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KINEMATICS PROBLEM AND THEIR SOLUTION

Q.1. A projectile is fired from the top of a tower 40 meter high with an initial speed of 50 m/s at an unknown angle. Find its speed when it hits the ground.

Q.2. An aeroplane is flying in the horizontal direction with a velocity 540 km/hr at a height of 2000 m. When it is vertically above the point 'A' on the ground, a body is dropped from it. The body strikes the ground at point B. Calculate the distance AB.

Q.3. The co-ordinates of a moving particle at any time t are given by x = ct2 and y = bt2. Find initial speed of the particle.

Q.4. A ball is thrown at a speed of 50 m/s at an angle of 600 with the horizontal. Find (a) the maximum height reached.

(b) the range of ball. (Take g = 10 m/s2)

Q.5. Two cars are moving in the same direction with the same speed 30 km/hr. They are separated by a distance of 5 km. What is the speed of a car moving in the opposite direction if it meets these two cars at an interval of 4 minutes?

Q.6. A stone is projected with a speed of 40 m/s at an angle of 300 with the horizontal from a tower of height 100 m above ground. Find

(a) the maximum height attained by the stone. (b) the horizontal distance from the tower where it

hits the ground.

100 m

300 40 m/s

Q.7. A projectile is fired from the top of a tower 40 meter high with an initial speed of 50 m/s at an

unknown angle. Find its speed when it hits the ground.

Q.8. An aeroplane is flying in a horizontal direction with a velocity 600 km/hr at a height of 1960 m. When it is vertically above the point 'A' on the ground, a body is dropped from it. The body strikes the ground at point B. Calculate the distance AB.

Q.9. Two cars are moving in the same direction with the same speed 30 km/hr. They are separated by a distance of 5 km. What is the speed of a car moving in the opposite direction if it meets these two cars at an internal of 4 minutes?

Q.10. A man standing on a road has to hold his umbrella at 300 with the vertical to keep the rain away. He throws the umbrella and starts running at 10 km/hr. He finds raindrops are hitting his head vertically. Find the speed of raindrops with respect to

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Q.11. Find the relation between the acceleration of rod A and wedge B in the arrangement shown in the figure. Assume all the surfaces to be smooth.

 B

A

Q.12. The position of a particle at time t = 0 is P = (-1, 2, -1). It starts moving with an initial velocity ˆ ˆ

u3i4 j and with uniform acceleration4iˆ4 jˆ. Find the final position and the magnitude of displacement after 4 sec.

Q.13. A particle is projected with velocity u and angle  with the horizontal. Find the time after which the velocity will be perpendicular to the initial velocity.

Q.14. A particle moves in x-y plane with constant acceleration ‘a’ directed along the negative y-axis. The equation of motion of the particle has the form y = x - x2, where  and  are positive constants. Find the velocity of the particle at the origin.

Q.15. From the velocity time graph shown in figure. Find the distance travelled by the particle during the first 40 sec. Also find the average velocity

during this period. 20 40

5 m/s

-5 m/s

sec.

Q.16. A train travels from one station to another at a speed of 40 km/hr and returns to the first station at the speed of 60 km/hr. Calculate the average speed and average velocity of the train.

Q.17. A body travels 200 cm in the first two seconds and 220 cm in the next four seconds. What will be the velocity at the end of seventh second from start ?

Q.18. A man standing on a hill top projects a stone horizontally with speed v0 as shown in figure. Taking the ordinate system as given in the figure find the co-ordinates of the point where the stone will hit the hill surface. x y (0, 0)  v0

Q.19. A particle of mass 3 kg moves under a force of 4iˆ + 8 jˆ + 10 kˆ . Newton. Calculate the acceleration (as vector) to which the particle is subjected to. If the particle starts from rest and was at origin initially, what are its new coordinates after 3 seconds?. Q.20. In a car race, car A takes a time t sec less than car B at the finish and passes the finishing point with speed v m/s more than the car B. Assuming that both the cars starts from rest and travel with constant acceleration a1 and a2 respectively. Show that v=( a1a2 ) t

Q.21. On a cricket field the batsman is at the origin of co-ordinates and a fielder stands in position (46 i

+ 28 j) m. The batsman hits the ball so that it rolls along the ground with constant velocity

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(7.5 i 10j) m/s. The fielder can run with a speed of 5 m/s. If he starts to run immediately the ball is hit, what is the shortest time in which he could intercept the ball ?

Q.22. A particle moves in the x - y plane with velocity vx = 8t - 2 and vy = 2. If it passes through the point x = 14 and y = 4 at t = 2s, Find the equation of the path.

Q.23. (a) A ball rolls off the edge of a horizontal table top 4m high. If it strikes the floor at a point 5m horizontally away from the edge of the table, what was its speed at the instant it left the table. Q.24. A farmer has to go 500 m due north, 400 m due east and 200 m due south to reach his field. If he

takes 20 minutes to reach the field,

(a) what distance he has to walk to reach the field ? (b) what is his displacement from his house to the field ? (c) what is the average speed of farmer during the walk ? (d) what is the average velocity of farmer during the walk ?

Q.25. Two cars are moving in the same direction with the same speed 30 km/hr. They are separated by a distance of 5 km. What is the speed of a car moving in the opposite direction if it meets these two cars at an internal of 4 minutes?

Q.26. The equation of motion of a particle moving along a straight line is given as x = ½ vt where x, v, t have usual meaning. Draw its approximate acceleration time graph.

Q.27. A river 400 m wide is flowing at a rate of 4 m/s. A boat is sailing at a velocity of 20 m/s with respect to the still water in a direction making an angle 370 with the direction of river flow.

(a) Find time taken by the boat to reach the opposite bank.

(b) How far from the starting point does the boat reach on the opposite bank.

Q.28. An object projected with the same speed at two different angles covers the same horizontal range R. If the two times of flight be t1 and t2, prove that R =

2 1

gt1t2.

Q.29. Velocity-time graph of a particle moving in a straight line is shown in figure. Plot the corresponding displacement time graph of a particle if at t = 0 displacement s = 0. t (sec.) v (m /s ) 2 4 6 8 0 10 20 A B C D

Q.30. A particle is projected with velocity v and at angle  from the horizontal. Find the instantaneous power delivered by the gravity at the highest point.

Q.31. Two particles move in a straight line towards each other with initial velocities v1 and v2 and with constant accelerations a1 and a2 directed against the corresponding velocities at the initial instant. What must be the initial maximum separation Smax between the two particles for which they meet during the motion?

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Q.32. If an object travels one half of its total path in the last second of its fall from the rest then find (a) the time and

(b) the height of its fall.

Q.33. A truck moving with constant acceleration covers the distance between two points 180 m apart in 6 seconds. Its speed as it passes the second point is 45 m/s. Find

(a) its acceleration

(b) its speed when it was at the first point.

Q.34. A body undergoing uniformly accelerated motion starts moving along +x-axis with a velocity of 5 m/s and after 5 seconds its velocity becomes 20 m/s in the same direction. What is the velocity of the body 10 seconds after the start of the motion ?

Q.35. What is the speed with which a stone is projected vertically upwards from the ground if it attains a maximum height of 20 m?

Q.36. A stone is projected from the ground with a velocity of 20 2 m/s at an angle of 450 with the horizontal? What is the maximum height from the ground attained by the stone?

Q.37. The velocity of a car changes from 72 km/hr due east to 72 km/hr due north in 10 seconds. What is the average acceleration of the car over this duration of time?

Q.38. A train moving along a straight road with a speed of 108 km/hr is brought to stop to next station within 120 sec. after applying the brakes for the next station. What is the magnitude of the retardation of the train.

Q.39. A car moving along a long straight road with a speed of 10 m/s is brought to rest within 10 seconds after applying the brakes. What is the magnitude of the retardation of the car ?

Q.40. A box is sliding on a smooth frictionless surface as shown in the figure. A particle is projected at any unknown angle w.r.t. box. At the same time another particle of mass m is released from the ceiling of the block. Find out the relative acceleration of the two particles.

m 2m

u

Q.41. A stone is projected from a balloon which is ascending with a velocity 2 m/s. The velocity of the stone w.r.t. balloon is 2 m/s at an angle of 450. Find out the velocity of stone with respect to ground.

Q.42. A body is projected with velocity 5 3 m/s at an angle of 600 with the horizontal. Find the angle between the initial velocity vector and the velocity vector at a height of 2.5 m.

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Q.43. The velocity – time graph of a particle moving along X – axis is shown. Find the displacement and the distance travelled in 10 s.

0 5 10  v 2 (m/s) t(s) -1

Q.44. A particle of mass m is projected horizontally from certain height with a velocity v0. Find kinetic energy of the particle after t seconds, assuming it is in the air.

Q.45. A particle moves in x-y plane such that x = kt and y = mt2. Where k and m are constants and t is the time. Find the velocity and the equation of trajectory of the particle.

Q.46. A car starting from rest moving on a straight line has acceleration – time graph as shown in the figure. Draw the velocity – time graph. -2 -1 1 2 m/s2 1 2 3 4 5 t (s ec .) a

Q.47. The acceleration of a particle varies with time as shown. If velocity at t = 0 is v0 then calculate velocity as a function of time.

t a 

450

Q.48. A stone is dropped from a tower of height H. If distance covered during last second is half of total height H. Find the total time taken by stone to reach the ground. Also find the value of H. Q.49. A particle moves in a circle of radius 20 cm at a speed given by v = 1 + t + t2 m/s where t is time in s. Find (a) the initial tangential and normal acceleration. (b) the angle covered by the radius in first 2 s.

Q.50. A particle of mass m is projected at angle  with the horizontal. The speed of a particle, when it is at the greatest height is (2/5)1/2 times its speed when it is at half of its greatest height. Determine its angle of projection.

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Q.51. A particle starts from origin at t = 0 along +ve x axis. It’s velocity –time graph is shown in the figure. Draw (i) a, t graph (ii) x, t graph -4 O 4 v 2 4 t

Q.52. The motion of a particle along a straight line is described by the function, x = 6 + 4t2 - t4 where x is in meters and t is in seconds. Find the position, velocity and acceleration at t = 2 sec.

Q.53. A boat travels downstream from point A to point B in two hours and upstream in four hours. Find the time taken by a log of wood to cover the distance from point A to point B.

Q.54. A particle slides down a smooth inclined plane of elevation  fixed in the elevator going up with an acceleration a0 as shown in figure. The base of the incline has a length L. Find the time taken by the particle to reach the bottom.

m a0

L

Q.55. Two particles of masses m1 and m2 in projectile motion have velocities v1 

and v2 

respectively at time t = 0. They collide at time t0. Their velocities become v1

and v2 

at time 2t0 while moving in air. Find the value of |(m1v1 m2v2) (m1v1 m2v2)|

         .

Q.56. A particle moving with uniform acceleration describes distances S1 and S2 meters in successive intervals of time t1 and t2 seconds. Prove that the acceleration is

2 (S2t1 - S1t2) / t1t2 (t1 + t2)

Q.57. Two cars having masses m1 and m2 move in circles of radii r1 and r2 respectively. If they complete the circles in equal time, find the ratio of the their angular speeds

2 1

 

.

Q.58. A body of mass m is projected vertically upwards with a velocity v0. It goes up and comes back to the same point. For this motion draw displacement-time, velocity-time, acceleration-time and velocity-displacement graphs.

Q.59. A man standing on a road has to hold his umbrella at 300 with the vertical to keep the rain away. He throws the umbrella and running at 10 kmph. He finds that rain drops are hitting his head vertically. find the speed of raindrops with respect to

(a) the road

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Q.60. A projectile travelling in a direction at 300 to the horizontal after 2 seconds of its start. It is travelling horizontally after one more second. Calculate the speed and angle of projection of the projectile. Q.61. Find the speed of two objects if, when they move towards each other, they get x meter closer every

second and when they move uniformly in the same direction with their original speeds, they get y

meter closer every two seconds.

Q.62. From the velocity time graph shown in figure. Find the distance travelled by the particle during the first 40 sec. Also find the average velocity during this period.

20 40

5 m/s

-5 m/s

sec.

Q.63. A particle A is moving along a straight line with velocity 3 m/s and another particle B has a velocity 5 m/s at an angle 300 to the path of A. Find the velocity of B relative to A.

Q.64. One end of a massless spring of spring constant 100 N / m and natural length 0.5 m is fixed and the other end is connected to a particle of mass 0.5 kg lying on a frictionless horizontal table. The spring remains horizontal. If the mass is made to rotate at an angular velocity of 2 rad/s, find the elongation of the spring.

Q.65. A ball takes t second to fall from a height h1 and 2t second to fall from a height h2 then what is the ratio of h1/h2.

Q.66. A projectile is projected with a unknown velocity at an unknown angle . If time of flight is 4 sec. What will be the maximum height reach by the projectile.

Q.67. A stone is projected from the ground with a velocity of 10 m/s in the vertically upward direction. How long does it remain in the air ?

Q.68. Two particles A and B are moving in a horizontal plane anticlockwise on two different concentric circles with

different constant angular velocities 2 and  respectively. (a) Find the relative velocity of B w.r.t. A after time t = /. (Initial position of particles A and B are shown in figure.) (b) Also find the relative position vector of B w.r.t. A.

A B X

Y

r 2r

Q.69. The velocity-time graph of a particle is given as shown in the figure. Find the distance travelled by the object in 7th second. 1 sec t v 7 m/s 4 m/s 3m/s 4 sec O 7 sec

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Q.70. A plate is moving with a constant velocity v0 in a horizontal plane. A small particle is moving in a circular (horizontal) path of radius  with constant angular velocity. Find velocity of particle with respect to ground when line OP makes angle  with x-axis. x y   P v0  O

Q.71. A particle is projected with a velocity u at an angle  with an inclined plane which makes an angle 45 with the horizontal. Calculate the radius of curvature of the path of projectile when velocity of projectile becomes parallel to the plane.

v

Q.72. A man standing on a road has to hold his umbrella at 300 with the vertical to keep the rain away. He throws the umbrella and starts running at 10 km/hr. He finds raindrops are hitting his head vertically. Find the speed of raindrops with respect to

(a) the road (b) the moving man.

Q.73. Two bodies are projected from the same point with equal speeds and different angle of projection. If they both strikes at the same point on an inclined plane whose inclination is . If  be the angle of projection of the first body with the horizontal show that the ratio of their times of flight is

     cos sin(

Q.74. The velocities of particles P and Q are in direction inclined at an angle  and  with the line segment PQ and if the distance between P and Q remains constants and given velocity of P is u. Find angular speed of Q with respect to P.

 

u v

P Q

Q.75. (a) From an elevated point A, a stone is projected vertically upwards. When the stone reaches a distance h below A, its velocity is double of what it was at a height h above A. Show that the greatest height attained by the stone is 5

3h .

(b) The dependence of the x coordinate of two bodies moving in a straight line (x - axis) is given by curves a and b, respectively. Which curve corresponds to the accelerated motion and which curve to decelerated motion ? Explain .

t x b

a

Q.76. An open elevator is ascending with zero acceleration . The speed v = 10m/sec. A ball is thrown vertically up by a boy when he is at a height h = 10m from the ground. The velocity of projection is v = 30m/sec with respect to elevator . Find

(a) the maximum height attained by the ball

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(c) time taken by the ball to reach the ground after crossing the elevator Q.77. A projectile is launched from on inclined plane with an

initial velocity v0 as shown in the figure. Find the time after which the projectile hits the plane for the first time.

900

Q.78. A particle is projected up with a speed of 25 m/s from the ground. What is the maximum height attained by the stone ? What is the distance travelled by the stone during 3rd second?

Q.79. A car moving with constant acceleration covers a distance of 24 m in first 2 seconds and 51 m in the next 3 seconds. What is the velocity of the car after next 5 seconds.

Q.80. A person walks with constant speed of 5 km/hr. He walks for 1hr. due east, then for 2 hrs. due north, then for 1 hr. again due east and finally for 2 hr. due south west.

(a) What is the displacement of the person ? (b) What is the total distance travelled by him?

Q.81. A car starts moving from rest with an acceleration whose value linearly increases with time from zero to 6 m/s2 in 6 sec after which it moves with constant velocity. Find the time taken by the car to travel first 72 m from starting point.

Q.82. In the pulley-block system shown, find the accelerations of A, B, C and the tension in the string. Assume the friction to be negligible and the string to be light and inextensible. The masses of the blocks are m, 2m and 3m respectively. C B A 300

Q.83. A farmer has to go 500 m due north, 400 m due east and 200 m due south to reach his field. If he takes 20 minutes to reach the field,

(a) what distance he has to walk to reach the field ? (b) what is his displacement from his house to the field ? (c) what is the average speed of farmer during the walk ? (d) what is the average velocity of farmer during the walk ? Q.84. A man wants to reach point B on the opposite bank of a

river flowing at a speed u as shown in the figure. What minimum speed relative to water should the man have so that he can reach point B ? In which direction should he swim ?

B

u 450

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Q.85. Two Blocks A and B of masses 10 kg and 6 kg respectively are connected through pulley as shown in figure. Find

(a) acceleration of A and B.

(b) friction force acting on block A and B. (c) tension between A and B. You may assume

the string was initially in just taut position.

10kg =0.5 A 4kg 6kg 2kg B =0.2 [1+2+1=4]

Q.86. Two particles projected vertically upward from point (0, 0) and (1, 0) with uniform velocity 10 m/s and v m/s respectively, as shown in the figure. It is found that they collide after time t in space. Find v and t. Y 45 30 10 m/s v m/s x (1, 0) (0, 0)

Q.87. Two smooth wedges of equal mass m are placed as shown in figure. All surfaces are smooth. Find the velocities of A & B when A hits the ground.

h

A B

Q.88. A particle moves in the x - y plane with velocity vpiˆqxjˆ where iˆand jˆ are unit vectors in the

direction of x and y-axis, p and q are constants. At the initial moment of time, the particle was located at the point x = y = 0. Find the equation of the trajectory of the particle.

Q.89. The velocity of a boat in still water is n times less than the velocity of flow of a river. At what angle to the stream direction must the boat move so that drift is minimised ? If n = 2, show that the angle

 = 1200.

Q.90. The velocity of a particle, when it is at the greatest height is (2/5)1/2 times its velocity when it is at half of its greatest height. Determine its angle of projection.

Q.91. On frictionless horizontal surface, assumed to be the x-y plane, a small trolley A is moving along a straight line parallel to the y-axis (see figure) with a constant velocity of (31) m/s. At a particular instant, when the line OA makes an angle of 45 with the x-axis, a ball is thrown along the surface from the origin O. Its velocity makes an angle  with the x-axis and it hits the trolley.

(a) The motion of the ball is observed from the frame of the trolley. Calculate the angle  made by the velocity vector of the ball with the x-axis in this frame.

O

A y

x 45

(b) Find the speed of the ball with respect to the surface, if  =4 3

Q.92. A river 400 m wide is flowing at a rate of 2.0 m/s. A boat is sailing at a velocity of 10 m/sec w.r.t the water in a direction perpendicular to river, find

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(b) how far from the point directly opposite to the starling point does the boat reach on opposite

bank.

Q.93. Two guns, situated at the top of a hill of height 10 m, fire one shot each with the same speed 53 m/s at some interval of time. One gun fires horizontally and the other fires upwards at an angle of 600 with the horizontal. The shots collide in air at a point P. find (I) the time interval between the fringes and (ii) the co-ordinates of the point P, take origin of the co-ordinate system at the foot of the will right below the muzzle and trajectory in x-y plane.

Q.94. A man can row a boat in still water at 3 km/h He can walk at a speed of 5 km/h on the shore. The water in the river flows at 2 km/h. If the man rows across the river and walks along the shore to reach the opposite point on the river bank find the direction in which he should row the boat so that he could reach the opposite shore in the least possible time. The width of the river is 500 m.

Q.95. There are two parallel planes each inclined to the horizontal at an angle . A particle is projected from a point mid-way between the two planes so that it grazes one of the planes and strikes the other at right angle. Find the angle of projection.

Q.96. A body falling freely from a given height H hits an inclined plane in its path at a height h. As a result of this impact the direction of the velocity of the body becomes horizontal. For what value of h/H the body will take maximum time to reach the ground ?

Q.97. The velocity time graph of moving object is given in the figure. Draw the acceleration versus time and displacement versus time graph. Find the distance travelled during the time interval when the acceleration is maximum. Assume that the particle starts from origin.

80 60 40 O 20 80 70 60 50 40 Time (s) 30 20 10 V (m/s

Q.98. A ball is thrown from the origin in the x - y plane with velocity 28.28 m/s at an angle 45 to the x - axis. At the same instant a trolley also starts moving with uniform velocity of 10m/s along the positive x - axis. Initially, the trolley is located at 38m from the origin. Determine the time and position at which the ball hits the trolley. D C 2m A B 3m 10m/s v0 45 x O y 38m

Q.99. A particle is suspended from a fixed point by a inextensible string of length 5m. It is projected from its lowest position in the horizontal direction in a vertical plane with such velocity that the string slackens after the particle has reached a height 8m above the lowest position. Find the velocity of

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Q.100. A bus is running along a highway at a speed of v1 = 16 m/s. A man is at a distance a = 60 m from the highway and at a distance b = 400 m from the bus. In what direction should the man run to reach any point of the highway, before or at the same time as the bus. The man can run at a speed of v2 = 4 m/s.

Q.101. An aircraft flies at 400 km/hr in still air. A wind of 200 2 km /hr is blowing from the south. The pilot to travel from A to a point B north east of A. Find the direction he must steer and time of his journey if AB = 1000 km. (Given cos 150 = 0.9659) N A E 450 450  vw C vaw va B

Q.102. A insect moves with constant speed of 10 m/s. At t = 0. It moves for 3 second due to east, next 3 second due to North and finally for 3 2 second due south west.

(a) What is the displacement of the insect ?

(b) What is the total distance travelled by insect ?

Q.103. A stone ‘A’ is dropped from the top of a tower 20 m high simultaneously another stone ‘B’ is thrown up from the bottom of the tower so that it can reach just on the top of the tower. What is the distance of the stones from the ground while they pass one another.

Q.104. A car moving with constant acceleration covers a distance of 100 m in 3 sec and then next 100 m in 2 sec. Find the acceleration of the car.

Q.105. A cyclist moves with constant speed 5 m/s along eastward for 2 seconds, then along southward for 2 seconds, then he moves along west for one second and finally along North- west for 2 seconds. Find

(a) Distance and displacement of cyclist for whole journey. (b) Average speed and Average velocity for whole journey (c) Average acceleration of cyclist for whole journey.

Q.106. A car starts from rest and moves with a constant acceleration of 2.0 m/s2 for 30 seconds. The brakes are then applied and the car comes to rest in another 60 seconds. Find

(a) total distance covered by the car. (b) Maximum speed attained by the car

(c) Find shortest distance from initial point to the point when its speed is half of maximum speed. Q.107. A particle is projected with speed 60 m/sec at an angle 300 from the horizontal. Find

(a) Minimum time taken to reach a height of 25 m.

(b) Vertical and horizontal component of velocity at the time found in part (a)

(c) The horizontal displacement covered by particle in the time calculated in part (a).

Q.108. How much high above the ground a monkey can throw a mango if he is able to throw the same mango upto a maximum horizontal distance of 100 m ?

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Q.109. A body of mass ‘m’ is dropped freely from a height ‘h’. Then draw the following graphs for the given body ?

(a) Displacement - Time graph (b) Kinetic energy - Time graph (c) Total energy - Time graph

(Assume displacement to be zero at ground level.)

h m

Q.110. A batsman hits a ball at a height of 1.22 m above the ground so that ball leaves the bat an angle 45o with the horizontal. A 7.31 m high wall is situated at a distance of 97.53 m from the position of the batsman. Will the ball clear the wall if its range is 106.68m.

Take g = 10 m/s2.

Q.111. A particle is projected from point 0 on the ground with velocity u=55 m/s at angle

1

tan

  (0.5). It strikes at a point C on a fixed smooth plane AB having inclination of 370 with horizontal as shown in figure. Calculate

(a) Coordinates of point C in reference to coordinate system as shown in figure (b) Velocity of particle with which it strikes inclined plane AB.

370 55 O B C x y A 10/3 m

Q.112. A motor car is travelling at 30 m/s on a circular road of radius 500 m. It is increasing in speed at the rate of 2m/s2. What is its acceleration?

Q.113. An object A is kept fixed at the point x = 3m and y = 1.25 m on a plank P raised above the ground. At time t = 0 the plank starts moving along the +x direction with an acceleration 1.5 m/s2. At the same instant a stone is projected from the origin with a velocity u as shown. A stationary person on the ground observes the stone hitting the object during its downward motion at an angle of 450 to the horizontal. All the motions are in the x-y plane. Find u and the time after which the stone hits the object.

u O 3.0 m A P y 1.25m P x

Q.114. Two masses ‘m’ and ‘2m’ are connected by a massless string which passes over a light frictionless pulley as shown in fig.1. The masses are initially held with equal lengths of the strings on either side of the pulley. Find the velocity of the masses at the instant the lighter mass moves up a distance of 6.54 m. The string is suddenly cut at that instant. Calculate the time taken by each to reach the ground. (g = 9.81 m/s2) 13.08 m 2m m ground Fig. 1

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Q.115. A particle moves in a circle of radius 20 cm at a speed given by v = 1 + t + t2 m/s where t is time in s. Find

(a) the initial tangential and normal acceleration. (b) the angle covered by the radius in first 2 s.

Q.116. A car starts moving from rest with an acceleration whose value linearly increases from zero to 6 m/s2 in 6 sec after which it moves with constant velocity. Find the time taken by the car to travel first 72 m from starting point.

Q.117. A particle is projected vertically with velocity v0. Wind is blowing and is providing a constant horizontal acceleration a0. There is a vertical wall at some distance from point of projection. If particle strikes the vertical wall perpendicularly then calculate

(i) Time of flight.

(ii) Velocity with which particle strikes the vertical wall. (iii) Distance x and y.

(iv) If collision at vertical wall is perfectly elastic will particle retrace its path ?

(v) Is path of particle parabolic?

`

y

x v0

Q.118. A particle is projected up a large inclined plane from a point O on it as shown in the figure. The projection velocity has a magnitude of 5.5m/s and its direction makes an angle 37° with the inclined plane. The inclination of the plane is also 37°. The inclined plane starts moving towards left with an acceleration a0 = 5 m/s2 at the moment the particle is projected. The particle strikes the inclined plane at a point P. Find the time taken by the particle to move from O to P. Also find the magnitude of displacement along the inclined plane as it moves from O to P. (Take sin 370 = 3/5) P O 370 370 u = 5.5 m/s a0 = 5 m/s 2

Q.119. Two inclined planes of inclinations 300 and 600 respectively meet at 900 as shown in figure. A particle is projected from point P on the first inclined plane with a velocity u = 10 3 m/s in a direction perpendicular to the inclined plane and it is observed to hit the other inclined plane at 900.

Find (a) the height of point P from ground (b) the length of PQ . 60 30 u B Q O A h P

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Q.120. A sleeve ‘A’ can slide freely along the smooth rod bent in the shape of a half circle of radius R as shown in figure. The system is set in rotation with a constant angular velocity  about the vertical axis OO. Find the angle  corresponding to the steady position of the sleeve.

R 

O’

A O

Q.121. A large heavy box is sliding without friction down a smooth inclined plane of inclination . From a point P on the bottom of the box a particle is projected inside the box, with speed u (relative to box) at

angle  with the bottom of the box. 

P

Q u 

(a) Find the distance along the bottom of the box between the point of projection P and the point Q where the particle lands. The particle does not hit any other surface of the box.

(b) If horizontal displacement of the particle with respect to ground is zero. Find the speed of the box at the moment when particle was projected.

Q.122. A stone is dropped from the top of a tower 20 m high. Simultaneously another stone is thrown up from the bottom of the tower so that it can reach the top of the tower. What are the speeds of the stones while they pass one another ?

Q.123. Two rockets are fired vertically from launching pads which are side by side. The first rocket moves vertically upwards with an acceleration of 6g and second with an acceleration of 8g. If the second rocket is fired 1 sec. after the first, find how long after its launching the second rocket overtakes the first.

Q.124. A particle is moving along a vertical circle of radius R = 20 m with a constant speed v = 31.4 m/sec. as shown. Line ABC is horizontal and passes through the centre of the circle. A shell is fired from point A at the instant when particle is at C. If distance AB is 20 3 m and shell collides with the particle at B, calculate

20 m C B  A u

(a) Smallest possible value of the angle  of projection. (b) Corresponding velocity u of projection

Q.125. A projectile is fired with velocity v0 at an angle  with the horizontal on a horizontal plane, Find (a) The average velocity of projectile in half of time of flight.

(b) The time in which the velocity of projectile becomes perpendicular to its initial velocity. (c) The radius of curvature of projectile at the instant when it is at its maximum height.

Q.126. A stone is projected from a point of ground in such a direction so as to hit a bird on the top of a telegraph post of height h and then attain the maximum height 2h above the ground. If at the instant of projection the bird were to fly away horizontally with a uniform speed, find the ratio between the horizontal velocities of the bird and the stone, if the stone still hits the bird while descending.

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Kinematics Solution Q.1. Initial K.E. = 2 m.502 2 1 u . m 2 1  Final K.E. = mv2 2 1

Work done by gravity = +mgh = mg. 40

From W-E principle mg . 40 = kf - kI = 2 1 m(v2 - 502)  v = 57.4 m/s. Q.2. For plane, Horizontal velocity = 540  18 5 m/s; vertical velocity = 0 Time of flight t = 2h 2 2000 g 10   = 20 sec.  Horizontal displacement = 20  540  18 5 = 3000 m Q.3. zero

Q.4. (i) Maximum height H =

2 u sin 2 2g  H = 2 2 (50) 3 m 2 10 2     H = 93.75 m (ii) Range R = 2 2 u sin 2 (50) sin120 g 10    R = 216.5 m Q.5. 30 v 5 60 4 c   vc = 45 km/hr.

Q.6. (a) Maximum height above the tower, using v2 = u2 + 2as in vertical direction. (u sin 300)2 = 2gh As u = 40 m/s,  = 300 40 40 1 4   = 2  10  h  h = 1600 20m 80   height above ground = 100 + 20 = 120m. (b) Range, time of flight = t, H = u sin t - 1gt2

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- 100 = (40  1)t 2 - 2 1 10 t 2  - 100 = 20 t - 5t2 t2 – 4t – 20 = 0, t = 6.9 sec.

R = ucos  t, R  distance from tower R = 40  3 6.9 2  = 238.9 m. Q.7. Initial K.E. = 2 m.502 2 1 u . m 2 1  Final K.E. = mv2 2 1

Work done by gravity = +mgh = mg. 40 From w~E principle

mg . 40 = kf - kI = 2 1 m(v2 - 502)  v = 57.4 m/s. Q.8. For plane, Horizontal velocity = 600  18 5 m/s; vertical velocity = 0 Time of flight t = 10 1960 2 g h 2   = 142sec  Horizontal displacement = 142  600  18 5 = 3299.83 m  3300 m. Q.9. 30 v 5 60 4 c   vc = 45 km/hr. Q.10. (a) vmg = vrg sin 300 vrg = 20 km/hr. (b) vrm = vrg cos 30 vrm = 10 3 km/hr 300 vm, g vr, m vrg Q.11. y tan x    aA = aB tan . Q.12. Initial position vector of particle

ˆi 2 j kˆ ˆ

   

Final position of the particle after 4 seconds

2 f i 1 S S ut at 2    

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iˆ 2 j kˆ ˆ

 

3iˆ 4 jˆ

4 1

4iˆ 3 jˆ

16

2

           

final position =21iˆ42 j kˆˆ, Displacement = - 20ˆi + 40ˆj. Magnitude of displacement =

 

20 2

 

40 2 20 5 m

Q.13. v ucosiˆ(usingt)jˆ jˆ sin u iˆ cos u u     0 v .

u  = u2 cos2  + u2 sin2  - (u sin)gt  t =

 sin g

u

Q.14. Comparing this equation y = x - x2 with equation of projectile. y = x tan  -  2 2 2 cos u 2 ax ,

we get tan  =  &  = 2sec2 u 2 a or, u2 = (1 tan ) 2 a 2     u = (1 ) 2 a 2    Q.15. Distance = 100 m Velocity = zero Q.16. Average speed = 60 40 60 40 2 v v v v 2 v s v s s 2 2 1 2 1 2 1        = 48 km/hr Average velocity = 0 Q.17. 2 = u(2) + 2 1 a(2)2  2 = 2u + 2a  1 = u + a . . . . (i) 2.2 + 2 = u(6) + 2 1 a(6)2 4.2 = 6u + 18 a  2.1 = 3u + 9a  0.7 = u + 3a . . . . (ii)

Solving (i) and (ii) we get a = -0.15 m/s2. , u = 1.15 m/s. v = 1.15 - 0.15  7 = 0.01 m/s. Q.18. x = v0 cos  t y = - gt2 2 1 |y| = |x| tan 

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y = - 2 1 g  2 2 0 2 cos v x 2 1 g  2 2 0 2 cos v x = x tan   x = 0 or x = g tan cos v 2 20 2   x = g 2 sin v20  y =    2 2 0 2 2 4 0 cos v g 2 sin v g 2 1 = -  2 2 2 0 cos g 2 2 sin v

Q.19. Taking F as the net force kˆ 3 10 jˆ 3 8 iˆ 3 4 a   m/s2 2 t a 2 1 t u s      = kˆ 9 3 10 jˆ 3 8 iˆ 3 4 2 1 0          = 6iˆ12jˆ15kˆ sx = 6m; sy = 12m sz = 15m

Q.20. Let time taken by the car and their final velocities are t1, t2 and v1, v2 respectively. Given t1 = t2 - t and v1 = v2 + v s1 = 1 2 1 2 1 12 2 2 22 a t s  a t = s (say)  a t1 12 a t2 22 = 2s also v1 = a1t1, v2 = a2t2  v1t1 = a1t1 2 = 2s and v2t2 = a2t2 2 = 2s  t1 = 2 1 s v and t2 = 2 2 s v so t2 - t1 = 2 1 1 2 1 s v  v t         2 1 2 1 2 s v v v v t          2 1 2 s v v v t v =

 

v v s t v v s t 1 2 12 22 2 2 2       

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= v v t t t a a t 1 2 1 2 1 2 

Q.21. The ball's position is at time t, (7.5)t. iˆ + (10)t jˆ

Suppose the fielder runs from his position with constant velocity 5 [(iˆcosjˆsin] m/s. relative to the wicket. At interception of the ball by the fielder the position must coincide so equating the components we get

7.5 t = 46 + 5t cos  . . . (I) and 10t = 28 + 5t sin  . . . (ii)

These give 1 t 5 28 t 10 t 5 46 t 5 . 7 2 2                 which simplifies to t = 4 sec, or

21 116

sec. Hence for earliest interception t = 4s. Q.22. vx = 8 t - 2 x = 8  t2/2 - 2  t + c1 at t = 2 x = 14 so c1 = 2 so x = 4t2 - 2t + 2 . . . (i) vy = 2 so y = 2  t + c2 at t = 2, y = 4 so c2 = 0 y = 2t . . . (ii)

eliminatating t form (I) and (ii) x = y2 - y+ 2

Q.23. (a) s = ut +

2 1

at2 for vertical motion 4 = 0 + 2 1 (10) t2 4m v table 5m  t2 = 5 4 t = 5 4  5 = v t v = 5/t = 5 / 4 5 = 2 5 5 4 5 5  m/sec. Q.24. (a) Distance = 500 + 400 + 200 = 1100m (b) Displacement = 500

 

j 400

 

iˆ 200

 

 jˆ  = 300 j 400iˆ Magnitude of displacement =

400

2 

300

2 = 500m y x N E

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(c) Average speed = time Total distance Total = 60 20 1100  = 12 11 m/s (d) Average velocity = Time placement is D = 60 20 500  = 12 5 m/s Q.25. 30 v 5 60 4 c   vc = 45 km/hr. Q.26. x = 2 t . dt dx  x = kt2 k some constant k 2 dt x d 2 2  . t a 

Q.27. (a) Resultant velocity of the boat is v = (vR + vB cos 370 ) i + vB sin 370 j 4i + 20  5 4 i + 20  5 3 j v =20 i + 12 j m/s

time taken by boat to cross the river = direction y in velocity direction y in travelled ce tan dis  t = 12 400 = 3 100 sec. 370 vB vR 400 m Y X (b) Displacement along x = v t = 20  3 100 = 3 2000 m distance from starting point 3 109 400 3 2000 ) 400 ( 2 2        m.

Q.28. For same range, angles are  and 900 - 

 R = g 2 sin u2  t1 = g sin u 2  , t2 = g cos u 2 g 90 sin( u 2       t1t2 = g R 2 g cos sin u 4 2 2     R = gt1t2 2 1 .

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Q.29. t (sec.) s (m ) 0 2 4 6 8 D 10 30 60 80 Q.30. Pins = F.v ,j ˆ mg F  v ucosiˆ Pins = 0

Q.31. | Relative velocity | of approach = v1 + v2 | Relative acceleration | = a1 + a2

Acceleration is directed against the initial velocity. For meeting of the two bodies the maximum separation Smax be such that relative velocity is just reduced to zero.

 r max 2 r 2 r u 2aS v    Smax = ) a a ( 2 ) v v ( a 2 u 2 1 2 2 1 r 2 r   

Q.32. Let the time of fall be t and height of fall be h, then h gt 2 1 2  … (i) 2 1 g(t – 1)2 = 2 h … (ii)  2 1 t 1 t 2          2 1 t 1 t    t = 2 + 2 seconds and h = 2 1  10  ( 2 + 2)2 = 58.2 m Q.33. 6u + a 36 2 1   = 180  6u + 18 a = 180 … (i) u + 6a = 45 … (ii) from (i) and (ii)

a = 5 m/s2 and u = 15 m/s. Q.34. u = 5 m/s, v = 20 m/s, t = 5 sec. a = 3 5 5 20 t u v     m/s2 v = u + at = 5 + 3  10 = 35 m/s Q.35. h = 20m, a = - g, v = 0 thus 0 = u2 - 2gh

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 u = 2gh = 21020 = 20 m/s Q.36. uy = u sin  = 20 2 sin 45-0 = 20 m/s maximum height = 10 2 20 20 g 2 sin u2 2     = 20 m. Q.37. t v v a 2 1 av      , v2 20m/s  jˆ s / m 20 v1  iˆ Thus 2iˆ 2jˆ 10 iˆ 20 jˆ 20 aav     

hence a = 2 2 m/s due north west.

Q.38. vi = 108 km/hr = 60 60 1000 108   = 30 m/sec. t = 120 sec. vf = 0 vf = vi + at or, 0 = 30 m/s + 100 sec, or, a = - 2 s / m 4 1 . sec 120 sec / m 30   or a = -(0.25) m/sec2 magnitude of retardation = 0.25 m/s2 Q.39. u = 10 m/s, v = 0, t = 10 s a = 1m/s2 10 10 t u v      |a| = 1m/s2

Q.40. Acceleration of particle of mass m w.r.to ground = g Acceleration of particle mass (2m) w.r.to ground = g Thus ar = g – g = 0 Q.41. vSB v cos 45 i0ˆv sin 45 j0ˆ  2 1 ˆi 2 1 ˆj 2 2     ˆ(iˆj)m / s BG ˆ v 2 j m / s ThusvS,G vSB vBG = 2 ˆj(iˆˆj) = ( ˆ(i3 j)ˆ v = 2 2 1 3  10 m / s and tan = 3 1  = tan-1(3). 3ˆj ˆi 

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Q.42. For vertical component of motion vy2 = uy2 + 2gh  v2sin21 = u 2 sin21  2gh  v2sin22 = (5 3)2sin260  2 10 (2.5)  v sin 2 =  5/2

Initially velocity vector u =

         jˆ 2 15 iˆ 2 3 5 1 O 2 2 v2 v1 2.5m Velocities vector at height 2.5 m v1 =

       jˆ 2 5 iˆ 2 3 5 and v2 =         jˆ 2 5 iˆ 2 3 5 Now the angle between initial velocity and velocities at height 2.5 m is

cos1 = | v || u | v . u 1 1 = 4 25 4 75 4 225 4 75 4 75 4 75    = 3 2 3 2 10 2 300 4 75 2    cos1 =  cos30   30 2 3 1 cos2 =       90 0 4 100 4 300 4 75 4 75 2 Q.43. Displacement = 1 10

 

2 1 5 10

 

1 5 1 15 2 3 2 3 6                        m Distance travelled =1 10

 

2 1 5 10

 

1 5 1 55 2 3 2 3 6                        m For plane, Horizontal velocity = 600  18 5 m/s; vertical velocity = 0 Time of flight t = 2h 2 2000 g 10   = 20 sec.  Horizontal displacement = 20  600  18 5 = 10000 3 m Q.44. vx (horizontal) = v0 vy (vertically downward) = gt v2 = v 2x vy2 = v 02 (gt)2 K.E. of particle after time ‘t’ =

2 1 mv2 = 2 1 m(v20(gt)2) Q.45. vx = dx k dt  ; vy = dy mt dt   ˆ ˆ vk i2mtj t = x k & y = mt 2 = m 2 2 2 x mx k k       

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 Equation of trajectory, y = 2 2 mx k Q.46. 1 2 4 5 3 1 2 3 4 5 t (sec.) v (m/s) Q.47.

t 0 v v tdt dv 0  v = v0 + t 2 /2 Q.48. 1 2 H gt 2 

2 H 1 g t 1 2 2   t 2 t 1  t H t 2t 2 

21 t

 2

2 t sec 2 1   =3.4 sec H = 1 2 gt 57.8 m 2  Q.49. Tangent acceleration at = dt dv = 2t +1 normal acceleration an = R v2  (at)t=0 = 1 m/s2 (an)t=0 =

0.2

1 R v02  = 5 m/s2 (b) v = R dt d R d = (1+t+t2 )dt  R

     ' 0 2 0 2 dt t t 1 d  = 33.3 rad

Q.50. Let u and  are projection speed and angle of projection respectively. vx = u cos  and vy = u sin 

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At greatest height h = g 2 sin u2 2

vertical velocity at half the greatest height v2 = v2y2gh/2 v2 = u2 sin2 - 2 sin u g 2 sin gu2 2 2 2   v = 2 sin u 

Resultant velocity at half the greatest height

vR =       2 2 2 2 2 2 cos u 2 sin u ) cos u ( v  u cos  = 5 2    2 2 2 2 cos u 2 sin u tan  = 3 ,  = 600 Q.51. (i) Velocity is decreasing

so, a = -4/2 = -2 -2 O a 4 t  (ii) 4 t  x Q.52. At, t = 2 sec, x = 6 + 16 - 16 = 6 m velocity, v = dt dx = 8t - 4t3 at t = 2 sec, v = 16 - 32 = -16 m/sec. Acceleration, dt dv = 8 - 12 t2 at t = 2 sec. Acceleration = 8 - 12 (2)2 = -40 m/s2 Q.53. 8 hrs.

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Q.54. 2 / 1 0)sin cos a g ( L 2          Q.55. 2 (m1 + m2)gt0

Q.56. Let u be the initial velocity. Then S1 = ut1 + 2 1

ft where f is the acceleration . In the next t12 2 seconds the point moves to S2. It moves through distances S1 + S2 in (t1 + t2) seconds S1+S2 = u(t1 + t2 )+ 2 1 f (t2 + t1) 2 =(ut1 + 2 1 ft ) + ut21 2 + 2 1 ft2 (t2 + 2t1) S2 = ut2 + 2 1 ft2 (t2 + 2t1) Hence S2t1 - S1t2 = 2 1 ft1t2 (t1 + t2 ) or f = ) t t ( t t ) t S t S ( 2 2 1 2 1 2 1 1 2   Q.57. 1

Q.58. displacement time velocity displacement

s

t

v

d

velocity time acceleration time

v

t

a

t

Q.59. Velocity of rain w.r.t. road is vr and velocity of rain w.r.t. moving man is vrm but rm v = vr vm   

=-vr sin 30 iˆ - vr cos 30 jˆ - 10 iˆ = (- vr sin 30 – 10 ) iˆ - vr cos 30 jˆ

300 vm vr vrm But - vr sin 30 – 10 = 0  vr sin 30 = -10 vr = 30 sin 10 

= - 20 m/s. But vr is not negative  vm  10iˆ 

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and vrm [20cos30] = 20 cos 30 jˆ

= 10  3 jˆ .

Q.60. After 2 seconds, vertical component of velocity, vy = v0 sin  - g(2) = (v0 sin  - 2g) Horizontal component of velocity = v0 cos 

Hence,    cos v g 2 sin v 0 0 = tan 300 = 3 1 . . . (i)

Again, velocity becomes horizontal when projectile reaches maximum height. Hence, time to reach maximum height = 3 seconds.

Therefore,

g sin

v0

= 3  v0 sin  = 3g . . . (ii) From (i) and (ii), v0 cos  = 3 g, v0 sin  = 3g

Hence, squaring, and adding, v0 = 2g3 = 20 3 m/sec. Dividing, tan  = 3 = tan 600   = 600 Q.61. Let vA and vB are the speeds of the objects

While moving towards each other

vA + vB = x (m/s) . . . (i)

While moving in same direction (Assuming vA > vB ) vA - vB = y/2 (m/s) . . . (ii)

Solving (i) and (ii), vA = (2x y) 4 1  vB = (2x y) 4 1  . Q.62. Distance = 100 m Velocity = zero Q.63. |vB - vA| = 2A 2 B v v  - 2vAvB cos 300 = 52 + 32 - 2 5  3  (3/2) = 8.02

using sine rule 0

30 sin 832 . 2 sin 3     = 32 0 30 0  vB -vA 5 m/s 3m/s vB - vA Q.64. kx = m2 (0 + x)  x  1 cm. Q.65. h1 = gt2 2 1 , h2 = g(t22) 2gt2 2 1  4 1 gt 2 gt ) 2 / 1 ( h h 2 2 2 1 Q.66. Time of flight T = g sin v 2 0  … (i)

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Maximum height H = g 2 sin v20 2 … (ii) eliminating v0 sin  H = g 8 g T g 2 2 Tg 2 2 f 2        = 8 gT2 At T = 4 sec., H = 8 4 4 10 8 gT2    = 20 m Q.67. u = 10 m/s, t = ? y = 0 thus 0 = 0 + 10t - gt2 2 1  10t = 2 1  10  t2  t = 2 seconds. Q.68. A = 2   = 2, vA = 2r ˆj B =    = , vB = 2r(- ˆj ) (a) vBA vB vA     2 r( j)ˆ 2 r( j)ˆ = -4r ˆj (b) rBA rBrA= 2r (iˆ) - (r) iˆ = - 3r iˆ .

A B X Y r 2r Q.69. dv 7 4 2 1m / s dt 4 1     t 7 a s u (2n 1) 2       1 3 (2 7 1) 9.5 m 2      .

Q.70. Velocity of particle w.r.t. ground = v0 iˆ sin(iˆ) +  cos  jˆ = (v0 -  sin ) iˆ +  cos  jˆ

  P  v0  O Q.71. Along y, u sin gcos t 0 t uta n g  Along x, x

v u cos g sin .t u cos g sin .utan

g

    

= u cos u sin ucos 2

cos cos        X g sin g cos Y v

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 

2 2 2 x 3 n v u cos 2 r a gcos     Q.72. (a) vrm = vrg cos 30 vrm = 10 3 km/hr (b) vmg = vrg sin 30 0 vmg = 20 km/hr. 300 vm, g vr, m vrg

Q.73. Let  be the angle of projection of the second body

R =    [sin(2 ) sin cos g u 2 2

since range of both the bodies is same. Therefore sin (2 - ) = sin (2 - ) or 2 -  =  - (2 - )  = 2  - ( - )    u Now T =      cos g sin( u 2 T =      cos g sin( u 2        cos sin( T T

Q.74. Let v be the velocity of Q if  is constant u cos  = v cos   v =   cos cos u  =     usin sin v =  ) sin cos (tan u   

Q.75. (a) If B & D be the points h above and h below A, then in the stone’s downward motion vD = 2vB

 

v2D vB2 2 2g h  4v2B v2B 4gh  v2B 4gh 3  h h C B A D

If C be the highest point attained by the stone then, vC2 v2B2gh' [when h = BC]  v2B 2gh h 4gh gh 6 2 3  '  ' 

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Greatest height = h + h = 5 3h

(b) The acceleration of a body moving along straight line is the second derivative of its position coordinate. For a concave surface , the second derivative is +ive while it is negative for the convex surface. Hence ‘a’ corresponds to accelerated while ‘b’ corresponds to decelerated motion.

Q.76. (a) Velocity of ball relative to elevator = 30 m/s

Velcoity of ball relative to ground = 10 + 30 = 40 m/s Maxmum height attained by ball =

 

10 2 40 10 2   = 90m

(b) When they meet again their displacement is same 10t = 40t - 1 2 10  t 2 t = 6 sec (c) 70 = 40t + 1 2 10  t 2 5t2 + 40t - 70 = 0

Q.77. Let the projectile hit the plane after time t. The horizontal displacement x = (v0 sin) t The vertical displacement y = (v0 cos) t -

2 1

gt2 y = -(tan) x for the plane

 t =  cos g v 2 0 Y X V0 O  Q.78. Maximum height h = 10 2 625 g 2 u2   = 31.25 m time after which v = 0, t =

10 25

= 2.5 second. Distance travelled in 3rd second = |y1| + |y2| where,

y1 = y(2.5) - y(2) y2 = y(3) - y(2.5)

y(2) = 25  2 - 10 2 50 20 30m 2 1 2      y(3) = 25  3 - 10 3 75 45 30m 2 1 2      y(2.5) = 31.25 m

thus distance during 3rds = 1.25 + 1.25 = 2.5 m

Q.79. Let initial speed of the car is u and acceleration be a. then 2u + 2 1  a  22 = 24 2u + 2a = 24 4 + a = 12 …(i)

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and 5u + 2 1

 a  52 = 75

 10 u + 25 a = 150 …(ii)

from (i) and (ii) a = 2 m/s2 s and u = 10 m/s after 10 s = 10 + 2  10 = 30 m/s

Q.80. Unit vector due east be iˆ and due west be jˆ . then

net displacement = 5iˆ10jˆ5iˆ[5 2cos45(iˆ)5 2sin45(jˆ)] = (10 – 5)iˆ(105)jˆ

= 5iˆ 5jˆ

(a) thus net displacement = 5 2 due north east (b) distance = 5 + 10 + 5 2 + 5 = 20 + 5 2 m

Q.81. Since acceleration varies linearly so

a  t m/s2 by given condition  a = kt  6 6 0 0 dak dt

 k = 1 then, t dt dv   v = 2 t2 m/s then, 2 t dt ds 2  or, s = 6 t3

at the end of t = 6 sec. Acceleration becomes zero. Distance moved by car at t = 6 sec is

S1 = 6 6 6 6  = 36 m Speed of the car =

2 6 6 

= 18 m/s Remaining distance = 72 – 36 = 36 m.

so time taken to cover this distance = t2 = sec. 2sec. 18

36  Total time = 6+2 = 8 sec.

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Q.82. The FBD of A,B,C are shown T = ma1 . . . (1) 2mg – 2T = 2ma2 . . . (2) T + 3 mg sin 300 = (3m)a3 . . . (3) constraint relation : a1+ a3 = 2a2 . . . (4) solving the equations

a1 = 9 g 20 , a2 = 11 g 20 , a3 = 13 g 20 , T = 9 mg 20  N1 T a1 mg  2mg 2T a2  N3 3mg T a3 Q.83. (a) Distance = 500 + 400 + 200 = 1100m

(b) Displacement = 500

 

j 400

 

iˆ 200

 

jˆ = 300 j 400iˆ Magnitude of displacement =

400

2 

300

2 = 500m (c) Average speed = time Total distance Total = 60 20 1100  = 12 11 m/s y x N E (d) Average velocity = Time placement is D = 60 20 500  = 12 5 m/s  = tan-1 300 400       = 37 0

due North of East.

Q.84. vx = u – v sin  vy = v cos  tan 450 = x y v v = 1  vy = vx u – v sin  = v cos  v =    cos sin u  450 v u = ) 45 sin( 2 u 0  

clearly minimum value of v =

2 u for  = 450 . Q.85. fmax = 1000.5+600.2 = 62 N Fx = 40 – 20 = 20 N fmax > Fx

So acceleration of Block = zero.

10kg 6kg 40 20 fB fA fB = 12 N 40 – T – 12 = 0 T = 28 N fA + 20 = T fA = 8 N

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Q.86. x110 cos 30 t 2 x v cos 45 t 2 1 1 y 10 sin30 t gt 2    2 2 1 y v sin 45 t gt 2    For collision 1 2 y y 1 v 10 2 2    v5 2m/s 1 2 x x 1    10 cos 30 t 5 2 cos 45 t  1

t 5 35  1 and t =

1 5 31 sec

Q.87. Writing constraint relation yA = yB tan  differentiate w.r.t. t we get vA = vB tan  … (i) using COE yA yB  mgh = B 2 mv2A 2 1 ) v ( m 2 1  … (ii)

putting value vA in equation (ii) and solving we get vB = 2gh cos , vA = 2gh sin 

Q.88. v piˆqxjˆ

It is clear that p is the x-component of velocity and qx is the y-component

 p dt dx  or dx = p.dt or

t  0 x 0 dx p dt or x = pt … (1) and dt dy = qx or dy = qx.dt or dy = q.p.t dt  x = p.t

y 

0 t 0p.q.t dy dt  y = 2 qt . p 2 … (2)

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Combining (1) and (2) 2y = pq 2 2 2 x x q p p        . Q.89. Given vb = n vR b

v = (-vb sin  ) iˆ(vbcos)jˆ Resultant velocity of boat

= vb vR

 

= (vR - vb sin ) iˆ + (vb cos ) jˆ

B vb

A

vR

If w = width of the river, time for crossing is T =  cos v W b

Drift during time T is (vR - vb sin ) T  Drift x = vb(n - sin )  cos v w b = w(n sec  - tan  ) For x to be minimum,  d dx = 0 lead to  = sin-1 (1/ n) Direction of boat w.r.t. stream is

900 +  = 900 + sin-1 (1/n)

For n = 1/2, the required angle = 900 + 300 = 1200

Q.90. Let u and  are projection velocity and angle of projection respectively. vx = u cos  and vy = u sin 

At greatest height h =

g 2 sin

u2 2

vertical velocity at half the greatest height v2 = v2y2gh/2 v2 = u2 sin2 - 2 sin u g 2 sin gu2 2 2 2   v = 2 sin u 

Resultant velocity at half the greatest height

vR =       2 2 2 2 2 2 cos u 2 sin u ) cos u ( v given, u cos  = 5 2    2 2 2 2 cos u 2 sin u tan  = 3 ,  = 600

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Q.91. (a) From the diagram vBT makes an angle of 45 with the x-axis.

(b) Using sine rule

s / m 2 v 15 sin v 135 sin v B T B   

`

450 60 0 O A B vT vB vBT

Q.92. Let VB,R = velocity of boat w.r.t river = 10 m/sec VR,G = velocity of river w.r.t ground = 2 m/sec VB,G = velocity of boat w.r.t ground.

From the figure, Time t = R , B V river of width (a) t = 40 10 400  sec 400 m d  VR VB,R VB,G

(b) Let the drift be d, then from geometry  R , B R V V tan = river of width d   R , B R V V width of river = 10 2  400 = 80 m Alternatively d = (VR,G) (t) = 80 m.

Q.93. Let the 1st and 2nd shorts take time t and t respectively to collide at point P(x, y). Ist shot x = 53 t . . . (I) y1 = 10 - 2 1 gt2 . . . (ii) For 2nd shot x2 = (53 cos 600)  t . . . (iii) y2 = 10 + (52 sin 60 0 )t - 2 1 gt2 . . . (iv) 600 2nd shot 10 m P(x, y) Ist shot

For collision, we have x1 = x2 and y1 = y2.

From (I) and (iii), t = 2t and from (ii) & (iv), t = 1 sec, t = 2 sec. Now (I) Time interval = 2 - 1 = 1 sec.

(ii) x1 = 53  t = 53 y1 = 10 - 2 1 (10) (1)2 = 10 - 5 = 5  Required co-ordinates = (5 3 m, 5m).

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Q.94. Let the points towards B and reches at C t1 : the time taken by the boat to reach C t1 =  cos u AD CD = (v - u sin )t1 t1 =    cos 3 10 500 3 hr =  cos 6 1 CD = (-3 sin  + 2)  cos 6 1 = - 0.5 tan  +  cos 3 1 B D C A v u 

t2 : time taken by the man from C to D t2 = s v CD = -5 cos 3 1 5 tan 5 . 0     = tan 10 1 +  cos 15 1 = -     cos 15 1 cos 10 sin =     cos 30 ) 2 sin 3 ( total time t = t1 + t2 =        30cos sin 3 cos 6 1 =    cos 30 sin 3 7 = 30 7 sec  - 10 1 tan for minimum t 0 d dt    30 7 sec tan  - 10 1 sec2 = 0  10 1 sec           sec tan 3 7 = 0  3 7 tan  - sec  = 0     cos 3 sin 7 = 0   = sin-1 (3/7)

Q.95. Let the angle of projection be  and velocity be u. The velocity parallel and perpendicular to the planes are u cos( - ) and u sin ( - ). The component u sin ( - ) becomes zero at the first plane where as the component ucos ( - ) at the second plane.     -  (i) (ii)

If the time required in the first case is t1 and the second is t2. Then 0 = u sin ( - ) – g cos t1  t1 =

    cos g ) sin( u . . . (i) and 0 = u cos ( - ) - g sin t2  t2 =

     sin g cos( u . . . . (ii) As the particle is mid way between the planes

u sin ( - )t1 -

2 1

g cos t = - {(u sin ( - ) t12 2 -

2 1

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 u sin ( - ) (t1 + t2) = 2 1

g cos  (t12t22) . . . (iii) putting (i) and (ii) in (iii) we obtain

u sin ( - )                  sin g cos( u cos g sin( u =                                       2 2 2 2 2 2 2 2 sin g ( cos u cos g ( sin u cos g 2 1

canceling u2/g from both the sides and rearranging we get                             2 2 2 2 sin 2 cos ( cos cos 2 ( sin sin cos( sin( cos ( sin = 0

 sin2 ( - ) sin2 + 2 sin ( - ) cos ( - ) sin  cos  - cos2 ( - ) cos2  = 0 dividing each side by cos2 ( - ) sin2

tan2 ( - ) + 2 tan ( - ) cot  - cot2  = 0 tan ( - ) = 2 cot 4 cot 4 cot 2  2 2  =  cot   2 cot  since ( - ) is an acute angle tan ( - ) is + ve

  -  = tan1(cot  (2 – 1))  =  + tan1 {cot  (2 – 1)}.

Q.96. Let t1 be the time taken to fall through a distance (H - h)  (H - h) = 2 1 gt 12  t1 = g ) h H ( 2 

Further, the time taken by the body to fall through a distance h is given by t2 = g

h 2

Total time taken by the body = t = t1 + t2

=

H h h

g 2

 

For the time to be maximum, dh dt = 0         1/2 h1/2 2 1 ) h H ( 2 1 g 2 = 0 H = 2h or h/H = 2 1 .

(39)

Q.97. 80 60 40 O 20 80 70 60 50 40 Time (s) 30 20 10 O 1 80 70 60 50 40 30 20 10 2 O 200 80 70 60 50 40 30 20 10 6 400 900 Time (s) Time (s) a m/s2 (m) x 4100 D C 2m A B 3m 10m/s v0 45 x O y 38m

Q.98. Let t be the instant at which the ball hits rear face AB of the trolley. Then (v0cos45 - u0)t = 38

(40)

or t = 38 45 38 28 28 45 10 38 0 0 v cos u  . cos   . s At t = 3.8 s, the y - coordinate of the ball is

y = (v0sin45)t - 1 2gt 2 = 20t - 5t2 or y = 20(3.8) - 5(3.8)2 = 3.8 m

Since 3.8m > 2m, therefore, the ball cannot hit the rear face of the trolley.

Now, we assume that the ball hits the top face BC of the trolley , and let t be that instant. Then, y = 2 = 20t - 5 t  2

or t 2 - 4 t + 0.4 = 0 t = 3.9 s

Let d be the distance from the point B at which the ball hits the trolley. Then, d = (v0cos45 - u0) (t - t) = (20 - 10) (3.9 - 3.8) = 1m

Q.99. (a) Equation of motion along radius at point Q. T + mg sin =

2

mv

When the string slackens i.e. T = 0 0 + mg sin =  2 mv vQ = 5 3 5 10 sin g     = 30 = 5.48 m/s (b) Vertical velocity at point Q = vQ cos

v2 = u2 + 2gh 0 = 2 Q v cos2 + 2(g)h h = g 2 cos v2 2 Q  = 10 2 25 16 30   = 25 24 = 0.96 m mg 3m mg sin T 90 vQ cos Q P 5m Q.100.    sin BD sin AD  sin  = sin t v t v 2 2 1 1 sin a b v v t t 1 2 2 1

since t1  t2 . Then sin   2 1 bv av  sin   0.6  370    1430  v2 B (Man) (Bus) A  v1 O D Q.101.   sin BC 45 sin AC 0   = 30 0 0 0 45 sin 400 105 sin v   v0 = 546.47 km/hr t = 47 . 546 1000 v AB a  = 1.83 hr.

(41)

Q.102. (a) displacement = zero (b) distance = OA + AB + BO 3 + 3 + 3 2 = 6 + 3 2 cm B A O W N S E

Q.103. Let t be the time when they pass one another for stone B, y= vBt + ( g)t2 2 1  … (i) for stone A, H – y = gt2 2 1 … (ii) from (i) and (ii),

H = vBt … (iii)

Stone B can reach just one the top of tower. We can calculate the velocity of stone B,

y a 2 v v y 2 i 2 f   uf = 0, for ymax = H = 20 m vi = vB ay = -g vB = 20 m/s H C A B y H- y g O y

from (iii) t = 1sec. s / m 20 m 20 

from equation (i), the required distance (BC) from ground = 20  1 - 2 1

 10  12 = 15 m

Q.104. If u is initial velocity, a is acceleration  100 = u  3 + a(3)2 2 1 = 3u + 2 a 9 …(i) 200 = 5u + 2 1 a(5)2 = 5u + 2 a 25 …(ii)   5u + 2 a 18 64 2 a 25    u 2 a 7 

Now, putting value of  v in equation (i) 100 = 3  2 a 30 2 a 9 2 a 7    a = ms2 15 100 = 6.67 m/s2

References

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