PHYSICS HIGH SCHOOL NOTES FOR KCSE PREPARATIONS
PRESSUREPressure is defined as the force acting normally (perpendicularly) per unit area. The SI units for pressure is newton per metre squared (N/m^{2}). One Nm^{2} is known as one Pascal (Pa). Pressure = normal force / area or pressure = thrust / area. Another unit for measuring pressure is the bar. 1 bar = 105 N/m^{2}. 1millibar = 100 N/m^{2}. Calculating pressureExamples 1. A rectangular brick of weight 10N, measures 50 cm × 30 cm × 10 cm. calculate the values of the maximum and minimum pressures which the block exert when resting on a horizontal table.
Solution Area of the smallest face = 0.3 × 0.1 = 0.03 m^{2}. Area of the largest face = 0.5 × 0.3 = 0.15 m^{2}. Maximum pressure = 10 N / 0.03 = 3.3 × 102 N/m^{2}. Minimum pressure = 10 N / 0.15 = 67 N/m^{2}. 2. A man of mass 84 kg stands upright on a floor. If the area of contact of his shoes and the floor is 420 cm^{2}, determine the average pressure he exerts on the floor. (Take g = 10 N/Kg)
Solution Pressure = force / area = 840 / 0.042 = 20,000 Nm^{2}. Pressure in liquids.The following formula is used to determine pressure in liquids.Pressure = h ρ g, where h – height of the liquid, ρ – density and g – is force of gravity. Examples 1. A diver is 10 m below the surface of water in a dam. If the density of water is 1,000 kgm^{3}, determine the pressure due to the water on the diver. (Take g = 10 Nkg^{1})
Solution Pressure = h ρ g = 10 × 1000 × 10 = 100,000 Nm^{2}. 2. The density of mercury is 13,600 kgm^{3}. Determine the liquid pressure at a point 76 cm below the surface of mercury. (Take g = 10 Nkg^{1})
Solution Pressure = h ρ g = 0.76 × 13,600 × 10 = 103,360 Nm^{2}. 3. The height of the mercury column in a barometer is found to be 67.0 cm at a certain place. What would be the height of a water barometer at the same place? (Densities of mercury and water are 1.36 × 104 kg/m^{3} and 1.0 × 103 kg/m^{3} respectively.)
Solution Let the pressure due to water be h_{1}ρ_{1}g_{1} = h ρ g, hence; h_{1} = h ρ / ρ_{1}= (6.7 × 10^{1}) × (1.36 × 10^{4}) = 911.2 cm or 9.11 m. Utube manometerIt is a transparent tube bent into Ushape. When a liquid is poured into a utube it settles at equal level since pressure depends on height and they share the same bottom. Consider the following diagrams;
For the levels to differ the pressure P_{1} must be greater than P_{2}, hence P_{1} =P_{2} + hρg.
If P_{1} is the lung pressure, P_{0} is the atmospheric pressure, then if the difference is‘h’ then lung pressure can calculated as follows. P_{1} =P_{0} + hρg. Example A man blows into one end of a Utube containing water until the levels differ by 40.0 cm. if the atmospheric pressure is 1.01 × 105 N/m^{2} and the density of water is 1000 kg/m^{3}, calculate his lung pressure. Solution Lung pressure = atmospheric Pressure + liquid pressure P_{1} = P_{0} + hρg. Hence P_{1} = (1.01 × 105) + (0.4 × 10 × 1000) = 1.05 × 105 N/m^{2}. Measuring pressure
1. Simple mercury barometer– it is constructed using a thick walled glass tube of length 1 m and is closed at one end. Mercury is added into the tube then inverted and dipped into a dish containing more mercury. The space above the mercury column is called torricellian vacuum. The height ‘h’ (if it is at sea level) would be found to be 760 mm. Atmospheric pressure can be calculated as, P = ρ g h => where ρ (mercury) 1.36 × 104 kg/m^{3}, g 9.81 N/kg, h 0.76 m. Then P = (1.36 × 10^{4}) × 9.81 × 0.76 = 1.01^{4} × 10^{5} Pa.
NOTE this is the standard atmospheric pressure, sometimes called one atmosphere. It is approximately one bar.
2. Fortin barometer – this is a more accurate mercury barometer. The adjusting screw is adjusted first to touch the mercury level in the leather bag.
3. Aneroid barometer – increase in pressure causes the box to contract, the movements are magnified by the system of levers and is transmitted to the pointer by the fine chain and this causes the pointer to move. The scale is suitably calibrated to read pressure. Since pressure falls or rises as altitude falls or rises, the pointer can also be calibrated to read altitude.
4. Bourdon gauge – it is also called gauge pressure and is used in gas cylinders. When air is blown into the rubber tube, the curved metal tube tries to straighten out and this causes movement which is transmitted by levers and gears attached to a pointer. This gauge can measure both gas and liquid pressure.
Examples
1. The height of the mercury column in a barometer is found to be 67.0 cm at a certain place. What would be the height of a water barometer at the same place? (densities of mercury 1.36 × 10^{4} kg/m^{3} and water 1.0 × 10^{3} kg/m^{3}). Solution Let the pressure due to water be h_{1} ρ_{1} g_{1} and that of water be h ρ g. Then h_{1} ρ_{1} g_{1} = h ρ g. Hence h_{1} = (6.7 × 10^{1}) × (1.36 × 10^{4}) / 1.0 × 10^{3} = 911.2 cm or 9.11 m.
Application of pressure in gases and liquids.
2. Drinking straw– when a liquid is drawn using a straw air is sucked through the straw to the lungs. This leaves the space in the straw partially evacuated. The atmospheric pressure pushing down the liquid in the container becomes greater than the pressure inside the straw and this forces the liquid into your mouth.
3. The syringe– they work in the principle as the straw. They are used by the doctors in hospitals for giving injections.
4. Bicycle pump– it uses two valves, one in the pump (greasy leather) and the other in the tire. When the handle is pushed in, the pressure inside the barrel becomes greater than the one in the tire and this pushes air inside. The valve in the tire is made such that air is locked inside once pumped.
5. The siphon– it is used to empty tanks which may not be easy to empty by pouring their contents out. The tubing must be lowered below the base of the tank. The liquid flows out due to pressure difference caused by the difference in height (h ρ g).
6. Lift pump.
7. Force pump. Transmission of pressure in liquids and gases.It was first recognized by a French mathematician and physicist called Blaise Pascal in the 17th century. Pressure is equally distributed in a fluid and equally transmitted as shown in the following, a) Hydraulic brake system – the master cylinder transmits pressure to the four slave cylinders on each wheel. The cylinders contain brake fluid. Fluid is used because liquids are almost incompressible. When force is applied in the pedal the resulting pressure in the master cylinder is transmitted to the slave cylinders. This forces the piston to open the brake shoes which then pushes the brake lining against the drum. This force the rotation of the wheel to slow down. It is important to note that pressure is equally distributed in all wheels so that the car doesn’t pull or veer to one side.
b) Hydraulic press – it consists of two pistons with different crosssectional areas. Since pressure is transmitted equally in fluids, when force is applied in one piston it is transmitted to the other piston. The smaller piston is called the force while the bigger piston is called the load. They are used to lift heavy loads in industries, bending metals and sheets etc.
Examples
1. The area of the smaller piston of a hydraulic press is 0.01 m^{2} and that of the bigger piston is 0.5 m^{2}. If the force applied to the smaller piston is 2 N, what force is transmitted to the larger piston? Solution Pressure = force / area – hence P = 2 / 0.01 = 200 Pa. Force = Pressure × Area = 200 × 0.5 = 100 N. 2. The master cylinder piston in a car braking system has a diameter of 2.0 cm. The effective area of the brake pads on each of the four wheels is 30 cm^{2}. The driver exerts a force of 500 n on the brake pedal. Calculate: a) The pressure in the master cylinder b) The total braking force in the car. Solution a) Area of the master cylinder – π r^{2} = 3.14 cm^{2} Pressure = force /area = 500 / 3.14 × 104 = 1.59 × 106 N/m^{2} b) Area of brake pads = (30 × 4) cm^{2}. Since pressure in the wheel cylinder is the same as in the master cylinder) F = Pressure × Area = (1.59 × 106) × (120 × 104) = 1.91 × 104 N.
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