* Your assessment is very important for improving the workof artificial intelligence, which forms the content of this project
Download past paper questions forces and motion
Survey
Document related concepts
Quasi-set theory wikipedia , lookup
Centripetal force wikipedia , lookup
Theoretical and experimental justification for the Schrödinger equation wikipedia , lookup
Eigenstate thermalization hypothesis wikipedia , lookup
N-body problem wikipedia , lookup
Atomic theory wikipedia , lookup
Seismometer wikipedia , lookup
Mass in special relativity wikipedia , lookup
Density of states wikipedia , lookup
Electromagnetic mass wikipedia , lookup
Transcript
A motorist starts out on a 210km journey at 8am. At 10am he stops for a 30 minute break after covering 180km. The motorist completes the journey at 11am. What is his average speed in covering the 210km? A 60km/h B 70km/h C 84km/h D 90km/h 0654/11/M/J/12 Q28 The diagrams show a glass tank with inside measurements of 5cm ×6cm ×4cm. The tank has a mass of 40g when empty. When the tank is filled with a liquid, the tank and liquid have a total mass of 220g. What is the density of the liquid? A B C D 220 (5×6×4) 220−40 (5×6×4) (5×6×4) 220 (5×6×4) 220−40 g/cm3 g/cm3 g/cm3 g/cm3 0654/11/M/J/12 Q29 A workman lifts a cubic block from ground level to a high shelf using a fork lift truck. A second workman has a metre rule and a stopwatch. Which quantity will the second workman be able to determine, using only the metre rule and the stopwatch? A the average speed of the block as it moves up B the density of the material of the block C the pressure exerted by the block on the shelf D the work done on the block when it is lifted 0654/11/M/J/12 Q30 The graph shows how the distance of an object changes with time. Between which two times is the object moving with a changing speed? A between 0s and 2s B between 2s and 4s C between 4s and 8s D between 8s and 12s 0654/12/M/J/12 Q28 The following are distance/time graphs. Which graph shows an object travelling at constant speed? 0654/11/O/N/12 Q28 What is the density of an object that has a mass of 20g and a volume of 5cm3? A 4g/cm3 B 15g/cm3 C 25g/cm3 D 100g/cm3 0654/11/O/N/12 Q29 A solid, rectangular metal block has the dimensions shown. The mass of the block is 2700g. What is the density of the metal? A. B. C. D. 2700 25×5 25×5 g/cm3 g/cm3 2700 2700 25×5×8 25×5×8 2700 g/cm3 g/cm3 0654/11/O/N/13 Q29 The diagram shows a distance/time graph for a journey. Which is the speed/time graph for this journey? 0654/11/M/J/13 Q28 Which property of an object cannot be affected by applying a force? A direction of movement B mass C shape D speed 0654/11/M/J/13 Q29 A cyclist takes 15 minutes to travel along the path PQRP. What is the average speed of the cyclist? A 0km/hour B 12km/hour C 20km/hour D 48km/hour 0654/12/M/J/13 Q28 Three forces act in the directions shown on each of the four blocks. Which block is in equilibrium? 0654/12/M/J/13 Q29 Sugar cane is a food crop grown in Australia. It is harvested and then transported on small trains to the processing plant. Fig. 1.1 shows one of the trains carrying sugar cane. (a) The mass of the engine and empty trucks is 20000kg and the mass of the sugar cane transported is 10000kg. The train travels at a speed of 0.5m/s. (i) Calculate the kinetic energy of the loaded train. State the formula that you use and show your working. formula used working [2] (ii) To travel at this speed, a driving force of 1000000N is needed. Calculate the work done by the engine when the train travels 1km. State the formula that you use and show your working. formula used working [2] (iii) It takes the train 5minutes to travel 1km. Calculate the power output of the engine. State the formula that you use and show your working. formula used working [2] (b) The water used to irrigate one sugar cane farm comes from a waterfall. The farmer attempts to reconstruct an experiment which may have been carried out by James Joule in 1847. Joule attempted to show that the water at the bottom of a waterfall was hotter than water at the top of the waterfall. His reasoning was that the water had gravitational potential energy at the top of the waterfall, which would be converted to kinetic energy as it fell. This kinetic energy would be changed to heat energy when the water fell into the pool at the bottom of the waterfall. (i) 1kg of water has 300J of gravitational potential energy at the top of the waterfall. State the maximum kinetic energy that 1kg of water will have when it reaches the bottom of the waterfall. Explain your answer. maximum kinetic energy explanation [1] (ii) Assuming that all the kinetic energy of the water is converted to thermal (heat) energy, calculate the temperature rise in the 1kg of water. The specific heat capacity of water is 4200J/kg°C. State the formula that you use and show your working. formula used working [3] 0654/31/M/J/12 Q1 (c) A car which is moving has kinetic energy. The faster a car goes, the more kinetic energy it has. The kinetic energy of the car is 1120000J when the car is travelling at 40m/s. Calculate the mass of the car. State the formula that you use and show your working. formula used working [2] (d) A driver is accompanied by four other passengers and their heavy luggage. Explain how the addition of the passengers and luggage affects the braking of the car compared to when the driver is alone in the car. [2] (e) A car is moving along a road. The mass of the car is 1200kg and the resultant force acting on it is 1500N. Calculate the acceleration of the car. State the formula that you use and show your working. formula used working [2] 0654/32/M/J/12 Q4 (part) You are going to find the density of the material used to make a plastic pipe as shown in Fig. 2.1. (a) Use Fig. 2.2, which shows a balance reading, to record the mass, M, of the piece of pipe to the nearest 0.1g. M= g [1] (b) (i) Use a ruler and Fig. 2.3 to measure the length, l, the external diameter, de, and the internal diameter, di, of the piece of pipe to the nearest 0.1cm. length, l= cm external diameter, de= internal diameter, di= cm cm [3] (ii) Use your values of the external diameter, de, and the internal diameter, di, to calculate k, using the formula given below. k= de2– di2 k= cm2 [2] (iii) Use your values in (b)(i)and (b)(ii)to calculate V, in cm3, the volume of the piece of pipe. Use the formula given below. 𝑉= 𝜋𝑘𝑙 4 V= cm3 [2] (c) Use your values of the mass, M, and the volume, V, of the piece of pipe, to calculate D, the density of the material used. Show clearly any formula you use. D= g/cm3 [2] 0654/62/M/J/12 Q2 (c) A speed – time graph for the car is shown in Fig. 9.2. It shows the motion of the car over a 25 second period. (i) State one part of the graph when the car was moving at constant speed and write down the value of this speed. part of graph speed [1] (ii) Calculate the distance travelled by the car between A and D. Show your working. [3] 0654/32/O/N/12 Q9c Fig. 3.1 shows two speed / time graphs for a car. (a) Describe the motion of the car in graph A, graph B. [1] (b) The car travels at 20m/s for 90 seconds. The total force driving the car forward is 1000N. Calculate the work done by this force during this 90 second journey. State the formulae that you use and show your working. formulae used working [3] (c) The manufacturer of the car gave the following information. • mass of car 950kg • the car will accelerate from 0 to 33m/s in 11 seconds (i) Calculate the acceleration of the car during the 11 seconds. Show your working. [2] (ii) Calculate the force needed to produce this acceleration. State the formula that you use and show your working. formula used working [2] (iii) The manufacturer claims the car can reach a maximum speed of 170km/hr. Explain, in terms of forces acting on the car, why there is a maximum speed (terminal velocity) that a car can reach. [2] 0654/33/O/N/12 Q3 Three boys, A, Band C, walk together from their school to a store. They stay at the store for a few minutes and then return to school. When they leave the store, • one boy walks back to school at a steady pace, • one boy walks back to school at a slower steady pace, • one boy slows down gradually as he walks back to school. The graph in Fig. 6.3 shows how their speeds vary with time. i) Calculate the distance of the store from the school. Show your working. [2] (ii) For how many seconds do the boys stay in the store? S [1] (iii) Which boy slowed down on his way back to school? Explain your answer. [1] 1) a) An elephant of mass 5000kg exerts a constant force of 1400N to push a tree trunk along at a steady speed of 1.5m/s. i) Calculate the work done by the elephant when the tree trunk moves 10m. State the formula that you use and show your working. formula working __________________ [2] ii) Calculate the kinetic energy of the elephant when it is moving at 1.5m/s. State the formula that you use and show your working. formula working __________________ [2] b) The elephant has a weight of 50000N and stands with all four feet in contact with the ground. Each foot of the elephant has an area of 0.2m2. Calculate the pressure exerted by the elephant on the ground. State the formula that you use and show your working. formula working __________________ [2] c) The volume of the elephant is 5m3. Its mass is 5000kg. Calculate the density of the elephant. State the formula that you use and show your working. formula working __________________ [2] 0654/32/M/J/13 Q2 Fig. 1.1 shows an experimental car powered by solar panels. (a) The speed/time graph in Fig. 1.2 shows the motion of the car over a short time. (i) On Fig. 1.2, label A at a point when the car was accelerating. [1] (ii) Calculate the total distance travelled by the car. Show your working. [2] 0654/33/M/J/13 Q1 (part) A student is doing an experiment to find the mass of a metre rule. He rests the rule on the pivot at the 40cm mark. He hangs a 100g load at the 10cm mark of the ruler. He hangs a balancing mass, m= 50g, on the other side of the rule so that the rule balances, see Fig. 2.1. The balancing mass is d cm from the pivot. • The student finds distance, d, and records it in Table 2.1. •He adds 10g to the balancing mass, m, and adjusts its position so that the rule balances. • He finds the new distance, d, and records it in Table 2.1. • He repeats this procedure using balancing masses, m, of 70, 80 and 90g. Table 2.1 Mass m / g Distance d / cm 50 34.6 1/𝑚 ⁄1/𝑔 0.020 60 28.8 0.017 21.9 0.013 70 80 90 (a) (i) Figs. 2.2 and 2.3 show the scale of the rule and the positions of the balancing masses when m= 70g and m= 90g. Read and record below the scale of the rule for each mass. scale reading for 70g mass = scale reading for 90g mass = cm cm [2] (ii) Use your answers to (i) to calculate the values of d for each mass. Record your values of d in Table 2.1. [1] 1 (iii) Calculate, to three decimal places, the values of 𝑚 for the masses 70g and 90g. Record these values in Table 2.1. [2] 1 𝑚 (b) (i) On the graph grid provided. plot distance, d, (vertical axis) against . Draw the best straight line. [2] (ii) Find the gradient of the straight line you have drawn. Show clearly on the graph how you obtain the values used to calculate the gradient. gradient = [2] (c) Calculate the mass of the rule using the formula mass of rule = 300 − mass of the ruler = 𝑔𝑟𝑎𝑑𝑖𝑒𝑛𝑡 . 10 g [1] 0654/61/O/N/12 Q2 A student is investigating forces acting at different angles. He is using the apparatus shown in Fig. 2.1. • He hangs a 20g mass, m, half way between the pulleys, at point X. • He places a protractor behind point X so that angle θ can be measured, as in Fig. 2.2. • He measures angle θ and records it in Table 2.1. • He repeats the experiment using masses of 40, 60 and 80g for mass, m. Table 2.1 Mass, m/g Angle θ /° Sine θ 0 0 0.00 20 11 0.19 40 22 0.37 60 80 (a) (i) Fig. 2.3 and 2.4 show the angles at point X for the masses m= 60g and m= 80g. For each diagram, read angle θ and record it in Table 2.1. [2] (ii) Use Table 2.2 to find the sines of the angles you have recorded in column 2 of Table 2.1. Record them in column 3 Table 2.1. [2] (b) (i) Plot a graph of sine θ (vertical axis) against mass, m on the grid below. Draw the best straight line. Extend it to the value of sine θ= 1.0. [3] (ii) Read and record the value of mass, m, when sine θ= 1.0. When sine θ= 1.0, mass m= g [1] (iii) In theory, m, from (b)(ii)should equal the sum of the two masses on the ends of the thread (= 100g). In practice it is rarely equal to the sum of the two masses. Suggest another force, acting in the apparatus, which could cause the difference. [1] (c) Suggest how the results of this experiment will compare if the experiment is carried out on the surface of the Moon, where the acceleration due to gravity is much smaller than on Earth. Explain your answer. [1] 0654/62/O/N/12 Q2 A science student is using the apparatus shown in Fig. 3.1 to investigate the relationship between the mass of a trolley and the time taken to travel along a track. The trolley has a mass of 100g. It is made from a light but strong material. It can be loaded with more masses. The weight, W, is a fixed mass used to accelerate the trolley along the smooth level 1 metre track. The release mechanism at point A and the contact point B are connected to a timer. • the student loads the trolley so that it has a total mass of 3kg • the trolley is released and the time taken to reach point Bis recorded in Table 3.1 • the trolley is loaded to give a different total mass and the experiment is repeated (a) Suggest the name of a metal or plastic that can be used to make the light, strong trolley. [1] (b) The timer displays for the two missing results are shown in Fig. 3.2. Record the times in Table 3.1. [1] (c) (i) Plot a graph of the time taken, t against total mass of the trolley on the grid provided. Label the axes. Use the points to draw a smooth curve. [3] (ii) When the curve is extended, it does not pass through the point (0,0). Suggest one reason why time, t, cannot be equal to 0.0s. [1] (d) On the same graph grid, draw a curve that might be obtained if the mass of the weight, W, is increased. Label your curve increased mass. [1] (e) (i) Name the force that causes the acceleration of the trolley. [1] (ii) State where, in the apparatus shown in Fig. 3.1, this force is acting to cause the acceleration of the trolley. Explain your answer. [2] 0654/63/O/N/12 Q3 (a) A student is finding the value of an unknown mass, M, of a fixed load by balancing it against a range of known masses on a metre rule. The apparatus is set up as shown in Fig 6.1. The unknown load of mass M, is fixed at the 5.0cm position. The student places a 60g mass, m, on the ruler. He adjusts the position of mass m, until the ruler is balanced. He records the distance, x cm, from the 50.0cm balance point in Table 6.1. (i) Use Fig 6.2 to find the distance, x, for masses equal to 80g and 90g and complete column 2 of Table 6.1. Measure to the centre of the mass. [2] (ii) Calculate 1 /x for each value of x and record your answers to 3 decimal places in Table 6.1. [2] (b) (i) On the grid provided, plot a graph of mass, m, (vertical axis) against 1/x. Draw the best straight line. (ii) Calculate the gradient of the line. Show clearly, on the graph, how you did this. gradient of the line [2] (c) Calculate the value of the unknown load of mass M, using the equation M= gradient/45 M= g [1] (d) This method of finding unknown masses is unsuitable for very small or very large masses. Suggest a reason for either of these. [1] 0654/61/M/J/13 Q6