National 4 Physics - Dynamics and Space Summary Notes PDF

Summary

These are summary notes for National 4 Physics covering the topic of Dynamics and Space. The notes describe speed and acceleration formulas, worked examples, and explain how to measure these concepts using light gates and speed-time graphs. The document also covers concepts such as forces, motion and energy.

Full Transcript

National 4 Physics - Dynamics and Space Summary Notes Speed and Acceleration Average and Instantaneous speeds Speed is calculated by dividing the distance travelled by the time taken. Measured over a long distance or long time, the speed calculated is an average speed. The average speed can be fou...

National 4 Physics - Dynamics and Space Summary Notes Speed and Acceleration Average and Instantaneous speeds Speed is calculated by dividing the distance travelled by the time taken. Measured over a long distance or long time, the speed calculated is an average speed. The average speed can be found using the formula: distance travelled d average speed = v = time taken t where v = final speed measured in metres per second d = distance measured in metres t = time measured in seconds Worked example A car travels from Aberdeen to Stonehaven, a distance of 24 kilometres. Calculate the average speed of the car in metres per second if it takes 15 minutes to complete the journey. d v = t 24000 v = 15 × 60 v = 26 ⋅ 7 metres per second The instantaneous speed of a vehicle is measured over very short distances or time intervals. In a car, the speedometer indicates the instantaneous speed. Electronic methods of measuring instantaneous speed can be used. This is done with an electronic timer or computer connected to light gates. Using Light Gates to Measure Speed A light gate consists of a light source and a photocell. The photocell is connected to an electronic timing device or a computer. The timing device is triggered by the light beam falling on the photocell being blocked by a card or similar. The timing device records how long the beam is blocked for. card of known length vehicle photocell light light gate computer interface 1 31/05/2018 National 4 Physics - Dynamics and Space Summary Notes The instantaneous speed can then be found using the formula: length of card instantaneous speed = time beam is blocked Acceleration Acceleration is a measure of the rate at which something increases or decreases its speed. (something slowing down is said to have negative acceleration). Acceleration can be calculated using the formula below. change in speed ∆v acceleration = or a = time taken for change t where a = acceleration measured in metres per second per second ∆v = change in speed measured in metres per second t = time measured in seconds Worked example A cheetah can accelerate from rest to 24 metres per second in 3 seconds. Calculate its acceleration. ∆v a = t 24 a = 3 a = 8 metres per second per second Using Light Gates to Measure Acceleration Just as light gates can be used to measure speed, light gates can be used to measure acceleration also. To calculate acceleration you need to know an initial speed and a final speed. This is achieved by using a double card. The same effect can also be achieved by using a single card and two light gates. double card vehicle 2 31/05/2018 National 4 Physics - Dynamics and Space Summary Notes Speed-Time Graphs Speed-time graphs can provide information about the motion of an object. The graphs below demonstrate the shape obtained for different types of motion. At rest Constant speed speed speed time time Acceleration or Negative acceleration speeding up or slowing down speed speed time time A speed time graph can tell us how far an object has travelled. The distance travelled is equal to the area under the graph. The graph can be split into sections and the area of each calculated. The sum of these is equal to the distance travelled. 10 speed in metres per second ½×b×h b×h ½×b×h 0 4 8 12 time in seconds Total area = (½ × 4 × 10) + (4 × 10) + (½ × 4 × 10) = 80 metres 3 31/05/2018 National 4 Physics - Dynamics and Space Summary Notes Measuring Acceleration from Speed-Time Graphs Information can be obtained from a speed-time graph which allows acceleration to be calculated. Worked example A car accelerates from 20 metres per second to 80 metres per second in a time of 10 seconds as shown in the graph below. Calculate its acceleration between 0 seconds and 10 seconds. 100 80 speed in metres per 60 second 40 20 0 1 2 3 4 5 6 7 8 9 10 11 12 time in seconds ∆v a = t 60 a = 10 a = 6 m s- 2 Forces, Motion and Energy Force is measured in newtons. When a force is applied to an object it can change its shape, its speed or its direction of travel. When forces are applied to an object they can either be balanced or unbalanced. In a situation where the forces are balanced there are either no forces acting on the object or the forces that are acting, cancel each other out. Remember that force is a vector quantity with both direction and magnitude. equal and opposite forces are balanced 4 31/05/2018 National 4 Physics - Dynamics and Space Summary Notes In a situation where the forces are unbalanced there will be a net or resultant force acting on the object. unequal forces are unbalanced Sir Isaac Newton summarised the effect of forces in his three Laws of Motion. Newton’s First Law of Motion states: “An object at rest will remain at rest unless acted on by an unbalanced force. An object in motion continues in motion with the same speed and in the same direction unless acted upon by an unbalanced force.” In simple terms, this means that: if the forces acting on a stationary object are all balanced the object remains at rest; if the forces acting on a moving object are all balanced the object will continue to move at a steady speed in a straight line; if the forces acting on an object are unbalanced the object will accelerate in the direction of the unbalanced force. Worked example Calculate the resultant force acting on the football and describe its motion as a result. 5 newtons 12 newtons 4 newtons Total force to the right = 9 newtons. Total force to the left = 12 newtons. Resultant force = 3 newtons to the left. 5 31/05/2018 National 4 Physics - Dynamics and Space Summary Notes Frictional Forces Whenever an object moves against another object, it experiences frictional forces. These forces act in the opposite direction to the movement. Friction makes it more difficult for things to move. Helpful Unhelpful friction between our shoes and the If you do not lubricate your bike regularly floor stop us from slipping with oil, the friction in the chain and axles increases. Your bike will be noisy and difficult to pedal. friction between tyres and the road When there is a lot of friction between stop cars from skidding moving parts, energy is transferred to the surroundings, causing heating. Think of what happens when you rub your hands together quickly. friction between the brakes and Bikes, cars and other moving objects wheel help bikes and cars to slow experience air resistance as they move. down Increase Friction Decrease Friction Use rough surface Lubricate machinery Increase Surface Area Decrease surface area/streamline Aerofoils Smooth surfaces e.g. waxing skis Newton’s Second Law of Motion states: “The acceleration of an object is dependent upon two variables – the net force acting upon the object and the mass of the object. The acceleration of an object depends directly upon the net force and inversely upon the mass of the object. The relationship between an object's mass m, its acceleration a, and the applied force F is: F = m × a. 6 31/05/2018 National 4 Physics - Dynamics and Space Summary Notes If there are more than two forces acting on an object, it is important that it is the net unbalanced force that is used in the calculation. Using the equation below can help you to remember this. Fun = m × a. where Fun = unbalanced force measured in newtons m = mass measured in kilograms a = acceleration measured in metres per second per second In simple terms this means that if an object is acted on by an unbalanced force it will accelerate. The amount of acceleration increases as the force increases. However if you apply the same force to a larger mass the acceleration will be less. Worked example A cyclist pedals to produce a forward force of 200 newtons. The forces of friction acting on the cyclist are 60 newtons. (a) Find the resultant force acting on the cyclist. (b) Calculate the acceleration of the cyclist if he has a mass of 70 kilograms. (a) Resultant force = 200 − 60 = 140 N. (b) F = m×a 140 = 70 × a 140 a= 70 a = 2 m etres per second per second Weight and Gravity A gravitational field exists around the Earth as shown opposite. It acts on any mass to attract it towards the Earth. The downwards force per kilogram is called the gravitational field strength and is 9·8 newtons per kilogram on Earth. Note that mass is defined as the amount of matter in a body and is measured in kilograms. 7 31/05/2018 National 4 Physics - Dynamics and Space Summary Notes Weight is the force with which the Earth’s gravity pulls an object downwards and, as it is a force, is measured in newtons. weight = m g where weight = is measured in newtons m = mass measured in kilograms g = gravitational field strength and is 9·8 newtons per kilogram on Earth Worked example A pupil has a mass of 50 kilograms. Calculate her weight. weight = mass × gravitational field strength weight = m g weight = 50 × 9·8 = 490 newtons The value of gravitational field strength (g) varies from planet to planet. Whilst the mass of objects will not vary, their weight will, depending upon where the object is. The table below shows values of g for the moon and different planets. Planet Gravitational field strength (newtons per kilogram) Moon 1·6 Mercury 3·7 Venus 8·9 Earth 9·8 Mars 3·7 Jupiter 26 Saturn 11·2 Uranus 9·0 Neptune 11·3 Worked example A hammer has a mass of 1·2 kilograms. Calculate the weight of the hammer on the moon. weight = m g weight = 1·2 × 1·6 = 1·92 newtons 8 31/05/2018 National 4 Physics - Dynamics and Space Summary Notes Space exploration The exploration of space and the technology involved has brought a lot of benefits. There is also a negative side to the exploration of space. You must decide if it is worth the risk. Benefits Communication – modern communication uses satellites and could not function as it does without them. Satellite navigation – this is not only used in cars but a whole range of industries including shipping, mining and aviation. The oil industry uses it to accurately position drilling rigs. Jobs – there are thousands of people employed directly by the space industry but there are probably millions who are employed in spin off technology such as satellite communication including mobile phones and television. Spin-off technologies. Many applications that are developed for the space industry have been adopted widely and are now part of everyday life such as bar codes, miniaturised electronics, scratch resistant glasses, industrial materials, cordless power tools, water purification systems – even non-stick coatings for frying pans! Mapping – satellites are able to accurately map the surface of the earth which aids important industries such as mining and can improve land use. Weather monitoring – accurately predicting weather patterns and anticipating dangerous hurricanes and tropical storms is now made more accurate and easier through using satellite imaging. Satisfying our curiosity – finding out more about the universe and our place in it has become possible through the advances in space exploration. In the past 50 years we have sent men to the Moon and probes to distant planets. Risks and Costs Pollution of space with debris from satellites and spacecraft. There is a risk that some debris may fall to Earth and reach the Earth’s surface. The risk of being hit is infinitely small though Danger to life – several astronauts have lost their lives in both the Apollo Moon missions and shuttle missions. Cost – the budget for space exploration is high could that money be better spent elsewhere. 9 31/05/2018 National 4 Physics - Dynamics and Space Summary Notes Re-entry and Heat In space there is no atmosphere and hence no friction for spacecraft to contend with. However, when re-entering the Earth’s atmosphere at high speed, the spacecraft faces problems. If the spacecraft hits the atmosphere at the wrong angle it can bounce back into space like a stone skipping off water. The atmosphere also creates a great deal of friction creating a lot of heat. As the spacecraft loses kinetic energy this is converted into heat energy. The space shuttle is covered with heat resistant tiles which prevent damage to the shuttle. Older spacecraft such as the American Apollo missions and Russian Soyuz missions used a system called ablation to prevent damage to the re-entry modules like the one shown opposite. The underside of the craft which experiences most friction is covered with a heat shield, a material which undergoes a process called ablation. This means that it removes excess heat by melting. The heat absorbed by the heat shield to melt it is called the latent heat of fusion. Satellites A satellite is in orbit around the Earth and although satellite technology is common now, the first satellite was only launched in 1957. Satellites can be either orbiting or geostationary. Orbiting satellites orbit at a lower height above the Earth’s surface and can be used to map the ground, observe weather or be used for military purposes. 10 31/05/2018 National 4 Physics - Dynamics and Space Summary Notes Geostationary satellites are in a higher orbit and orbit the Earth once every 24 hours. As a result, they always remain in the same position above the Earth’s surface. They are mostly used for telecommunications and weather observation. Satellites often carry receivers and curved dish transmitters which consist of a curved reflector with an aerial or antenna in front. The signals being received by the satellite can be quite weak. The curved dish collects these signals and focuses them onto the antenna. The bigger the dish, the antenna more signals it can collect and the stronger the final signal will be. curved dish antenna signal being received by dish 11 31/05/2018 National 4 Physics - Dynamics and Space Summary Notes Cosmology You should know a number of definitions and terms relating to space and the universe. Planet - a body revolving around a star. Moon - a body revolving around a planet. Star - a ball of burning gas at the centre of a solar system. Sun - the star at the centre of our solar system. Solar system - a star and its associated planets. Galaxy - a grouping of solar systems. Universe - all the matter that we know of. Exo-planet – a planet outside our solar system. A light Year On Earth, distances are measured in kilometres. In space, the distances involved are so large that they are measured in light years i.e. the distance that light will travel in 1 year. Since light travels at 300 000 000 metres per second and there are 31 500 000 (60 × 60 × 24 × 365) seconds in a year it means that in 1 year light travels 9·5 million million kilometres. Some important distances in light years are: The Sun to the Earth - 8·5 minutes The Sun to the nearest star - 4·3 light years The diameter of the Milky Way - 120 000 light years Exoplanets An exoplanet, or extrasolar planet, is a planet outside our Solar System. More than a thousand such planets have been discovered. There are at least 100 billion planets in the Milky Way, with at least one planet on average per star. Around 1 in 5 Sun-like stars have an "Earth-sized" planet which might be able to support life so the nearest would be expected to be within 12 light-years distance from Earth. Astronomers have estimated that there could be as many as 40 billion Earth-sized planets orbiting in the habitable zones of Sun-like stars and red dwarfs within the Milky Way. Most of the known exoplanets are giant planets—estimated to be the size of Jupiter or Neptune—because the larger and more massive planets are more easily detected. The discovery of exoplanets leads to the next question—could they support life. In order to support life, conditions on the planet’s surface must be right. 12 31/05/2018 National 4 Physics - Dynamics and Space Summary Notes Life on Other Planets For life to exist on other planets they must fulfil certain conditions. Orbit around the star Some planets do not have a circular orbit around their star like the Earths. This means that the temperature on the planet’s surface can vary between extremes which make it uninhabitable. Distance of orbit from the Sun If a planet orbits very close to the Sun it will be too hot to allow life. If its orbit is too far away from the planet it will be too cold for life to survive. Planet size Factors such as the size, mass and density of a planet affect its gravitational field strength. If a planet has a high value (Earth’s is 9·8 newtons per kilogram) any living organism would need very strong bones to support it— assuming it was large enough to need bones. The gravitational field strength also affects the ability of a planet to hang onto its atmosphere. If it is too low the atmosphere will disappear into space. Presence of water Life as we know it requires water so it would have to be present at temperatures which allow it to be in liquid form. Presence of an atmosphere Life as we know it requires oxygen in an atmosphere. This has to be at a certain concentration to allow life to develop, too much or too little is a bad thing. The atmosphere also protects life on the planet’s surface from harmful radiation from the star. 13 31/05/2018

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