1. University Physics: Mechanics Ch4. TWO- AND THREE-DIMENSIONAL MOTION Lecture 4 Dr.-Ing. Erwin Sitompul http://zitompul.wordpress.com

2. 4/2 Erwin SitompulUniversity Physics: Mechanics Solution of Homework 3: The Beetles Starting point 1 st run, 0.5 m 2 nd run, 0.8 m 1 st run, 1.6 m 2 nd run, ? New location

3. 4/3 Erwin SitompulUniversity Physics: Mechanics Thus, the second run of the green beetle corresponds to the vector Solution of Homework 3: The Beetles New location Starting point A B C D → → → →

4. 4/4 Erwin SitompulUniversity Physics: Mechanics Solution of Homework 3: The Beetles (a) The magnitude of the second run? (b) The direction of the second run? N E S W D → The direction of the second run is 79.09° south of due east or 10.91° east of due south.

5. 4/5 Erwin SitompulUniversity Physics: Mechanics Moving in Two and Three Dimensions  In this chapter we extends the material of the preceding chapters to two and three dimensions.  Position, velocity, and acceleration are again used, but they are now a little more complex because of the extra dimensions.

6. 4/6 Erwin SitompulUniversity Physics: Mechanics Position and Displacement  One general way of locating a particle is with a position vector r,  The coefficients x, z, and y give the particle’s location along the coordinate axes and relative to the origin.  The following figure shows a particle with position vector  In rectangular coordinates, the position is given by (–3 m, 2 m, 5 m). →

7. 4/7 Erwin SitompulUniversity Physics: Mechanics Position and Displacement  As a particle moves, its position vector changes in a way that the vector always extends from the origin to the particle.  If the position vector changes from r 1 to r 2, then the particle’s displacement delta is: →→

8. 4/8 Erwin SitompulUniversity Physics: Mechanics Average Velocity and Instantaneous Velocity  If a particle moves through a displacement Δr in a time interval Δt, then its average velocity v avg is:  The equation above can be rewritten in vector components as: → →

9. 4/9 Erwin SitompulUniversity Physics: Mechanics  The particle’s instantaneous velocity v is the velocity of the particle at some instant.  The direction of instantaneous velocity of a particle is always tangent to the particle’s path at the particle’s position. Average Velocity and Instantaneous Velocity →

10. 4/10 Erwin SitompulUniversity Physics: Mechanics Average Velocity and Instantaneous Velocity  Writing the last equation in unit-vector form:  This equation can be simplified by rewriting it as: where the scalar components of v are:  The next figure shows a velocity vector v and its scalar x and y components. Note that v is tangent to the particle’s path at the particle’s position. → → →

11. 4/11 Erwin SitompulUniversity Physics: Mechanics The figure below shows a circular path taken by a particle. If the instantaneous velocity of the particle at a certain time is v = 2i – 2j m/s, through which quadrant is the particle currently moving when it is traveling (a) clockwise (b)counterclockwise (a) clockwise(b) counterclockwise First quadrant Third quadrant Average Velocity and Instantaneous Velocity ^ ^ →

12. 4/12 Erwin SitompulUniversity Physics: Mechanics Homework 4: The Plane A plane flies 483 km west from city A to city B in 45 min and then 966 km south from city B to city C in 1.5 h. From the total trip of the plane, determine: (a) the magnitude of its displacement; (b) the direction of its displacement; (c) the magnitude of its average velocity; (d) the direction of its average velocity; (e) its average speed.

13. 4/13 Erwin SitompulUniversity Physics: Mechanics Homework 4 A turtle starts moving from its original position with the speed 10 cm/s in the direction 25° north of due east for 1 minute. Afterwards, it continues to move south for 2 m in 8 s. From the total movement of the turtle, determine: (a) the magnitude of its displacement; (b) the direction of its displacement; (c) the magnitude of its average velocity; (d) the direction of its average velocity; (e) its average speed. New