Suppose two trains are moving in the same directions at X m/s and Y m/s then their relative speed

Size: px
Start display at page:

Download "Suppose two trains are moving in the same directions at X m/s and Y m/s then their relative speed"

Transcription

1 Distance (D) = Speed (S) Time (T) X kmph = X 5 18 m/s X m/s = X 18 5 kmph If the ratio of the speeds A & B is a : b, then the ratio of the times taken by them to cover the same distance is = 1 a 1 b = b : a Suppose two trains are moving in the same directions at X m/s and Y m/s then their relative speed = (X Y) m/s Suppose two trains are moving in the opposite directions at X m/s and Y m/s then their relative speed = (X + Y) m/s If two trains of length A meters and B meters are moving in same directions at X m/s and Y m/s then the time taken by the trains to cross each other = A+B X Y seconds If trains move in opposite direction s = A+B X+Y seconds

2 1 Samir drove at the speed of 45kmph from home to resort. Returning over the same route he got stuck in traffic and took an hours longer. Also he could drive only at the speed of 40 kmph. How many kilometers did he drive each way? Let distance = D D = 360 km (answer) D 45 D 40 = 1 2 A 320 meter long train moving an average speed of 120 kmph crosses a platform in 24 seconds. A man crosses the platform in 4 minutes. What is the speed of the man in m/s. Platform length = X- meters X = X = 480 meters Therefore, man s speed = = 2 m/s (answer) 3 A driver was supposed to drive at a uniform speed to cover a distance of 180 km, he was 54 minutes late. To cover this lost time he had to increase the speed by 10 kmph, what is the original speed Let original speed = X- kmph

3 X = 40 kmph (answer) 180 X 180 X + 10 = A car covers a certain distance taking 7 hours in forward journey. During the return journey speed was increased by 12 kmph and it takes 5 hours. What is the total distance. Let the speed = X- kmph 7 X = 5(X + 12) X = 30 kmph Therefore, Distance => 7X = 7 30 = 210 km (answer) 5 Two trains of equal length running in opposite directions, pass a pole in 18 & 12 seconds. The train will cross each other in.. Train length = X- meters 1 st train speed = X/18 m/s 2 nd train speed = X/12 m/s Relative speed => X/18 + X/12 = 5X/36 m/s Total distance => X + X = 2X meters Therefore, Time = Distance Speed = 2X 5x 36 = 14.4 seconds (answer) 6 A thief seeing a policeman from a distance of 200 meters starts running with a speed of 8 kmph. The policeman gives chase immediately with a speed of 9 kmph and the thief is caught. The distance run by the thief is.

4 Relative speed => (9-8) = 1 kmph = 1 5 = 5/18 m/s 18 Time taken by policeman to chase thief = = 720 seconds Distance run by the thief => = 1600 meters (answer) 7 A train moving at a rate of 36 kmph crosses a standing man in 10 seconds. It will cross a platform 55 meters long in.. Speed => 36 5 = 10 m/s 18 Distance of train => = 100 meters Total distance => = 155 meters Time = = 15.5 seconds (answer) 8 A person travels 285 km in 6 hours. In the first part of the journey he travels at 40 kmph by bus. In the second part, he travels at 55 kmph by train. The distance travelled by train is.. Train distance = X, Bus distance = 285 X X = 165 km (answer) X X = A train overtakes two persons who are walking in the same directions in which the train is running at the rate of 2 kmph and 4 kmph and passes them completely in 9 seconds and 10 seconds respectively. The length of the train is.

5 Let train speed = S, Distance = D And, D S 4 = From above equations, we get D = 50 meters (answer) D S 2 = Ramana started a journey at 1 pm at 30 kmph. Karthik started from the same spot and in the same direction at 1.40 pm at 40 kmph. Kartikovertook Ramana in. Since Kartik starts 40 minutes after Ramana Distance covered by Ramana in 40 minutes => = 20 km 60 Relative speed => = 10 kmph Therefore, time = = 2 hours (answer) 11 A train crosses a man on the platform in 8.5 seconds and crosses the platform of 240 meters in length in 20.5 seconds. What is the length of the train.. Train length = X, Train speed = Y X = 8.5 seconds (1) Y X Y 20.5 seconds.. (2)

6 From equations 1 & 2 X = 170 meters (answer) 12 A motor car does a journey in 17.5 hours covering the first half at 30 kmph and the second half at 40 kmph. Find the distance of the journey. Distance (D) = S T D = 600 km (answer) = 2 X Y X + Y T = ( ) A car starts from A for B travelling 20 kmph. 1 ½ hours later another car starts from A & travelling at the rate of 30 kmph reaches B, 2 ½ hours before the first car. Find the distance from A to B.. Distance = D D = 240 km (answer) D 20 D 30 = If a man walks 20 km at 5 kmph, he will be late by 40 minutes. If he walks at 8 kmph, how early from the fixed time will he reach Time (T) = 20 5 = 4 hours Fixed time = 4 hours 40 minutes = 3.20 minutes Time taken to cover 20 km at 8 kmph = 20 8 = 2.30 minutes Therefore, required time => 3.20 minutes 2.30

7 minutes = 50 minutes (answer) 15 In covering a certain distance, the speed of A & B in the ratio of 3: 4. Atakes 30 minutes more than B to reach the destination. The time taken by A to reach the destination Distance =D Let A s speed = 3X kmph B s speed = 4X kmph D 3X D 4X = D 3X = 2 hours Therefore, time taken by A to reach the destination = 2 hours (answer) 16 A train covers certain distance between two places at a uniform speed. If the train moved 10 kmph faster, it would take 2 hours less. And, if the train was slower by 10 kmph, it would take 3 hours more than the scheduled time. Find the distance covered by the train If the distance be X- km and usual speed be Y- kmph Then usual time = X/Y hours x y + 10 = x y 2 And, x y 10 = x y + 3 x = 3y(y 10) 10. (2) x = y(y + 2) (1) 5

8 From equations (1) and (2) We get, x = 600 km (answer) 17 A train passes two bridges of lengths 800 m & 400 m in 100 seconds & 60 seconds respectively. The length of the train is. Train length = X- meters As given, speed = x Speed = x From equations 1 & 2 X = 200 meters (answer) (1). (2) 18 Two cars start at the same time from one point and move along two roads at right angle to each other. Their speeds are 36 kmph& 48 kmph respectively. After 15 seconds the distance between them will be Let O be the starting point. The car running at 36 kmph is moving along OB & that at 48 kmph moving along OA. Also let they reach at B & A after 15 seconds respectively OA = = 200 meters 18 OB = = 150 meters 18 Required distance AB = (200) 2 + (150) 2 = 250 meters (answer) 19 Two trains start from stations A & B and travel towards each other at speeds of 50 kmph and 60 kmph respectively. At the time of their meeting, the

9 second train has travelled 120 km more than the first. The distance between A & B is Relative speed => = 10 kmph Time (T) = 120 = 12 hours 10 Therefore, distance of AB => = 1320 km (answer) 20 A train running at 7/11th of its own speed reached a place in 22 hours. How much time could be saved if the train would run at its own speed Since the train runs at 7/11 th of its own speed The time it takes is 11/7 th of its usual time Let the usual time taken be T- hours Then we can write, 11 7 T = 22 T = 14 hours Therefore, time saved => = 8 hours (answer) 21 A man can reach a certain place in 30 hours. If he reduces his speed by 1/15th he goes 10 km less in that time. Find his speed in kmph. Let the speed of the man = X- kmph 30 X 30(X x 15 ) = 10 X = 5 kmph (answer) 22 Two trains, Kolkata & Mumbai starts at the same time from stations Kolkata & Mumbai respectively towards each other. After passing each other they take 12 hours & 3 hours to reach Mumbai & Kolkata respectively. If the

10 Kolkata train is moving at the speed of the 48 kmph, the speed of the Mumbai train is. Formula, S 1 T 1 = S 2 T 2 S 2 = 96 kmph (answer) = S Two trains starts at the same time from Mumbai & Pune and proceed towards each other at the rate of 60 kmph& 40 kmph respectively. When they meet it is found that one train has travelled 20 km more than the other. Find the distance between Mumbai & Pune Both will meet at the time => T = D 100 Also 60T 40T => 20T = 20 T = 1 So, D = 100T => = 100 km (answer) 24 A boy takes as much time in running 12 meters as a car takes in covering 36 meters. The ratio of the speeds of the boy & the car is Here time is same, so Boy s speed = X- kmph & Car s speed = Y kmph Therefore, 12 = 36 x y X: Y = 1: 3 (answer) 25 A & B are two stations. A train goes from A to B at 64 kmph and returns to A at a slower speed. If its average speed for the whole journey is 56 kmph, at what speed did it return?

11 2 x y x + y = 56 (from formula) Y = kmph (answer) 2 64 Y 64 + Y = Amit started cycling along the boundaries of a square field from cover point A. After half an hour, he reached the corner point C, diagonally opposite to A. If his speed was 8 kmph, what is the area of the field in square. Distance covered in 1 hour = 2X 2 = X = 4 => X= 2 Area => X 2 = (2) 2 = 4 sq. km (answer) 27 A train travelling at 48 kmph completely crosses another train having half it length and travelling in opposite directions at 42 kmph in 12 seconds. It also passes a railway platform in 45 seconds. The length of the platform is

12 1 st train length = X- meters 2 nd train length = x 2 meters Relative speed ( ) = 90 kmph = = 25 m/s And, X+ X 2 25 = 12 => X = 200 meters And length of the platform = Y- meters Speed of the first train = m/s Y = Y = 400 meters (answer) = A man is walking at a speed of 10 kmph. After every km, he takes a rest for 5 minutes. How much time will he take to cover a distance of 5 km Total time for rest = 20 minutes (from question) Time = 5 10 = 1 2 hour or 30 minutes Therefore, total time => 30 minutes + 20 minutes = 50 minutes (answer) 29 In a one kilometer race, A can beat B by 30 meters while in a 500 meter race B can beat C by 25 meters. By how many meters will A beat C in a 100 meter race.. When A runs 1000 meter, B runs 970 meter When B runs 500 meter, C runs 475 meter When B runs 97 meter, C runs =? = meter A will beat C by ( ) = 7.85 meter (answer)

13 30 A car covers 1/5 of the distance from A to B at the speed of 8 kmph, 1/10 of the distance at 25 kmph and remaining at the speed of 20 kmph. Find the average speed of the whole journey Let the total distance = 1 km Time = distance/ time Therefore, total time = = = 8/25 hours Therefore, average speed = Total distance/ total time = = kmph (answer) 31 A boy started from his house by bicycle at 10 am at a speed of 12 kmph. His elder brother started after 1 hour 15 minutes by scooter along the same path and caught him at 1.30 pm. The speed of the scooter will be (kmph).. Distance covered by cycling in 3 ½ hours = Distance covered by scooter in 2 ¼ hours Let speed of the scooter = X = x 9 4 X = kmph (answer) 32 Buses start from a bus terminal with a speed of 20 kmph at intervals of 10 minutes. What is the speed of a man coming from the opposite direction towards the bus terminal if he meets the buses at intervals of 8 minutes..

14 Distance covered in 10 minutes at 20 kmph = Distance covered in 8 minutes at (20 + X) kmph Here, X = Speed of the man = (20 + X) X = 5 kmph (answer) 33 A railway half- ticket costs half the full rate. But the reservation charge on the half- ticket is the same as that on full ticket. One reserved full ticket for a journey between two stations is 525/- and the cost of one full and one half reserved tickets is 850/-. What is the reservation charge Let the half- ticket = X/- Reservation charge = Y/- Therefore, full ticket will be = 2X 2 X+ Y = (1) 2 X + Y + X + Y = 850 3X + 2Y = 850 (2) From equations 1 &2 X = 200/- & Y = 125/- Therefore, reservation charge Y = 125/- (answer) 34 A man travels 35 km partly at 4 kmph and at 5 kmph. If he covers former distance at 5 kmph and later distance at 4 kmph, he could cover 2 km more in the same time. The time taken to cover the whole distance at original rate is Suppose the man covers first distance in X- hours and second distance in Y- hours Then, 4 X + 5Y = 35 (1) 5 X + 4Y = 37. (2) From equations 1 & 2

15 X = 5- hours & Y = 3- hours Therefore, total time taken => = 8 hours (answer) 35 Two persons, Ajith&Lalitha start at the same time from Secunderabad& Vijayawada and proceed towards each other at 45 kmph and 54 kmph respectively. When they meet, it is found that one of them has travelled 72 km more than the other. The distance between the places.. 9 km (54-45) difference arises in the 99 km ( ) distance So, 72 km difference will arise in 792 km distance i. e ? = 792 km (answer) 36 The distance between two cities is 800 km. A motor car starts from the first city at the speed of 30 kmph. At the same time, another car starts from the second city towards the first city at the speed of 50 kmph. The distance of the point from the first city where both the cars meet is Since time of travel for both cars is same So, V 1 = 30 kmph& V 2 = 50 kmph Time = distance/speed D1 V1 = D2 V2 D = = 300 km (answer) 37 A train can travel 50% faster than a car. Both starts from point A at the same time and reach point B 75 km away from A at the same time. On the way, however the train lost about 12.5 minutes while stopping at the stations. The speed of the car is..

16 Let the speed of the car = X- kmph Then speed of the train => X = 3x 2 kmph X = 120 kmph (answer) 75 X 75 3X 2 = In a KM race A can beat B by 80 meters and B can beat C by 60 meters. In the same race, A can beat C by.. While A runs 1000 meters, B runs => = 920 meters And while B runs 1000 meters, C runs => = 940 meters While B runs 920 meters, C runs => = meters While A runs 1000 meters, C runs 4324 meters Therefore, A can beat C by = = meters (answer) 5 39 In a 100 meter race, A runs at 5 kmph. A gives B a start of 8 meter and still beats him by 8 seconds. Find out the speed of B.. Time taken by A to cover 100 meter = ( 5 18 ) = 72 seconds Therefore B covers (100-8) or 92 meters in (72 + 8) or 80 seconds Therefore, speed of B = = 4.14 kmph (answer) ( 18 5 ) 40 A can run 224 meters in 28 seconds and B in 32 seconds. By what distance A beat B..

17 Clearly A beats B by 4 seconds (32-28=4) Now find out how much B will run in these 4 seconds Speed of B => = 7 m/s Distance covered by B in 4 seconds => speed time = 7 4= 28 meters (answer) 41 The speed of a car is increased by 2 km after every hour. If the distance travelled in the first hour was 35 km, then what was the total distance travelled in 12 hours This is the problem of arithmetic progression with the first term a = 35 Common difference d = 2 And, total no. of terms (n) = 12 The sum of this series will be the total distance travelled Sum S n = n 2 [2a + (n 1) d] = 12 2 [ (12 1) 2] = 552 km (answer) 42 A man can reach a certain place in 30 hours. If he reduces his speed by 1/15th, he goes 10 km less in that time. Find his speed per hour. Let speed = S 30 S 30 ( 14 s 1 ) = 10 (1 = 14 ) S = 5 kmph (answer) 43 When a person reduces his speed from 42 kmph to 36 kmph he takes 20

18 minutes more than his usual time taken. Find the usual time taken by him Actual speed (S 1 ) = 42 kmph After reducing, speed (S 2 ) = 36 kmph Time difference => 20 minutes => 20 = 1/3 hours Time = Distance / Speed By solving we get D = 84 km Therefore, actual time => D S1 = D S1 D S2 = 1 3 D 42 D 36 = 1 3 = 2 hours (answer) 44 A cyclist covers a distance of 24 km in a certain time with a certain fixed uniform speed. If he increases his speed by 2 kmph, he takes 2 hours less to cover the same distance. Find his original speed. Let original speed of the cyclist = X kmph Distance = 24 km (constant) 1 st case: 2 nd case: 24 X 24 (X+2) Difference: 2 hours X = 4 kmph (answer) Time = Distance Speed 24 X 24 X + 2 = 2

19 45 Two gunshots were fired at the interval of 12 minutes. One person moving towards the place from where gunshots were fired, listens the two sounds at the interval of 11 minutes. If the speed of sound is 330 m/s, find the speed of the person Distance travelled by sound in (12 11) minutes will be equal to distance travelled by person in 11 minutes X = 30 m/s (answer) = x Two friends started walking simultaneously from points A and B towards each other. 144 minutes later the distance between them was 20% of the original distance. After how much time they meet each other? Let the original distance between A and B is 5x Km Time taken to travel CD = 144 = 36 minutes (answer) 4 47 A dog finds a cat a 25 leaps away. The cat sees the dog coming towards it and starts running with the dog in hot pursuit. In every minute, the dog makes 5 leaps and the cat makes 6 leaps and one lap of the dog is equal to 2 leaps of the cat. Find the time in which the dog will catch the cat. Initial distance = 25 dog leaps Per minute dog makes 5 dog leaps

20 Per minute cat makes 6 cat leaps = 3 dog leaps Relative speed = 2 dog leaps per minute Then, an initial distance of 25 dog leaps would be covered in 12.5 minutes (answer) 47 A thief steals car at 1.30 pm and drives it at 45 kmph. The theft is discovered at 2 pm and the owner sets off in another car at 50 kmph. He will overtake the thief at. Here there is a gap of half an hour As the theft discovered at 2 pm Distance covered by thief in half an hour = = km Relative speed, = 5 kmph Relative speed in same direction is the difference in speed Time = distance = 22.5 = 4. 5 hours Relative speed 5 So, 2 pm hours = 6.30 pm (answer) 48 Hari and Ravi started a race from opposite ends of the pool. After a minute and a half, they passed each other in the centre of the pool. If they lost no time in turning and maintained their respective speeds, how many minutes after starting did they pass each other second time?

21 First meeting 3 minutes 2 In second meeting, they will have to cover double distance than their first meeting Therefore, total time = = 4 1 minutes (answer) 2 49 Two guns were fired from the same place at an interval of 10 minutes and 30 seconds, but a person in the train approaching the place hears the second shot 10 minutes after the first. The speed of the (in kmph), supposing that sound travels at 330 metres per second Let the speed of the train be x m/s Then, Distance travelled by the train in 10 minutes = Distance travelled by sound in 30 seconds x = x = 16.5 Therefore, speed of the train = 16.5 m/s = kmph = 59.4 kmph (answer) 50 The Taxi charges in a city contain fixed charges and additional charge per km. The fixed charge is for a distance of upto 5 km and additional charge per km thereafter. The charge for a distance of 10 km is 350/- and for 25 km is 800/-. The charge for a distance of 30 km is.. Fare of 10 km /- Fare of 25 km /- 5

22 Therefore, additional charge per km = = 30/- per km So, charge upto 5 km = 350 (5 30) = 200/- Fare of 30 km = 5 km + 25 km = = 950/- (answer) 51 A train after travelling 60 km meets with an accident and then proceeds at 3 of its former speed and arrives at its destination 40 minutes 4 late. If the accident could have occurred 20 km ahead, it would have reached the destination 10 minute earlier. Find the speed of the train.. Original time taken for B to D = 40 3 => 120 Minutes If accident takes place after 25 km then original time for C to D = (40 10) 3 => 90 minutes Time taken for travelling 25 km = 30 minutes Speed of Train = = 50 kmph (answer) 52 The Speeds of three Cars are in the ratio 3 : 4 : 5. The time taken by each of them to travel the same distance is in the ratio is

23 Speed = Distance [Formula] Time 1 For the same distance, Speed Required ratio = = = 20 : 15 : 12 (answer) Time 53 The auto rickshaw fare consists of a fixed charge together with the charge for the distance covered. For a journey of 10 km, the charge paid is 85/- and for a journey of 15 km, the charge paid is 120/-. The fare for a journey of 25 km will be.. Auto rickshaw charge for distance covered = x Fixed charge = y According to charge 10x + y = 85.. (1) 15x + y = 120. (2) From equations (1) and (2) x = 7, y = 15 Hence fare for journey of 25 km = (25x + y) = = 190/- (answer) 54 A Railway passenger counts the telegraph poles on the rail road as the passes them. The telegraph poles are at a distance of 50 m. What will be his count in 4 hours if the speed of the train is 45 kmph Distance travelled by train in 4 hours = 45 4 = 180 km No. of telegraph poles = = 3600 (answer)

24 55 An aeroplane first flew with a speed of 440 kmph and covered a certain distance. It still had to cover 770 km less than what it had already covered but it flew with a speed of 660 kmph. The average speed for the entire flight was 500 kmph. Find the total distance covered.. Total Distance Average Speed = Total Time 500 = 2x 770 x x x = 1760 Total distance covered = 2x 770 = = 2750 km (answer)

3. Walking 3/4th of his usual rate, a man is 15min late. Find his usual time in minutes A. 30 B. 35 C. 45 D. 25

3. Walking 3/4th of his usual rate, a man is 15min late. Find his usual time in minutes A. 30 B. 35 C. 45 D. 25 1. A car covers its journey at the speed of 80km/hr in 10hours. If the same distance is to be covered in 4 hours, by how much the speed of car will have to increase? A. 40km/hr B. 60km/hr C. 90km/hr D.

More information

SPEED, TIME & DISTANCE EXERCISE

SPEED, TIME & DISTANCE EXERCISE SPEED, TIME & DISTANCE EXERCISE 1. An aeroplane flies along the four sides of a square at the speeds of 00, 400, 0 and 500 km/h. Find the average speed of the plane around the field. (a) 384km/h (b) 370

More information

EXERCISE : TIME, SPEED & DISTANCE

EXERCISE : TIME, SPEED & DISTANCE ABOUT DISHA PUBLICATION One of the leading publishers in India, Disha Publication provides books and study materials for schools and various competitive exams being continuously held across the country.

More information

Basic Formulae. Speed Time & Distance. Speed Time & Distance: Train Problems

Basic Formulae. Speed Time & Distance. Speed Time & Distance: Train Problems Basic Formulae Speed Time & Distance Train Problems: Basic Concepts and Formulae- Distance Speed = Time Time = Distance / Speed Distance = Speed Time 1 m/s = 18/5 Km/hr 1 km/hr = 5/18 m/s Relative Speed

More information

Time & Distance short Tricks & Questions with solutions By Governmentadda.com

Time & Distance short Tricks & Questions with solutions By Governmentadda.com Time & Distance short Tricks & Questions with solutions By Governmentadda.com Daily Visit GovernmentAdda.com (A Complete Hub for Government Exams Preparation) 1 Please support us by joining below Groups

More information

TIME, SPEED AND DISTANCE

TIME, SPEED AND DISTANCE ABOUT DISHA PUBLICATION One of the leading publishers in India, Disha Publication provides books and study materials for schools and various competitive eams being continuously held across the country.

More information

Time and Distance Questions for Bank Clerk Pre Exams.

Time and Distance Questions for Bank Clerk Pre Exams. Time and Distance Questions for Bank Clerk Pre Exams. Time and distance Quiz 6 Directions: Study the following Questions carefully and choose the right answer: 1. A man starts from a place P and reaches

More information

7.3.2 Distance Time Graphs

7.3.2 Distance Time Graphs 7.3.2 Distance Time Graphs 35 minutes 39 marks Page 1 of 11 Q1. A cyclist goes on a long ride. The graph shows how the distance travelled changes with time during the ride. (i) Between which two points

More information

4.7 Uniform Motion (work).notebook November 15, UNIFORM MOTION

4.7 Uniform Motion (work).notebook November 15, UNIFORM MOTION 4.7 UNIFORM MOTION When an object moves at a constant speed, or rate, it is said to be in uniform motion. The formula d = rt is used to solve uniform motion problems. Example 1 An airplane flies 1000 miles

More information

The distance-time graphs below represent the motion of a car. Match the descriptions with the graphs. Explain your answers.

The distance-time graphs below represent the motion of a car. Match the descriptions with the graphs. Explain your answers. Motion Graphs 6 The distance-time graphs below represent the motion of a car. Match the descriptions with the graphs. Explain your answers. Descriptions: 1. The car is stopped. 2. The car is traveling

More information

Distance-time graphs

Distance-time graphs Distance-time graphs Name & Set 1 Someone runs a race at a steady speed. The runner s motion is plotted as a distance-time graph below. distance /m 100 80 60 40 20 0 0 2 4 6 8 10 12 time /s (i) Over what

More information

GOING MY WAY EXAMPLES

GOING MY WAY EXAMPLES GOING MY WAY EXAMPLES When an object moves at a constant speed, or rate, it is said to be in uniform motion. The formula d = rt is used to solve uniform motion problems. In the formula, d represents distance,

More information

NCERT solution for Motion and Time

NCERT solution for Motion and Time 1 NCERT solution for Motion and Time Question 1 Classify the following as along a straight line, circular or oscillatory : (i) Motion of your hands while running. (ii) Motion of a horse pulling a cart

More information

2. On a position-time graph such as Figure 2-18, what represents the velocity?

2. On a position-time graph such as Figure 2-18, what represents the velocity? HONORS PHYSICS PROBLEM SET ONE DIMENSIONAL MOTION DISPLACEMENT AND VELOCITY 1. On the graph in Figure 2-18, what is the total distance traveled during the recorded time interval? What is the displacement?

More information

Copenhagen Cycling Map. Red Lines Cycling facilities

Copenhagen Cycling Map. Red Lines Cycling facilities Copenhagen Cycling Map Red Lines Cycling facilities Copenhagen Cycling Facilities Design Approaches Transportation without Pollution Copenhagen s Strategy Where Cycling is one of the top key activities

More information

Figure 1. The distance the train travels between A and B is not the same as the displacement of the train.

Figure 1. The distance the train travels between A and B is not the same as the displacement of the train. THE DISTANCE-TIME RELATIONSHIP Q1. A train travels from town A to town B. Figure 1 shows the route taken by the train. Figure 1 has been drawn to scale. Figure 1 (a) The distance the train travels between

More information

Match words and pictures

Match words and pictures Match words and pictures Vocabulary Worksheet - Transport bicycle 1 2 3 bus car 1 helicopter hot-air balloon 4 5 6 jet ski motorbike 7 8 9 motor boat motor scooter plane 10 11 12 scooter ship submarine

More information

Figure 1 shows the distance time graph for a person walking to a bus stop. Figure 1. Time in seconds

Figure 1 shows the distance time graph for a person walking to a bus stop. Figure 1. Time in seconds (a) Figure shows the distance time graph for a person walking to a bus stop. Figure Time in seconds (i) Which one of the following statements describes the motion of the person between points R and S on

More information

Figure 1. What is the difference between distance and displacement?

Figure 1. What is the difference between distance and displacement? Q1.A train travels from town A to town B. Figure 1 shows the route taken by the train. Figure 1 has been drawn to scale. Figure 1 (a) The distance the train travels between A and B is not the same as the

More information

VECTORS Important Questions from CBSE point of view

VECTORS Important Questions from CBSE point of view VECTORS Important Questions from CBSE point of view LEVEL-1 1. Two forces have their resultant equal to either. At what angle are they inclined? 2. Add a velocity of 30 m/s eastwards to a velocity of 40

More information

Wordproblems. 1. Problem solving

Wordproblems. 1. Problem solving Wordproblems 1. Problem solving Many problems can be translated into algebraic equations. When problems are solved using algebra, we follow these steps: Step 1: Read the problem. Step 2: Decide on the

More information

RAILWAY SAFETY. Please click on any of the links below to go directly to your specified topic within this document.

RAILWAY SAFETY. Please click on any of the links below to go directly to your specified topic within this document. RAILWAY SAFETY Please click on any of the links below to go directly to your specified topic within this document. Facts about Railway Property and Trains Railway Signs, Devices, and Warnings Railway Safety

More information

JR. GENIUS EDUCATIONAL SERVICES INC.

JR. GENIUS EDUCATIONAL SERVICES INC. 1 Name: 1. Multiple Choice: 25 marks Copy to Scantron Card after finding the answer on the sheet. Fill in the Scantron card in the last 5 min. of the test. Do Short section first. 1. You are riding your

More information

Puzzle Power: Practice Problems

Puzzle Power: Practice Problems Puzzle Power: Practice Problems 1.a With a 7-minute hourglass and an 11-minute hourglass, find the simplest way to time the boiling of an egg for 15 minutes. 1.b Three backpackers cooked rice for dinner.

More information

Staying Safe. Around Trains

Staying Safe. Around Trains Staying Safe Around Trains Trains are fun to watch but walking and playing near them can be dangerous. Kids have been hurt when they have been hit by trains. Don t play on the tracks or walk on or beside

More information

Although many factors contribute to car accidents, speeding is the

Although many factors contribute to car accidents, speeding is the 74 Measuring Speed l a b o r at o ry Although many factors contribute to car accidents, speeding is the most common kind of risky driving. Unsafe speed is involved in about 20% of fatal car accidents in

More information

Side Roads and Other Non-Signalised Junctions

Side Roads and Other Non-Signalised Junctions Green Surfacing Sections of the Cycle Superhighway are marked with green paint these highlight sections where people cycling the Superhighway are likely to come into contact with walkers, drivers, or other

More information

HONORS PHYSICS One Dimensional Kinematics

HONORS PHYSICS One Dimensional Kinematics HONORS PHYSICS One Dimensional Kinematics LESSON OBJECTIVES Be able to... 1. use appropriate metric units and significant figures for given measurements 2. identify aspects of motion such as position,

More information

Student Exploration: Distance-Time Graphs

Student Exploration: Distance-Time Graphs Name: Date: Student Exploration: Distance-Time Graphs Vocabulary: speed, y-intercept Prior Knowledge Questions (Do these BEFORE using the Gizmo.) Max ran 50 meters in 10 seconds. Molly ran 30 meters in

More information

Do not turn this page until you are asked to.

Do not turn this page until you are asked to. YEAR 7 MATHEMATICS EXAMINATION SEMESTER 2 2016 QUESTION AND ANSWER BOOKLET STUDENT NAME: TEACHER: DATE: TIME ALLOWED FOR THIS PAPER Reading time before commencing work: 10 minutes Working time for this

More information

2. A homemade car is capable of accelerating from rest to 100 km hr 1 in just 3.5 s. Assuming constant acceleration, find:

2. A homemade car is capable of accelerating from rest to 100 km hr 1 in just 3.5 s. Assuming constant acceleration, find: Preliminary Work 1. A motorcycle accelerates uniformly from rest to a speed of 100 km hr 1 in 5 s. Find: (a) its acceleration (b) the distance travelled in that time. [ Answer: (i) a = 5.56 ms 2 (ii) x

More information

Motion. 1 Describing Motion CHAPTER 2

Motion. 1 Describing Motion CHAPTER 2 CHAPTER 2 Motion What You ll Learn the difference between displacement and distance how to calculate an object s speed how to graph motion 1 Describing Motion 2(D), 4(A), 4(B) Before You Read Have you

More information

CHANGES IN FORCE AND MOTION

CHANGES IN FORCE AND MOTION reflect CRACK! That s the sound of a bat hitting a baseball. The ball fl ies through the air and lands over the fence for a home run. The motion of a batted ball seems simple enough. Yet, many forces act

More information

UNIT 12. A WORLD IN MOTION

UNIT 12. A WORLD IN MOTION NAME: UNIT 12. A WORLD IN MOTION 1. INTRODUCTION. BRAINSTORM Think and discuss about these questions: a) Are your rucksacks moving at the moment? b) Is a rucksack into a car moving? Use these sentences:

More information

Home Link Assignment # 1 - SIGNS

Home Link Assignment # 1 - SIGNS Home Link Assignment # 1 - SIGNS 1 A. Road slippery when wet B. Hidden intersection ahead C. Narrow road ahead D. Winding road ahead 2 A. Slow moving vehicle ahead B. Head end street ahead C. Yield right-of-way

More information

Physical Science You will need a calculator today!!

Physical Science You will need a calculator today!! Physical Science 11.3 You will need a calculator today!! Physical Science 11.3 Speed and Velocity Speed and Velocity Speed The ratio of the distance an object moves to the amount of time the object moves

More information

Road Safety Factsheet

Road Safety Factsheet Road Safety Factsheet Overtaking July 2017 Overtaking is one of the highest risk manoeuvres for both drivers and riders because it can put the overtaking vehicle into the path of oncoming traffic, often

More information

Mathematics (Project Maths Phase 3)

Mathematics (Project Maths Phase 3) *B6* Pre-Leaving Certificate Examination, 2014 Triailscrúdú na hardteistiméireachta, 2014 Mathematics (Project Maths Phase 3) Paper 1 Ordinary Level 2½ hours 300 marks Name: School: Address: Class: Teacher:

More information

SURVEY: TRAFFIC VOLUME COUNT AUGUST 2017

SURVEY: TRAFFIC VOLUME COUNT AUGUST 2017 SURVEY: TRAFFIC VOLUME COUNT AUGUST 2017 Traffic Volume Counts The Survey for Traffic Volume Count was conducted by - itrans, PDA & CEE in Consortium, for Pune Cycle Plan. The Traffic Volume Count survey

More information

California DMV Test. Mark the correct answers

California DMV Test. Mark the correct answers California DMV Test Mark the correct answers 1. When you leave your lane to pass another vehicle, you know you have enough room to return to your driving lane when you: Have passed the other vehicle's

More information

AQA P2.1.2 Forces and motion

AQA P2.1.2 Forces and motion AQA P2.1.2 Forces and motion 90 minutes 90 marks Page 1 of 23 Q1. The graph shows the distance a person walked on a short journey. (a) Choose from the phrases listed to complete the statements which follow.

More information

Parental Responsibilities

Parental Responsibilities Bicycle riding is a fun way to exercise and enjoy the outdoors. To remain safe on Illinois roads, bicyclists must obey the same traffic safety laws that govern vehicle drivers. No amount of bicycle safety

More information

1.0 Converting. 1. What is the speed of a person walking at 3.1 mph in m/s? Show your work and box your answer (check your units)

1.0 Converting. 1. What is the speed of a person walking at 3.1 mph in m/s? Show your work and box your answer (check your units) 1.0 Converting There are 1,609.34 meters in one mile. One meter equals 3.28 feet. I mph equals 0.44704 m/s 1. What is the speed of a person walking at 3.1 mph in m/s? Show your work and box your answer

More information

Peterborough Council on Aging

Peterborough Council on Aging Peterborough Council on Aging Discussion paper series #4, 2015 Transportation Transportation, including accessible and affordable public transport is a key factor influencing active aging. in particular,

More information

interchange audit ABERDEEN Introduction Purpose of the Interchange Audit Interchange Audit Linking cycling with public transport

interchange audit ABERDEEN Introduction Purpose of the Interchange Audit Interchange Audit Linking cycling with public transport interchange audit ABERDEEN Bus Station RAILWAY Station FERRY PORT Interchange Audit Susan Warren Jolin Warren 20 March 2014 Linking cycling with public transport Image copyright Boon Low Introduction Purpose

More information

Review - Kinematic Equations

Review - Kinematic Equations Review - Kinematic Equations 1. In an emergency braking exercise, a student driver stops a car travelling at 83 km/h [W] in a time of 4.0 s. What is the car s acceleration during this time? (The answer

More information

MEPS Report Reina Doi

MEPS Report Reina Doi MEPS Report 21.06.2010 0925866 Reina Doi 1. Task Survey at the bikeway network with respect to weaknesses/ gaps including elaboration of measures to enhance the situation. The bikeway network of Wiener

More information

Market Factors and Demand Analysis. World Bank

Market Factors and Demand Analysis. World Bank Market Factors and Demand Analysis Bank Workshop and Training on Urban Transport Planning and Reform. Baku, April 14-16, 2009 Market Factors The market for Public Transport is affected by a variety of

More information

1. Which one of the following is a vector quantity? A. time B. speed C. energy D. displacement

1. Which one of the following is a vector quantity? A. time B. speed C. energy D. displacement 1. Which one of the following is a vector quantity? A. time B. speed C. energy D. displacement 2. A car is travelling at a constant speed of 26.0 m/s down a slope which is 12.0 to the horizontal. What

More information

* BLACK TRIANGLES Correct Answer. * RED TRIANGLES Red / blue circles. * BLUE RECTANGLES Explanation

* BLACK TRIANGLES Correct Answer. * RED TRIANGLES Red / blue circles. * BLUE RECTANGLES Explanation 1 YOU MUST OBEY SIGNS GIVING ORDERS. THESE SIGNS ARE MOSTLY IN * BLACK TRIANGLES Correct Answer * RED TRIANGLES Red / blue circles. * BLUE RECTANGLES Explanation * RED / BLUE CIRCLES Traffic signs can

More information

VI. Market Factors and Deamnd Analysis

VI. Market Factors and Deamnd Analysis VI. Market Factors and Deamnd Analysis Introduction to Public Transport Planning and Reform VI-1 Market Factors The market for Public Transport is affected by a variety of factors No two cities or even

More information

Where are you right now? How fast are you moving? To answer these questions precisely, you

Where are you right now? How fast are you moving? To answer these questions precisely, you 4.1 Position, Speed, and Velocity Where are you right now? How fast are you moving? To answer these questions precisely, you need to use the concepts of position, speed, and velocity. These ideas apply

More information

Encouraging Taxi Drivers to Behave: Grafton Bridge Taxi and Bus Lane Trial. Rob Douglas-Jones Tim Segedin, Edin Ltd.

Encouraging Taxi Drivers to Behave: Grafton Bridge Taxi and Bus Lane Trial. Rob Douglas-Jones Tim Segedin, Edin Ltd. Encouraging Taxi Drivers to Behave: Grafton Bridge Taxi and Bus Lane Trial Rob Douglas-Jones Tim Segedin, Edin Ltd. 2.1km 12 mins Hospital 1.5km 9 mins To Newmarket 5 500 bikes per day 500 pedestrians

More information

Kolkata City Fatal Accident Study (April 2016 March 2017)

Kolkata City Fatal Accident Study (April 2016 March 2017) Kolkata City Fatal Accident Study (April 2016 March 2017) Submitted to Deputy Commissioner of Police (Traffic), Kolkata City 18 April, 2017 18 April 2017 Kolkata city fatal accident study 1 Overview JPRI

More information

ST BEDE S CATHOLIC COLLEGE TRAFFIC MANAGEMENT PLAN

ST BEDE S CATHOLIC COLLEGE TRAFFIC MANAGEMENT PLAN ST BEDE S CATHOLIC COLLEGE TRAFFIC MANAGEMENT PLAN APPLICABLE TO Staff, students and parents DOCUMENT OWNER Principal APPROVAL DATE 6 th July 2018 APPROVED BY Principal SCHOOL ACTIONS School Policy Staff

More information

By the end of this set of exercises, you should be able to. interpret Distance Time Graphs. solve problems involving speed, distance and time

By the end of this set of exercises, you should be able to. interpret Distance Time Graphs. solve problems involving speed, distance and time SPEED, DISTANCE AND TIME By the end of this set of exercises, you should be able to (a) (b) interpret Distance Time Graphs solve problems involving speed, distance and Mathematics Support Materials: Mathematics

More information

London starts new bike hire scheme

London starts new bike hire scheme www.breaking News English.com Ready-to-use ESL/EFL Lessons by Sean Banville 1,000 IDEAS & ACTIVITIES FOR LANGUAGE TEACHERS The Breaking News English.com Resource Book http://www.breakingnewsenglish.com/book.html

More information

Name: Date Due: Motion. Physical Science Chapter 2

Name: Date Due: Motion. Physical Science Chapter 2 Name: Date Due: Motion Physical Science Chapter 2 What is Motion? 1. Define the following terms: a. motion= a. frame of reference= b. distance= c. vector= d. displacement= 2. Why is it important to have

More information

A STUDY OF SIMULATION MODEL FOR PEDESTRIAN MOVEMENT WITH EVACUATION AND QUEUING

A STUDY OF SIMULATION MODEL FOR PEDESTRIAN MOVEMENT WITH EVACUATION AND QUEUING A STUDY OF SIMULATION MODEL FOR PEDESTRIAN MOVEMENT WITH EVACUATION AND QUEUING Shigeyuki Okazaki a and Satoshi Matsushita a a Department of Architecture and Civil Engineering, Faculty of Engineering,

More information

One Dimensional Kinematics Challenge Problems

One Dimensional Kinematics Challenge Problems One Dimensional Kinematics Challenge Problems Problem 1: One-Dimensional Kinematics: Two stones are released from rest at a certain height, one after the other. a) Will the difference between their speeds

More information

Strategies for Elimination Races

Strategies for Elimination Races Strategies for Elimination Races Although not a championship event, the elimination race is a crowd favorite. The elimination race is also called the Miss and Out or the Devil Take the Hindmost. It is

More information

Be Safe! Follow School Bus Safety Rules. Prepared by: Pupil Transportation Unit Manitoba Education & Advanced Learning

Be Safe! Follow School Bus Safety Rules. Prepared by: Pupil Transportation Unit Manitoba Education & Advanced Learning Follow School Bus Safety Rules Prepared by: Pupil Transportation Unit Manitoba Education & Advanced Learning WHAT IS SCHOOL BUS SAFETY? Not reaching under the bus! Being careful in the DANGER ZONES! Getting

More information

More Word Problems. Front 19 x 19x. Rear 14 x (x + 525) Solve: 19x + 14(x + 525) = 31, front and 1265 rear

More Word Problems. Front 19 x 19x. Rear 14 x (x + 525) Solve: 19x + 14(x + 525) = 31, front and 1265 rear Name: Date: More Word Problems 1) Tickets to a concert were $19 for the seats near the front and $14 for the rear seats. There were 525 more rear seats sold than front seats, and sales for all tickets

More information

Coast Riders Motorcycle Club. Group Ride Guidelines

Coast Riders Motorcycle Club. Group Ride Guidelines Coast Riders Motorcycle Club Group Ride Guidelines Coast Riders Group Riding Guidelines... 2 Part One The Formation... 2 Spacing... 3 Group Size... 3 Part Two The Participants... 4 The Group Leader...

More information

Shedding Light on Motion Episode 4: Graphing Motion

Shedding Light on Motion Episode 4: Graphing Motion Shedding Light on Motion Episode 4: Graphing Motion In a 100-metre sprint, when do athletes reach their highest speed? When do they accelerate at the highest rate and at what point, if any, do they stop

More information

Port-a-potties will be available at the assembly area for use by your group during the time before the parade begins.

Port-a-potties will be available at the assembly area for use by your group during the time before the parade begins. Dear Parade Participant: Thank you for entering the 2012 Atlanta Pride Parade sponsored by Delta Air Lines. As Chairperson of the Parade and on behalf of the entire Atlanta Pride Committee we sincerely

More information

Application of Geometric Mean

Application of Geometric Mean Section 8-1: Geometric Means SOL: None Objective: Find the geometric mean between two numbers Solve problems involving relationships between parts of a right triangle and the altitude to its hypotenuse

More information

Road Markings. Lecture Notes in Transportation Systems Engineering. Prof. Tom V. Mathew

Road Markings. Lecture Notes in Transportation Systems Engineering. Prof. Tom V. Mathew Road Markings Lecture Notes in Transportation Systems Engineering Prof. Tom V. Mathew 1 Overview The essential purpose of road markings is to guide and control traffic on a highway. They supplement the

More information

Chapter 11 Motion. Displacement-. Always includes Shorter than distance

Chapter 11 Motion. Displacement-. Always includes Shorter than distance Chapter 11 Motion Section 1 - an object s change in position relative to a reference point. Observe objects in to other objects. international unit for. Frame of Reference Frame of reference- a system

More information

Presentation on INTEGRATION OF FEEDER SERVICES WITH BRTS CORRIDOR- MUMBAI-PUNE ROAD 5th Dec UMI, New Delhi Mr. S. S. Savane and Mr. D. R.

Presentation on INTEGRATION OF FEEDER SERVICES WITH BRTS CORRIDOR- MUMBAI-PUNE ROAD 5th Dec UMI, New Delhi Mr. S. S. Savane and Mr. D. R. Presentation on INTEGRATION OF FEEDER SERVICES WITH BRTS CORRIDOR- MUMBAI-PUNE ROAD 5th Dec. 2013 UMI, New Delhi Mr. S. S. Savane and Mr. D. R. Jundhare WE WOULD LIKE TO SHARE Introduction to Pimpri Chinchwad

More information

Reasoning Questions Quiz with Solution for UGC NET Exam.

Reasoning Questions Quiz with Solution for UGC NET Exam. Reasoning Questions Quiz with Solution for UGC NET Exam. Direction Sense Quiz 10 Directions: Read the following Questions carefully and choose the right answer: 1. One fine morning on his morning walk,

More information

R O A D S A F E T Y E D U C A T I O N

R O A D S A F E T Y E D U C A T I O N R O A D S A F E T Y E D U C A T I O N Pedestrians Just because you use the road doesn t mean you own it One in five road deaths is a pedestrian. 74% of pedestrian deaths are caused by the pedestrian most

More information

C) miles per hour. D) all of the above. 2) When you look at the speedometer in a moving car, you can see the car's

C) miles per hour. D) all of the above. 2) When you look at the speedometer in a moving car, you can see the car's Practice Kinematics Questions (Answers are at the end ) 1) One possible unit of speed is. A) light years per century. B) kilometers per hour. C) miles per hour. D) all of the above.. 2) When you look at

More information

CHAPTER 3 TEST REVIEW

CHAPTER 3 TEST REVIEW AP PHYSICS Name: Period: Date: DEVIL PHYSICS BADDEST CLASS ON CAMPUS 50 Multiple Choice 45 Single Response 5 Multi-Response Free Response 3 Short Free Response 2 Long Free Response AP EXAM CHAPTER TEST

More information

Cutnell/Johnson Physics

Cutnell/Johnson Physics Cutnell/Johnson Physics Classroom Response System Questions Chapter 3 Kinematics in Two Dimensions Interactive Lecture Questions 3.1.1. A truck drives due south for 1.2 km in 1.5 minutes. Then, the truck

More information

Clinic (U5/U6) Program Adventure Theme Practice Plans

Clinic (U5/U6) Program Adventure Theme Practice Plans Clinic (U5/U6) Program Adventure Theme Practice Plans Thank you for coaching. The following eight practice plans are to be used in sequence throughout your season. All activities are age appropriate and

More information

Physics 1.8: Average Speed & Average Velocity

Physics 1.8: Average Speed & Average Velocity Physics 1.8: Average Speed & Average Velocity ICan2Ed, Inc. Average speed is defined as the total distance covered divided by the time interval. Adding all the distances of the sections of travel and dividing

More information

WAVES: WAVE BEHAVIOUR QUESTIONS

WAVES: WAVE BEHAVIOUR QUESTIONS WAVES: WAVE BEHAVIOUR QUESTIONS Waves (2017;3) During her summer break, Sarah goes to her holiday home by the beach. Due to rocks at the beach, the depth of the water changes sharply. At the beach Sarah

More information

Jeddah Knowledge International School. Science Revision Pack Answer Key Quarter 3 Grade 10

Jeddah Knowledge International School. Science Revision Pack Answer Key Quarter 3 Grade 10 Jeddah Knowledge International School Science Revision Pack Answer Key 2016-2017 Quarter 3 Grade 10 Name: Section: ANSWER KEY- SCIENCE GRADE 10, QUARTER 3 1 1. What are the units for mass? A Kilograms

More information

get across road safety AN ESSENTIAL GUIDE FOR PARENTS WITH CHILDREN IN THE AGE ZONE:

get across road safety AN ESSENTIAL GUIDE FOR PARENTS WITH CHILDREN IN THE AGE ZONE: get across road safety AN ESSENTIAL GUIDE FOR PARENTS WITH CHILDREN IN THE AGE ZONE: 0 1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 did you know The best way to teach road safety is to practice in real life situations.

More information

ROAD TRAFFIC CODE PENALTIES NOTE; Not all penalty provisions are recorded here. If not listed please refer to RTC.

ROAD TRAFFIC CODE PENALTIES NOTE; Not all penalty provisions are recorded here. If not listed please refer to RTC. REG 9 ROAD TRAFFIC CODE PENALTIES NOTE; Not all penalty provisions are recorded here. If not listed please refer to RTC. Max penalties (regs 230 21) 1 st offence -Subsequent offence Max penalties (all

More information

BEST PRACTICES FOR ACCESSIBLE TRANSPORT. C G B (Kit) Mitchell

BEST PRACTICES FOR ACCESSIBLE TRANSPORT. C G B (Kit) Mitchell BEST PRACTICES FOR ACCESSIBLE TRANSPORT by C G B (Kit) Mitchell Independent mobility is necessary for independent living Many people with disabilities use cars, either as driver or passenger Those who

More information

1 Identify and explain ten important road signs.

1 Identify and explain ten important road signs. ROAD SAFETY ADVENTURER AWARD BOOK By Lyn Webb 1 Identify and explain ten important road signs. What does a SPEED LIMITED AREA sign mean? These signs are used to indicate an area where a lower speed limit

More information

GCSE 185/08 MATHEMATICS FOUNDATION TIER PAPER 2. A.M. THURSDAY, 17 November hours. Centre Number. Candidate Number. Surname.

GCSE 185/08 MATHEMATICS FOUNDATION TIER PAPER 2. A.M. THURSDAY, 17 November hours. Centre Number. Candidate Number. Surname. Surname Other Names Centre Number 0 Candidate Number GCSE 185/08 MATHEMATICS FOUNDATION TIER PAPER 2 A.M. THURSDAY, 17 November 2011 2 hours For s use Question Maximum Mark Mark Awarded ADDITIONAL MATERIALS

More information

SAFETY GUIDE FOR SCHOOL CHILDREN & PARENTS. toronto.ca/visionzeroto #VisionZeroTO

SAFETY GUIDE FOR SCHOOL CHILDREN & PARENTS. toronto.ca/visionzeroto #VisionZeroTO SAFETY GUIDE FOR SCHOOL CHILDREN & PARENTS toronto.ca/visionzeroto #VisionZeroTO VISION ZERO ROAD SAFETY PLAN Toronto s Vision Zero Road Safety Plan is a five-year strategy for eliminating traffic-related

More information

Pass your Driving Test with confidence

Pass your Driving Test with confidence Pass your Driving Test with confidence Sample theory questions, and answers to help you prepare for your driving test. Q1. When should you not drive? While under the influence of alcohol, drugs (prescribed

More information

Chapter Twenty-eight SIGHT DISTANCE BUREAU OF LOCAL ROADS AND STREETS MANUAL

Chapter Twenty-eight SIGHT DISTANCE BUREAU OF LOCAL ROADS AND STREETS MANUAL Chapter Twenty-eight SIGHT DISTANCE BUREAU OF LOCAL ROADS AND STREETS MANUAL Jan 2006 SIGHT DISTANCE 28(i) Chapter Twenty-eight SIGHT DISTANCE Table of Contents Section Page 28-1 STOPPING SIGHT DISTANCE

More information

Last First Date Per SETTLE LAB: Speed AND Velocity (pp for help) SPEED. Variables. Variables

Last First Date Per SETTLE LAB: Speed AND Velocity (pp for help) SPEED. Variables. Variables DISTANCE Last First Date Per SETTLE LAB: Speed AND Velocity (pp108-111 for help) Pre-Activity NOTES 1. What is speed? SPEED 5-4 - 3-2 - 1 2. What is the formula used to calculate average speed? 3. Calculate

More information

In the Interest of Safety: Transit Safety Slide Reference Guide

In the Interest of Safety: Transit Safety Slide Reference Guide In the Interest of Safety: Transit Safety Slide Reference Guide Slide T-1: In the Interest of Safety: Transit Safety Welcome to In the Interest of Safety: Transit Safety. Suggested Opening: Thank you for

More information

D) 83 m D) Acceleration remains the same and speed increases. C) 216 m B) 6.0 m shorter A) 4.5 s A) 15 km/hr C) 47 m C) 20 m/sec B) 20 m/sec

D) 83 m D) Acceleration remains the same and speed increases. C) 216 m B) 6.0 m shorter A) 4.5 s A) 15 km/hr C) 47 m C) 20 m/sec B) 20 m/sec 1. A truck, initially traveling at a speed of 22 meters per second, increases speed at a constant rate of 2.4 meters per second 2 for 3.2 seconds. What is the total distance traveled by the truck during

More information

Road Markings. Lecture Notes in Transportation Systems Engineering. Prof. Tom V. Mathew. 1 Overview 1. 2 Classification 2

Road Markings. Lecture Notes in Transportation Systems Engineering. Prof. Tom V. Mathew. 1 Overview 1. 2 Classification 2 Road Markings Lecture Notes in Transportation Systems Engineering Prof. Tom V. Mathew Contents 1 Overview 1 2 Classification 2 3 Longitudinal markings 2 3.1 Center line.....................................

More information

Traffic Signals. Part I

Traffic Signals. Part I Traffic Signals Part I Part I The Islamic University of Gaza Civil Engineering Department Traffic Engineering (Optional Course) ECIV 5332 Instructor: Dr. Yahya Sarraj Associate Prof. in Transportation

More information

You should know how to find the gradient of a straight line from a diagram or graph. This next section is just for revision.

You should know how to find the gradient of a straight line from a diagram or graph. This next section is just for revision. R1 INTERPRET THE GRADIENT OF A STRAIGHT LINE GRAPH AS A RATE OF CHANGE; RECOGNISE AND INTERPRET GRAPHS THAT ILLUSTRATE DIRECT AND INVERSE PROPORTION (foundation and higher tier) You should know how to

More information

Word Problems: Number Theory and past/future Alg. 1H

Word Problems: Number Theory and past/future Alg. 1H PS-A1 Word Problems: Number Theory and past/future Alg. 1H DO ON BINDER PAPER Define variables ("Let Statements"). Write a verbal model. Write an equation. Then solve your equation. Finally answer the

More information

Cycling Inclusive Transport Planning

Cycling Inclusive Transport Planning Cycling Inclusive Transport Planning Dr. Anvita Arora, Dr. Mark Zuidgeest*, Mark Kirkels Interface for Cycling Expertise *Cycling Academic Network ADB Transport Forum, Manila Activity Clinic 11 May 27th,

More information

METRO. Monthly Board Report. February 2009

METRO. Monthly Board Report. February 2009 METRO Monthly Board Report Operating Capital Service Performance February 29 3/17/29 February 29 MONTHLY BOARD REPORT Table of Contents Section A Section B Section C Section D Section E Section F Section

More information

Chapter 2 Two Dimensional Kinematics Homework # 09

Chapter 2 Two Dimensional Kinematics Homework # 09 Homework # 09 Pthagorean Theorem Projectile Motion Equations a 2 +b 2 =c 2 Trigonometric Definitions cos = sin = tan = a h o h o a v =v o v =v o + gt =v o t = o + v o t +½gt 2 v 2 = v 2 o + 2g( - o ) v

More information

Determining Minimum Sightlines at Grade Crossings: A Guide for Road Authorities and Railway Companies

Determining Minimum Sightlines at Grade Crossings: A Guide for Road Authorities and Railway Companies Determining Minimum Sightlines at Grade Crossings: A Guide for Road Authorities and Railway Companies Her Majesty the Queen in Right of Canada, represented by the Minister of Transport, 2015. Cette publication

More information

Road Safety Facilities Implemented in Japan

Road Safety Facilities Implemented in Japan Road Safety Facilities Implemented in Japan 1 Road Safety Facilities 1.Guard Fence 2.Road Lighting 3.Other Road Safety Facilities 2 Road Safety Facilities 1.Guard Fence 2.Road Lighting 3.Other Road Safety

More information

-Lexington Mayor, Jim Gray

-Lexington Mayor, Jim Gray DWIN Ride on over to Lexington, and enjoy some of the most beautiful countryside anywhere. Our trails and major roadway bike lanes have helped achieve bronze-level status from the League of American Bicyclists,

More information