NEET Exam > NEET Notes > DC Pandey Solutions for NEET Physics > DC Pandey Solutions: Centre of Mass, Conservation of Linear Momentum- 5
DC Pandey Solutions: Centre of Mass, Conservation of Linear Momentum- 5 | DC Pandey Solutions for NEET Physics PDF Download
| Download, print and study this document offline |
Please wait while the PDF view is loading
Page 1
29. When the spider eats up the moth and
travels towards A with velocity
v
2
relative
to rod.
24
2
48 0 m
v
v mv
R R
+
æ
è
ç
ö
ø
÷ + =
[v
R
= velocity (absolute) of rod]
Þ v
v
R
= -
6
Option (c) is correct.
30. Time taken by spider to reach point A
starting from point B
= +
4 8
2
L
v
L
v/
= = =
20 20
20
L
v
L
L T
T
/
= ´ = 20 4 80 s
31. Form CM not to shift
Þ ( ) ( ) x L m x L m ¢ + + ¢ + 8 24 6 48
= ´ 64 48 m
i.e., x
L
¢ = -
8
3
Option (a) is correct.
More than One Cor rect Op tions
1. Along vertical : 2
2
45 mV m
v
sin sin q = × °
i.e., 2
2 2
V
v
sin q = …(i)
Along horizontal :
mv m
v
mV = ° +
2
45 2 cos cos q
i.e., 2 1
1
2 2
V v cos q = -
æ
è
ç
ö
ø
÷
…(ii)
Squaring and adding Eq. (i)and (ii),
8
2 2 2 2
2
2 2
V
v
v
v
=
æ
è
ç
ö
ø
÷
+ -
æ
è
ç
ö
ø
÷
= + + - × ×
v
v
v
v
v
2
2
2
8 7
2
2 2
= -
5
4 2
2 2
v v
Dividing Eq. (ii) by Eq. (i)
tan q =
-
1
2 2
2 2 1
2 2
=
-
<
1
2 2 1
1
\ q < ° 45
Thus, the divergence angle between the
particles will be less than
p
2
.
Option (b) is correct.
Initial KE =
1
2
2
mv
Final KE =
æ
è
ç
ö
ø
÷ +
1
2 2
1
2
2
2
2
m
v
mV
= + × - ×
é
ë
ê
ù
û
ú
1
2
1
4
2
5
32
2
1
8 2
2
mv
As Final KE < Initial KE
Collision is inelastic.
Option (d) is correct.
2. v
m m
m m
v
2
2 1
1 2
2
¢ =
-
+
=
-
+
m m
m m
v
5
5
2
= -
2
3
2
v
= -
2
3
2gl
Centre of Mass, Conservation of Linear Momentum, Impulse and Collision | 197
48 m
48 m
x'
8L M + S
v/2
m
2m
q
45°
L
Rest
2m m
v
v
2
v'
2
v'
1
v = 0
1
m = 5m
1
m = m
2
Page 2
29. When the spider eats up the moth and
travels towards A with velocity
v
2
relative
to rod.
24
2
48 0 m
v
v mv
R R
+
æ
è
ç
ö
ø
÷ + =
[v
R
= velocity (absolute) of rod]
Þ v
v
R
= -
6
Option (c) is correct.
30. Time taken by spider to reach point A
starting from point B
= +
4 8
2
L
v
L
v/
= = =
20 20
20
L
v
L
L T
T
/
= ´ = 20 4 80 s
31. Form CM not to shift
Þ ( ) ( ) x L m x L m ¢ + + ¢ + 8 24 6 48
= ´ 64 48 m
i.e., x
L
¢ = -
8
3
Option (a) is correct.
More than One Cor rect Op tions
1. Along vertical : 2
2
45 mV m
v
sin sin q = × °
i.e., 2
2 2
V
v
sin q = …(i)
Along horizontal :
mv m
v
mV = ° +
2
45 2 cos cos q
i.e., 2 1
1
2 2
V v cos q = -
æ
è
ç
ö
ø
÷
…(ii)
Squaring and adding Eq. (i)and (ii),
8
2 2 2 2
2
2 2
V
v
v
v
=
æ
è
ç
ö
ø
÷
+ -
æ
è
ç
ö
ø
÷
= + + - × ×
v
v
v
v
v
2
2
2
8 7
2
2 2
= -
5
4 2
2 2
v v
Dividing Eq. (ii) by Eq. (i)
tan q =
-
1
2 2
2 2 1
2 2
=
-
<
1
2 2 1
1
\ q < ° 45
Thus, the divergence angle between the
particles will be less than
p
2
.
Option (b) is correct.
Initial KE =
1
2
2
mv
Final KE =
æ
è
ç
ö
ø
÷ +
1
2 2
1
2
2
2
2
m
v
mV
= + × - ×
é
ë
ê
ù
û
ú
1
2
1
4
2
5
32
2
1
8 2
2
mv
As Final KE < Initial KE
Collision is inelastic.
Option (d) is correct.
2. v
m m
m m
v
2
2 1
1 2
2
¢ =
-
+
=
-
+
m m
m m
v
5
5
2
= -
2
3
2
v
= -
2
3
2gl
Centre of Mass, Conservation of Linear Momentum, Impulse and Collision | 197
48 m
48 m
x'
8L M + S
v/2
m
2m
q
45°
L
Rest
2m m
v
v
2
v'
2
v'
1
v = 0
1
m = 5m
1
m = m
2
T
mv
l
mg -
¢
=
2
2
or T
mv
l
mg =
¢
+
2
= +
m g
mg
8
9
=
17
9
mg
Option (a) is correct.
Velocity of block
v
m
m m
v
1
2
1 2
2
2
¢ =
+
=
+
×
2
5
2
m
m m
gl
=
1
3
2gl
Option (c) is correct.
Maximum height attained by pendulum
bob
=
¢
= =
v
g
gl
g
l
g
2
2
2
8 9
2
4 /
Option (d) is correct.
3. v u cos cos f = q Þ
v
u
=
f
cos
cos
q
and e
v
u
=
f sin
sinq
=
f
´
f cos
cos
sin
sin
q
q
=
tan
tan
f
q
Option (b) is correct.
Change in momentum of particle
= - f - + ( sin ) ( sin ) mv mu q
\ Impulse delivered by floor to the particle
= mv mu sin sin f + q
=
f
+
é
ë
ê
ù
û
ú
mv
u
v
sin
sin
sin
q
q
= +
é
ë
ê
ù
û
ú
mv
u
v
e
u
v
sinq
= + mu e sin ( ) q 1
Option (d) is correct.
u e 1 1
2 2
- - ( ) sin q
= - + u e 1
2 2 2
sin sin q q
= + u e cos sin
2 2 2
q q
= + f u
v
u
cos sin
2
2
2
2
q
= + f u v
2 2 2 2
cos sin q
= f + f v v
2 2 2 2
cos sin
=v
Option (c) is correct.
cos sin
2 2 2
q q + e
= +
f
cos
tan
tan
sin
2
2
2
2
q
q
q
= + cos ( tan )
2 2
1 q f
= f cos
2 2
q sec
=
f
cos
cos
2
2
q
= =
v
u
2
2
FinalKE
InitialKE
Option (d) is correct.
4. u i j
®
-
= + ( )
^ ^
3 2
1
ms
Impulse received by particle of mass m
= - +
® ®
m m u v
= - + + - + m m ( ) ( )
^ ^ ^ ^
3 2 2 i j i j
= - + m( )
^ ^
5 i j unit
Option (b) is correct.
Impulse received by particle of mass M
= - (impulse received by particle of
mass m)
= + m( )
^ ^
5i j
Option (d) is correct.
198 | Mechanics-1
v
v cos f
v sin f
u
f
u sin q
q
+
u cos q
m
u
M
v = (–2 i + j) m/s
^ ^
®
m
Page 3
29. When the spider eats up the moth and
travels towards A with velocity
v
2
relative
to rod.
24
2
48 0 m
v
v mv
R R
+
æ
è
ç
ö
ø
÷ + =
[v
R
= velocity (absolute) of rod]
Þ v
v
R
= -
6
Option (c) is correct.
30. Time taken by spider to reach point A
starting from point B
= +
4 8
2
L
v
L
v/
= = =
20 20
20
L
v
L
L T
T
/
= ´ = 20 4 80 s
31. Form CM not to shift
Þ ( ) ( ) x L m x L m ¢ + + ¢ + 8 24 6 48
= ´ 64 48 m
i.e., x
L
¢ = -
8
3
Option (a) is correct.
More than One Cor rect Op tions
1. Along vertical : 2
2
45 mV m
v
sin sin q = × °
i.e., 2
2 2
V
v
sin q = …(i)
Along horizontal :
mv m
v
mV = ° +
2
45 2 cos cos q
i.e., 2 1
1
2 2
V v cos q = -
æ
è
ç
ö
ø
÷
…(ii)
Squaring and adding Eq. (i)and (ii),
8
2 2 2 2
2
2 2
V
v
v
v
=
æ
è
ç
ö
ø
÷
+ -
æ
è
ç
ö
ø
÷
= + + - × ×
v
v
v
v
v
2
2
2
8 7
2
2 2
= -
5
4 2
2 2
v v
Dividing Eq. (ii) by Eq. (i)
tan q =
-
1
2 2
2 2 1
2 2
=
-
<
1
2 2 1
1
\ q < ° 45
Thus, the divergence angle between the
particles will be less than
p
2
.
Option (b) is correct.
Initial KE =
1
2
2
mv
Final KE =
æ
è
ç
ö
ø
÷ +
1
2 2
1
2
2
2
2
m
v
mV
= + × - ×
é
ë
ê
ù
û
ú
1
2
1
4
2
5
32
2
1
8 2
2
mv
As Final KE < Initial KE
Collision is inelastic.
Option (d) is correct.
2. v
m m
m m
v
2
2 1
1 2
2
¢ =
-
+
=
-
+
m m
m m
v
5
5
2
= -
2
3
2
v
= -
2
3
2gl
Centre of Mass, Conservation of Linear Momentum, Impulse and Collision | 197
48 m
48 m
x'
8L M + S
v/2
m
2m
q
45°
L
Rest
2m m
v
v
2
v'
2
v'
1
v = 0
1
m = 5m
1
m = m
2
T
mv
l
mg -
¢
=
2
2
or T
mv
l
mg =
¢
+
2
= +
m g
mg
8
9
=
17
9
mg
Option (a) is correct.
Velocity of block
v
m
m m
v
1
2
1 2
2
2
¢ =
+
=
+
×
2
5
2
m
m m
gl
=
1
3
2gl
Option (c) is correct.
Maximum height attained by pendulum
bob
=
¢
= =
v
g
gl
g
l
g
2
2
2
8 9
2
4 /
Option (d) is correct.
3. v u cos cos f = q Þ
v
u
=
f
cos
cos
q
and e
v
u
=
f sin
sinq
=
f
´
f cos
cos
sin
sin
q
q
=
tan
tan
f
q
Option (b) is correct.
Change in momentum of particle
= - f - + ( sin ) ( sin ) mv mu q
\ Impulse delivered by floor to the particle
= mv mu sin sin f + q
=
f
+
é
ë
ê
ù
û
ú
mv
u
v
sin
sin
sin
q
q
= +
é
ë
ê
ù
û
ú
mv
u
v
e
u
v
sinq
= + mu e sin ( ) q 1
Option (d) is correct.
u e 1 1
2 2
- - ( ) sin q
= - + u e 1
2 2 2
sin sin q q
= + u e cos sin
2 2 2
q q
= + f u
v
u
cos sin
2
2
2
2
q
= + f u v
2 2 2 2
cos sin q
= f + f v v
2 2 2 2
cos sin
=v
Option (c) is correct.
cos sin
2 2 2
q q + e
= +
f
cos
tan
tan
sin
2
2
2
2
q
q
q
= + cos ( tan )
2 2
1 q f
= f cos
2 2
q sec
=
f
cos
cos
2
2
q
= =
v
u
2
2
FinalKE
InitialKE
Option (d) is correct.
4. u i j
®
-
= + ( )
^ ^
3 2
1
ms
Impulse received by particle of mass m
= - +
® ®
m m u v
= - + + - + m m ( ) ( )
^ ^ ^ ^
3 2 2 i j i j
= - + m( )
^ ^
5 i j unit
Option (b) is correct.
Impulse received by particle of mass M
= - (impulse received by particle of
mass m)
= + m( )
^ ^
5i j
Option (d) is correct.
198 | Mechanics-1
v
v cos f
v sin f
u
f
u sin q
q
+
u cos q
m
u
M
v = (–2 i + j) m/s
^ ^
®
m
5. T m a =
1
and m g T m a
2 2
- =
Solving, a
m
m m
g =
+
2
1 2
( ) a
m a m
m m
x CM
=
+
+
1 2
1 2
0
=
+
m
m m
a
1
1 2
=
+
m m
m m
g
1 2
1 2
2
( )
Option (b) is correct.
( )
( )
a
m m a
m m
y CM
=
+
+
1 2
1 2
0
=
+
m
m m
a
2
1 2
=
+
æ
è
ç
ö
ø
÷
m
m m
g
1 2
2
Option (c) is correct.
6. As the block comes down, the CM of the
system will also come down i.e., it does not
remain stationary.
a
mg
m M
g
CM
=
+
¹
a
CM
is downwards and also a g
CM
< .
Option (d) is correct.
As no force acts along horizontal direction,
the momentum of the system will remain
conserved along horizontal direction.
Option (c) is correct.
7. Velocity of B after collision :
v
e
v
1 2
1
2
¢ =
+
æ
è
ç
ö
ø
÷
=
3
4
v [as e =
1
2
and v v
2
= (given)]
¹
v
2
Impulse given by A to B
= change in momentum of B
=
æ
è
ç
ö
ø
÷ - × m v m
3
4
0
=
3
4
mv
Option (b) is correct.
Velocity of A after collision
v
e
v
2 2
1
2
¢ =
-
æ
è
ç
ö
ø
÷
=
v
4
Loss of KE during collision
= - ¢ + ¢
1
2
1
2
2
2
1
2
2
2
mv m v v ( )
= -
æ
è
ç
ö
ø
÷ -
æ
è
ç
ö
ø
÷
é
ë
ê
ù
û
ú
1
2 4
3
4
2
2 2
m v
v v
=
3
16
2
mv
Option (c) is correct.
8. As the mass of the system keeps on
decreasing momentum of the system does
not remain constant.
Thrust force is developed on the rocket
due to Newton’s 3rd law of motion.
Option (b) is correct.
As, a
dv
dt
v
m
dm
dt
g
i
= = -
æ
è
ç
ö
ø
÷
-
The value of a will remain constant if v
i
and -
dm
dt
are constant.
Option (c) is correct.
F F
t net
= (Thrust force due to gas ejection)
- W (weight of rocket)
a
F
m
=
net
Thus, Newton’s 2nd law is applied.
Option (d) is correct.
Centre of Mass, Conservation of Linear Momentum, Impulse and Collision | 199
m
1
m
2
mg
2
a
T
T T
T
x
y
a
v
2
Before collision
v'
2
m
2
m
1
m
1
m
2
v = 0
1
A B
After collision
v'
1
B A
Page 4
29. When the spider eats up the moth and
travels towards A with velocity
v
2
relative
to rod.
24
2
48 0 m
v
v mv
R R
+
æ
è
ç
ö
ø
÷ + =
[v
R
= velocity (absolute) of rod]
Þ v
v
R
= -
6
Option (c) is correct.
30. Time taken by spider to reach point A
starting from point B
= +
4 8
2
L
v
L
v/
= = =
20 20
20
L
v
L
L T
T
/
= ´ = 20 4 80 s
31. Form CM not to shift
Þ ( ) ( ) x L m x L m ¢ + + ¢ + 8 24 6 48
= ´ 64 48 m
i.e., x
L
¢ = -
8
3
Option (a) is correct.
More than One Cor rect Op tions
1. Along vertical : 2
2
45 mV m
v
sin sin q = × °
i.e., 2
2 2
V
v
sin q = …(i)
Along horizontal :
mv m
v
mV = ° +
2
45 2 cos cos q
i.e., 2 1
1
2 2
V v cos q = -
æ
è
ç
ö
ø
÷
…(ii)
Squaring and adding Eq. (i)and (ii),
8
2 2 2 2
2
2 2
V
v
v
v
=
æ
è
ç
ö
ø
÷
+ -
æ
è
ç
ö
ø
÷
= + + - × ×
v
v
v
v
v
2
2
2
8 7
2
2 2
= -
5
4 2
2 2
v v
Dividing Eq. (ii) by Eq. (i)
tan q =
-
1
2 2
2 2 1
2 2
=
-
<
1
2 2 1
1
\ q < ° 45
Thus, the divergence angle between the
particles will be less than
p
2
.
Option (b) is correct.
Initial KE =
1
2
2
mv
Final KE =
æ
è
ç
ö
ø
÷ +
1
2 2
1
2
2
2
2
m
v
mV
= + × - ×
é
ë
ê
ù
û
ú
1
2
1
4
2
5
32
2
1
8 2
2
mv
As Final KE < Initial KE
Collision is inelastic.
Option (d) is correct.
2. v
m m
m m
v
2
2 1
1 2
2
¢ =
-
+
=
-
+
m m
m m
v
5
5
2
= -
2
3
2
v
= -
2
3
2gl
Centre of Mass, Conservation of Linear Momentum, Impulse and Collision | 197
48 m
48 m
x'
8L M + S
v/2
m
2m
q
45°
L
Rest
2m m
v
v
2
v'
2
v'
1
v = 0
1
m = 5m
1
m = m
2
T
mv
l
mg -
¢
=
2
2
or T
mv
l
mg =
¢
+
2
= +
m g
mg
8
9
=
17
9
mg
Option (a) is correct.
Velocity of block
v
m
m m
v
1
2
1 2
2
2
¢ =
+
=
+
×
2
5
2
m
m m
gl
=
1
3
2gl
Option (c) is correct.
Maximum height attained by pendulum
bob
=
¢
= =
v
g
gl
g
l
g
2
2
2
8 9
2
4 /
Option (d) is correct.
3. v u cos cos f = q Þ
v
u
=
f
cos
cos
q
and e
v
u
=
f sin
sinq
=
f
´
f cos
cos
sin
sin
q
q
=
tan
tan
f
q
Option (b) is correct.
Change in momentum of particle
= - f - + ( sin ) ( sin ) mv mu q
\ Impulse delivered by floor to the particle
= mv mu sin sin f + q
=
f
+
é
ë
ê
ù
û
ú
mv
u
v
sin
sin
sin
q
q
= +
é
ë
ê
ù
û
ú
mv
u
v
e
u
v
sinq
= + mu e sin ( ) q 1
Option (d) is correct.
u e 1 1
2 2
- - ( ) sin q
= - + u e 1
2 2 2
sin sin q q
= + u e cos sin
2 2 2
q q
= + f u
v
u
cos sin
2
2
2
2
q
= + f u v
2 2 2 2
cos sin q
= f + f v v
2 2 2 2
cos sin
=v
Option (c) is correct.
cos sin
2 2 2
q q + e
= +
f
cos
tan
tan
sin
2
2
2
2
q
q
q
= + cos ( tan )
2 2
1 q f
= f cos
2 2
q sec
=
f
cos
cos
2
2
q
= =
v
u
2
2
FinalKE
InitialKE
Option (d) is correct.
4. u i j
®
-
= + ( )
^ ^
3 2
1
ms
Impulse received by particle of mass m
= - +
® ®
m m u v
= - + + - + m m ( ) ( )
^ ^ ^ ^
3 2 2 i j i j
= - + m( )
^ ^
5 i j unit
Option (b) is correct.
Impulse received by particle of mass M
= - (impulse received by particle of
mass m)
= + m( )
^ ^
5i j
Option (d) is correct.
198 | Mechanics-1
v
v cos f
v sin f
u
f
u sin q
q
+
u cos q
m
u
M
v = (–2 i + j) m/s
^ ^
®
m
5. T m a =
1
and m g T m a
2 2
- =
Solving, a
m
m m
g =
+
2
1 2
( ) a
m a m
m m
x CM
=
+
+
1 2
1 2
0
=
+
m
m m
a
1
1 2
=
+
m m
m m
g
1 2
1 2
2
( )
Option (b) is correct.
( )
( )
a
m m a
m m
y CM
=
+
+
1 2
1 2
0
=
+
m
m m
a
2
1 2
=
+
æ
è
ç
ö
ø
÷
m
m m
g
1 2
2
Option (c) is correct.
6. As the block comes down, the CM of the
system will also come down i.e., it does not
remain stationary.
a
mg
m M
g
CM
=
+
¹
a
CM
is downwards and also a g
CM
< .
Option (d) is correct.
As no force acts along horizontal direction,
the momentum of the system will remain
conserved along horizontal direction.
Option (c) is correct.
7. Velocity of B after collision :
v
e
v
1 2
1
2
¢ =
+
æ
è
ç
ö
ø
÷
=
3
4
v [as e =
1
2
and v v
2
= (given)]
¹
v
2
Impulse given by A to B
= change in momentum of B
=
æ
è
ç
ö
ø
÷ - × m v m
3
4
0
=
3
4
mv
Option (b) is correct.
Velocity of A after collision
v
e
v
2 2
1
2
¢ =
-
æ
è
ç
ö
ø
÷
=
v
4
Loss of KE during collision
= - ¢ + ¢
1
2
1
2
2
2
1
2
2
2
mv m v v ( )
= -
æ
è
ç
ö
ø
÷ -
æ
è
ç
ö
ø
÷
é
ë
ê
ù
û
ú
1
2 4
3
4
2
2 2
m v
v v
=
3
16
2
mv
Option (c) is correct.
8. As the mass of the system keeps on
decreasing momentum of the system does
not remain constant.
Thrust force is developed on the rocket
due to Newton’s 3rd law of motion.
Option (b) is correct.
As, a
dv
dt
v
m
dm
dt
g
i
= = -
æ
è
ç
ö
ø
÷
-
The value of a will remain constant if v
i
and -
dm
dt
are constant.
Option (c) is correct.
F F
t net
= (Thrust force due to gas ejection)
- W (weight of rocket)
a
F
m
=
net
Thus, Newton’s 2nd law is applied.
Option (d) is correct.
Centre of Mass, Conservation of Linear Momentum, Impulse and Collision | 199
m
1
m
2
mg
2
a
T
T T
T
x
y
a
v
2
Before collision
v'
2
m
2
m
1
m
1
m
2
v = 0
1
A B
After collision
v'
1
B A
Match the Columns
1. If x
0
is the compression made in the
spring, the restoring force on B will
decrease from kx
0
to zero as the spring
regains its original length. Thus, the
acceleration of B will also decrease from
kx
m
B
0
to zero.
So, the a
CM
will also decrease from
kx
m m
A B
0
+
to zero.
\ (a) ® (r)
When spring is released after compressing
it, the restoring on B will accelerate it
towards right while the reaction force on
A will apply a force on the wall which in
turn will apply equal and opposite force on
A and consequently A will travel towards
right. As both travel towards right the
velocity of CM will be maximum in the
beginning.
After this A will start compressing the
spring and at a certain instant when the
spring is compressed to maximum value
both the blocks will travel towards right
with a constant velocity and then the
velocity of CM will become constant.
\ (b) ® (q)
As the blocks will never move along
y-axis, the y-component of the CM of the
two blocks will not change.
\ (d) ® (p)
As the two blocks will keep on moving
towards right (surface below being
smooth) the x-coordinate of the CM of the
blocks will keep on increasing.
\ (c) ® (s)
2. Initial a
m g m g
m m
CM
=
+ + +
+
( ) ( )
= + g
= + 10 SI unit
\ (a) ® (q)
Initial v
m m
m m
CM
=
- + ´
+
( ) 20 0
= - 10
\ | | v
CM
= 10 SI unit
\ (b) ® (q)
For the time taken by the first particle to
return to ground
s ut at = +
1
2
2
0 20 5
2
= - + ( ) t t
Þ t = 4 s
Now, as the collision of the first particle
with the ground is perfectly inelastic, the
first particle will remain on ground at
rest.
Now, let us find the position of 2nd
particle at t = 5 s
s = + ( ) ( ) 0 5
1
2
10 5
2
= 125 m
The particle (2nd) will still be in space
moving downwards.
a
m m g
m m
CM
=
× + ×
+
0
= =
g
2
5 (SI unit)
\ (c) ® (p)
Velocity of 2nd particle at t = 5 s
v = + ´ 0 10 5
= 50 ms
-1
200 | Mechanics-1
B A
m
B
m
A
k
B A
x
0
kx
0
kx
0
–1
20 ms
m
1st particle
+
180 m
2nd particle
u = 0
Page 5
29. When the spider eats up the moth and
travels towards A with velocity
v
2
relative
to rod.
24
2
48 0 m
v
v mv
R R
+
æ
è
ç
ö
ø
÷ + =
[v
R
= velocity (absolute) of rod]
Þ v
v
R
= -
6
Option (c) is correct.
30. Time taken by spider to reach point A
starting from point B
= +
4 8
2
L
v
L
v/
= = =
20 20
20
L
v
L
L T
T
/
= ´ = 20 4 80 s
31. Form CM not to shift
Þ ( ) ( ) x L m x L m ¢ + + ¢ + 8 24 6 48
= ´ 64 48 m
i.e., x
L
¢ = -
8
3
Option (a) is correct.
More than One Cor rect Op tions
1. Along vertical : 2
2
45 mV m
v
sin sin q = × °
i.e., 2
2 2
V
v
sin q = …(i)
Along horizontal :
mv m
v
mV = ° +
2
45 2 cos cos q
i.e., 2 1
1
2 2
V v cos q = -
æ
è
ç
ö
ø
÷
…(ii)
Squaring and adding Eq. (i)and (ii),
8
2 2 2 2
2
2 2
V
v
v
v
=
æ
è
ç
ö
ø
÷
+ -
æ
è
ç
ö
ø
÷
= + + - × ×
v
v
v
v
v
2
2
2
8 7
2
2 2
= -
5
4 2
2 2
v v
Dividing Eq. (ii) by Eq. (i)
tan q =
-
1
2 2
2 2 1
2 2
=
-
<
1
2 2 1
1
\ q < ° 45
Thus, the divergence angle between the
particles will be less than
p
2
.
Option (b) is correct.
Initial KE =
1
2
2
mv
Final KE =
æ
è
ç
ö
ø
÷ +
1
2 2
1
2
2
2
2
m
v
mV
= + × - ×
é
ë
ê
ù
û
ú
1
2
1
4
2
5
32
2
1
8 2
2
mv
As Final KE < Initial KE
Collision is inelastic.
Option (d) is correct.
2. v
m m
m m
v
2
2 1
1 2
2
¢ =
-
+
=
-
+
m m
m m
v
5
5
2
= -
2
3
2
v
= -
2
3
2gl
Centre of Mass, Conservation of Linear Momentum, Impulse and Collision | 197
48 m
48 m
x'
8L M + S
v/2
m
2m
q
45°
L
Rest
2m m
v
v
2
v'
2
v'
1
v = 0
1
m = 5m
1
m = m
2
T
mv
l
mg -
¢
=
2
2
or T
mv
l
mg =
¢
+
2
= +
m g
mg
8
9
=
17
9
mg
Option (a) is correct.
Velocity of block
v
m
m m
v
1
2
1 2
2
2
¢ =
+
=
+
×
2
5
2
m
m m
gl
=
1
3
2gl
Option (c) is correct.
Maximum height attained by pendulum
bob
=
¢
= =
v
g
gl
g
l
g
2
2
2
8 9
2
4 /
Option (d) is correct.
3. v u cos cos f = q Þ
v
u
=
f
cos
cos
q
and e
v
u
=
f sin
sinq
=
f
´
f cos
cos
sin
sin
q
q
=
tan
tan
f
q
Option (b) is correct.
Change in momentum of particle
= - f - + ( sin ) ( sin ) mv mu q
\ Impulse delivered by floor to the particle
= mv mu sin sin f + q
=
f
+
é
ë
ê
ù
û
ú
mv
u
v
sin
sin
sin
q
q
= +
é
ë
ê
ù
û
ú
mv
u
v
e
u
v
sinq
= + mu e sin ( ) q 1
Option (d) is correct.
u e 1 1
2 2
- - ( ) sin q
= - + u e 1
2 2 2
sin sin q q
= + u e cos sin
2 2 2
q q
= + f u
v
u
cos sin
2
2
2
2
q
= + f u v
2 2 2 2
cos sin q
= f + f v v
2 2 2 2
cos sin
=v
Option (c) is correct.
cos sin
2 2 2
q q + e
= +
f
cos
tan
tan
sin
2
2
2
2
q
q
q
= + cos ( tan )
2 2
1 q f
= f cos
2 2
q sec
=
f
cos
cos
2
2
q
= =
v
u
2
2
FinalKE
InitialKE
Option (d) is correct.
4. u i j
®
-
= + ( )
^ ^
3 2
1
ms
Impulse received by particle of mass m
= - +
® ®
m m u v
= - + + - + m m ( ) ( )
^ ^ ^ ^
3 2 2 i j i j
= - + m( )
^ ^
5 i j unit
Option (b) is correct.
Impulse received by particle of mass M
= - (impulse received by particle of
mass m)
= + m( )
^ ^
5i j
Option (d) is correct.
198 | Mechanics-1
v
v cos f
v sin f
u
f
u sin q
q
+
u cos q
m
u
M
v = (–2 i + j) m/s
^ ^
®
m
5. T m a =
1
and m g T m a
2 2
- =
Solving, a
m
m m
g =
+
2
1 2
( ) a
m a m
m m
x CM
=
+
+
1 2
1 2
0
=
+
m
m m
a
1
1 2
=
+
m m
m m
g
1 2
1 2
2
( )
Option (b) is correct.
( )
( )
a
m m a
m m
y CM
=
+
+
1 2
1 2
0
=
+
m
m m
a
2
1 2
=
+
æ
è
ç
ö
ø
÷
m
m m
g
1 2
2
Option (c) is correct.
6. As the block comes down, the CM of the
system will also come down i.e., it does not
remain stationary.
a
mg
m M
g
CM
=
+
¹
a
CM
is downwards and also a g
CM
< .
Option (d) is correct.
As no force acts along horizontal direction,
the momentum of the system will remain
conserved along horizontal direction.
Option (c) is correct.
7. Velocity of B after collision :
v
e
v
1 2
1
2
¢ =
+
æ
è
ç
ö
ø
÷
=
3
4
v [as e =
1
2
and v v
2
= (given)]
¹
v
2
Impulse given by A to B
= change in momentum of B
=
æ
è
ç
ö
ø
÷ - × m v m
3
4
0
=
3
4
mv
Option (b) is correct.
Velocity of A after collision
v
e
v
2 2
1
2
¢ =
-
æ
è
ç
ö
ø
÷
=
v
4
Loss of KE during collision
= - ¢ + ¢
1
2
1
2
2
2
1
2
2
2
mv m v v ( )
= -
æ
è
ç
ö
ø
÷ -
æ
è
ç
ö
ø
÷
é
ë
ê
ù
û
ú
1
2 4
3
4
2
2 2
m v
v v
=
3
16
2
mv
Option (c) is correct.
8. As the mass of the system keeps on
decreasing momentum of the system does
not remain constant.
Thrust force is developed on the rocket
due to Newton’s 3rd law of motion.
Option (b) is correct.
As, a
dv
dt
v
m
dm
dt
g
i
= = -
æ
è
ç
ö
ø
÷
-
The value of a will remain constant if v
i
and -
dm
dt
are constant.
Option (c) is correct.
F F
t net
= (Thrust force due to gas ejection)
- W (weight of rocket)
a
F
m
=
net
Thus, Newton’s 2nd law is applied.
Option (d) is correct.
Centre of Mass, Conservation of Linear Momentum, Impulse and Collision | 199
m
1
m
2
mg
2
a
T
T T
T
x
y
a
v
2
Before collision
v'
2
m
2
m
1
m
1
m
2
v = 0
1
A B
After collision
v'
1
B A
Match the Columns
1. If x
0
is the compression made in the
spring, the restoring force on B will
decrease from kx
0
to zero as the spring
regains its original length. Thus, the
acceleration of B will also decrease from
kx
m
B
0
to zero.
So, the a
CM
will also decrease from
kx
m m
A B
0
+
to zero.
\ (a) ® (r)
When spring is released after compressing
it, the restoring on B will accelerate it
towards right while the reaction force on
A will apply a force on the wall which in
turn will apply equal and opposite force on
A and consequently A will travel towards
right. As both travel towards right the
velocity of CM will be maximum in the
beginning.
After this A will start compressing the
spring and at a certain instant when the
spring is compressed to maximum value
both the blocks will travel towards right
with a constant velocity and then the
velocity of CM will become constant.
\ (b) ® (q)
As the blocks will never move along
y-axis, the y-component of the CM of the
two blocks will not change.
\ (d) ® (p)
As the two blocks will keep on moving
towards right (surface below being
smooth) the x-coordinate of the CM of the
blocks will keep on increasing.
\ (c) ® (s)
2. Initial a
m g m g
m m
CM
=
+ + +
+
( ) ( )
= + g
= + 10 SI unit
\ (a) ® (q)
Initial v
m m
m m
CM
=
- + ´
+
( ) 20 0
= - 10
\ | | v
CM
= 10 SI unit
\ (b) ® (q)
For the time taken by the first particle to
return to ground
s ut at = +
1
2
2
0 20 5
2
= - + ( ) t t
Þ t = 4 s
Now, as the collision of the first particle
with the ground is perfectly inelastic, the
first particle will remain on ground at
rest.
Now, let us find the position of 2nd
particle at t = 5 s
s = + ( ) ( ) 0 5
1
2
10 5
2
= 125 m
The particle (2nd) will still be in space
moving downwards.
a
m m g
m m
CM
=
× + ×
+
0
= =
g
2
5 (SI unit)
\ (c) ® (p)
Velocity of 2nd particle at t = 5 s
v = + ´ 0 10 5
= 50 ms
-1
200 | Mechanics-1
B A
m
B
m
A
k
B A
x
0
kx
0
kx
0
–1
20 ms
m
1st particle
+
180 m
2nd particle
u = 0
\ At t = 5 s
v
m m
m m
CM
=
× + ×
+
0 50
=25 (SI unit)
\ (d) ® (s)
3. Initial KE of block B = 4 J
\
1
2
4
2
´ ´ = 0.5 u
Þ u = 4 ms
-1
\ Initial momentum of B = ´ 0.5 4
=
-
2
1
kg ms
\ (a) ® (r)
Initial momentum
p p p
A B CM
= +
= + 0 2
=
-
2
1
kgms
\ (b) ® (r)
Velocity given to block B will compress the
spring and this will gradually increase the
velocity of A. When the spring gets
compressed to its maximum both the
blocks will have the same velocities i.e.,
same momentum as both have same mass.
p p
A B
=
(at maximum compression of the spring)
But, p p
A B
+ = initial momentum of B.
\ p p
A A
+ = 2
i.e., p
A
= 1 kgms
-1
\ (c) ® (q)
After the maximum compression in the
spring, the spring will gradually expand
but now the velocity of block A will
increase and that of B will decrease and
when the spring attains maximum
expansion the velocity of B will be zero
and so will be its momentum.
\ (d) ® (p)
4. If collision is elastic, the two blocks will
interchange there velocities (mass of both
balls being equal).
Thus, velocity of A after collision = v
\ (a) ® (r)
If collision is perfectly inelastic, the two
balls will move together (with velocities V).
\ mv m m V = + ( )
Þ V
v
=
2
\ (b) ® (s)
If collision is inelastic with e =
1
2
,
v
e
v
1 2
1
2
¢ =
+
×
=
+
×
1
1
2
2
v [Q v v
2
= (given)]
=
3
4
v
\ (c) ® (p)
If collision is inelastic with e =
1
4
,
v v v
1
1
1
4
2
5
8
¢ =
+
æ
è
ç
ö
ø
÷
=
\ (d) ® (q).
5. If A moves x towards right
Let plank (along with B) move by x¢ to the
right.
\
x x ´ + ¢ +
+ +
=
30 60 30
30 60 30
0
( )
( )
i.e., x
x
¢ = -
3
=
x
3
, towards left.
\ (a) ® (r)
If B moves x towards left
Let plank (along with A) move x¢ to the
left
\
x x × + ¢ +
+ +
=
60 30 30
60 30 30
0
( )
( )
i.e., x x ¢ = -
= x, towards right
Centre of Mass, Conservation of Linear Momentum, Impulse and Collision | 201
B A
m = 0.5 kg m
C 30 kg
B A
50 kg 60 kg
Smooth
Read More
About this Document
|
4.70/5 Rating |
|
Nov 21, 2024 Last updated |
Document Description: DC Pandey Solutions: Centre of Mass, Conservation of Linear Momentum- 5 for NEET 2024 is part of DC Pandey Solutions for NEET Physics preparation.
The notes and questions for DC Pandey Solutions: Centre of Mass, Conservation of Linear Momentum- 5 have been prepared according to the NEET exam syllabus. Information about DC Pandey Solutions: Centre of Mass, Conservation of Linear Momentum- 5 covers topics
like and DC Pandey Solutions: Centre of Mass, Conservation of Linear Momentum- 5 Example, for NEET 2024 Exam. Find important definitions, questions, notes, meanings, examples, exercises and tests below for DC Pandey Solutions: Centre of Mass, Conservation of Linear Momentum- 5.
Introduction of DC Pandey Solutions: Centre of Mass, Conservation of Linear Momentum- 5 in English is available as part of our DC Pandey Solutions for NEET Physics
for NEET & DC Pandey Solutions: Centre of Mass, Conservation of Linear Momentum- 5 in Hindi for DC Pandey Solutions for NEET Physics course.
Download more important topics related with notes, lectures and mock test series for NEET
Exam by signing up for free. NEET: DC Pandey Solutions: Centre of Mass, Conservation of Linear Momentum- 5 | DC Pandey Solutions for NEET Physics
Description
Full syllabus notes, lecture & questions for DC Pandey Solutions: Centre of Mass, Conservation of Linear Momentum- 5 | DC Pandey Solutions for NEET Physics - NEET | Plus excerises question with solution to help you revise complete syllabus for DC Pandey Solutions for NEET Physics | Best notes, free PDF download
Information about DC Pandey Solutions: Centre of Mass, Conservation of Linear Momentum- 5
In this doc you can find the meaning of DC Pandey Solutions: Centre of Mass, Conservation of Linear Momentum- 5 defined & explained in the simplest way possible. Besides explaining types of
DC Pandey Solutions: Centre of Mass, Conservation of Linear Momentum- 5 theory, EduRev gives you an ample number of questions to practice DC Pandey Solutions: Centre of Mass, Conservation of Linear Momentum- 5 tests, examples and also practice NEET
tests
|
Explore Courses for NEET exam
|
|
Signup for Free!
Signup to see your scores go up within 7 days! Learn & Practice with 1000+ FREE Notes, Videos & Tests.
Related Searches
Conservation of Linear Momentum- 5 | DC Pandey Solutions for NEET Physics
,DC Pandey Solutions: Centre of Mass
,practice quizzes
,Previous Year Questions with Solutions
,video lectures
,shortcuts and tricks
,ppt
,Exam
,Sample Paper
,Conservation of Linear Momentum- 5 | DC Pandey Solutions for NEET Physics
,Important questions
,Semester Notes
,mock tests for examination
,Viva Questions
,DC Pandey Solutions: Centre of Mass
,Objective type Questions
,Extra Questions
,past year papers
,MCQs
,DC Pandey Solutions: Centre of Mass
,study material
,Free
,Conservation of Linear Momentum- 5 | DC Pandey Solutions for NEET Physics
,Summary
;
Additional Information about DC Pandey Solutions: Centre of Mass, Conservation of Linear Momentum- 5 for NEET Preparation
DC Pandey Solutions: Centre of Mass, Conservation of Linear Momentum- 5 Free PDF Download
The DC Pandey Solutions: Centre of Mass, Conservation of Linear Momentum- 5 is an invaluable resource that delves deep into the core of the NEET exam.
These study notes are curated by experts and cover all the essential topics and concepts, making your preparation more efficient and effective.
With the help of these notes, you can grasp complex subjects quickly, revise important points easily,
and reinforce your understanding of key concepts. The study notes are presented in a concise and easy-to-understand manner,
allowing you to optimize your learning process. Whether you're looking for best-recommended books, sample papers, study material,
or toppers' notes, this PDF has got you covered. Download the DC Pandey Solutions: Centre of Mass, Conservation of Linear Momentum- 5 now and kickstart your journey towards success in the NEET exam.
Importance of DC Pandey Solutions: Centre of Mass, Conservation of Linear Momentum- 5
The importance of DC Pandey Solutions: Centre of Mass, Conservation of Linear Momentum- 5 cannot be overstated, especially for NEET aspirants.
This document holds the key to success in the NEET exam.
It offers a detailed understanding of the concept, providing invaluable insights into the topic.
By knowing the concepts well in advance, students can plan their preparation effectively.
Utilize this indispensable guide for a well-rounded preparation and achieve your desired results.
DC Pandey Solutions: Centre of Mass, Conservation of Linear Momentum- 5 Notes
DC Pandey Solutions: Centre of Mass, Conservation of Linear Momentum- 5 Notes offer in-depth insights into the specific topic to help you master it with ease.
This comprehensive document covers all aspects related to DC Pandey Solutions: Centre of Mass, Conservation of Linear Momentum- 5.
It includes detailed information about the exam syllabus, recommended books, and study materials for a well-rounded preparation.
Practice papers and question papers enable you to assess your progress effectively.
Additionally, the paper analysis provides valuable tips for tackling the exam strategically.
Access to Toppers' notes gives you an edge in understanding complex concepts.
Whether you're a beginner or aiming for advanced proficiency, DC Pandey Solutions: Centre of Mass, Conservation of Linear Momentum- 5 Notes on EduRev are your ultimate resource for success.
DC Pandey Solutions: Centre of Mass, Conservation of Linear Momentum- 5 NEET Questions
The "DC Pandey Solutions: Centre of Mass, Conservation of Linear Momentum- 5 NEET Questions" guide is a valuable resource for all aspiring students preparing for the
NEET exam. It focuses on providing a wide range of practice questions to help students gauge
their understanding of the exam topics. These questions cover the entire syllabus, ensuring comprehensive preparation.
The guide includes previous years' question papers for students to familiarize themselves with the exam's format and difficulty level.
Additionally, it offers subject-specific question banks, allowing students to focus on weak areas and improve their performance.
Study DC Pandey Solutions: Centre of Mass, Conservation of Linear Momentum- 5 on the App
Students of NEET can study DC Pandey Solutions: Centre of Mass, Conservation of Linear Momentum- 5 alongwith tests & analysis from the EduRev app,
which will help them while preparing for their exam. Apart from the DC Pandey Solutions: Centre of Mass, Conservation of Linear Momentum- 5,
students can also utilize the EduRev App for other study materials such as previous year question papers, syllabus, important questions, etc.
The EduRev App will make your learning easier as you can access it from anywhere you want.
The content of DC Pandey Solutions: Centre of Mass, Conservation of Linear Momentum- 5 is prepared as per the latest NEET syllabus.
|
© EduRev
|
Education Revolution
|
Follow Us
|
Signup on EduRev and stay on top of your study goals
10M+ students crushing their study goals daily