1. Ch 2 Velocity ~Motion in One Dimension~

2. Scalar versus Vector Scalar – quantity that only has magnitude Vector – quantity that has magnitude and direction.

3. Three friends drive their four wheelers a distance of 100.0 m. Will they end up in the same place? Why or why not. No, 100.0 m is a scalar and does not specify a specific direction. Now suppose they drive 175.0 m due East. Will they end up in the same place? Why or why not. Yes, 100.0 m East is a vector. It has direction Scalar versus Vector

4. Distance Distance is the measure of separation between two objects. It is given the variable “d” and is measured in meters (m). If the positions are known, distance is calculated as follows. The distance between the buoys be? The distance from the shore to each buoy is. Distance is a scalar quantity. 012345678910111213141516 13m 3m and 16m 16m 3m3m

5. Displacement When an object is displaced, it is moved from an initial position (x 1 ) to a final position (x 2 ). Displacement (variable  x) is a measure of the change in position of an object after it has moved.

6. Example Displacement - Distance John travels east along a straight highway and passes mile marker 260. John continues until mile marker 150 and then doubles back to mile marker 175. What is Johns displacement from marker 260? +85 miles What is the total distance John traveled? 135 miles

7. Example Displacement - Distance John travels west along a straight highway and passes mile marker 260. John continues until mile marker 150 and then doubles back to mile marker 175. What is Johns displacement from marker 260? -85 miles What is the total distance John traveled? 135 miles

9. Average Velocity Average Velocity – the change in position of an object over a given time interval. Finial positionInitial position Initial time Final time Vector or Scalar??

10. A ball moves at 12m/s and coasts up a hill with a uniform acceleration of -1.6m/s2. Example Distance traveled for the 1 st 6s. Distance traveled for the 1 st 9s.

11. Simultaneous equations Solve the following equations for both x and y x = 6 Y = 11

12. Simultaneous equations An F-15 on patrol traveling at 103m/s is ordered to over take and observe what is believed to be a hostile MIG jet fighter flying at 323Km/hr in the same direction as the F- 15. The MIG is 3.8Km ahead of the F-15. How far (Km) will the F-15 travel before over taking the MIG?

13. Average Acceleration The rate at which the Velocity changes. –Scalar or vector? Average acceleration Change in velocity Change in time What are the units of acceleration?

14. Average Acceleration Can an object speed up and have a negative average acceleration? –YES! Let’s see an example how!

15. Practice Problem – Avg Acceleration Simon rolls backwards faster and faster down his driveway. He starts at -2.0 m/s and is moving at -9.0 m/s 2.0 s later. What is his average acceleration? Negative a! AHH H!!!!

16. Average Acceleration Can an object slow down and have a positive average acceleration? –YES! Let’s see an example how!

17. Practice Problem – Avg Acceleration Simon rolls up the other side of the ramp and slows down from-9.0m/s to - 2m/s in 2s. What is his average acceleration? AHH H!!!!

18. -250 100 150 250 0102030405060708090 Time (s) 0 -50 -100 -150 -200 Position (m) 50 200 Position vs. Time Graph

19. What is the position of the object at t = 10s? What is the position of the object at t = 40s? What is the position of the object at t = 60s? Position vs. Time Graph -25 -20 -15 -10 -5 0 5 10 15 20 25 0102030405060708090 Position (m) Time (s)

20. Position vs. Time Graph -25 -20 -15 -10 -5 0 5 10 15 20 25 0102030405060708090 Position (m) Time (s)

21. Position vs. Time Graph -25 -20 -15 -10 -5 0 5 10 15 20 25 0102030405060708090 Position (m) Time (s) + Slope + Velocity Moving forwards - Slope - Velocity Moving backwards 0 Slope 0 Velocity Not moving

22. Position vs. Time Graph -25 -20 -15 -10 -5 0 5 10 15 20 25 0102030405060708090 Position (m) Time (s) During what time period(s) is the object moving forward? During what time period(s) is the object moving backwards? During what time period(s) is the object not moving?

23. Instantaneous Velocity Draw a tangent line at the point that corresponds to that instant in time Find the slope of that tangent line at 5.0s, 2.0s, and 9.0s. Rise - Δd Run - Δt

24. Position Time Graphs Velocity Time Graphs Velocity vs. Time Graph - 25 - 20 - 15 -10 -5 0 5 10 15 20 25 0102030405060708090 Time (s) Velocity (m/s) Position vs. Time Graph -25 -20 -15 -10 -5 0 5 10 15 20 25 0102030405060708090 Position (m) Time (s) Position–Time graphs lets us calculate velocity. Velocity–Time graphs lets us calculate displacement (  x).

25. Area Calculations In order to calculate area, you will need to know how to find the area of different shapes. TrapezoidTriangleRectangle/Square

26. Velocity vs. Time Graph - 25 - 20 - 15 -10 -5 0 5 10 15 20 25 0102030405060708090 Time (s) Velocity (m/s) Displacement equals the area between the curve and the x-axis. (  d = Area) Find the displacement between 10s-25s.

27. “Negative” Area Area above the x- axis indicates positive displacement. Area below the x- axis indicates negative displacement. Negative velocity means negative displacement Velocity vs. Time Graph - 25 - 20 - 15 -10 -5 0 5 10 15 20 25 0102030405060708090 Time (s) Velocity (m/s)

28. Velocity vs. Time Graph - 25 - 20 - 15 -10 -5 0 5 10 15 20 25 0102030405060708090 Time (s) Velocity (m/s) Displacement equals the area under the curve (  d = Area) Find the distance traveled between 40-55s

29. Velocity vs. Time Graph - 25 - 20 - 15 -10 -5 0 5 10 15 20 25 0102030405060708090 Time (s) Velocity (m/s) Displacement equals the area under the curve (  d = Area) Find the distance traveled between 25-65s

30. Velocity vs. Time Graph - 25 - 20 - 15 -10 -5 0 5 10 15 20 25 0102030405060708090 Time (s) Velocity (m/s) Displacement equals the area under the curve (  d = Area) Find the displacement traveled between 10-55s

31. Velocity vs. Time Graph - 25 - 20 - 15 -10 -5 0 5 10 15 20 25 0102030405060708090 Time (s) Velocity (m/s) Find the displacement between 40-75s 337.5m left

32. Velocity-Time ΔvΔv ΔtΔt What is the average acceleration of the object over the first 2 s? Slope of velocity-time graph is the average acceleration!!

33. Velocity-Time Graphs During what time period(s) does the object have a positive acceleration? During what time period(s) does the object have a negative acceleration? During what time period(s) is the object not accelerating?

34. Velocity-Time Graphs During what time period(s) is the sign of the velocity and acceleration opposite?

35. Constant Acceleration Acceleration that does not change in time is uniform or constant acceleration. On a Velocity-Time Graph, constant acceleration is a straight line

36. Velocity – Time Graph The slope is the Acceleration

37. Velocity of an Object with Constant Acceleration Constant Acceleration = Uniform Acceleration What would the graph of a versus t look like?

38. Velocity of an Object with Constant Acceleration D vs t v vs t a vs t

39. Zero Acceleration, Constant Speed We can use small triangles to visualize the distance traveled per increment of time. The same amount of distance is covered in the same amount of time. The speed of the object remained constant.

40. Negative Acceleration We can use small triangles to visualize the distance traveled per increment of time. The second triangle is much smaller that the first triangle. The larger size means that the body traveled more distance in the same increment of time The object was moving slower during the second increment. The object experienced a negative acceleration.

41. Positive Acceleration We can use small triangles to visualize the distance traveled per increment of time. The second triangle is much larger that the first triangle. The larger size means that the body traveled more distance in the same increment of time The object was moving faster during the second increment. The object experienced a positive acceleration.

42. Instantaneous Speed You raced your 4-wheeler over a 30 mile long track in 1.5 hours. What is your average speed? 20mph Watch the animation. Is the speed always 20mph?

43. Graphs of Motion Label the three distance v. time graphs below as either accelerating positive, accelerating negative, or zero acceleration.

44. Velocity versus Time Label the three velocity versus time graphs below as either – accelerating positive –accelerating negative –zero acceleration. Simply read the values directly from the graph.