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Test: Motion in a Straight - Relative Velocity (April 24) - NEET MCQ


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10 Questions MCQ Test Daily Test for NEET Preparation - Test: Motion in a Straight - Relative Velocity (April 24)

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Test: Motion in a Straight - Relative Velocity (April 24) - Question 1

A ball A is dropped from a building of height 45 m. Simultaneously another identical ball B is thrown up with a speed 50 m s−1. The relative speed of ball B w.r.t. ball A at any instant of time is (Take g = 10 m s−2).

Detailed Solution for Test: Motion in a Straight - Relative Velocity (April 24) - Question 1

Here, u= −0 , u= +50ms−1

a= −g , a= −g

uB= uB − u= 50ms−1 − (0)ms−1 = 50ms−1

aB= a− aA = −g − (−g) = 0

∵ vBA = uBA + aBAt(As aBA = 0)

∴ vBA = uBA

As there is no acceleration of ball B w.r.t to ball A, therefore the relative speed of ball B w.r.t ball A at any instant of time remains constant (= 50ms−1).

Test: Motion in a Straight - Relative Velocity (April 24) - Question 2

A ball A is thrown up vertically with a speed u and at the same instant another ball B is released from a height h. At time t, the speed of A relative to B is

Detailed Solution for Test: Motion in a Straight - Relative Velocity (April 24) - Question 2

Taking upwards motion of ball A for time t, its velocity is VA = U - gt. 
Taking downwards motion of ball B for time, its velocity is VB = gt. 
 Relative velocity of A w.r.t. B
=VAB = VA -(-VB) = (u - gt) - (-gt) = u

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Test: Motion in a Straight - Relative Velocity (April 24) - Question 3

Two cars A and B are running at velocities of 60 km h−1 and 45 km h−1. What is the relative velocity of car A with respect to car B, if both are moving eastward?

Detailed Solution for Test: Motion in a Straight - Relative Velocity (April 24) - Question 3

Velocity of car A w.r.t. ground

∴ vAG = 60 kmh−1

Velocity of car B w.r.t. ground

∴ vBG = 45 km h−1

Relative velocity of car A w.r.t. B

vAB = vAG + vGB

=vAG − vBG = 15 km h−1 (∵ vGB = −vBG)

Test: Motion in a Straight - Relative Velocity (April 24) - Question 4

On a two-lane road, car A is travelling with a speed of 36 km h-1. Two cars B and C approach car A in opposite directions with a speed of 54 km h-1 each. At a certain instant, when the distance AB is equal to AC, both being 1 km, B decides to overtake A before C does. The minimum required acceleration of car B to avoid an accident is

Detailed Solution for Test: Motion in a Straight - Relative Velocity (April 24) - Question 4


Velocity of car A ,

Velocity of car B ,

Velocity of car C ,

Relative velocity of car B w.r.t. car A
vBA = vB−v= 15ms−1−10ms−1 = 5ms−1
Relative velocity of car C w.r.t. car A is
vCA = vC−v= −15ms−1 − 10ms−1=−25ms−1

At a certain instant, both cars B and C are at the same distance from car A

i.e. AB − BC = 1km = 1000m

Time taken by car C to cover 1km to reach car A

In order to avoid an accident, the car B accelerates such that it overtakes car A in less than 40s. Let the minimum required acceleration be a. Then,

Test: Motion in a Straight - Relative Velocity (April 24) - Question 5

A bird is tossing (flying to and fro) between two cars moving towards each other on a straight road. One car has speed of 27 km h−1 while the other has the speed of 18 km h−1. The bird starts moving from first car towards the other and is moving with the speed of 36 km h−1 when the two were separated by 36 km. The total distance covered by the bird is

Detailed Solution for Test: Motion in a Straight - Relative Velocity (April 24) - Question 5

image
 

Velocity of car A, v= +27kmh−1

Velocity of car B, v= −18kmh−1

Relative velocity of car A with respect to car B

=v− vB = + 27kmh−1  (−18kmh−1) = 45kmh−1
Time taken by the two cars to meet = 36 km/45 km h-1  = 0.8

Thus, distance covered by the bird
= 36kmh−1 x 0.8h = 28.8km

Test: Motion in a Straight - Relative Velocity (April 24) - Question 6

A bus is moving with a speed of 10ms−1 on a straight road. A scooterist wishes to overtake the bus in 100s. If the bus is at a distance of 1km from the scooterist with what speed should the scooterist chase the bus?

Detailed Solution for Test: Motion in a Straight - Relative Velocity (April 24) - Question 6

Let vs be the velocity of the scooter, the distance between the scooter and the bus = 1000m,

The velocity of the bus = 10ms−1

Time taken to overtake = 100s

Relative velocity of the scooter with respect to the bus = (v− 10)

1000/(vs − 10) = 100s

= vs = 20ms−1

Test: Motion in a Straight - Relative Velocity (April 24) - Question 7

Two towns A and B are connected by a regular bus service with a bus leaving in either direction every T minutes. A man cycling with a speed of 20 kmh-1 in the direction A to B notices that a bus goes past him every 18 min in the direction of his motion, and every 6 min in the opposite direction. The period T of the bus service is

Detailed Solution for Test: Motion in a Straight - Relative Velocity (April 24) - Question 7

Let vkmh−1 be the constant speed with which the bus travel ply between the towns A and B .

Relative velocity of the bus from A to B with respect to the cyclist = (v − 20)kmh−1

Relative velocity of the bus from B to A with respect to the cyclist = (v + 20)kmh−1

Distance travelled by the bus in time T (minutes) = vT

As per question

Equating (i) and (ii) , we get

= 18v − 18 x 20 = 6v + 20 × 6

or 12v = 20 x 6 + 18 x 20 = 480 or v = 40 kmh−1

Putting this value of v in (i) , we get

40T = 18 x 40 − 18 x 20 = 18 x 20

Test: Motion in a Straight - Relative Velocity (April 24) - Question 8

A 175m long train is travelling along a straight track with a velocity 72km−1h. A bird is flying parallel to the train in the opposite direction with a velocity 18km−1h. The time taken by the bird to cross the train is

Detailed Solution for Test: Motion in a Straight - Relative Velocity (April 24) - Question 8

Velocity of train,

Since bird is flying parallel to train in opposite direction.

∴ Relative velocity of bird w.r.t. train = vB + vT = 25m/s Train’s length = 175m

Time taken by the bird to cross the train is = 175/25 = 7s

Test: Motion in a Straight - Relative Velocity (April 24) - Question 9

Two parallel rail tracks run north-south. On one track train A moves north with a speed of 54 kmh−1 and on the other track train B moves south with a speed of 90kmh−1.  What is the velocity of a monkey running on the roof of the train A against its motion with a velocity of 18 kmh-1 with respect to the train A as observed by a man standing on the ground?

Detailed Solution for Test: Motion in a Straight - Relative Velocity (April 24) - Question 9

Let the velocity of the monkey with respect to ground be vMG
Relative velocity of the monkey with respect to the train A

Test: Motion in a Straight - Relative Velocity (April 24) - Question 10

A jet airplane travelling at the speed of 500kmh−1 ejects its products of combustion at the speed of 1500kmh−1 relative to the jet plane. The speed of the products of combustion with respect to an observer on the ground is

Detailed Solution for Test: Motion in a Straight - Relative Velocity (April 24) - Question 10

Veloity of jet plane w.r.t ground vjG = 500 km h-1
Velocity of products of combustion w.r.t jet plane vCJ = -1500 kmh-1
∴ Velocity of products of combustion w.r.t ground is vCG = vCJ + vJG = - 1500kmh-1 + 500 kmh-1
= -1000 km h-1
-ve sign shows that the direction of products of combustion is opposite to that of the plane
∴ Speed of the products of combustion w.r.t ground = 1000 km h-1

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