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Motion in A Plane

Multiple Choice Questions

151.

The potential energy of particle varies with distance x fixed a origin as $v = (\frac{A \sqrt{x}}{x + B})$ ; where A and B are constants. The dimensions of AB are

[ M L^5/2 T^-2 ]
[ M L² T^-² ]
[ M^3/2 L^3/2 T^-2 ]
[M L^7/2 T^-2 ]

152.
A solid sphere and a hollow sphere of the same material and of a same size can be distinguished without weighing

by determining their moments of inertia about their coaxial axe

by rolling them simultaneously on an inclined plane

by rotating them about a common axis of rotation

by applying equal torque on them

by rolling them simultaneously on an inclined plane

The acceleration of a body rolling down the plane $= α$

∴ $α = \frac{g sinθ}{1 + \frac{K^{2}}{R^{2}}}$

where K is radius of gyration and R the radius of sphere.

For solid sphere,

$\frac{K^{2}}{R^{2}} = \frac{2}{5}$

$α = \frac{g sinθ}{1 + \frac{2}{5}}$

$α = \frac{g \sin θ}{\frac{7}{5}}$

∴ $α = \frac{5}{7} g sinθ$

For hollow sphere,

$\frac{K^{2}}{R^{2}} = \frac{2}{3}$

$α = \frac{g \sin θ}{1 + \frac{2}{3}}$

$α = \frac{3}{5} g \sin θ$

$α = 0.6 (g sinθ)$

Since, acceleration of solid sphere is more than of hollow sphere, it rolls faster, and reaches the
bottom of the inclined plane earlier. Hence, solid sphere and hollow sphere can be distinguished by rolling them simultaneously on an inclined plane.

153.

A certain vector in the xy-plane has an x-component of 4 m and a y-component of 10 m. It is then rotated in the xy-plane so that its x-component is doubled. Then, its new y-component is (approximately)

20 m
7.2 m
5.0 m
4.5 m

154.

A coin is dropped in a lift. It takes time t₁ to reach the floor when lift is stationary. It takes time t₂ when lift is moving up with constant acceleration. Then,

t₁ ≥ t₂
t₂ > t₁
t₁ = t₂
t₁ >> t₂

155.

A body is thrown with a velocity of 9.8 m/s making an angle of 30° with the horizontal. It will hit the ground after a time

1.5 s
1 s
3 s
2 s

156.

Three points charges +q, -2q and +q are placed at points (x=0, y=a, z=0), ( x=0, y=0, z=0 ) and (x=a, y=0, z=0), respectively. The magnitude and direction of the electric dipole moment vector of this charge assembly are

√2 qa along + y direction
√2 qa along the line joining point
qa along the line joining points (x = 0,y = 0, z = 0) and (x = a, y = a, z = 0)
√2 qa along + x direction

157.

The angle between two linear transmembrane domains is defined by following vectors $a = \hat{i} + \hat{j} - \hat{k} and b = \hat{i} - \hat{j} + \hat{k}$

cos^-1 $(\frac{1}{3})$
cos^-1 $(\frac{- 1}{3})$
sin^-1 $(\frac{- 1}{3})$
sin^-1 $(\frac{1}{3})$

158.

A projectile is fired with a velocity u at angle θ with the ground surface. During the motion at any time it is making an angle a with the ground surface. The speed of particle at this time will be

ucosθ sec $α$
ucosθ tan $α$
u² cos² $α$ sin² $α$
usinθ.sin $α$

159.

Water level is maintained in a cylindrical vessel upto a fixed height H. The vessel is kept on a horizontal plane. At what height above the bottom should a hole be made in the vessel, so that the water stream coming out of the hole strikes the horizontal plane of the greatest distance from the vessel?

$h = \frac{H}{2}$
$h = \frac{3 H}{2}$
$h = \frac{2 H}{3}$
h = $\frac{3}{4} H$

160.

What is the radius of curvature of the parabola traced out by the projectile in the previous problem at a point where the particle velocity makes an angle θ/2 with the horizontal?