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ব্যাংক ডেইলি কুইজ [লং কোর্সের অংশ]

পরীক্ষাব্যাংক ডেইলি কুইজ [লং কোর্সের অংশ]তারিখতারিখ অনির্ধারিতসময়17 minutes
মোট প্রশ্ন১৫
সিলেবাস
Exam - 64 Daily Quiz: Math: Topic: Time and Speed - Train, Boat and Stream.
ঘনত্ব
উত্তর
উত্তরিতবর্তমানপুনরায় দেখুনঅসম্পূর্ণ

ব্যাংক ডেইলি কুইজ [লং কোর্সের অংশ]

ব্যাংক ডেইলি কুইজ [লং কোর্সের অংশ] · তারিখ অনির্ধারিত · ১৫ প্রশ্ন

.
A train running at the speed of 90 km/h crosses a pole in 10 seconds. What is the length of the train? 
  1. 150 meters
  2. 250 meters
  3. 100 meters
  4. 160 meters
ব্যাখ্যা

Question: A train running at the speed of 90 km/h crosses a pole in 10 seconds. What is the length of the train?

Solution:
Speed = 90 km/h
= [90 × (5/18)] m/sec
= 25 m/sec

∴ Length of the train = (25 × 10) m
= 250 m

So, the length of the train is 250 meters.

.
Excluding stoppages, the speed of a train is 80 kmph, and including stoppages, it is 64 kmph. For how many minutes does the train stop per hour?
  1. 12 minutes
  2. 15 minutes
  3. 22 minutes
  4. 16 minutes
ব্যাখ্যা

Question: Excluding stoppages, the speed of a train is 80 kmph, and including stoppages, it is 64 kmph. For how many minutes does the train stop per hour?

Solution:
Excluding stoppages speed = 80 kmph
Including stoppages speed = 64 kmph

Loss in distance per hour due to stoppages
= (80 - 64) km
= 16 km

Time taken to cover 16 km at 80 kmph
= (16/80) × 60 minutes
= 12 minutes

.
A boat takes 12 hours to cover a certain distance upstream and 8 hours to cover the same distance downstream. What is the ratio between the speed of the boat and the speed of the water current, respectively?
  1. 7 : 1 
  2. 4 : 1 
  3. 5 : 1 
  4. 3 : 1 
ব্যাখ্যা

Question: A boat takes 12 hours to cover a certain distance upstream and 8 hours to cover the same distance downstream. What is the ratio between the speed of the boat and the speed of the water current, respectively?

Solution:
Let,
Upstream speed = x kmph
Downstream speed = y kmph

Since distance is same,
x × 12 = y × 8
⇒ 12x = 8y
⇒ y = 3x/2

Now,
Speed of boat = (y + x)/2
Speed of current = (y - x)/2

∴ Required ratio
= (y + x) : (y - x)
= [(3x/2) + x] : [(3x/2) - x]
= (5x/2) : (x/2)
= 5x : x
= 5 : 1

∴ The ratio of the speed of the boat to the speed of the water current is 5 : 1.

.
A boat running downstream covers a distance of 30 km in 3 hours, while it takes 5 hours to cover the same distance upstream. What is the speed of the boat in still water?
  1. 9 km/h
  2. 5 km/h
  3. 8 km/h
  4. 10 km/h
ব্যাখ্যা

Question: A boat running downstream covers a distance of 30 km in 3 hours, while it takes 5 hours to cover the same distance upstream. What is the speed of the boat in still water?

Solution:
Rate while running downstream = (30/3) km/h
= 10 km/h

Rate while running upstream = (30/5) km/h
= 6 km/h

∴ Speed of the boat in still water
= (10 + 6)/2 km/h
= 8 km/h

So, the speed of the boat in still water is 8 km/h.

.
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.

.
A man takes 6 hours to walk to a place and ride back to the starting point. If he were to walk both ways, it would take him 9 hours. How much time would he take to ride both ways?
  1. 3 hours
  2. 2 hours
  3. 5 hours
  4. 4 hours
ব্যাখ্যা

Question: A man takes 6 hours to walk to a place and ride back to the starting point. If he were to walk both ways, it would take him 9 hours. How much time would he take to ride both ways?

Solution:
Time taken in walking both ways = 9 hours ................(i)
Time taken in walking one way and riding back = 6 hours ........(ii)

By the equation (ii) × 2 - (i), we have:
Time taken by the man in riding both ways
= (6 × 2) - 9
= 12 - 9
= 3 hours

∴ The time taken by him to ride both ways is 3 hours.

.
A train passes a telegraph post and a 300 m long bridge in 10 seconds and 25 seconds, respectively. Find the speed of the train in km/h.
  1. 72 km/h
  2. 32 km/h
  3. 52 km/h
  4. 62 km/h
ব্যাখ্যা

Question: A train passes a telegraph post and a 300 m long bridge in 10 seconds and 25 seconds, respectively. Find the speed of the train in km/h.

Solution:
Let,
Length of the train = x metres
Speed of the train = y m/sec

Time to pass the telegraph post:
x/y = 10
⇒ x = 10y

Time to pass the bridge:
(x + 300)/25 = y
⇒ x + 300 = 25y
⇒ 10y + 300 = 25y
⇒ 25y - 10y = 300
⇒ 15y = 300
⇒ y = 20 m/sec

∴ Speed of the train = 20 × (18/5) km/h
= 72 km/h

So, the speed of the train is 72 km/h.

.
P runs three times faster than Q, and Q runs twice as fast as R. If R covers a certain distance in 120 minutes, how long will it take P to cover the same distance?
  1. 10 minutes
  2. 20 minutes
  3. 25 minutes
  4. 30 minutes
ব্যাখ্যা

Question: P runs three times faster than Q, and Q runs twice as fast as R. If R covers a certain distance in 120 minutes, how long will it take P to cover the same distance?

Solution:
Let,
Speed of R = x
Then speed of Q = 2x
Speed of P = 2x × 3 = 6x

Ratio of speeds P : Q : R = 6x : 2x : x = 6 : 2 : 1

Since time is inversely proportional to speed,
Ratio of time taken P : Q : R = 1/6 : 1/2 : 1 = 1 : 3 : 6
Given that,
R covers a certain distance in 120 minutes.
So,
6 units = 120 minutes
1 unit = (120 ÷ 6) minutes = 20 minutes

∴ P will cover the same distance in 20 minutes.

.
A 180 meter long train running at the speed of 72 km/h crosses another train running in the opposite direction at the speed of 108 km/h in 10 seconds. What is the length of the other train? 
  1. 120 meters
  2. 320 meters
  3. 220 meters
  4. 420 meters
ব্যাখ্যা

Question: A 180 meter long train running at the speed of 72 km/h crosses another train running in the opposite direction at the speed of 108 km/h in 10 seconds. What is the length of the other train?

Solution:
Relative speed = (72 + 108) km/h
= 180 × (5/18) m/sec
= 50 m/sec

Let,
Length of the other train = x metres

Then,
(x + 180)/10 = 50
⇒ x + 180 = 500
⇒ x = 500 - 180
∴ x = 320

∴ The length of the other train is 320 meters.

১০.
A man can row at 10 kmph in still water. If the speed of the current is 2 kmph and it takes him 1.5 hours to row to a place and come back, how far is the place? 
  1. 7.2 km away
  2. 7 km away
  3. 8.2 km away
  4. 6 km away
ব্যাখ্যা

Question: A man can row at 10 kmph in still water. If the speed of the current is 2 kmph and it takes him 1.5 hours to row to a place and come back, how far is the place?

Solution:
Speed downstream = 10 + 2 = 12 kmph
Speed upstream = 10 - 2 = 8 kmph

Let the required distance = x km

ATQ,
(x/12) + (x/8) = 1.5
Or, (2x + 3x)/24 = 1.5
Or, 5x/24 = 1.5
Or, 5x = 36
∴ x = 36/5
∴ x = 7.2 km

∴ The place is 7.2 km away.

১১.
A boat moves at a speed of 30 km/h in still water. The speed of the current is 5 km/h. How far will the boat travel downstream in 12 minutes? 
  1. 8 km
  2. 7 km
  3. 6 km
  4. 10 km
ব্যাখ্যা

Question: A boat moves at a speed of 30 km/h in still water. The speed of the current is 5 km/h. How far will the boat travel downstream in 12 minutes?

Solution:
Speed of the boat in still water = 30 km/h
Speed of the current = 5 km/h

∴ Speed downstream = 30 + 5 = 35 km/h

Time = 12 minutes = 12/60 hours = 1/5 hours

∴ Distance travelled downstream = 35 × (1/5) km
= 7 km

∴ The distance travelled downstream is 7 km.

১২.
Two trains start at the same time from Chittagong and Sylhet and proceed towards each other at 80 km/h and 100 km/h, respectively. When they meet, it is found that one train has travelled 80 km more than the other. Find the distance between Chittagong and Sylhet.
  1. 720 km
  2. 520 km
  3. 620 km
  4. 600 km
ব্যাখ্যা

Question: Two trains start at the same time from Chittagong and Sylhet and proceed towards each other at 80 km/h and 100 km/h, respectively. When they meet, it is found that one train has travelled 80 km more than the other. Find the distance between Chittagong and Sylhet.

Solution:
Let the trains meet after t hours.

ATQ,
(100 × t) = (80 × t) + 80
⇒ 100t - 80t = 80
⇒ 20t = 80
∴ t = 4 hours

∴ Distance between Chittagong and Sylhet = (100 × 4) + (80 × 4)
= 400 + 320
= 720 km

∴ The distance between Chittagong and Sylhet is 720 km.

১৩.
Sonar Bangla express, normally reaches its destination at 72 km/h in 6 hours. Find the speed at which it must travel to reduce the travel time by 2 hours?
  1. 78 km/h
  2. 66 km/h
  3. 58 km/h
  4. 108 km/h
ব্যাখ্যা

Question: Sonar Bangla express, normally reaches its destination at 72 km/h in 6 hours. Find the speed at which it must travel to reduce the travel time by 2 hours?

Solution:
Distance to be covered = Speed × Time
= 72 × 6
= 432 km

Reduced time = 6 - 2 = 4 hours

∴ Required speed = 432/4
= 108 km/h

∴ The train must travel at 108 km/h to reduce the time by 2 hours.

১৪.
A machine wheel has a circumference of 50 cm and completes 24 rotations in 4 seconds. What is the speed of the wheel in kilometers per hour (km/h)? 
  1. 25 km/h
  2. 10 km/h
  3. 10.8 km/h
  4. 4.5 km/h
ব্যাখ্যা

Question: A machine wheel has a circumference of 50 cm and completes 24 rotations in 4 seconds. What is the speed of the wheel in kilometers per hour (km/h)?

Solution:
Total distance covered = (50 × 24) cm
= 1200 cm
= (1200 ÷ 100) m
= 12 m

We know,
Speed = (Total distance ÷ Time)
= (12 ÷ 4) m/sec
= 3 m/sec

Converting into km/h,
= 3 × (18/5) km/h
= 10.8 km/h

∴ The speed of the wheel is 10.8 km/h.

১৫.
A train covers a certain distance at a speed of 240 kmph in 6 hours. To cover the same distance in 4 hours, it must travel at a speed of-
  1. 260 km/h
  2. 360 km/h
  3. 160 km/h
  4. 220 km/h
ব্যাখ্যা

Question: A train covers a certain distance at a speed of 240 kmph in 6 hours. To cover the same distance in 4 hours, it must travel at a speed of-

Solution:
Given,
Distance = (240 × 6)
= 1440 km

We know,
Speed = (Distance ÷ Time)

∴ Required speed = (1440 ÷ 4) km/h
= 360 km/h

∴ The required speed is 360 km/h.