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Selina Concise Physics Class 9 ICSE Solutions Pressure in Fluids and Atmospheric Pressure

November 9, 2023May 28, 2022 by Veerendra

Selina Concise Physics Class 9 ICSE Solutions Pressure in Fluids and Atmospheric Pressure

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Selina ICSE Solutions for Class 9 Physics Chapter 4 Pressure in Fluids and Atmospheric Pressure

Exercise 4(A)

Solution 1S.

Thrust is the force acting normally on a surface.
Its S.I. unit is ‘newton’.

Solution 2S.

Pressure is the thrust per unit area of the surface.
Its S.I. unit is ‘newton per metre²‘ or ‘pascal’.

Solution 3S.

(a) Pressure is measured in ‘bar’.
(b) 1 bar = 10⁵ pascal.

Solution 4S.

One pascal is the pressure exerted on a surface of area 1 m² by a force of 1N acting normally on it.

Solution 5S.

Thrust is a vector quantity.

Solution 6S.

Pressure is a scalar quantity.

Solution 7S.

Thrust is the force applied on a surface in a perpendicular direction and it is a vector quantity. The effect of thrust per unit area is pressure, and it is a scalar quantity.

Solution 8S.

Pressure exerted by thrust is inversely proportional to area of surface on which it acts. Thus, larger the area on which the thrust acts, lesser is the pressure exerted by it.
Example: If we stand on loose sand, our feet sink into the sand, but if we lie on that sand, our body does not sink into the sand. In both the cases, the thrust exerted on the sand is equal (equal to the weight of the body). However, when we lie on sand, the thrust acts on a large area and when we stand, the same thrust acts on a small area.

Solution 9S.

The tip of an allpin is made sharp so that large pressure is exerted at the sharp end and it can be driven into with less effort.

Solution 10S.

(a) It is easier to cut with a sharp knife because even a small thrust causes great pressure at the edges and cutting can be done with less effort.
(b) Wide wooden sleepers are placed below the railway tracks so that the pressure exerted by the rails on the ground becomes less.

Solution 11S.

A substance which can flow is called a fluid.

Solution 12S.

Due to its weight, a fluid exerts pressure in all directions; the pressure exerted by the fluid is called fluid pressure.

Solution 13S.

A solid exerts pressure only on the surface on which it is placed, i.e. at its bottom, but a fluid exerts pressure at all points in all directions.

Solution 14S.

Take a can or large plastic bottle filled with water. Place it on a horizontal surface. Make a series of holes in the wall of the vessel anywhere below the free surface of the liquid. The water spurts out through each hole. This shows that the liquid exerts pressure at each point on the wall of the bottle.
Selina Concise Physics Class 9 ICSE Solutions Pressure in Fluids and Atmospheric Pressure - 3
Liquid exerts pressure at all points in all directions

Solution 15S.

Pressure at a point in a liquid depends upon the following three factors:

Depth of the point below the free surface.
Density of liquid.
Acceleration due to gravity.

Solution 16S.

P = P_o + hρg
Here, P = Pressure exerted at a point in the liquid
P_o = Atmospheric pressure
h = Depth of the point below the free surface
ρ = Density of the liquid
g = Acceleration due to gravity

Solution 17S.

Consider a vessel containing a liquid of density ρ. Let the liquid be stationary. In order to calculate pressure at a depth, consider a horizontal circular surface PQ of area A at a depth h below the free surface XY of the liquid. The pressure on the surface PQ will be due to the thrust of the liquid contained in cylinder PQRS of height h with PQ as its base and top face RS lying on the frees surface XY of the liquid.

Selina Concise Physics Class 9 ICSE Solutions Pressure in Fluids and Atmospheric Pressure - 2
Total thrust exerted on the surface PQ
= Weight of the liquid column PQRS
= Volume of liquid column PQRS x density x g
= (Area of base PQ x height) x density x g
= (A x h) x ρ x g

This thrust is exerted on the surface PQ of area A. Therefore, pressure is given as shown below.
P = Thrust on surface / Area of surface
P = Ah ρg / A = hρg
Thus, Pressure = depth x density of liquid x acceleration due to gravity

Solution 18S.

Due to dissolved salts, density of sea water is more than the density of river water, so pressure at a certain depth in sea water is more than that at the same depth in river water.

Solution 19S.

(a) P₂ = P₁ + h ρ g,
(b) P₂ > P₁

Solution 20S.

The reason is that when the bubble is at the bottom of the lake, total pressure exerted on it is the atmospheric pressure plus the pressure due to water column. As the gas bubble rises, due to decrease in depth the pressure due to water column decreases. By Boyle’s law, PV = constant, so the volume of bubble increases due to decrease in pressure, i.e., the bubble grows in size.

Solution 21S.

The pressure exerted by a liquid increases with its depth. Thus as depth increases, more and more pressure is exerted by water on wall of the dam. A thicker wall is required to withstand greater pressure, therefore, the thickness of the wall of dam increases towards the bottom.

Solution 22S.

The sea divers need special protective suit to wear because in deep sea, the total pressure exerted on the diver’s body is much more than his blood pressure. To withstand it, he needs to wear a special protective suit.

Solution 23S.

Laws of liquid pressure:

Pressure at a point inside the liquid increases with the depth from its free surface.
In a stationary liquid, pressure is same at all points on a horizontal plane.
Pressure is same in all directions about a point in the liquid.
Pressure at same depth is different in different liquids. It increases with the increase in the density of liquid.
A liquid seeks its own level.

Solution 24S.

The liquid from hole B reaches a greater distance on the horizontal surface than that from hole A.
This explains that liquid pressure at a point increases with the depth of point from the free surface.

Solution 25S.

(i) As the diver moves to a greater depth, pressure exerted by sea water on him also increases.
(ii) When the diver moves horizontally, his depth from the free surface remains constant and hence the pressure on him remains unchanged.

Solution 26S.

Pascal’s law states that the pressure exerted anywhere in a confined liquid is transmitted equally and undiminished in all directions throughout the liquid.

Solution 27S.

Two applications of Pascal’s law:

Hydraulic press
Hydraulic jack

Solution 28S.

The principle of a hydraulic machine is that a small force applied on a smaller piston is transmitted to produce a large force on the bigger piston.
Hydraulic press and hydraulic brakes work on this principle.

Solution 29S.

Hydraulic press works on principle of hydraulic machine.
It states that a small force applied on a smaller piston is transmitted to produce a large force on the bigger piston.
Use: It is used for squeezing oil out of linseed and cotton seeds.

Solution 30S.

(i) X : Press Plunger; Y: Pump Plunger

(ii) When the lever is moved down, valve B closes and valve A opens, so the water from cylinder P is forced into the cylinder Q.

(iii) Valve B closes due to an increase in pressure in cylinder P. This pressure is transmitted to the connecting pipe and when the pressure in connecting pipe becomes greater than the pressure in the cylinder Q, valve A opens up.

(iv) When the release valve is opened, the ram (or press) plunger Q gets lowered and water of the cylinder Q runs out in the reservoir.

Solution 31S.

Selina Concise Physics Class 9 ICSE Solutions Pressure in Fluids and Atmospheric Pressure - 1
Working: When handle H of the lever is pressed down by applying an effort, the valve V opens because of increase in pressure in cylinder P. The liquid runs out from the cylinder P to the cylinder Q. As a result, the piston B rises up and it raises the car placed on the platform. When the car reaches the desired height, the handle H of the lever is no longer pressed. The valve V gets closed (since the pressure on the either side of the valve becomes same) so that the liquid may not run back from the cylinder Q to cylinder P.

Solution 32S.

Selina Concise Physics Class 9 ICSE Solutions Pressure in Fluids and Atmospheric Pressure - 4

Working: To apply brakes, the foot pedal is pressed due to which pressure is exerted on the liquid in the master cylinder P, so liquid runs out from the master cylinder P to the wheel cylinder Q. As a result, the pressure is transmitted equally and undiminished through the liquid to the pistons B₁and B₂ of the wheel cylinder. Therefore, the pistons B₁ and B₂ get pushed outwards and brake shoes get pressed against the rim of the wheel due to which the motion of the vehicle retards. Due to transmission of pressure through the liquid, equal pressure is exerted on all the wheels of the vehicle connected to the pipe line R.

On releasing the pressure on the pedal, the liquid runs back from the wheel cylinder Q to the master cylinder P and the spring pulls the break shoes to their original position and forces the pistons B₁ and B₂ to return back into the wheel cylinder Q. Thus, the brakes get released.

Solution 33S.

(a) h ρ g (b) same (c) the same (d) directly proportional (e) directly proportional.

Solution 1M.

Solution 2M.

h ρ g

Solution 3M.

P₁ < P₂

Solution 4M.

P₂ – P₁ = h ρ g

Solution 1N.

Selina Concise Physics Class 9 ICSE Solutions Pressure in Fluids and Atmospheric Pressure - 5

Solution 2N.

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Solution 3N.

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Solution 4N.

Selina Concise Physics Class 9 ICSE Solutions Pressure in Fluids and Atmospheric Pressure - 8

Solution 5N.

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Solution 6N.

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Solution 7N.

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Solution 8N.

Selina Concise Physics Class 9 ICSE Solutions Pressure in Fluids and Atmospheric Pressure - 12

Solution 9N.

Selina Concise Physics Class 9 ICSE Solutions Pressure in Fluids and Atmospheric Pressure - 13

Solution 10N.

Selina Concise Physics Class 9 ICSE Solutions Pressure in Fluids and Atmospheric Pressure - 14

Solution 11N.

Selina Concise Physics Class 9 ICSE Solutions Pressure in Fluids and Atmospheric Pressure - 15

Solution 12N.

Selina Concise Physics Class 9 ICSE Solutions Pressure in Fluids and Atmospheric Pressure - 16

Solution 13N.

Data is incomplete

Solution 14N.

Selina Concise Physics Class 9 ICSE Solutions Pressure in Fluids and Atmospheric Pressure - 17

Exercise 4(B)

Solution 1S.

The thrust exerted per unit area of the earth surface due to column of air, is called the atmospheric pressure on the earth surface.

Solution 2S.

1.013 x 10 ⁵ pascal

Solution 3S.

Atmospheric pressure is measured in ‘torr’.
1 torr = 1 mm of Hg.

Solution 4S.

At normal temperature and pressure, the barometric height is 0.76 m of Hg at sea level which is taken as one atmosphere.
1 atmosphere = 0.76 m of Hg = 1.013 x 10⁵ pascal

Solution 5S.

We do not feel uneasy under enormous pressure of the atmosphere above as well as around us because of the pressure of our blood, known as blood pressure, is slightly more than the atmospheric pressure. Thus, our blood pressure balances the atmospheric pressure.

Solution 6S.

Experiment to demonstrate that air exerts pressure:

Take a thin can fitted with an airtight stopper. The stopper is removed and a small quantity of water is boiled in the can. Gradually the steam occupies the entire space of can by expelling the air from it [Fig (a)]. Then stopper is then tightly replaced and simultaneously the flame beneath the can is removed. Cold water is then poured over the can.

It is observed that the can collapses inwards as shown in fig (b).

The reason is that the pressure due to steam inside the can is same as the air pressure outside the can [Fig (a)]. However, on pouring cold water over the can, fitted with a stopper [fig (b)], the steam inside the can condenses producing water and water vapour at very low pressure. Thus, the air pressure outside the can becomes more than the vapour pressure inside the closed can.

Consequently, the excess atmospheric pressure outside the can causes it to collapse inwards.
Selina Concise Physics Class 9 ICSE Solutions Pressure in Fluids and Atmospheric Pressure - 18

Solution 7S.

(i) When air is removed from the balloon, the pressure inside the balloon (which was due to air in it) is much less than the atmospheric pressure outside and hence the balloon collapses.

(ii) Water is held inside the dropper against the atmospheric pressure because the pressure due to height column of liquid inside the dropper is less than the atmospheric pressure. By pressing the dropper we increase the pressure inside the dropper and when it becomes greater than the atmospheric pressure the liquid comes out of the dropper.

(iii) There is no air inside a completely filled and sealed can. When a single hole is made to drain out the oil from the can, some of the oil will come out and due to that the volume of air above the oil will increase and hence the pressure of air will decrease. But if two holes are made on the top cover of the can, air outside the can will enter it through one hole and exert atmospheric pressure on the oil from inside along with the pressure due to oil column, and it will come out of the can from the other hole.

Solution 8S.

When syringe is kept with its opening just inside a liquid and its plunger is pulled up in the barrel, the pressure of air inside the barrel below the plunger becomes much less than the atmospheric pressure acting on the liquid. As a result, the atmospheric pressure forces the liquid to rise up in the syringe.

Solution 9S.

In a water pump, on pulling the piston up, the pressure of air inside the siphon decreases and the atmospheric pressure on the water outside increases. As a result, the atmospheric pressure pushes the water up in pump.

Solution 10S.

(a) Pressure increases inside the bell jar.
(b) Pressure decreases inside the balloon.

Solution 11S.

A barometer is used to measure atmospheric pressure.

Solution 12S.

A barometer is an instrument which is used to measure the atmospheric pressure.

Construction of a simple barometer:

A simple mercury barometer can be made with a clear, dry, thick-walled glass tube about 1 metre ling. The glass tube is sealed at one end and is filled with mercury completely. While filling the tube with mercury care has to be taken so that there are no air bubbles present in the mercury column. Close the open end with thumb and turn the tube upside down carefully over a trough containing mercury. Dip the open end under the mercury level in the trough and remove the thumb.

The mercury level in the tube falls until it is about 76 cm (h =760 mm) vertically above the mercury level. It is the atmospheric pressure acting on the surface of the mercury in the trough that supports the vertical mercury column. The empty space above the mercury column is called the ‘Torricellian vacuum’.
Selina Concise Physics Class 9 ICSE Solutions Pressure in Fluids and Atmospheric Pressure - 19

Solution 13S.

In given figure, at all points such as C on the surface of mercury in trough, only the atmospheric pressure acts. When the mercury level in the tube becomes stationary, the pressure inside tube at the point A, which is at the level of point C, must be same as that at the point C. The pressure at point A is due to the weight (or thrust) of the mercury column AB above it. Thus, the vertical height of the mercury column from the mercury surface in trough to the level in tube is a measure of the atmospheric pressure.
The vertical of the mercury column in it (i.e., AB = h) is called the barometric height.
Had the pressure at points A and C be not equal, the level of mercury in the tube would not have been stationary.
Selina Concise Physics Class 9 ICSE Solutions Pressure in Fluids and Atmospheric Pressure - 20

Solution 14S.

Selina Concise Physics Class 9 ICSE Solutions Pressure in Fluids and Atmospheric Pressure - 21

Solution 15S.

It is the atmospheric pressure acting on the surface of the mercury in the trough that supports the vertical mercury column. Hence, barometric height is used as unit to express the atmospheric pressure.

Solution 16S.

The atmospheric pressure at a place is 76 cm of Hg means at normal temperature and pressure, the height of the mercury column supported by the atmospheric pressure is 76 cm.
76 cm of Hg = 1.013 x 10⁵ pascal

Solution 17S.

The space above mercury is a vacuum. This empty space is called ‘Torricellian vacuum’.

This can be shown by tilting the tube till the mercury fills the tube completely. Again when the mercury column becomes stationary, the empty space is created above the mercury column. If somehow air enters into the empty space or a drop of water gets into the tube, it will immediately vaporize and the air will exert pressure on mercury column due to which the barometric height will decrease.

Solution 18S.

(a) The barometric height remains unaffected.
(b) The barometric height remains unaffected.
(c) The barometric height decreases.

Solution 19S.

Two uses of barometer:

To measure the atmospheric pressure.
For weather forecasting

Solution 20S.

Two advantages of using mercury as barometric liquid:

The density of mercury is greater than that of all the liquids, so only 0.76m height of mercury column is needed to balance the normal atmospheric pressure.
The mercury neither wets nor sticks to the glass tube therefore it gives the correct reading.

Solution 21S.

Water is not a suitable barometric liquid because:

The vapour pressure of water is high, so its vapours in the vacuum space will make the reading inaccurate.
Water sticks with the glass tube and wets it, so the reading becomes inaccurate.

Solution 22S.

In a simple barometer, there is no protection for the glass tube but in Fortin’s barometer, this defect has been removed by enclosing the glass tube in a brass case.
In a simple barometer, a scale cannot be fixed with the tube (or it cannot be marked on the tube) to measure the atmospheric pressure but Fortin’s barometer is provided with a vernier calipers to measure the accurate reading.

Solution 23S.

Selina Concise Physics Class 9 ICSE Solutions Pressure in Fluids and Atmospheric Pressure - 22
To measure the atmospheric pressure, first the leather cup is raised up or lowered down with the help of the screw S so that the ivory pointer I just touches the mercury level in the glass vessel. The position of the mercury level in the barometer tube is noted with the help of main scale and the vernier scale. The sum of the vernier scale reading to the main scale reading gives the barometric height.

Solution 24S.

A barometer calibrated to read directly the atmospheric pressure is called an aneroid barometer. It has no liquid, it is light and portable.

Selina Concise Physics Class 9 ICSE Solutions Pressure in Fluids and Atmospheric Pressure - 23

Construction: Figure above shows the main parts of an aneroid barometer. It consists of a metallic box B which is partially evacuated. The top D of the box is springy and corrugated in form of a diaphragm as shown. At the middle of diaphragm, there is a thin rod L toothed at its upper end. The teeth of rod fit well into the teeth of a wheel S attached with a pointer P which can slide over a circular scale. The circular scale is initially calibrated with a standard barometer so as to read the atmospheric pressure directly in terms of the barometric height.

Working: When atmospheric pressure increases, it presses the diaphragm D and the rod L gets depressed. The wheel S rotates clockwise and pointer P moves to the right on the circular scale. When atmospheric pressure decreases, the diaphragm D bulges out due to which the rod L moves up and the wheel S rotates anti-clockwise. Consequently, the pointer moves to the left.

Solution 25S.

Aneroid barometer has no liquid and it is portable. It is calibrated to read directly the atmospheric pressure.

Solution 26S.

(i) In a mine, reading of a barometer increases.
(ii) On hills, reading of barometer decreases.

Solution 27S.

Selina Concise Physics Class 9 ICSE Solutions Pressure in Fluids and Atmospheric Pressure - 24

Solution 28S.

Factors that affect the atmospheric pressure are:

Height of air column
Density of air

Solution 29S.

A fountain pen filled with ink contains some air at a pressure equal to atmospheric pressure on earth’s surface. When pen is taken to an altitude, atmospheric pressure is low so the excess pressure inside the rubber tube forces the ink to leak out.

Solution 30S.

On mountains, the atmospheric pressure is quite low. As such, nose bleeding may occur due to excess pressure of blood over the atmospheric pressure.

Solution 31S.

An altimeter is a device used in aircraft to measure its altitude.

Principle: Atmospheric pressure decreases with the increase in height above the sea level; therefore, a barometer measuring the atmospheric pressure can be used to determine the altitude of a place above the sea level.

The scale of altimeter is graduated with height increasing towards left because the atmospheric pressure decreases with increase of height above the sea level.

Solution 32S.

(a) It indicates that the moisture is increasing i.e., there is a possibility of rain.
(b) It indicates the coming of a storm or cyclone.
(c) It indicates that the moisture is decreasing i.e., it indicates dry weather.

Solution 1M.

1 torr = 1 mm of Hg

Solution 2M.

76 cm of Hg

Solution 3M.

Solution 1N.

Selina Concise Physics Class 9 ICSE Solutions Pressure in Fluids and Atmospheric Pressure - 25

Solution 2N.

Selina Concise Physics Class 9 ICSE Solutions Pressure in Fluids and Atmospheric Pressure - 26

Solution 3N.

Selina Concise Physics Class 9 ICSE Solutions Pressure in Fluids and Atmospheric Pressure - 27
Assumption: Atmospheric pressure falls linearly with ascent.

Solution 4N.

Selina Concise Physics Class 9 ICSE Solutions Pressure in Fluids and Atmospheric Pressure - 28

Solution 5N.

Selina Concise Physics Class 9 ICSE Solutions Pressure in Fluids and Atmospheric Pressure - 29

More Resources for Selina Concise Class 9 ICSE Solutions

A New Approach to ICSE Physics Part 1 Class 9 Solutions Pressure in Fluids

March 28, 2022July 21, 2018 by Raju

A New Approach to ICSE Physics Part 1 Class 9 Solutions Pressure in Fluids

These Solutions are part of A New Approach to ICSE Physics Part 1 Class 9 Solutions. Here we have given A New Approach to ICSE Physics Part 1 Class 9 Solutions Pressure in Fluids.

Practice Problems 1.
Question 1.
Calculate pressure exerted by 0.8 m vertical length of alcohol of density 0.80 gcnr⁵ in SI units.
[Take g = 10 ms^-2].
Answer:
Vertical length of alcohol column = h = 0.8 m
Density of alcohol = ρ = 0.80 g cm ^-3\(\rho=\frac{0.80 \times 10^{6}}{10^{3}} \mathrm{kgm}^{-3}\)
ρ = 0.80 x 1000 kgm^-3.
ρ = 800 kg m^-3Pressure = P = ?
p= hpg
P = 0.8 x 800 x 10
= 6400 Pa

Question 2.
What is the pressure exerted by 75 cm vertical column of mercury of density 13600 kgm^-3 in SI units.
[Take g = 9.8 ms^-2].
Answer:
Vertical length of mercury column = h = 75 cm = 0.75 m
Density of mercury = p = 13600 kg m^-3Acceleration due to gravity = g = 9.8 ms^-2Pressure = P = ?
p= hpg
P = 0.75 x 13600×9.8
P = 99960 Pa

Practice Problems 2.
Question 1.
66640 Pa pressure is exerted by 0.50 m vertical column of a liquid. If g = 9.8 Nkg^-1, calculate density of the liquid.
Answer:
Pressure + P = 66640 Pa .
Vertical length of liquid column = h = 0.50 m
Acceleration due to gravity -g = 9.8 ms^-2\(\rho=\frac{66640}{0.50 \times 9.8}\)
ρ = 13600 kg m^-3

Question 2.
What vertical height of water will exert pressure of 333200 Pa? Density of water is 1000 kgnr³ and g = 9.8 ms^-2.
Answer:
Vertical height of water = h = ?
Pressure due to water column = P = 333200 Pa Acceleration due to gravity = g = 9.8 ms^-2

A New Approach to ICSE Physics Part 1 Class 9 Solutions Pressure in Fluids 3

Question 3.
Pressure at bottom of sea at some particular place is 8968960 Pa. If density of sea water is 1040 kgm³ calculate the depth of sea. Take g = 9.8 ms^-2. Neglect the pressure of the atmosphere.
Answer:
Pressure at the bottom of the sea = P = 8968960 Pa
A New Approach to ICSE Physics Part 1 Class 9 Solutions Pressure in Fluids 4

Practice Problems 3.

Question 1.
Atmospheric pressure at sea level is 76 cm of mercury. Calculate the vertical height of air column exerting the above pressure. Assume the density of air 1.29 kgm^-3and that of mercury is 13600 kgm^-3. Why the height calculated by you is far less than actual height of atmosphere?
Answer:

Question 2.
Calculate the equivalent height of mercury, which will exert as much pressure as 960 m of sea water of density 1040 kgm^-3. Density of mercury is 13600 kgm^-3.
Answer:
A New Approach to ICSE Physics Part 1 Class 9 Solutions Pressure in Fluids 7

Practice Problems 4.
Question 1.
The pressure of water on the ground floor, in a water pipe is 150000 Pa, whereas pressure on the fourth floor is 30000 Pa. Calculate height of fourth floor. Take g = 10 ms^-2.
Answer:
Pressure of water at fourth floor = P₂ = 3000 Pa Let h be the height of fourth floor
Difference in pressure of water at ground floor and fourth floor
= P₁ – P₂ = 150000 – 30000
= 120000 Pa
Pressure of water due to height (h) = hρg
=> P₁ – P₂ = h p

A New Approach to ICSE Physics Part 1 Class 9 Solutions Pressure in Fluids 8

Question 2.
The pressure of water on ground floor is 160000 Pa. Calculate the pressure at the fifth floor, at a height of 15 m.
Answer:
Pressure of water at ground floor = P, = 160000 Pa
Pressure of water at fifth floor = P₂ = ?
Height of fifth floor = h = 15 m
Density of water = ρ = 1000 kgm^-3Difference in pressure of water at ground and fifth floor
= P₁ – P₂
Pressure of water due to height (h) = hρg
= P₁ – P₂ = hρg
160000 -P₂= 15 x 1000 x 10
P₂= 160000-150000
P₂ = 10000 Pa

Practice Problems 5.
Question 1.
(a) The area of cross-sections of the pump plunger and press plunger of a hydraulic press are 0.02 m² and 8 m² respectively. If the hydraulic press overcomes a load of 800 kgf, calculate the force acting on pump plunger.
(b) If the mechanical advantage of the handle of pump plunger is 8, calculate the force applied at the end of the handle of pump plunger.
Answer:
(a) Load on the press plunger = L = 800 kgf
Let the effort acting on the pump plunger = E

(b)

A New Approach to ICSE Physics Part 1 Class 9 Solutions Pressure in Fluids 10

Question 2.
The radii of the press plunger and pump plunger are in ratio of 50 : 4. If an effort of 20 kgf acts on the pump plunger, calculate the maximum effort which the press plunger can over come.
Answer:
Effort acting on the pump plunger – E = 20 kgf
Load acting on the press plunger = L = ?
So let radius of pump plunger = 5 Ox = R and radius of press plunger = Ax = r

\(\text { Now, } \frac{L}{E}=\frac{\pi R^{2}}{\pi r^{2}}\)

A New Approach to ICSE Physics Part 1 Class 9 Solutions Pressure in Fluids 12

QUESTIONS BASED ON ICSE EXAMINATION
(A) Objective Questionsion

Multiple Choice Questions.
Select the correct option.

1. Unit of thrust in SI system is
(a) dynes
(b) joule
(c) N/m²
(d) newton

2. The unit Nm²is the unit of
(a) force
(b) pressure
(c) thrust
(d) momentum

3. One Pascal is equal to:
(a) Nm²
(b) Nm-²
(c) Nm²
(d) Nm-¹

4. Thrust acting perpendicularly on the unit surface area is called :
(a) pressure
(b) moment of force
(c) down thrust
(d) none of these

5. Pressure applied in liquids is transmitted with undiminished force:
(a) in downward direction
(b) upward direction only
(c) sides of containing vessel
(d) in all directions

6. As we move upwards, the atmospheric pressure :
(a) increases
(b) decreases
(c) remains same
(d) cannot be said

7. A dam for water reservoir is built thicker at the bottom than at the top because :
(a) pressure of water is very large at the bottom due to its large depth
(b) water is likely to have more density at the bottom due to its large depth
(c) quantity of water at the bottom is large
(d) variation in value of ‘g’

8. The pressure exerted by 50 kg (g = 10 m/s²) on an area of cross section of 2 m² is :
(a) 50 Pa
(b) 200 Pa
(c) 250 Pa
(d) 1000 Pa
Ans. (c) 250 Pa
Explanation : m = 50 kg; g = 10 ms^-2Area of cross-section = A = 2m²Pressure \(P=\frac{F}{A}=\frac{m g}{A}=\frac{50 \times 10}{2}\)=250Pa

9. Pressure at a point inside a liquid does not depend on :
(a) The depth of the point below the surface of the liquid
(b) The nature of the liquid
(c) The acceleration due to gravity at that point
(d) The shape of the containing vessel

10. The atmospheric pressure on earth’s surface is approximately
(a) 10⁵ Pa
(b) 10⁴ Pa
(c) 9.6 x 10⁴ N/m²
(d) 10^-4 Pa

(B) Subjective Questions

Question 1.
State three factors on which the pressure at a point in a liquid depends.
Answer:
Factors on which the pressure at a point in a liquid depends are:

Pressure in a liquid is directly proportional to its height or depth.
Pressure in a liquid is directly proportional to its density.
Pressure in a liquid is directly proportional to the acceleration due to gravity.
Pressure in a liquid is independent of the area of crosssection.

Question 2.
The normal pressure of air is 76 cm of mercury. Calculate the pressure in SI units.
[Density of mercury = 13600 kg/m³ and g = 10 m/s²]
Answer:
Height of mercury column = h = 76 cm
h = 0.76 m
Density of mercury =ρ = 13600 kg/m³Acceleration due to gravity = g = 10 m/s²Pressure = P = ?
P = hρg
P = 0.76 x 13600 x 10 = 103360 N/m²

Question 3.
At a given place, a barometer records 70 cm of Hg. If the mercury in barometer is replaced by water, what would be resulting reading? (Density of Hg = 13600 kg/m³; Density of water = 1000 kg/m³)
Answer:
Height of mercury column = h = 70 cm = 0.70 m
Density of mercury = ρ= 13600 kg/m³Acceleration due to gravity = g = 10 m/s²Pressure = hρg
For water:
Height of water column = h’ = ?
Pressure due to water column = P’

A New Approach to ICSE Physics Part 1 Class 9 Solutions Pressure in Fluids 14

Question 4.
The base of cylindrical vessel measures 300 cm². Water is poured into it upto a depth of 6 cm. Calculate the pressure of water on the base in vessel.
Answer:
Area of base of cylinder = A = 300 cm²A = 300 x 10 m²A = 3 x 10²m²Height (or depth) of water column = h = 6 cm
\(h=\frac{6}{100} \mathrm{m}\)
Density of water = ρ = 1000 kg/m³Acceleration due to gravity = g = 10 m/s²Pressure at the base in vessel = P = hρg
ρ = \(\frac{6}{100}\) x 1000 x 10
P = 600Pa

Question 5.
The pressure in water pipe on the ground floor of a building is 40000 pascals, whereas on the first floor it’s 10000 pascals. Find the height of first floor. (Acceleration due to gravity g = 10 ms^-2)
Ans.
Pressure on the ground floor of a building = P₁ = 40000 Pa
Pressure on the first floor of a building = P₂ = 10000 Pa
ρ = 1000 kg/m³ = density of water
Acceleration due to gravity = g = 10 m/s²
Difference in pressure = P, – P₂ = 40000 – 10000 = 30000 Pa
Let h = height of first floor
Pressure of water due to height (h) = hρg
30000 = h x 1000 x 10
\(h=\frac{30000}{10000}=3 \mathrm{m}\)

Question 6.
(a) Define SI unit of pressure.
(b) The atmospheric pressure at a place is 650 mm of Hg. Calculate this pressure in Pascals (Pa).
Answer:
(a) SI unit of pressure is pascal (Pa) or Nm^-2One Pascal: When a force of one newton acts normally on an area of one square metre (1 m²) then pressure acting on the surface acting on the surface is called one Pascal.
(b) Height of mercury column = h = 650 mm
h = 65 cm = 0.65 m
Density of mercury = ρ= 13600 kg/m³Acceleration due to gravity = g = 10 ms^-2Pressure (P) = 650 mm of Hg = hρg
= 0.65 x 13600=10
= 88400 Pa

Question 7.
Pressure in a water pipe on the ground floor of a building is 100,000 Pa. Calculate the pressure in water pipe on first floor at a height of 3 m. [Density of water = 1000 kgm^-3 ; g = 10 ms^-2]
Answer:
Pressure of water at ground floor = P₁ = 1,00,000 Pa
Pressure of water at first floor = P₂ = ?
Height of first floor = h = 3 m
Density of water = ρ= 1000 kgm^-3Acceleration due to gravity = g = 10 ms^-2Difference in pressure of water at-ground floor an first floor
= P₁ -P₂Pressure of water due to height (h) = hρg
=> P₁– P₂ = hρg
1,00,000 – P₂ = 3 x 1000 x 10 –
P₂= 1,00,000-30000
P₂= 70000 Pa
∴ Pressure of water in pipe at first floor of a building is 70000 Pa.

Question 8.
P is the pressure at some point in a liquid. State whether pressure P is a scalar or vector quantity.
Answer:
Pressure exerted on an enclosed fluid gets transmitted equally and undiminishingly in all directions. So no particular direction is associated with pressure.
That is why Pressure is a scalar quantity.

Question 9.
A beaker contains a liquid of density ‘ρ’ upto height ‘h’such that ‘P_A’ is atmospheric pressure and ‘g’ is acceleration due to gravity. Answer the following questions :
(a) What is the pressure on the free surface of liquid?
(b) What is the pressure on the base of beaker?
(c) What is the lateral pressure at the base on the inner walls of beaker?
Answer:
(a) Pressure on the free surface of liquid is equal to the atmospheric pressure (P_a).
(b) Consider a liquid contained in a beaker, such that ‘ p’ is the density of liquid.
Consider a point B at the base of liquid and the liquid column of area of cross-section ‘a’ around it, such that ‘h’is the
height of the liquid column as shown in the figure.
A New Approach to ICSE Physics Part 1 Class 9 Solutions Pressure in Fluids 18

A New Approach to ICSE Physics Part 1 Class 9 Solutions Pressure in Fluids 19

(c) Also lateral pressure at the base on the inner walls of beaker = P_a + hρg

Question 10.
State the law of transmission of pressure in liquids.
Ans.
Pascal’s law : “The pressure applied on the surface of a confined liquid is transmitted equally and undiminished in all directions throughout the liquid.”

Question 11.
Calculate the hydrostatic pressure exerted by water at the bottom of a beaker. Take the depth of water as 40 cm, the density of water 1000 kgm^-3 and g = 9.8 ms^-2.
Ans.
Pressure at the bottom of beaker = P = ?
Height (or depth) of water in beaker = h = 40 cm
h= 0.4m
Density of water =ρ
= 1000 kgm^-3Acceleration due to gravity = g = 9.8 ms^-2P = hρg
P = 0.4 x 1000 x9.8
= 3920 Pa

Question 12.
State Pascal’s law of transmission of pressure in a liquid.
Answer:
Pascal’s law : “The pressure applied on the surface of a confined liquid is transmitted equally and undiminished in all directions throughout the liquid.”

Question 13.
State briefly, how and why the atmospheric pressure of a place varies with the altitude. Draw an approximate graph to illustrate this variation.
Answer:

We know atmospheric pressure = height of air column x density of air x acceleration due to gravity; P = hρg So, as we go up i.e. at higher altitudes, height of air column and hence atmospheric pressure decreases.
Also with the increase in altitude, density of air decreases and hence atmospheric pressure decreases.
If we take average density of air as 1.29 kgm^-3 and the density of mercury as 13 600 kgm^-3we can find the height
Column which will exert as much pressure as*’ is exerted by 1 cm or (0.01 m) column of mercury as
Height of air column x density of air = height of mercury column x density of mercury height of air column x 1.29 kg/m³= 0.01 m x 13600 kg/m³

∴ Height of air column = \(\frac{136}{1.29} \mathrm{m}\)=105m(approx)

Thus, 105 m of air column, on the average, will exert as much pressure as 1 cm column of mercury. Further,1 cm of mercury column exerts pressure = 105 m of air column 76 cm of mercury column exerts pressure = 105 x 76 m = 7980 m = 8 km (approx).
Thus, 8 km of air column will exert as much pressure as 76 cm of mercury column. However, it does not mean that atmosphere extends to only 8 km. As it is pointed out earlier, the density of atmosphere also changes with height. Thus, a fall of one cm in pressure does not mean that we have covered a vertical height of 105 m. On higher altitudes the vertical height of air is far in excess of 105 m, because of low density of air. A graph showing fall in pressure with height is shown in the figure.

A New Approach to ICSE Physics Part 1 Class 9 Solutions Pressure in Fluids 21

Question 14.
The blood pressure reading of a patient is recorded 160/ 100. Express the lower pressure in SI units.
[Take density of mercury as 13.6 x 10³ kgm^-3 and the value of ‘g’ as 10 ms^-2]
Answer:
Lower pressure of the patient = 100 mm of Hg column
Height of mercury column = h = 100 mm = 10 cm h = 0.1 m
Density of mercury = ρ=13.6x 10³ kgm^-3Acceleration due to gravity = g = 10 ms^-2So lower pressure of patient = P = hρg
P = 0.1 x 13.6 x 10³ x 10
P = 13600 Pa

Question 15.
State two advantages of aneroid barometer.
Answer:
Advantages of aneroid barometer :

It is compact, portable and hence can be carried anywhere.
It does not contain any liquid and there is no chance of spilling over of liquid as in mercury barometer.

Question 16.
Explain, why a gas bubble released at the bottom of a lake grows in size as it rises to the surface of the lake.
Answer:
Bubble released at the bottom of a lake grows in size as it rises to the surface of the lake because the pressure exerted on it by water of the lake DECREASES hence by BOYLE’S LAW PV = constant the VOLUME of bubble INCREASES and the bubble grows in size.

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