ = 4x 

নির্দিষ্ট স্থানে B পৌঁছাতে সময় নেয় t মিনিট 
নির্দিষ্ট স্থানে A পৌঁছাতে সময় নেয় t + 30 মিনিট 

এখন,
3x(t + 30) = 4xt
3t + 90 = 4t 
4t - 3t = 90 
t = 90 

নির্দিষ্ট স্থানে A পৌঁছাতে সময় নেয় (90 + 30) মিনিট = 120 মিনিট
                                                                              = 2 ঘণ্টা
১৮১.
A man can row 5 km/h in still water.If the speed of the current is 1 km/hr, it takes 3 h more in upstream than in the downstream for the same distance. The distance is-
  1. ক) 44 km 
  2. খ) 42 km 
  3. গ) 38 km 
  4. ঘ) 36 km 
ব্যাখ্যা
Question: A man can row 5 km/h in still water. If the speed of the current is 1 km/hr, it takes 3 h more in upstream than in the downstream for the same distance. The distance is-

Solution: 
Let the distance be = d
Speed of boat in upstream = 5 - 1= 4 km/h
Speed of the boat in downstream=5 + 1= 6 km/h
According to the question,

Now
d​/4 − d/6 ​= 3
(3d - 2d)/12 ​=3
d/12 = 3
d = 36 km 
১৮২.
The distance between two towns is 150 km. A cyclist travels from town A to B at 30 km/h and returns at 25 km/h. What is the average speed for the entire trip?
  1. 26.50 km/h
  2. 27.27 km/h
  3. 29.66 km/h
  4. 24.75 km/h
ব্যাখ্যা
Question: The distance between two towns is 150 km. A cyclist travels from town A to B at 30 km/h and returns at 25 km/h. What is the average speed for the entire trip?

Solution:
Given that,
Distance between two towns = 150 km
Speed from A to B = 30 km/h
Speed from B to A = 25 km/h

Now,
Time from A to B,
t1 = 150/30 = 5 hours

And
Time from B to A,
t2 = 150/25 = 6 hours

Therefore,
Total distance = 150 + 150 = 300 km
Total time = 5 + 6 = 11 hours

∴ Average speed = Total distance/Total time
= 300/11 = 27.27 km/h

∴ The average speed for the entire trip is 27.27 km/h.

১৮৩.
Speed ​​of the boat and current are 12 and 4 km/h respectively. How much time will it take for the boat to travel 64 km downstream and then return the same distance upstream? 
  1. 10 hours
  2. 9 hours
  3. 12 hours
  4. 15 hours
ব্যাখ্যা

Question: Speed ​​of the boat and current are 12 and 4 km/h respectively. How much time will it take for the boat to travel 64 km downstream and then return the same distance upstream?

Solution:
We know,
Effective speed with the current = Actual speed + speed of stream
= (12 + 4)  km/h
= 16 km/h

∴ Time taken to cover 64 km = (64 ÷ 16) hours 
= 4 hours

Effective speed against the current = Actual speed - speed of stream
= (12 - 4) km/h
= 8 km/h

∴  Time taken to return 64 km = (64 ÷ 8) hours
= 8 hours

∴ Total time taken = (4 + 8) hours 
= 12 hours

১৮৪.
When the speed is increased to 4 kmph it takes 4 hours less to cover a distance of 32 km. Find the previous speed.
  1. 8 kmph
  2. 4 kmph
  3. 12 kmph
  4. 10 kmph
  5. 9 kmph
ব্যাখ্যা

Previous speed = x
A/Q,
32/x - 32/(x + 4) = 4
Or, 32x + 128 - 32x/x(x + 4) = 4
Or, (x + 4)x = 32
Or, x2 + 4x - 32 = 0
Or, x2 + 8x - 4x - 32 = 0
Or, (x + 8) (x - 4) = 0
So, the previous speed was 4 kmph.
And, Present speed will be 4 + 4 = 8 kmph.

১৮৫.
A train, 800meter long is running with a speed of 78 km/hr. It crosses a tunnel in 1 minute. What is the length of the tunnel (in meters)?
  1. ক) 440 meter
  2. খ) 260 meter
  3. গ) 500 meter
  4. ঘ) 430 meter
ব্যাখ্যা

Let the length of the tunnel = x meter
Then, distance = (800 + x) meter.
Time = 1 minute = 60 seconds.
Speed = 78 km/hr
= 78 × (5/18)
= (65/3) m/s
According to the question,
800 + x = 60 × (65/3)
⇒ 800 + x = 1300
⇒ x = 500 meter.

১৮৬.
A man can row at 8 kmph in still water. If the velocity of current is 2 kmph and it takes him 2 hour to row to a place and come back, how far is the place?
  1. 5.6 km
  2. 4.5 km
  3. 7.5 km
  4. 5.5 km
ব্যাখ্যা
Question: A man can row at 8 kmph in still water. If the velocity of current is 2 kmph and it takes him 2 hour to row to a place and come back, how far is the place?

Solution:
Speed downstream = (8 + 2) kmph = 10 kmph
Speed upstream = (8 - 2) kmph = 6 kmph
Let the required distance be x km

ATQ,
(x/10) + (x/6) = 2
⇒ (3x + 5x)/30 = 2
⇒ 8x = 60
∴ x = 7.5
১৮৭.
A train 150m long passes a pole in 15 seconds and crosses another train of the same length travelling in opposite direction in 8 seconds. The speed of the second train in (km/h) is -
  1. 66 km/h
  2. 124 km/h
  3. 99 km/h
  4. 93 km/h
ব্যাখ্যা
Question: A train 150m long passes a pole in 15 seconds and crosses another train of the same length travelling in opposite direction in 8 seconds. The speed of the second train in (km/h) is -

Solution:
Speed of the first train :
= 150/15 = 10 m/s

Time taken by trains to cross each other = 8 s
And, relative speed of two trains :
= (150 + 150)/8 = 37.5

∴ Speed of the second train :
= (37.5 - 10) × 18/5
= 99 km/h
১৮৮.
A train 300 metres long is running at a speed of 45 km/hr. How many seconds will it take cross a 200 metres long train running in the same direction at a speed of 30 km/h?
  1. 60 s
  2. 75 s
  3. 100 s
  4. 110 s
  5. None
ব্যাখ্যা
Question: A train 300 metres long is running at a speed of 45 km/hr. How many seconds will it take cross a 200 metres long train running in the same direction at a speed of 30 km/hr?

Solution:
Here,
Length of 1st train 300 metres
Length of 2nd train 200 metres

∴ Total distance to cross each other = 300 + 200 metres
= 500 metres

Relative speed for travelling same direction = 45 - 30 km/hr
= 15 km/hr
= (15 × 1000)/3600 m/s
= 25/6 m/s

Required time to cross = 500/(25/6) s
= (500 × 6)/25 s
= 120 s
১৮৯.
A train travels 360 km at a uniform speed. If the speed had been 5 km/h more, it would have taken 1 hour less for the same journey. Find the speed of the train.
  1. 30 km/hr
  2. 40 km/hr
  3. 50 km/hr
  4. 60 km/hr
  5. 67 km/hr
ব্যাখ্যা

Let x km/hr be the speed of the train.

Time required to cover 360 km = 360/x hr.

As per the question given,

⇒ (x + 5)((360/x)- 1) = 360
⇒ (x + 5)(360 – x) = 360x
⇒ 360x – x2 + 1800 - 5x = 360x
⇒ x2 + 5x – 1800 = 0
⇒ x(x + 45) -40(x + 45) = 0
⇒ (x + 45)(x – 40) = 0
⇒ x = 40, -45

Negative value is not considered for speed, hence the answer is 40km/hr.

১৯০.
A boatman can row a boat at the speed of 5 km/hr upstream and 15 km/hr downstream. Find the speed of the stream.
  1. 5 km/h
  2. 7.5 km/h
  3. 10 km/h
  4. 2.5 km/h
ব্যাখ্যা
Question: A boatman can row a boat at the speed of 5 km/hr upstream and 15 km/hr downstream. Find the speed of the stream.

Solution:
Let’s denote:
B as Speed of the boat in still water (km/h)
S as Speed of the stream (km/h)

Speed of the boat upstream is the speed of the boat in still water minus the speed of the stream:
B - S = 5 km/hr…(i)

Speed of the boat downstream is the speed of the boat in still water plus the speed of the stream:
B + S = 15 km/hr…(ii)

 
Solving both equations
B = 10 km/h and S = 5 km/h

∴ Speed of the stream is 5 km/h
১৯১.
A man takes 2.2 times as long to row a distance upstream as to row the same distance downstream. If he can row 55 km downstream in 2 hour 30 minutes, what is the speed of the boat in the still water?
  1. ক) 40 km/hr
  2. খ) 8 km/hr
  3. গ) 16m/hr
  4. ঘ) 24 km/hr
ব্যাখ্যা

Downstream speed = 55/(5/2) = 11 × 2
= 22 km/hours

Time taken in upstream = 2.2 × 5/2
= 5.5 hours

Upstream speed = 55/5.5
= 10 km/hour

∴ The speed of boat in still water

= (10 + 22)/2
= 32/2
= 16 km/hr.

১৯২.
Two trucks 300 km away are travelling towards each other with a constant speed. Truck A is moving at a average speed 70 km/h while truck B is moving at average speed 50 km/h. How long does it take for them to meet.
  1. ক) 5 hours
  2. খ) 3 hours
  3. গ) 2.5 hours
  4. ঘ) 6 hours
ব্যাখ্যা

যেহেতু ট্রাক দুটি বিপরীত দিকে চলছে, সেহেতু এদের গতিবেগ যোগ করলে আপেক্ষিক বেগ পাওয়া যাবে। 

∴ নির্ণেয় সময় = 300 / (70+50) ঘণ্টা
= 300/120 ঘণ্টা
= 2.5 ঘণ্টা

১৯৩.
The elevator in a eleven-storied office building travels at the rate of one floor per 1/4 minute, which allows time for picking up and letting down passengers. At the main floor and at the top floor the operator stops for 1 minute. How many complete (return) trips will the operator makes during a 7 hour period?
  1. 50
  2. 60
  3. 80
  4. None
ব্যাখ্যা
Question: The elevator in a eleven-storied office building travels at the rate of one floor per 1/4 minute, which allows time for picking up and letting down passengers. At the main floor and at the top floor the operator stops for 1 minute. How many complete (return) trips will the operator makes during a 7 hour period?

Solution:
Complete trip = 10 floors up + 10 floors down
= 20 floors

Complete trip time taken = 
= 20 × (1/4) + 2 minutes 
= 5 minutes + 2 minutes
= 7 minutes.

Now
7 hour = 7 × 60 minutes. = 420 minutes.

In 420 minutes operator can make = 420/7 = 60 trips.
১৯৪.
A train having a length of 240 metre passes a post in 24 seconds. How long will it take to pass a platform having a length of 650 metre?
  1. ক) 99 seconds
  2. খ) 100 seconds
  3. গ) 89 seconds
  4. ঘ) 98 seconds
  5. ঙ) 97 seconds
ব্যাখ্যা
Speed of the train = 240/24 = 10 m/s
Required time = (240 + 650)/10 = 89 seconds
১৯৫.
The ratio between the speeds of two trains is 5 : 6. If the second train runs 270 km in 3 hours, then the speed of the first train is:
  1. ক) 75 km/hr.
  2. খ) 65.5 km/hr.
  3. গ) 75.8 km/hr.
  4. ঘ) 75.5 km/hr.
ব্যাখ্যা
Question: The ratio between the speeds of two trains is 5 : 6. If the second train runs 270 km in 3 hours, then the speed of the first train is:

Solution: 
Let,
the speed of first train be 5x
the speed of second train be 6x

ATQ, 
6x = 270/3 
Or, 6x = 90
Or, x = 90/6 
Or, x = 15

∴  Speed of first train =  5x = 5 × 15 = 75 km/hr. 
১৯৬.
If a person walks at 18 km/hr instead of 12 km/hr, he would have walked 25 km more. The actual distance travelled by him is:
  1. ক) 50 km. 
  2. খ) 48 km. 
  3. গ) 60 km. 
  4. ঘ) 55 km. 
ব্যাখ্যা
Question: If a person walks at 18 km/hr instead of 12 km/hr, he would have walked 25 km more. The actual distance travelled by him is:

Solution: 
Let the actual distance travelled be x km.

ATQ, 
Or, x/12 = (x + 25)/18
Or, 18x = 12x + 300
Or, 18x − 12x = 300
Or, 6x = 300
Or, x = 50
∴ distance = 50 km.
১৯৭.
An aeroplane covers a certain distance at a speed of 250 kmph in 4 hours. To cover the same distance in  hours, it must travel at a speed of: 
  1. 600 kmph
  2. 800 kmph
  3. 900 kmph
  4. 755.5 kmph
ব্যাখ্যা

Question: An aeroplane covers a certain distance at a speed of 250 kmph in 4 hours. To cover the same distance in hours, it must travel at a speed of:

Solution:
বিমানটির অতিক্রান্ত  মোট দূরত্ব = গতিবেগ × সময়
= 250 কিমি/ঘন্টা × 4 ঘন্টা
= 1000 কিমি

এখন, একই দূরত্ব ঘন্টায় অতিক্রম করার জন্য প্রয়োজনীয় গতিবেগ নির্ণয় করতে হবে।

ঘন্টা = (1 + 1/4) ঘন্টা = 5/4 ঘন্টা

প্রয়োজনীয় গতিবেগ = মোট দূরত্ব/সময়
= 1000 কিমি/(5/4) ঘন্টা
= (1000 × 4/5) কিমি/ঘন্টা
= 200 × 4 কিমি/ঘন্টা
= 800 কিমি/ঘন্টা

সুতরাং, একই দূরত্ব 5/4 ঘন্টায় অতিক্রম করার জন্য বিমানটিকে 800 কিমি/ঘন্টা গতিবেগে চলতে হবে।

১৯৮.
A boat running downstream covers a distance of 36 km in 3 hours while for covering the same distance upstream, it takes 4 hours. What is the speed of the boat in still water?
  1. ক) 7.5 km/hr.
  2. খ) 9.5 km/hr.
  3. গ) 10.5 km/hr.
  4. ঘ) 12.5 km/hr.
ব্যাখ্যা
Rate downstream = (36/3) km/hr. = 12 km/hr.
Rate upstream = (36/4) km/hr. =9 km/hr.

 The speed of the boat in still water = (1/2)(12 + 9) km/hr.
                                                          = (1/2) × 21 km/hr.
                                                           = 10.5 km/hr.
১৯৯.
In a 100m race, Javed defeated Naveed by 5 seconds. If the speed of Javed is 18 Kmph, then the speed of Naveed is-
  1. ক) 15.4 kmph
  2. খ) 14.4 kmph
  3. গ) 14.5 kmph
  4. ঘ) 15.4 kmph
  5. ঙ) 13.5 kmph
ব্যাখ্যা

Time taken by Javed =100/{18 × (5/18)} = 20 seconds
Time taken by Naveed = 20 + 5 = 25 seconds
Speed of Naveed = 100/25 × 18/5 = 14.4 km/h

২০০.
A swimmer swims in a river against the current and takes 30 minutes to swim 2 km. With the current, he takes 20 minutes to swim the same distance. What is his speed in still water?
  1. 3 km/h
  2. 4 km/h
  3. 5 km/h
  4. 6 km/h
ব্যাখ্যা
Question: A swimmer swims in a river against the current and takes 30 minutes to swim 2 km. With the current, he takes 20 minutes to swim the same distance. What is his speed in still water?

Solution:
Given that,
distance covered= 2 km 
time consumed = 30 min = 30/60 hr = 1/2 hr
∴ speed of the swimmer against current (upstream) = 2/(1/2) = 4 km/hr

Again,
With the current,
distance covered = 2 km
time consumed= 20 min = 20/60 hr = 1/3 hr
∴ speed of the swimmer with current (downstream)= 2/(1/3) = 6 km/hr

∴ speed in still water = (speed in downstream + speed in upstream)/2
 = (6 + 4)/2
=10/2
= 5
So, the swimmer’s speed in still water is 5 km/h