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Page No 270:

Question 1:

Answer:

Density is defined as mass per unit volume. It tells how closely packed are the molecules inside an object. When molecules are tightly packed, we say that the object is dense; when molecules are far apart, we say that the object is light.
The density of a liquid depends on the mass of the molecules that make up the liquid and the closeness of the molecules of the liquid. It is not always true that the molecules of a dense liquid are heavier than the molecules of a lighter liquid.
For example, alcohol is less dense than oil. Alcohol molecules are mostly carbon and hydrogen atoms, so they are similar to oil. But they also contain an oxygen atom, which makes them a little heavy. For this reason, you might think that alcohol is denser than oil. But because of their shape and size, alcohol molecules do not pack as efficiently as oil molecules. This property of molecules makes alcohol less dense than oil.

Page No 270:

Question 2:

Density is defined as mass per unit volume. It tells how closely packed are the molecules inside an object. When molecules are tightly packed, we say that the object is dense; when molecules are far apart, we say that the object is light.
The density of a liquid depends on the mass of the molecules that make up the liquid and the closeness of the molecules of the liquid. It is not always true that the molecules of a dense liquid are heavier than the molecules of a lighter liquid.
For example, alcohol is less dense than oil. Alcohol molecules are mostly carbon and hydrogen atoms, so they are similar to oil. But they also contain an oxygen atom, which makes them a little heavy. For this reason, you might think that alcohol is denser than oil. But because of their shape and size, alcohol molecules do not pack as efficiently as oil molecules. This property of molecules makes alcohol less dense than oil.

Answer:

We know that pressure is the application of force over a particular area. In mathematical terms, pressure is equal to force divided by area; that is, with more force comes more pressure and with more area comes less pressure. An iron rod has more surface area than the pointed tip of a needle. That is why the pointed needle exerts more pressure than the iron rod (with the same force) when pressed against our skin.

Page No 270:

Question 3:

We know that pressure is the application of force over a particular area. In mathematical terms, pressure is equal to force divided by area; that is, with more force comes more pressure and with more area comes less pressure. An iron rod has more surface area than the pointed tip of a needle. That is why the pointed needle exerts more pressure than the iron rod (with the same force) when pressed against our skin.

Answer:

In case of an incompressible liquid, the density is independent of the variations in pressure and always remains constant. But it is not so in case of a compressible liquid. Thus, the given equation will not be strictly valid for a compressible liquid.

Page No 270:

Question 4:

In case of an incompressible liquid, the density is independent of the variations in pressure and always remains constant. But it is not so in case of a compressible liquid. Thus, the given equation will not be strictly valid for a compressible liquid.

Answer:

Using the equation PoP = ρogz, we get:
P = Po − ρogz
The pressure calculated by using this equation will be more than the actual pressure because density at a height of 10 km above Madras will be less than ρo.
Yes, the answer will change if we also consider the variation in g. Because g decreases with height, it will have the same effect on pressure as that of density.

Page No 270:

Question 5:

Using the equation PoP = ρogz, we get:
P = Po − ρogz
The pressure calculated by using this equation will be more than the actual pressure because density at a height of 10 km above Madras will be less than ρo.
Yes, the answer will change if we also consider the variation in g. Because g decreases with height, it will have the same effect on pressure as that of density.

Answer:

Yes, the normal to the free surface of the liquid passes through the centre of the Earth. Because of the gravitational force, the free surface of the liquid takes the shape of the surface of the Earth. Also, because the gravitational force is directed towards the centre of the Earth, the normal to the free surface also passes through the centre of the Earth (in all cases).

Page No 270:

Question 6:

Yes, the normal to the free surface of the liquid passes through the centre of the Earth. Because of the gravitational force, the free surface of the liquid takes the shape of the surface of the Earth. Also, because the gravitational force is directed towards the centre of the Earth, the normal to the free surface also passes through the centre of the Earth (in all cases).

Answer:

The length of the mercury column will be more than 76 cm. The pressure depends on the height of the highest point of the mercury from the ground and not on the length of the liquid column. 

Let:l=Length of the mercury columnθ=Angle at which the tube is inclined with the verticalGiven:h=76 cmlcosθ=hor, l=hcosθl>h
Or,
l > 76 cm

Page No 270:

Question 7:

The length of the mercury column will be more than 76 cm. The pressure depends on the height of the highest point of the mercury from the ground and not on the length of the liquid column. 

Let:l=Length of the mercury columnθ=Angle at which the tube is inclined with the verticalGiven:h=76 cmlcosθ=hor, l=hcosθl>h
Or,
l > 76 cm

Answer:

No, mercury cannot be pulled up into the pump by this process. The level up to which mercury can rise is 76 cm (to maintain equal pressure at points A and B).

Page No 270:

Question 8:

No, mercury cannot be pulled up into the pump by this process. The level up to which mercury can rise is 76 cm (to maintain equal pressure at points A and B).

Answer:

Pressure at point A is 76 cm of mercury. Therefore, mercury will rise to full length of the tube, i.e., 1 m, to maintain equal pressure at points A and B. Inside the satellite, geffective=0, so the pressure due to height of the mercury column will be zero.

Page No 270:

Question 9:

Pressure at point A is 76 cm of mercury. Therefore, mercury will rise to full length of the tube, i.e., 1 m, to maintain equal pressure at points A and B. Inside the satellite, geffective=0, so the pressure due to height of the mercury column will be zero.

Answer:

Two pressures are acting upon point P:
(1) Pressure due to mercury level above point P equals to P1 (say)
(2) Atmospheric pressure = P0 (inwards)
And,
P0> P1
As the inward pressure is more, the mercury will not come out of the hole.



Page No 271:

Question 10:

Two pressures are acting upon point P:
(1) Pressure due to mercury level above point P equals to P1 (say)
(2) Atmospheric pressure = P0 (inwards)
And,
P0> P1
As the inward pressure is more, the mercury will not come out of the hole.

Answer:

Archimedes' principle is not valid in case of an elevator accelerating upwards, but it is valid for a car accelerating on a level road.
According to Archimedes' principle,
Buoyant force, B = Weight of the substituted liquid
Or,
B = mg

The above principle is satisfied in case of a car accelerating on a level road.
In case of an elevator, the buoyant force will be as below:
B = mg + ma  (If the elevator is going upwards with an acceleration a)
Thus, Archimedes' principle is not valid in this case.

Page No 271:

Question 11:

Archimedes' principle is not valid in case of an elevator accelerating upwards, but it is valid for a car accelerating on a level road.
According to Archimedes' principle,
Buoyant force, B = Weight of the substituted liquid
Or,
B = mg

The above principle is satisfied in case of a car accelerating on a level road.
In case of an elevator, the buoyant force will be as below:
B = mg + ma  (If the elevator is going upwards with an acceleration a)
Thus, Archimedes' principle is not valid in this case.

Answer:

Whether an object sinks or floats in a liquid depends upon the density of the two. We know that sea water has dissolved salts in it, which increase its density. So, sea water exerts more buoyancy force (in the upward direction) on the swimmer than that exerted by fresh water. This helps the person to swim easily in sea water compared to fresh water.

Page No 271:

Question 12:

Whether an object sinks or floats in a liquid depends upon the density of the two. We know that sea water has dissolved salts in it, which increase its density. So, sea water exerts more buoyancy force (in the upward direction) on the swimmer than that exerted by fresh water. This helps the person to swim easily in sea water compared to fresh water.

Answer:

The water of mass equal to the mass of the ice cube will take less volume compared to the ice cube. The water will not overflow when the ice melts because the ice will displace the space it would take if it were in a liquid state.

Page No 271:

Question 13:

The water of mass equal to the mass of the ice cube will take less volume compared to the ice cube. The water will not overflow when the ice melts because the ice will displace the space it would take if it were in a liquid state.

Answer:

Some rocks should be added to increase the force acting in the downward direction. It will help the boat to pass under the bridge. If some rocks are removed, the upthrust of water on the boat will be greater than the weight of the boat. So, the boat will rise in water and will fail to pass under the bridge.

Page No 271:

Question 14:

Some rocks should be added to increase the force acting in the downward direction. It will help the boat to pass under the bridge. If some rocks are removed, the upthrust of water on the boat will be greater than the weight of the boat. So, the boat will rise in water and will fail to pass under the bridge.

Answer:

Let a be the area of cross section and v be the velocity of water.
According to the equation of continuity,
av = Constant
or, v α 1a
It means the larger the area of cross section, the smaller will be the velocity of liquid and vice versa.
Thus, as the water comes out of the vertical pipe, its velocity increases and area of cross section decreases.

Page No 271:

Question 15:

Let a be the area of cross section and v be the velocity of water.
According to the equation of continuity,
av = Constant
or, v α 1a
It means the larger the area of cross section, the smaller will be the velocity of liquid and vice versa.
Thus, as the water comes out of the vertical pipe, its velocity increases and area of cross section decreases.

Answer:

According to the equation of continuity, if the exit hole of the pipe is partially closed, the water stream comes out with more velocity due to decrease in area. This results in the water stream going to a larger distance.

Page No 271:

Question 16:

According to the equation of continuity, if the exit hole of the pipe is partially closed, the water stream comes out with more velocity due to decrease in area. This results in the water stream going to a larger distance.

Answer:

This can be explained through Bernoulli's principle, which states that the higher the air speed, the lower the pressure in that area. Because the air inside the car does not move, the pressure in the car is atmospheric. Because air moves outside the car (directly above it), the pressure is low. The canvas top of the Gipsy car is pushed upwards because the pressure inside the car is greater than the pressure directly above the car.

Page No 271:

Question 1:

This can be explained through Bernoulli's principle, which states that the higher the air speed, the lower the pressure in that area. Because the air inside the car does not move, the pressure in the car is atmospheric. Because air moves outside the car (directly above it), the pressure is low. The canvas top of the Gipsy car is pushed upwards because the pressure inside the car is greater than the pressure directly above the car.

Answer:

(b) the forces between the molecules is stronger in solids than in liquids

The forces between the particles of a solid are stronger than those between the particles of a liquid, so the particles cannot move freely but can only vibrate. Thus, a solid has stable, definite shape and volume. A solid can only change its shape by force (when broken or cut), whereas a liquid can easily change its shape because of weak inter-particle forces.

Page No 271:

Question 2:

(b) the forces between the molecules is stronger in solids than in liquids

The forces between the particles of a solid are stronger than those between the particles of a liquid, so the particles cannot move freely but can only vibrate. Thus, a solid has stable, definite shape and volume. A solid can only change its shape by force (when broken or cut), whereas a liquid can easily change its shape because of weak inter-particle forces.

Answer:

(b) the first is valid but not the second

For a point inside the elevator, pressure can be defined as P=lims0FS. It is independent of the acceleration of the elevator.

The modified form of the second equation, which will be valid in the given case, is given by
P1-P2=ρ(g+a0) z
Here, acceleration a0(say) due to elevator accelerating upwards is also taken into account.

Page No 271:

Question 3:

(b) the first is valid but not the second

For a point inside the elevator, pressure can be defined as P=lims0FS. It is independent of the acceleration of the elevator.

The modified form of the second equation, which will be valid in the given case, is given by
P1-P2=ρ(g+a0) z
Here, acceleration a0(say) due to elevator accelerating upwards is also taken into account.

Answer:

(c) maximum in vessel C

Here, the height of the liquid column is maximum in vessel C. Thus, the force on the base of vessel C, i.e., F=P0+hρg where P0 is atmospheric pressure, is maximum.

Page No 271:

Question 4:

(c) maximum in vessel C

Here, the height of the liquid column is maximum in vessel C. Thus, the force on the base of vessel C, i.e., F=P0+hρg where P0 is atmospheric pressure, is maximum.

Answer:

(d) equal in all the vessels

The force on the base is given by
F=hρg×AF=(hAρ)gF=(Volume×Density)×gF=mg
In the question, the masses are equal. So, the force on the base is the same in all cases.

Page No 271:

Question 5:

(d) equal in all the vessels

The force on the base is given by
F=hρg×AF=(hAρ)gF=(Volume×Density)×gF=mg
In the question, the masses are equal. So, the force on the base is the same in all cases.

Answer:

(d) zero

At both points A and B, pressure is equal to atmospheric pressure.  

Thus, we have:PA=PB=PatmPB-PA=0

Page No 271:

Question 6:

(d) zero

At both points A and B, pressure is equal to atmospheric pressure.  

Thus, we have:PA=PB=PatmPB-PA=0

Answer:

(b) decrease

As the air inside the jar is pumped out, the air pressure decreases. Thus, the pressure in the liquid near the bottom of the beaker decreases.

Page No 271:

Question 7:

(b) decrease

As the air inside the jar is pumped out, the air pressure decreases. Thus, the pressure in the liquid near the bottom of the beaker decreases.

Answer:

(b) the elevator only

The two points in the same horizontal line will not have equal pressure if the liquid is accelerated horizontally. There should be vertical acceleration.

Page No 271:

Question 8:

(b) the elevator only

The two points in the same horizontal line will not have equal pressure if the liquid is accelerated horizontally. There should be vertical acceleration.

Answer:

(a) P1 = 0, P2 = atmospheric pressure

The upper part of the tube contains vacuum as the mercury goes down and no air is allowed in. Thus, the pressure at the upper end, i.e., at the surface of mercury in a barometer tube is zero (P1= 0). However, the pressure at the surface of mercury in the cup or any another point at the same horizontal plane is equal to the atmospheric pressure.

Page No 271:

Question 9:

(a) P1 = 0, P2 = atmospheric pressure

The upper part of the tube contains vacuum as the mercury goes down and no air is allowed in. Thus, the pressure at the upper end, i.e., at the surface of mercury in a barometer tube is zero (P1= 0). However, the pressure at the surface of mercury in the cup or any another point at the same horizontal plane is equal to the atmospheric pressure.

Answer:

(c) < 76 cm

If the elevator goes up at an increasing speed, then the effective value of g increases.
We know:
P=ρgh
So, h will have a lesser value for the same value of P if g increases.



Page No 272:

Question 10:

(c) < 76 cm

If the elevator goes up at an increasing speed, then the effective value of g increases.
We know:
P=ρgh
So, h will have a lesser value for the same value of P if g increases.

Answer:

(c) > 76 cm

When the elevator is going upwards with acceleration a, the effective acceleration is a' = (g + a).
Thus, pressure is given by
P=hρ(g+a) 
Air pressure in the elevator = P=h'ρg
Because the pressure is the same, h' > h.
∴ Air pressure > 76 cm

Page No 272:

Question 11:

(c) > 76 cm

When the elevator is going upwards with acceleration a, the effective acceleration is a' = (g + a).
Thus, pressure is given by
P=hρ(g+a) 
Air pressure in the elevator = P=h'ρg
Because the pressure is the same, h' > h.
∴ Air pressure > 76 cm

Answer:

(d) < 76 cm

Because of the trapped air, the pressure at the upper end of the mercury column inside the tube is not zero.
In other words, P0>0.
Using this relation, we get:
Patm=P0+ρghHere,ρ=Density of mercuryh=Height of the mercury columnP0>0And,Patm>ρgh76 cm of Hg>ρghor, h<76 cm

Page No 272:

Question 12:

(d) < 76 cm

Because of the trapped air, the pressure at the upper end of the mercury column inside the tube is not zero.
In other words, P0>0.
Using this relation, we get:
Patm=P0+ρghHere,ρ=Density of mercuryh=Height of the mercury columnP0>0And,Patm>ρgh76 cm of Hg>ρghor, h<76 cm

Answer:

(c) 44 N

Upthrust exerted by the water on the block = Change in the reading of the spring balance
                                                                     = (20 − 16) N = 4 N
Downthrust = 4 N
Actual weight of the beaker containing water = 40 N
∴ Effective weight = (40 + 4) N = 44 N

Page No 272:

Question 13:

(c) 44 N

Upthrust exerted by the water on the block = Change in the reading of the spring balance
                                                                     = (20 − 16) N = 4 N
Downthrust = 4 N
Actual weight of the beaker containing water = 40 N
∴ Effective weight = (40 + 4) N = 44 N

Answer:

(c) same part in the water

When more air is pushed into the bottle from the pump, the pressure of air increases on the wood as well as on the water surface with the same amount. So, the level of water and wood does not change. Thus, the piece of wood floats with the same part in the water.

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Question 14:

(c) same part in the water

When more air is pushed into the bottle from the pump, the pressure of air increases on the wood as well as on the water surface with the same amount. So, the level of water and wood does not change. Thus, the piece of wood floats with the same part in the water.

Answer:

(c) will remain the same

In the absence of water, the force acting on the bottom of the vessel is due to the air and the cube. Now, when water is filled in the vessel, the force due to the water and the cube is greater. The extra force is balanced by the buoyant force acting on the cube in the upward direction.

Page No 272:

Question 15:

(c) will remain the same

In the absence of water, the force acting on the bottom of the vessel is due to the air and the cube. Now, when water is filled in the vessel, the force due to the water and the cube is greater. The extra force is balanced by the buoyant force acting on the cube in the upward direction.

Answer:

(a) P1 = P2 = P3

If the fluid is in equilibrium, then the pressure is the same at all points in the same horizontal level.

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Question 16:

(a) P1 = P2 = P3

If the fluid is in equilibrium, then the pressure is the same at all points in the same horizontal level.

Answer:

(c) passes through a point to the left of the centre

When the box is accelerated towards right, the water in the box experiences a pseudo force (ma) towards left, where m is the mass of water. So, the resultant normal force by the water on the top of the box passes through a point to the left of the centre.

Page No 272:

Question 17:

(c) passes through a point to the left of the centre

When the box is accelerated towards right, the water in the box experiences a pseudo force (ma) towards left, where m is the mass of water. So, the resultant normal force by the water on the top of the box passes through a point to the left of the centre.

Answer:

(b) F1 > F2

When the box is accelerated towards right, the water in the box experiences a pseudo force (ma) towards left, where m is the mass of water. So, the force F1exerted by the water on the the left wall of the box is greater.

Page No 272:

Question 18:

(b) F1 > F2

When the box is accelerated towards right, the water in the box experiences a pseudo force (ma) towards left, where m is the mass of water. So, the force F1exerted by the water on the the left wall of the box is greater.

Answer:

(d) each case

This happens in accordance with the equation of continuity.
As the area of the cross section of cylindrical tube AB is constant, the velocity of water will also be the same. The equation is derived from the principle of conservation of mass and it is true for every case, i.e., when the tube is either horizontal or vertical.

Page No 272:

Question 19:

(d) each case

This happens in accordance with the equation of continuity.
As the area of the cross section of cylindrical tube AB is constant, the velocity of water will also be the same. The equation is derived from the principle of conservation of mass and it is true for every case, i.e., when the tube is either horizontal or vertical.

Answer:

(c) energy

The principle behind the Bernoulli theorem is the law of conservation of energy. It states that energy can be neither created nor destroyed; it merely changes from one form to another. 

Page No 272:

Question 20:

(c) energy

The principle behind the Bernoulli theorem is the law of conservation of energy. It states that energy can be neither created nor destroyed; it merely changes from one form to another. 

Answer:

(d) PA = PB  because  the cross-sectional areas at A and B are equal.

According to Bernoulli's theorem, pressures at points A and B of the horizontal tube will be equal if water has the same velocity at these points.
Also, according to the equation of continuity, velocity at points A and B will be equal only if the cross-sectional areas at A and B are equal.
So, PA = PB only if the cross-sectional areas at A and B are equal.

Page No 272:

Question 21:

(d) PA = PB  because  the cross-sectional areas at A and B are equal.

According to Bernoulli's theorem, pressures at points A and B of the horizontal tube will be equal if water has the same velocity at these points.
Also, according to the equation of continuity, velocity at points A and B will be equal only if the cross-sectional areas at A and B are equal.
So, PA = PB only if the cross-sectional areas at A and B are equal.

Answer:

(a) v1 = v2

The velocity of efflux does not depend on the density of the liquid. It only depends on the height h (given same in the question) and acceleration due to gravity g (constant value here).

v1=v2=v=2gh

Page No 272:

Question 22:

(a) v1 = v2

The velocity of efflux does not depend on the density of the liquid. It only depends on the height h (given same in the question) and acceleration due to gravity g (constant value here).

v1=v2=v=2gh

Answer:

(c) The water level will rise to a height v2/2g and then stop.

From the principle of continuity and Bernoulli's equation, ​we have:
v2=2ghh=v22g

So, h is the maximum height up to which the water level will rise if the water is ejected at a speed v.

Page No 272:

Question 1:

(c) The water level will rise to a height v2/2g and then stop.

From the principle of continuity and Bernoulli's equation, ​we have:
v2=2ghh=v22g

So, h is the maximum height up to which the water level will rise if the water is ejected at a speed v.

Answer:

(a) The solid exerts a force equal to its weight on the liquid.
(b) The liquid exerts a force of buoyancy on the solid which is equal to the weight of the solid.
(c) The weight of the displaced liquid equals the weight of the solid.

Force exerted by any solid on a liquid = F = mg = W = Weight of the solid 
According to Archimedes' principle, any object, wholly or partially immersed in a fluid, is buoyed up by a force equal to the weight of the fluid displaced by the object.
Also, any floating object displaces its own weight of fluid. Thus, we can say that the weight of the object is equal to the weight of the fluid displaced.



Page No 273:

Question 1:

(a) The solid exerts a force equal to its weight on the liquid.
(b) The liquid exerts a force of buoyancy on the solid which is equal to the weight of the solid.
(c) The weight of the displaced liquid equals the weight of the solid.

Force exerted by any solid on a liquid = F = mg = W = Weight of the solid 
According to Archimedes' principle, any object, wholly or partially immersed in a fluid, is buoyed up by a force equal to the weight of the fluid displaced by the object.
Also, any floating object displaces its own weight of fluid. Thus, we can say that the weight of the object is equal to the weight of the fluid displaced.

Answer:

Given:
Height of the water tank above the tap level, h = 4 m
Acceleration due to gravity, g = 10 m/s2
Density of water, ρ = 103 kg/m3
When the tap is closed, the pressure of the water in the tap is
P = hρg
On substituting the respective values in the formula, we get:
P = 4 × 103 × 10
   = 40,000 N/m2

It is necessary to specify that the tap is closed because if the tap is open, then the pressure gradually decreases as h decreases and also because the pressure in the tap is atmospheric.

Page No 273:

Question 2:

Given:
Height of the water tank above the tap level, h = 4 m
Acceleration due to gravity, g = 10 m/s2
Density of water, ρ = 103 kg/m3
When the tap is closed, the pressure of the water in the tap is
P = hρg
On substituting the respective values in the formula, we get:
P = 4 × 103 × 10
   = 40,000 N/m2

It is necessary to specify that the tap is closed because if the tap is open, then the pressure gradually decreases as h decreases and also because the pressure in the tap is atmospheric.

Answer:

(a) Given:
Height of the first arm, h1 = 8 cm
Height of the second arm, h2 = 2 cm
Density of mercury, ρHg = 13.6 gm/cc
Atmospheric pressure, pa = 1.01 × 105 N/m2 = 1.01 × 106 dyn/cm2
Now,
Let pg be the pressure of the gas.
If we consider both limbs, then the pressure at the bottom of the tube will be the same.



According to the figure, we have:
pg+ρHg×h2×g=pa+ρHg×h1×gpg=pa+ρHg×g(h1-h2)         =1.01×106+13.6×980×(8-2) dyn/cm2         =(1.01×106+13.6×980×6) dyn/cm2         =1.09×105 N/m2

(b) Pressure of the mercury at the bottom of the U-tube:
pHg = pa + ρHg× h1 × g
      =1.01×106+13.6×8×980 =1.12×105 N/m2

Page No 273:

Question 3:

(a) Given:
Height of the first arm, h1 = 8 cm
Height of the second arm, h2 = 2 cm
Density of mercury, ρHg = 13.6 gm/cc
Atmospheric pressure, pa = 1.01 × 105 N/m2 = 1.01 × 106 dyn/cm2
Now,
Let pg be the pressure of the gas.
If we consider both limbs, then the pressure at the bottom of the tube will be the same.



According to the figure, we have:
pg+ρHg×h2×g=pa+ρHg×h1×gpg=pa+ρHg×g(h1-h2)         =1.01×106+13.6×980×(8-2) dyn/cm2         =(1.01×106+13.6×980×6) dyn/cm2         =1.09×105 N/m2

(b) Pressure of the mercury at the bottom of the U-tube:
pHg = pa + ρHg× h1 × g
      =1.01×106+13.6×8×980 =1.12×105 N/m2

Answer:

 Given:
Area of the wider tube, A = 900 cm2
Weight of the boy, m = 45 kg
Density of water, ρ = 10kgm−3
Let h be the difference in the levels of water in the tubes and pa be the atmospheric pressure.


As per the figure, we have:
pa+hρg=pa+mgA
hρg=mgAh=mρAh=m1000×A        =451000×900×10-4=12 m=50 cm

Page No 273:

Question 4:

 Given:
Area of the wider tube, A = 900 cm2
Weight of the boy, m = 45 kg
Density of water, ρ = 10kgm−3
Let h be the difference in the levels of water in the tubes and pa be the atmospheric pressure.


As per the figure, we have:
pa+hρg=pa+mgA
hρg=mgAh=mρAh=m1000×A        =451000×900×10-4=12 m=50 cm

Answer:

Given:
Atmospheric pressure, pa=1.0×105 N/m2Density of water, ρW=103 kg/m3Acceleration due to gravity, g=10 m/s2Volume of water, V=500 mL500 g0.5 kg
Area of the top of the glass, A = 20 m2
Height of the glass, h = 20 cm​

(a) Force exerted on the bottom of the glass = Atmospheric force + Force due to cylindrical water column or glass
=pa×A+A×h×ρw×g=Aρa+hρwg=20×10-4105+20×10-2×103×10=204 N

(b) Let F​be the force exerted by the sides of the glass. Now, from the free body diagram of water inside the glass, we can find out the resultant force exerted by the sides of the glass.
Thus, we have:
pa×A+mg=A×h×ρw×g+Fs+pa×Amg=A×h×ρw×g+Fs0.5×1=20×10-4×20×10-2×10-3×10+FsFs=5-4=1 N (upward)

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Question 5:

Given:
Atmospheric pressure, pa=1.0×105 N/m2Density of water, ρW=103 kg/m3Acceleration due to gravity, g=10 m/s2Volume of water, V=500 mL500 g0.5 kg
Area of the top of the glass, A = 20 m2
Height of the glass, h = 20 cm​

(a) Force exerted on the bottom of the glass = Atmospheric force + Force due to cylindrical water column or glass
=pa×A+A×h×ρw×g=Aρa+hρwg=20×10-4105+20×10-2×103×10=204 N

(b) Let F​be the force exerted by the sides of the glass. Now, from the free body diagram of water inside the glass, we can find out the resultant force exerted by the sides of the glass.
Thus, we have:
pa×A+mg=A×h×ρw×g+Fs+pa×Amg=A×h×ρw×g+Fs0.5×1=20×10-4×20×10-2×10-3×10+FsFs=5-4=1 N (upward)

Answer:

When the glass is covered by a jar and the air is pumped out of the jar, atmospheric pressure has no effect on the glass.

(a) Force exerted on the bottom:
(hρwg)×A
=20×10-2×103×1020×10-4=4 Nb mg=h×ρw×g×A+FsFs=5-4=1 N
(c) If we use a glass of different shape with same volume, height and area, then there will not be any change in the answer.

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Question 6:

When the glass is covered by a jar and the air is pumped out of the jar, atmospheric pressure has no effect on the glass.

(a) Force exerted on the bottom:
(hρwg)×A
=20×10-2×103×1020×10-4=4 Nb mg=h×ρw×g×A+FsFs=5-4=1 N
(c) If we use a glass of different shape with same volume, height and area, then there will not be any change in the answer.

Answer:

Case: When water is used in a barometer instead of mercury
Pressure exerted by 76 cm of mercury column, P = 76 × 13.6 × g dyn/cm2
Density of water, ρw = 103 kg/m3
Let h be the height of the water column
P=hρwg                                        76×13.6×g= h×ρw×gh=76×13.61h=1033.6 cm

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Question 2:

Case: When water is used in a barometer instead of mercury
Pressure exerted by 76 cm of mercury column, P = 76 × 13.6 × g dyn/cm2
Density of water, ρw = 103 kg/m3
Let h be the height of the water column
P=hρwg                                        76×13.6×g= h×ρw×gh=76×13.61h=1033.6 cm

Answer:

(a) W2 = W1
(c) W2 < W1 + w

According to the question, the density of air inside and outside the balloon is the same. So, the weight w of air inside the balloon is equal to the weight of displaced air. Thus, the spring balance will not register any difference because the balloon will experience buoyant force equal to w that cancels out the weight of the added air.

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Question 3:

(a) W2 = W1
(c) W2 < W1 + w

According to the question, the density of air inside and outside the balloon is the same. So, the weight w of air inside the balloon is equal to the weight of displaced air. Thus, the spring balance will not register any difference because the balloon will experience buoyant force equal to w that cancels out the weight of the added air.

Answer:

(c) decrease if it is taken partially out of the liquid
(d) be in the vertically upward direction.

The force exerted by the liquid on the solid is the vertically upward force (buoyant force) that opposes the weight of the immersed solid.​ As more and more volume of the solid is immersed in the liquid, the buoyant force increases.
Buoyant force depends on the weight of the displaced liquid. So, maximum upward buoyant force acts on the solid when it is completely immersed in the liquid. It decreases if the solid is taken partially out of the liquid. Once the object is immersed in the liquid, then pushing it further in the liquid does not increase the buoyant force.

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Question 4:

(c) decrease if it is taken partially out of the liquid
(d) be in the vertically upward direction.

The force exerted by the liquid on the solid is the vertically upward force (buoyant force) that opposes the weight of the immersed solid.​ As more and more volume of the solid is immersed in the liquid, the buoyant force increases.
Buoyant force depends on the weight of the displaced liquid. So, maximum upward buoyant force acts on the solid when it is completely immersed in the liquid. It decreases if the solid is taken partially out of the liquid. Once the object is immersed in the liquid, then pushing it further in the liquid does not increase the buoyant force.

Answer:

(b) The pressure at the surface of the water will decrease.
(c) The force by the water on the bottom of the vessel will decrease.

As air is pumped out of the hole, there is a decrease in the atmospheric pressure above the water surface in the vessel. Due to this, pressure at the surface of the water decreases. Thus, the force exerted by the water on the bottom of the vessel also decreases.

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Question 5:

(b) The pressure at the surface of the water will decrease.
(c) The force by the water on the bottom of the vessel will decrease.

As air is pumped out of the hole, there is a decrease in the atmospheric pressure above the water surface in the vessel. Due to this, pressure at the surface of the water decreases. Thus, the force exerted by the water on the bottom of the vessel also decreases.

Answer:

(c) the kinetic energies of all the particles arriving at a given point are the same
(d) the momenta of all the particles arriving at a given point are the same

In a streamline flow, every fluid particle arriving at a given point has the same velocity v. Thus, the kinetic energies (12mv2 ) and momenta (mv) of all particles arriving at a given point are the same, as the mass of a particle is constant.

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Question 6:

(c) the kinetic energies of all the particles arriving at a given point are the same
(d) the momenta of all the particles arriving at a given point are the same

In a streamline flow, every fluid particle arriving at a given point has the same velocity v. Thus, the kinetic energies (12mv2 ) and momenta (mv) of all particles arriving at a given point are the same, as the mass of a particle is constant.

Answer:

(a) Flow in both the tubes are steady.
(b) Flow in both the tubes are turbulent.
(c) Flow is steady in A but turbulent in B.

In a steady flow, the velocity of liquid particles reaching a particular point is the same at all times, but if the liquid is pushed in the tube at a rapid rate, i.e., if the flow rate increases, then the flow may become turbulent. Here, the flow rate is the volume of fluid per unit time per unit area flowing past a point.
Large volume of water passes through tube B compared to tube A. Thus, the flow rate is greater in tube B than in tube A. So, if the flow is turbulent in A, then the flow in B cannot be steady. Therefore, the first three options are possible.

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Question 7:

(a) Flow in both the tubes are steady.
(b) Flow in both the tubes are turbulent.
(c) Flow is steady in A but turbulent in B.

In a steady flow, the velocity of liquid particles reaching a particular point is the same at all times, but if the liquid is pushed in the tube at a rapid rate, i.e., if the flow rate increases, then the flow may become turbulent. Here, the flow rate is the volume of fluid per unit time per unit area flowing past a point.
Large volume of water passes through tube B compared to tube A. Thus, the flow rate is greater in tube B than in tube A. So, if the flow is turbulent in A, then the flow in B cannot be steady. Therefore, the first three options are possible.

Answer:

(c) The pressures are equal if the tube has a uniform cross section.
(d) The pressures may be equal even if the tube has a nonuniform cross section.

In streamline flow in a tube, every particle of the liquid follows the path of its preceding particle and the velocity of all particles crossing a particular point is the same. However, the velocity of the particles at different points in their path may not necessarily be the same. Thus, by applying Bernoulli's theorem and equation of continuity, we can say that if the tube has a uniform cross section, the pressures will be equal; and if the tube has a non-uniform cross section, the pressures may or may not be equal.

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Question 8:

(c) The pressures are equal if the tube has a uniform cross section.
(d) The pressures may be equal even if the tube has a nonuniform cross section.

In streamline flow in a tube, every particle of the liquid follows the path of its preceding particle and the velocity of all particles crossing a particular point is the same. However, the velocity of the particles at different points in their path may not necessarily be the same. Thus, by applying Bernoulli's theorem and equation of continuity, we can say that if the tube has a uniform cross section, the pressures will be equal; and if the tube has a non-uniform cross section, the pressures may or may not be equal.

Answer:

(a) area of the hole
(b) density of the liquid

The emergent speed v of the liquid flowing from the hole in the bottom of the tank is given by
v=2gh
Here, g is acceleration due to gravity and h is height of the liquid from the hole.
Thus, it is clear from the above relation that the speed of the liquid depends on the height of the liquid from the hole and on the acceleration due to gravity. It does not depend on the area of the hole and the density of the liquid.



Page No 274:

Question 7:

(a) area of the hole
(b) density of the liquid

The emergent speed v of the liquid flowing from the hole in the bottom of the tank is given by
v=2gh
Here, g is acceleration due to gravity and h is height of the liquid from the hole.
Thus, it is clear from the above relation that the speed of the liquid depends on the height of the liquid from the hole and on the acceleration due to gravity. It does not depend on the area of the hole and the density of the liquid.

Answer:

Given:
Depth of the stone from the water surface, h = 500 m
Area of the plane surface of the large stone, A = 2 m2 
Density of water, ρw = 103 kgm−3
​Force (F) is given by
 F=P×A=hρw×gA                P=PressureF=500×103×10×2       =107 N/m2
The force does not depend on the orientation of the rock when the surface area of the stone remains the same.

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Question 8:

Given:
Depth of the stone from the water surface, h = 500 m
Area of the plane surface of the large stone, A = 2 m2 
Density of water, ρw = 103 kgm−3
​Force (F) is given by
 F=P×A=hρw×gA                P=PressureF=500×103×10×2       =107 N/m2
The force does not depend on the orientation of the rock when the surface area of the stone remains the same.

Answer:

Dimensions of the rectangular tank:
Length, l = 3 m
Breadth, b = 2 m
Height, h = 1 m
Area of the bottom surface of the tank, A = 2×3=6 m2
Density of water, ρw = 1000 kgm−3

(a) Total force exerted by water on the bottom surface of the tank:
        f=Ahρwg       =6×1×103×10       =6×104=60,000 N

(b) Force exerted by water on the strip of width δx:
     df=p×A=xρwg×A   =x×103×10×2×δx   =20,000xδx N

(c) Inside the tank, the water force acts in every direction due to adhesion. Therefore, torque is given by
     di=F×r=20,000×δx(1-x) N

(d) Total force exerted by water on the side about the bottom edge F:
         F=0120,000 xδx F=20,000x2201        =10,000 N
(e) Torque by the water on the side τ:
      τ=20,000×01xδx1-x=20,000x22-x3301=20,000×12-13=20,0006 Nm  =100003 Nm

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Question 9:

Dimensions of the rectangular tank:
Length, l = 3 m
Breadth, b = 2 m
Height, h = 1 m
Area of the bottom surface of the tank, A = 2×3=6 m2
Density of water, ρw = 1000 kgm−3

(a) Total force exerted by water on the bottom surface of the tank:
        f=Ahρwg       =6×1×103×10       =6×104=60,000 N

(b) Force exerted by water on the strip of width δx:
     df=p×A=xρwg×A   =x×103×10×2×δx   =20,000xδx N

(c) Inside the tank, the water force acts in every direction due to adhesion. Therefore, torque is given by
     di=F×r=20,000×δx(1-x) N

(d) Total force exerted by water on the side about the bottom edge F:
         F=0120,000 xδx F=20,000x2201        =10,000 N
(e) Torque by the water on the side τ:
      τ=20,000×01xδx1-x=20,000x22-x3301=20,000×12-13=20,0006 Nm  =100003 Nm

Answer:

Given:
Weight of the ornament in air, m1a = 36 gm
Weight of the ornament in water, m2w = 34 gm
Specific gravity (density) of gold, ρAu = 19.3 gm/cc
Specific gravity (density) of copper, ρCu = 8.9 gm/cc
Using Archimedes' principle, we get:
Loss of weight = Weight of displaced water
                        = 36 − 34
                        = 2 gm
Let mAu and mCu be the masses of gold and copper, respectively.
Now, the mass of the ornament mc will be
mc = mAu + mCu= 36 gm       ...(i)
Now, let the volume of the ornament in cm be V.
Thus, we have:V×ρw×g=2×g(vAu+vCu)×ρw×g=2×g     ρw=Density of watermAuρAu+mCuρCuρw×g=2×gmAu19.3+mCu8.9×1=2 8.9 mAu+19.3 mCu=2×19.3×8.9                                        =343.54     ...(ii)From (i) and (ii), we get:8.9 (mAu+mCu)=8.9×368.9 mAu+8.9mCu=320.40    ...(iii)From (ii) & (iii), we get:10.4 mCu=23.14mCu=2.225 gm

Therefore, the amount of copper present in the ornament is 2.2 gm.

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Question 10:

Given:
Weight of the ornament in air, m1a = 36 gm
Weight of the ornament in water, m2w = 34 gm
Specific gravity (density) of gold, ρAu = 19.3 gm/cc
Specific gravity (density) of copper, ρCu = 8.9 gm/cc
Using Archimedes' principle, we get:
Loss of weight = Weight of displaced water
                        = 36 − 34
                        = 2 gm
Let mAu and mCu be the masses of gold and copper, respectively.
Now, the mass of the ornament mc will be
mc = mAu + mCu= 36 gm       ...(i)
Now, let the volume of the ornament in cm be V.
Thus, we have:V×ρw×g=2×g(vAu+vCu)×ρw×g=2×g     ρw=Density of watermAuρAu+mCuρCuρw×g=2×gmAu19.3+mCu8.9×1=2 8.9 mAu+19.3 mCu=2×19.3×8.9                                        =343.54     ...(ii)From (i) and (ii), we get:8.9 (mAu+mCu)=8.9×368.9 mAu+8.9mCu=320.40    ...(iii)From (ii) & (iii), we get:10.4 mCu=23.14mCu=2.225 gm

Therefore, the amount of copper present in the ornament is 2.2 gm.

Answer:

Given:
Mass of copper, mAu = 36 gm
Now,mAuρAu+Vcρw×g=2×gHere, Vc=Volume of cavityρAu= Density of goldρw=Density of water On substituting the respective values, we get:3619.3+Vc×1=2Vc=2-3619.3        =36-619.3        =0.112 cm3

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Question 11:

Given:
Mass of copper, mAu = 36 gm
Now,mAuρAu+Vcρw×g=2×gHere, Vc=Volume of cavityρAu= Density of goldρw=Density of water On substituting the respective values, we get:3619.3+Vc×1=2Vc=2-3619.3        =36-619.3        =0.112 cm3

Answer:

Given:
Mass of the metal piece, m =160 gm = 160 × 10−3 kg
Density of the metal piece, ρm = 8000 kg/m3
Density of the water, ρw = 1000 kg/m3
​Let R be the normal reaction and U be the upward thrust.

From the diagram, we have:
mg = U + R
R = mg −wg            [U = wg]
R=mg-mρm×ρw×g
       =160×10-3×10-103×108000=160×10-3×101-18=1.4 N

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Question 12:

Given:
Mass of the metal piece, m =160 gm = 160 × 10−3 kg
Density of the metal piece, ρm = 8000 kg/m3
Density of the water, ρw = 1000 kg/m3
​Let R be the normal reaction and U be the upward thrust.

From the diagram, we have:
mg = U + R
R = mg −wg            [U = wg]
R=mg-mρm×ρw×g
       =160×10-3×10-103×108000=160×10-3×101-18=1.4 N

Answer:

Given:
Mass of the ferryboat, m = 50 kg
Internal volume, V = 1 m3 = External volume of the ferryboat
Density of water, ρw = 103 kg/m​3

(a) Let V1 be the volume of the boat inside the water. It is equal to the volume of the water displaced in m3.
   As the weight of the boat is balanced by the buoyant force, we have:
   mg=V1×ρw×g50=V1×103V1=5100=0.05 m3

(b) Let V2be the volume of the boat filled with water before water starts coming in from the side.
 mg+V2ρw×g=V×ρw×g         [V is the volume of the water displaced by the boat.]50+V2×103=1×103V2=103-50103         =9501000=0.95 m3
Fraction of the boat's volume filled with water=1920

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Question 13:

Given:
Mass of the ferryboat, m = 50 kg
Internal volume, V = 1 m3 = External volume of the ferryboat
Density of water, ρw = 103 kg/m​3

(a) Let V1 be the volume of the boat inside the water. It is equal to the volume of the water displaced in m3.
   As the weight of the boat is balanced by the buoyant force, we have:
   mg=V1×ρw×g50=V1×103V1=5100=0.05 m3

(b) Let V2be the volume of the boat filled with water before water starts coming in from the side.
 mg+V2ρw×g=V×ρw×g         [V is the volume of the water displaced by the boat.]50+V2×103=1×103V2=103-50103         =9501000=0.95 m3
Fraction of the boat's volume filled with water=1920

Answer:

Given:
Specific gravity of ice, ρice = 0.9 gm/cc
Weight of the metal piece, m = 5 kg
Density of water, ρw = 103 kg/m3​
Let x be the minimum edge of the ice block in cm.
We have:
mg + Wice = U
Here,
U = Upward thrust
Wice = Weight of the ice
Thus, we have:0.5×g+x3×ρice×g=x3×ρw×g      Volume of the liquid displaced=x30.5×103+x3×(0.9)=x3×1x3×(0.1)=(0.5)×103x3=5×103x=17.09 cmx=17 cm

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Question 14:

Given:
Specific gravity of ice, ρice = 0.9 gm/cc
Weight of the metal piece, m = 5 kg
Density of water, ρw = 103 kg/m3​
Let x be the minimum edge of the ice block in cm.
We have:
mg + Wice = U
Here,
U = Upward thrust
Wice = Weight of the ice
Thus, we have:0.5×g+x3×ρice×g=x3×ρw×g      Volume of the liquid displaced=x30.5×103+x3×(0.9)=x3×1x3×(0.1)=(0.5)×103x3=5×103x=17.09 cmx=17 cm

Answer:

Given:
Specific gravity of water, ρW = 1 gm/cc
Specific gravity of ice, ρice = 0.9 gm/cc
Specific gravity of kerosene oil, ρk = 0.8 gm/cc
Now,
V​ice Vk + Vw
Here,
Vk = Volume of ice inside kerosene oil
Vw = Volume of ice inside water
Vice = Volume of ice 
Thus, we have:
Vice×ρice×g=Vk×ρk×g+Vw×ρw×gVk+Vw× ρice=Vk×ρk+Vw×ρw(0.9) Vk+(0.9)Vw=(0.8)Vk+1×Vw(0.1)Vw=0.1 VkVwVk=1.Vw:Vk=1:1

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Question 15:

Given:
Specific gravity of water, ρW = 1 gm/cc
Specific gravity of ice, ρice = 0.9 gm/cc
Specific gravity of kerosene oil, ρk = 0.8 gm/cc
Now,
V​ice Vk + Vw
Here,
Vk = Volume of ice inside kerosene oil
Vw = Volume of ice inside water
Vice = Volume of ice 
Thus, we have:
Vice×ρice×g=Vk×ρk×g+Vw×ρw×gVk+Vw× ρice=Vk×ρk+Vw×ρw(0.9) Vk+(0.9)Vw=(0.8)Vk+1×Vw(0.1)Vw=0.1 VkVwVk=1.Vw:Vk=1:1

Answer:

Given:
Density of iron, ρI = 8000 kg/m3 = 8 gm/u
Density of water, ρw = 1000 kg/m3 = 1 gm/u
Let x be the external edge of iron.
According to Archemedes' principle,
Weight displaced = Upward thrust
w = u


For the given condition, we have:
Weight of the box = Buoyant force
V1ρIg = wg
⇒ (x2 × (0.1) × 6) × 8 = x3 × 1            [Volume of iron = v1 = 6  times the volume of each sheet]
x = 4.8 cm

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Question 16:

Given:
Density of iron, ρI = 8000 kg/m3 = 8 gm/u
Density of water, ρw = 1000 kg/m3 = 1 gm/u
Let x be the external edge of iron.
According to Archemedes' principle,
Weight displaced = Upward thrust
w = u


For the given condition, we have:
Weight of the box = Buoyant force
V1ρIg = wg
⇒ (x2 × (0.1) × 6) × 8 = x3 × 1            [Volume of iron = v1 = 6  times the volume of each sheet]
x = 4.8 cm

Answer:

Given:
Density of wood, ρw = 0.8 gm/cc
Density of lead, ρpb = 11.3 gm/cc
Weight of the cubical wood block, mw  = 200 g


The cubical block floats in water.
Now,
(mw+ mpb) × g = (Vw + Vpb)ρ × g
Here,
ρ = Density of water
Vw = Volume of wood
Vpb= Volume of lead
(mw+mpb)=mwρw+mpbρpbρ(200+mpb)=2000.8+mpb11.3×1mpb-mpb11.3=250-20010.3 mpb11.3=50mpb=50×11.310.3=54.8 gm

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Question 17:

Given:
Density of wood, ρw = 0.8 gm/cc
Density of lead, ρpb = 11.3 gm/cc
Weight of the cubical wood block, mw  = 200 g


The cubical block floats in water.
Now,
(mw+ mpb) × g = (Vw + Vpb)ρ × g
Here,
ρ = Density of water
Vw = Volume of wood
Vpb= Volume of lead
(mw+mpb)=mwρw+mpbρpbρ(200+mpb)=2000.8+mpb11.3×1mpb-mpb11.3=250-20010.3 mpb11.3=50mpb=50×11.310.3=54.8 gm

Answer:

Given:
Mass of wood, mw = 200 g
Specific gravity of wood, ρW = 0.8 gm/cc
Specific gravity of lead, ρPB= 11.3 gm/cc
We know:Mg=wThus, we have:(mw+mpb)g=Vw×ρ×g           [ρ=Density of water]200+mpb=2000.8×1mpb=250-200=50 gm

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Question 18:

Given:
Mass of wood, mw = 200 g
Specific gravity of wood, ρW = 0.8 gm/cc
Specific gravity of lead, ρPB= 11.3 gm/cc
We know:Mg=wThus, we have:(mw+mpb)g=Vw×ρ×g           [ρ=Density of water]200+mpb=2000.8×1mpb=250-200=50 gm

Answer:

Given:
Length of the edge of the metal block, x  = 12 cm
Specific gravity of mercury, ρHg= 13.6 gm/cc
It is given that 15th of the cubical block is inside mercury initially.
Let ρb be the density of the block in gm/cc.
(x)3×ρb×g=(x)2×x5×ρHg×g(12)3×ρb×g=(12)2×125×13.6ρb=13.65 gm/cc
Let y be the height of the water column after the water is poured.
Vb = VHg + Vw = (12)3
Here,
VHg = Volume of the block inside mercury
Vw  = Volume of the block inside water
(Vb×ρb×g)=(VHg×ρHg×g)+(Vw×ρw×g)(VHg+Vw)×13.65=VHg×13.6+Vw×1(12)3×13.65=(12-y)×(12)2×13.6+(y)×(12)2×112×13.65=(12-y)×13.6+(y)12.6y=13.612-125=(13.6)×(9.6)y=(9.6)×(13.6)(12.6)=10.4 cm

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Question 19:

Given:
Length of the edge of the metal block, x  = 12 cm
Specific gravity of mercury, ρHg= 13.6 gm/cc
It is given that 15th of the cubical block is inside mercury initially.
Let ρb be the density of the block in gm/cc.
(x)3×ρb×g=(x)2×x5×ρHg×g(12)3×ρb×g=(12)2×125×13.6ρb=13.65 gm/cc
Let y be the height of the water column after the water is poured.
Vb = VHg + Vw = (12)3
Here,
VHg = Volume of the block inside mercury
Vw  = Volume of the block inside water
(Vb×ρb×g)=(VHg×ρHg×g)+(Vw×ρw×g)(VHg+Vw)×13.65=VHg×13.6+Vw×1(12)3×13.65=(12-y)×(12)2×13.6+(y)×(12)2×112×13.65=(12-y)×13.6+(y)12.6y=13.612-125=(13.6)×(9.6)y=(9.6)×(13.6)(12.6)=10.4 cm

Answer:

Given:
Inner radius of the hollow spherical body, r1 = 6 cm
Outer radius of the hollow spherical body, r2 = 8 cm 
Let the density of the material of the sphere be ρ and the volume of the water displaced by the hollow sphere be V.
If ρw is the density of water, then:
Weight of the liquid displaced=V2(ρw)×gWe know:Upward thrust=Weight of the liquid displaced43πr32-43πr13ρ=1243πr23×ρwr23-r13×ρ=12r23×1(8)3-(6)3×ρ=12(8)3×1ρ=5122×(512-216)       = 5122×296= 0.865 gm/cc =865 kg/m33

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Question 20:

Given:
Inner radius of the hollow spherical body, r1 = 6 cm
Outer radius of the hollow spherical body, r2 = 8 cm 
Let the density of the material of the sphere be ρ and the volume of the water displaced by the hollow sphere be V.
If ρw is the density of water, then:
Weight of the liquid displaced=V2(ρw)×gWe know:Upward thrust=Weight of the liquid displaced43πr32-43πr13ρ=1243πr23×ρwr23-r13×ρ=12r23×1(8)3-(6)3×ρ=12(8)3×1ρ=5122×(512-216)       = 5122×296= 0.865 gm/cc =865 kg/m33

Answer:

Given:
Radius of the sphere, r = 5 cm
Mass of the maximum load, m = 0.1 kg
Let the weight of the sphere be W1 and the weight of the load be W2.
Now,
W1 + W2 = U
Here, U is the upward thrust.
Let V be the volume of the sphere.
Thus, we have:mg+V×ρs×g=v×ρw×gHere,  ρs=Density of the sphere in gm/ccρw=Density of waterOn substituting the respective values in the above equation, we get: (0.1)×103+43×π×(5)3×ρs=43×π×(5)3×1100=43×π×125×(1-ρs)1-ρs=3×1004×π×125=0.19ρs=1-(0.19)         =0.81 gm/cc=0.8 gm/cc

Page No 274:

Question 21:

Given:
Radius of the sphere, r = 5 cm
Mass of the maximum load, m = 0.1 kg
Let the weight of the sphere be W1 and the weight of the load be W2.
Now,
W1 + W2 = U
Here, U is the upward thrust.
Let V be the volume of the sphere.
Thus, we have:mg+V×ρs×g=v×ρw×gHere,  ρs=Density of the sphere in gm/ccρw=Density of waterOn substituting the respective values in the above equation, we get: (0.1)×103+43×π×(5)3×ρs=43×π×(5)3×1100=43×π×125×(1-ρs)1-ρs=3×1004×π×125=0.19ρs=1-(0.19)         =0.81 gm/cc=0.8 gm/cc

Answer:

Given:
Density of iron, ρI= 7800 kgm−3
Density of wood, ρw= 800 kgm−3
Density of air, ρair= 1.293 kgm−3
Net weight of Iron W1:WI=mIg-VIρair×gHere, mI and VI are the mass and volume of the iron, respectively.Now,mI-mIρIρairg=1-17800×1.293×(9.8)Net weight of wood=Ww=mwg-Vw . ρair gHere, mw and Vw are the mass and volume of the wood, respectively.Now,m-mρwρairg=1-1800×1.2939.8WIWw=9.87800-1.29378009.8800-1.293800=7800-1.293800-1.293×878=1.0015

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Question 22:

Given:
Density of iron, ρI= 7800 kgm−3
Density of wood, ρw= 800 kgm−3
Density of air, ρair= 1.293 kgm−3
Net weight of Iron W1:WI=mIg-VIρair×gHere, mI and VI are the mass and volume of the iron, respectively.Now,mI-mIρIρairg=1-17800×1.293×(9.8)Net weight of wood=Ww=mwg-Vw . ρair gHere, mw and Vw are the mass and volume of the wood, respectively.Now,m-mρwρairg=1-1800×1.2939.8WIWw=9.87800-1.29378009.8800-1.293800=7800-1.293800-1.293×878=1.0015

Answer:

Given:
Outer diameter of the cylindrical object, d = 20 cm
∴ Radius, r=d2=10 cm
Mass of the object, m = 2 kg
When the object is depressed into water, the net unbalanced force causes simple harmonic motion.
Let x be the displacement of the block from the equilibrium position.
Now,
Driving force=U=VρwgHere,U is the upward thrust.V is the volume.ρw is the density of water.  Thus, we have:ma=πr2(x)×ρwga=πr2ρw9x2×103T=2πDisplacementAcceleration =2π(x)×2×103πr2ρwg(x) =2π2×103π×(10)2×1×10 =2π2π×10=0.5 s
Therefore, the required time period is 0.5 second.

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Question 23:

Given:
Outer diameter of the cylindrical object, d = 20 cm
∴ Radius, r=d2=10 cm
Mass of the object, m = 2 kg
When the object is depressed into water, the net unbalanced force causes simple harmonic motion.
Let x be the displacement of the block from the equilibrium position.
Now,
Driving force=U=VρwgHere,U is the upward thrust.V is the volume.ρw is the density of water.  Thus, we have:ma=πr2(x)×ρwga=πr2ρw9x2×103T=2πDisplacementAcceleration =2π(x)×2×103πr2ρwg(x) =2π2×103π×(10)2×1×10 =2π2π×10=0.5 s
Therefore, the required time period is 0.5 second.

Answer:

Given:
Diameter of the cylindrical object, d = 10 cm
∴ Radius, r = 5 cm
Height of the object, h = 20 cm
Density of the object, ρb = 8000 kg/m3 = 8 gm/cc
Density of water, ρw = 1000 kg/m3
Spring constant, k =  500 N/m = 500 × 103 dyn/cm

(a) Now,
F + U = mg                   [F = kx]
Here, U is the upward thrust and x is the small displacement from the equilibrium position.
kx + wg = mg
500×103×(x)+πr2×h2×1×1000=πr2×h×ρb×1000500×103×(x)= πr2×h×1000ρb-12=π×(5)2×20×1000ρb-1250x=π×25×2×ρb-12x=π(8-0.5)or, x=π×7.5=23.5 cm

(b) We know that X is the displacement of the block from the equilibrium position.
Now,
Driving force:
F=kX+Vρw×gma=kx+πr2×(X)×ρw×g=(k+πr2×ρw×g)xω2×(X)=k+πr2×ρw×gm×(X)In SHM a=ω2X, time period T is T=2πmk+πr2×ρw×g    =2ππ×25×20×8500+103+π×25×1×1000       =0.935 s



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Question 24:

Given:
Diameter of the cylindrical object, d = 10 cm
∴ Radius, r = 5 cm
Height of the object, h = 20 cm
Density of the object, ρb = 8000 kg/m3 = 8 gm/cc
Density of water, ρw = 1000 kg/m3
Spring constant, k =  500 N/m = 500 × 103 dyn/cm

(a) Now,
F + U = mg                   [F = kx]
Here, U is the upward thrust and x is the small displacement from the equilibrium position.
kx + wg = mg
500×103×(x)+πr2×h2×1×1000=πr2×h×ρb×1000500×103×(x)= πr2×h×1000ρb-12=π×(5)2×20×1000ρb-1250x=π×25×2×ρb-12x=π(8-0.5)or, x=π×7.5=23.5 cm

(b) We know that X is the displacement of the block from the equilibrium position.
Now,
Driving force:
F=kX+Vρw×gma=kx+πr2×(X)×ρw×g=(k+πr2×ρw×g)xω2×(X)=k+πr2×ρw×gm×(X)In SHM a=ω2X, time period T is T=2πmk+πr2×ρw×g    =2ππ×25×20×8500+103+π×25×1×1000       =0.935 s

Answer:

Given:
Mass of the wooden block, m = 5 kg
Density of the block, ρ = 800 kg/m3
Spring constant, k = 50 N/m
Density of water, ρw = 1000 kg/m3
(a) Using the free body diagram, we get:
mg = kx + Vρwg          (Here, wg > mg. So, there will be some elongation.]
(0.5)×(10+50×(x))= 0.5800×103×(10)50x=0.5×10×108-150x=54x=2.5 cm

(b) As the system is inside the water, the unbalance force will be the driving force, which is kx for SHM.
Hence, there will be no change in the buoyant force.
ma=kxa=kx/mw2x=kx/m2pT2=k/mT=2πmk=2π×0.550=π5 s

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Question 25:

Given:
Mass of the wooden block, m = 5 kg
Density of the block, ρ = 800 kg/m3
Spring constant, k = 50 N/m
Density of water, ρw = 1000 kg/m3
(a) Using the free body diagram, we get:
mg = kx + Vρwg          (Here, wg > mg. So, there will be some elongation.]
(0.5)×(10+50×(x))= 0.5800×103×(10)50x=0.5×10×108-150x=54x=2.5 cm

(b) As the system is inside the water, the unbalance force will be the driving force, which is kx for SHM.
Hence, there will be no change in the buoyant force.
ma=kxa=kx/mw2x=kx/m2pT2=k/mT=2πmk=2π×0.550=π5 s

Answer:

Let the length of the edge of the ice block when it just leaves contact with the bottom of the glass be x and the height of water after melting be h.
Given:
Inner diameter of the cylindrical glass = 6 cm
∴ Inner radius, r = 3 cm
Edge of the ice cube = 4 cm
Weight = Upward thurst(x)3×ρice×g=(x)2×h×ρw×gh=(0.9)x
Again, volume of the water left from the melting of the ice is given by
(4)3-(x)3=π×(r)2×h-x2h       [Amount of water=ρ(r2-x2)h] (4)3-(x)3=π×(3)2×h-x2hPutting h=0.9x, we get:(4)3-(x)3=π×(3)2×(0.9)x
On solving the above equation, we get:
x = 2.26 cm

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Question 26:

Let the length of the edge of the ice block when it just leaves contact with the bottom of the glass be x and the height of water after melting be h.
Given:
Inner diameter of the cylindrical glass = 6 cm
∴ Inner radius, r = 3 cm
Edge of the ice cube = 4 cm
Weight = Upward thurst(x)3×ρice×g=(x)2×h×ρw×gh=(0.9)x
Again, volume of the water left from the melting of the ice is given by
(4)3-(x)3=π×(r)2×h-x2h       [Amount of water=ρ(r2-x2)h] (4)3-(x)3=π×(3)2×h-x2hPutting h=0.9x, we get:(4)3-(x)3=π×(3)2×(0.9)x
On solving the above equation, we get:
x = 2.26 cm

Answer:

Let a0 be the acceleration with which U-tube is accelerated horizontally. So, the horizontal part will experience some inertial force.
Also,
pa = Atmospheric pressure
A = Area of cross section
h = Increase in height of the liquid
According to the question,
paA+A×l×ρ×a0=paA+hρg×Ahg=a0lh=a0lg

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Question 27:

Let a0 be the acceleration with which U-tube is accelerated horizontally. So, the horizontal part will experience some inertial force.
Also,
pa = Atmospheric pressure
A = Area of cross section
h = Increase in height of the liquid
According to the question,
paA+A×l×ρ×a0=paA+hρg×Ahg=a0lh=a0lg

Answer:

Given:
Average speed of water in Alaknanda = 20 kmh−1
Average speed of water in Bhagirathi = 16 kmh−1
Width of Bhagirathi = 8 m
Width of Alaknanda = 12 m
Width of Ganga = 16 m
Now,
Volume of water discharged from Alaknanda + Volume of water discharged from Bhagirathi = Volume of water flow in Ganga
Let:
d = Depth of the three rivers
VA × d × 12 + VB × d × 8 = VG × d × 16
Here, VA, VBand VG be the average speeds of water in Alaknanda, Bhagirathi and Ganga, respectively.
Using the equation of continuity, we get:
20×12+16×8=VG×16VG × 16= 368VG=36816=23 km/h

Page No 275:

Question 28:

Given:
Average speed of water in Alaknanda = 20 kmh−1
Average speed of water in Bhagirathi = 16 kmh−1
Width of Bhagirathi = 8 m
Width of Alaknanda = 12 m
Width of Ganga = 16 m
Now,
Volume of water discharged from Alaknanda + Volume of water discharged from Bhagirathi = Volume of water flow in Ganga
Let:
d = Depth of the three rivers
VA × d × 12 + VB × d × 8 = VG × d × 16
Here, VA, VBand VG be the average speeds of water in Alaknanda, Bhagirathi and Ganga, respectively.
Using the equation of continuity, we get:
20×12+16×8=VG×16VG × 16= 368VG=36816=23 km/h

Answer:

(a) Given:
The areas of cross-sections of the tube at A and B are 4 mm2 and 2 mm2, respectively.
1 cc of water enters per second through A.
Let:
ρ = Density of the liquid
PA = Pressure of liquid at A
PB = Pressure of liquid at B

(a)
QAt=1as=DischargeaA×VA=QAGiven: aA=4 mm2=4×10-2 cm2 4×10-2×VA=1cc/s VA=25 m/s(b) aA×VA=aB×VB4×10-2×25=2×10-2×VBVB=50 cm/s

(c) By Bernoulli's equation, we have:
12ρvA2+PA=12ρvB2+PB(PA-PB)=12ρvB2-vA2=12×1×(2500-625)=18752=937.5 dyn/cm2=93.75 N/m2 

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Question 29:

(a) Given:
The areas of cross-sections of the tube at A and B are 4 mm2 and 2 mm2, respectively.
1 cc of water enters per second through A.
Let:
ρ = Density of the liquid
PA = Pressure of liquid at A
PB = Pressure of liquid at B

(a)
QAt=1as=DischargeaA×VA=QAGiven: aA=4 mm2=4×10-2 cm2 4×10-2×VA=1cc/s VA=25 m/s(b) aA×VA=aB×VB4×10-2×25=2×10-2×VBVB=50 cm/s

(c) By Bernoulli's equation, we have:
12ρvA2+PA=12ρvB2+PB(PA-PB)=12ρvB2-vA2=12×1×(2500-625)=18752=937.5 dyn/cm2=93.75 N/m2 

Answer:

Given:
Separation between the cross sections at A and B = 15/16 cm
Speed of water at A, vA = 25 cm/s
Speed of water at B, vB = 50 cm/s
(c) By Bernoulli's equation, we get:
12pvA2+ρghA+PA=12pvB2+ρghB+PBPA-PB=12pvB2-vA2+ρghB-hA        [hA-hB=1516cm]PA-PB=12(2500-625)-1000×1516                   =0

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Question 30:

Given:
Separation between the cross sections at A and B = 15/16 cm
Speed of water at A, vA = 25 cm/s
Speed of water at B, vB = 50 cm/s
(c) By Bernoulli's equation, we get:
12pvA2+ρghA+PA=12pvB2+ρghB+PBPA-PB=12pvB2-vA2+ρghB-hA        [hA-hB=1516cm]PA-PB=12(2500-625)-1000×1516                   =0

Answer:

Water enters through B at the rate of 1 cm3s−1.

(a) Speed of water at A, VA=25 cm/s
(b) Speed of water at B, VB=50 cm/s
(c) By Bernoulli's equation, we have:
12pvA2+ρghA+PA=12ρvB2+ρghB+PB PA-PB=12×1×1875+12×1000×1516                =1875 dyn/cm2=188 N/m2

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Question 31:

Water enters through B at the rate of 1 cm3s−1.

(a) Speed of water at A, VA=25 cm/s
(b) Speed of water at B, VB=50 cm/s
(c) By Bernoulli's equation, we have:
12pvA2+ρghA+PA=12ρvB2+ρghB+PB PA-PB=12×1×1875+12×1000×1516                =1875 dyn/cm2=188 N/m2

Answer:

Given:
Difference in the heights of A and B = 5 cm
Area of cross section at A, aa = 1 cm2
Area of cross section at B, ab = 0.5 cm2
Speed of water at A, vA = 10 cms−1

(a) From the equation of continuity, we have:VA×aA=VB×aB10×1=VB×0.5VB=20 cm/s
The required speed of water at cross section B is 20 cms−1

(b) From Bernoulli's equation, we get: 12ρvA2+ρghA+PA=12ρvB2+ρghA+PBPB-PA=12ρvA2-vB2+ρghA-hB
Here,
PA and PB are the pressures at A and B, respectively.
hA and hB are the heights of points A and B, respectively.
ρ is the density of the liquid.
On substituting the values, we have:
PB-PA=12×1(100-400)+1×1000(5.0)            =-150+5000=4850 Dyne/cm2            =485 N/m2
Therefore, the required pressure difference at A and B is 485 N/m2.

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Question 32:

Given:
Difference in the heights of A and B = 5 cm
Area of cross section at A, aa = 1 cm2
Area of cross section at B, ab = 0.5 cm2
Speed of water at A, vA = 10 cms−1

(a) From the equation of continuity, we have:VA×aA=VB×aB10×1=VB×0.5VB=20 cm/s
The required speed of water at cross section B is 20 cms−1

(b) From Bernoulli's equation, we get: 12ρvA2+ρghA+PA=12ρvB2+ρghA+PBPB-PA=12ρvA2-vB2+ρghA-hB
Here,
PA and PB are the pressures at A and B, respectively.
hA and hB are the heights of points A and B, respectively.
ρ is the density of the liquid.
On substituting the values, we have:
PB-PA=12×1(100-400)+1×1000(5.0)            =-150+5000=4850 Dyne/cm2            =485 N/m2
Therefore, the required pressure difference at A and B is 485 N/m2.

Answer:

Given:
Difference in the heights of water columns in vertical tubes = 2 cm
Area of cross section at A, aA = 4 cm2
Area of cross section at B, aB = 2 cm2
Now, let vAand vBbe the speeds of water at A and B, respectively.
From the equation of continuity, we have:
 vAaA=vB×aB vA×4=vB×2 vB=2vA               ...(i)
From Bernoulli's equation, we have:
12ρvA2+ρghA+pA=12ρvB2+ρghB+pB12ρvA2+pA=12ρvB2+pBpA-pB=12ρvB2-vA2
Here,
pA and pB are the pressures at A and B, respectively.
hA and hB are the heights of water columns at point A and B, respectively.
ρ is the density of the liquid.
Thus, we have:
12×1×4vA2-vA22×1×1000=12×1×3vA2[pA-pB=2 cm=2×1×1000 dyne/cm2 (water column)] vA2=40003=36.51 cm/sRate of flow=vAaA=36.51×4=146 cm3/s
Hence, the required rate of flow of water across any section is 146 cm3/s.

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Question 33:

Given:
Difference in the heights of water columns in vertical tubes = 2 cm
Area of cross section at A, aA = 4 cm2
Area of cross section at B, aB = 2 cm2
Now, let vAand vBbe the speeds of water at A and B, respectively.
From the equation of continuity, we have:
 vAaA=vB×aB vA×4=vB×2 vB=2vA               ...(i)
From Bernoulli's equation, we have:
12ρvA2+ρghA+pA=12ρvB2+ρghB+pB12ρvA2+pA=12ρvB2+pBpA-pB=12ρvB2-vA2
Here,
pA and pB are the pressures at A and B, respectively.
hA and hB are the heights of water columns at point A and B, respectively.
ρ is the density of the liquid.
Thus, we have:
12×1×4vA2-vA22×1×1000=12×1×3vA2[pA-pB=2 cm=2×1×1000 dyne/cm2 (water column)] vA2=40003=36.51 cm/sRate of flow=vAaA=36.51×4=146 cm3/s
Hence, the required rate of flow of water across any section is 146 cm3/s.

Answer:

Given:
Area of cross section of the wide portions of the tube, aa = 5 cm2
Area of cross section of the narrow portions of the tube, ab= 2 cm2 
Now, let va and vb be the speeds of water at A and B, respectively.
Rate of flow of water through the tube = 500 cm3/s
vA=5005=100 cm/sFrom the equation of continuity, we have:vAaA=vBaBvAvB=aBaA=255vA=2vBvB=52vA   ...(i)From the Bernoulli's equation, we have:12ρvA2+ρghA+pA=12ρvB2+ρghB+pB pA-pB=12pvB2-vA2
Here,
ρ is the density of the fluid.
pA and pB are the pressures at A and B.
h is the difference of the mercury levels in the U-tube.
Now,h×13.6×980=12×1×214(100)2      [Using (i)] h=21×(100)22×13.6×980×4      [pA-pB]=1.969 cm

Therefore, the required difference is 1.969 cm.
      

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Question 34:

Given:
Area of cross section of the wide portions of the tube, aa = 5 cm2
Area of cross section of the narrow portions of the tube, ab= 2 cm2 
Now, let va and vb be the speeds of water at A and B, respectively.
Rate of flow of water through the tube = 500 cm3/s
vA=5005=100 cm/sFrom the equation of continuity, we have:vAaA=vBaBvAvB=aBaA=255vA=2vBvB=52vA   ...(i)From the Bernoulli's equation, we have:12ρvA2+ρghA+pA=12ρvB2+ρghB+pB pA-pB=12pvB2-vA2
Here,
ρ is the density of the fluid.
pA and pB are the pressures at A and B.
h is the difference of the mercury levels in the U-tube.
Now,h×13.6×980=12×1×214(100)2      [Using (i)] h=21×(100)22×13.6×980×4      [pA-pB]=1.969 cm

Therefore, the required difference is 1.969 cm.
      

Answer:

Given:
Area of the hole of the water tank = 2 mm2
Height of filled water, h = 80 cm
Area of the cross-section of the tanks, A = 0.4 m2
Acceleration due to gravity, g = 9.8 ms-2
Pressure at the open surface and at the hole is equal to atmospheric pressure.

(a) Velocity of water:
v=2gh
  = 2×10×0.80= 4 m/sec

(b) Velocity of water when the tank is half-filled and h is 802, i.e., 40 cm:
= 2×10×0.40= 8 m/sec

(c) Volume:
Volume=Ah=A v dt=A×2gh dt=2 mm22ghdt
Volume of the tank = Ah = V (say)
i.e., dVdt=Adhdt
a1v1=Adhdt2×10-62gh=0.4dhdtdh=5×10-62ghdt
(d) dh=5×10-6 2gh dtdh2gh=5×10-6 dt
On integrating, we get:
5×10-60tdt=1280.80.4dhh=5×10-6×t=128×2h120.80.4=5×10-6×t=128×2h120.80.4t=120×2×(0.4)1/2-(0.8)1/4×15×10-6t=14.47×2×23.16×15×10-6×13600 h   = 6.51 h
Thus, the time required to leak half of the water out is 6.51 hours.

Page No 275:

Question 35:

Given:
Area of the hole of the water tank = 2 mm2
Height of filled water, h = 80 cm
Area of the cross-section of the tanks, A = 0.4 m2
Acceleration due to gravity, g = 9.8 ms-2
Pressure at the open surface and at the hole is equal to atmospheric pressure.

(a) Velocity of water:
v=2gh
  = 2×10×0.80= 4 m/sec

(b) Velocity of water when the tank is half-filled and h is 802, i.e., 40 cm:
= 2×10×0.40= 8 m/sec

(c) Volume:
Volume=Ah=A v dt=A×2gh dt=2 mm22ghdt
Volume of the tank = Ah = V (say)
i.e., dVdt=Adhdt
a1v1=Adhdt2×10-62gh=0.4dhdtdh=5×10-62ghdt
(d) dh=5×10-6 2gh dtdh2gh=5×10-6 dt
On integrating, we get:
5×10-60tdt=1280.80.4dhh=5×10-6×t=128×2h120.80.4=5×10-6×t=128×2h120.80.4t=120×2×(0.4)1/2-(0.8)1/4×15×10-6t=14.47×2×23.16×15×10-6×13600 h   = 6.51 h
Thus, the time required to leak half of the water out is 6.51 hours.

Answer:

It is given that H is the height of the cylindrical vessel.


Now, let h be the height of the hole from the surface of the tank.
The velocity of water v is given by
 v=2g(H-h)Also, let t be the time of flight.Now,t=2hgLet x be the maximum horizontal distance. x=v×t       =2g(H-h)×2hg      =4(Hh-h2)
For x to be maximum,
ddhHh-h2=00=H-2hh=H2



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