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Vectors

Vectors. There are two kinds of quantities…. Scalars are quantities that have magnitude only, such as position speed time mass Vectors are quantities that have both magnitude and direction, such as displacement velocity acceleration. R R. R. head. tail. Notating vectors.

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Vectors

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  1. Vectors

  2. There are two kinds of quantities… • Scalars are quantities that have magnitude only, such as • position • speed • time • mass • Vectors are quantities that have both magnitude and direction, such as • displacement • velocity • acceleration

  3. R R R head tail Notating vectors • This is how you notate a vector… • This is how you draw a vector…

  4. x A Direction of Vectors • Vector direction is the direction of the arrow, given by an angle. • This vector has an angle that is between 0o and 90o.

  5. y Quadrant II 90o <  < 180o Quadrant I 0 <  < 90o x     Quadrant III 180o <  < 270o Quadrant IV 270o <  < 360o Vector angle ranges

  6. BUT……what about the direction? In the previous example, DISPLACEMENT was asked for and since it is a VECTOR we should include a DIRECTION on our final answer. N W of N E of N N of E N of W E W N of E S of W S of E NOTE: When drawing a right triangle that conveys some type of motion, you MUST draw your components HEAD TO TOE. W of S E of S S

  7. Equal Vectors • Equal vectors have the same length and direction, and represent the same quantity (such as force or velocity). • Draw several equal vectors.

  8. A -A Inverse Vectors • Inverse vectors have the same length, but opposite direction. • Draw a set of inverse vectors.

  9. Sample problem • A surveyor stands on a riverbank directly across the river from a tree on the opposite bank. She then walks 100 m downstream, and determines that the angle from her new position to the tree on the opposite bank is 50o. How wide is the river, and how far is she from the tree in her new location?

  10. Sample problem • You are standing at the very top of a tower and notice that in order to see a manhole cover on the ground 50 meters from the base of the tower, you must look down at an angle 75o below the horizontal. If you are 1.80 m tall, how high is the tower?

  11. Practice Problem • Find the x- and y-components of the following vectors • R = 175 meters @ 55o

  12. Practice Problem • Find the x- and y-components of the following vectors • v = 25 m/s @ 178o

  13. Practice Problem • Find the x- and y-components of the following vectors • a = 2.23 m/s2 @ 50o N of W

  14. Graphical Addition of Vectors

  15. Graphical Addition of Vectors • Add vectors A and B graphically by drawing them together in a head to tail arrangement. • Draw vector A first, and then draw vector B such that its tail is on the head of vector A. • Then draw the sum, or resultant vector, by drawing a vector from the tail of A to the head of B. • Measure the magnitude and direction of the resultant vector.

  16. B B A R Practice Graphical Addition A + B = R R is called the resultant vector!

  17. The Resultant and the Equilibrant • The sum of two or more vectors is called the resultant vector. • The resultant vector can replace the vectors from which it is derived. • The resultant is completely canceled out by adding it to its inverse, which is called the equilibrant.

  18. B -R A R The Equilibrant Vector A + B = R The vector-R is called the equilibrant. If you add R and -R you get a null (or zero) vector.

  19. Graphical Subtraction of Vectors • Subtract vectors A and B graphically by adding vector A with the inverse of vector B (-B). • First draw vector A, then draw -B such that its tail is on the head of vector A. • The difference is the vector drawn from the tail of vector A to the head of -B.

  20. B -B C A Practice Graphical Subtraction A - B = C

  21. Practice Problem • Vector A points in the +x direction and has a magnitude of 75 m. Vector B has a magnitude of 30 m and has a direction of 30o relative to the x axis. Vector C has a magnitude of 50 m and points in a direction of -60o relative to the x axis. • Find A + B • Find A + B + C • Find A – B.

  22. Practice Problem • In a daily prowl through the neighborhood, a cat makes a displacement of 120 m due north, followed by a displacement of 72 m due west. Find the magnitude and displacement required if the cat is to return home.

  23. Practice Problem • If the cat in the previous problem takes 45 minutes to complete the first displacement and 17 minutes to complete the second displacement, what is the magnitude and direction of its average velocity during this 62-minute period of time?

  24. Relative Motion

  25. Relative Motion • Relative motion problems are difficult to do unless one applies vector addition concepts. • Define a vector for a swimmer’s velocity relative to the water, and another vector for the velocity of the water relative to the ground. Adding those two vectors will give you the velocity of the swimmer relative to the ground.

  26. Vs Vw Vw Vt = Vs +Vw Relative Motion

  27. Vs Vw Vw Vt = Vs +Vw Relative Motion

  28. Vs Vw Vw Vt = Vs +Vw Relative Motion

  29. Practice Problem • You are paddling a canoe in a river that is flowing at 4.0 mph east. You are capable of paddling at 5.0 mph. • If you paddle east, what is your velocity relative to the shore? • If you paddle west, what is your velocity relative to the shore? • You want to paddle straight across the river, from the south to the north.At what angle to you aim your boat relative to the shore? Assume east is 0o.

  30. Practice Problem • You are flying a plane with an airspeed of 400 mph. If you are flying in a region with a 80 mph west wind, what must your heading be to fly due north?

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