1. Geometry 9.7 Vectors

2. Goals  I can name a vector using component notation.  I can add vectors.  I can determine the magnitude of a vector.  I can find the direction of a vector.

3. Vectors  A vector is a quantity  that has both direction  and magnitude (size).  Represented with a arrow drawn between two points. A B Initial Point Terminal Point Vector AB or AB Click on ↑

4. Component form of a vector R S Horizontal Component Vertical Component 6 4 Horizontal Component Vertical Component

5. Notation warning  (2, 3) is a point on the plane.   2, 3  is a vector that can be anywhere on the plane. (2, 3) Any vector with a horizontal component of 2 and vertical component of 3 is the vector  2, 3 .

6. Write each vector in component form.

7. Translation by Vectors  From each given point, draw the vector  a, b .  The terminal points is where the translated points are.

8. Example Translate  JKL using vector  -3, 3 . J K L J’ K’ L’ Notice: the vectors drawn from each point to its image are parallel.

9. Vector Addition  Vector u =  a, b   Vector v =  c, d   Vector sum:  u + v =  a, b  +  c, d  =  a + c, b + d 

10. Example  Add u =  4, 1  and v =  2, 5   u + v =  4 + 2, 1 + 5  =  6, 6   Graphically:  4, 1   2, 5   6, 6 

11. Example  u =  1, 2 , v =  3, -6 , w =  -6, 1   Find u + v + w.  Solution:   1, 2  +  3, -6  +  -6, 1  =   1 + 3 – 6, 2 – 6 + 1  =  -2, -3 

12. Magnitude of a vector: is the distance from the initial point to the terminal point. Use distance formula or Pythagorean theorem to find magnitude. (3, 1) (8, 8) The vector in component form is

13. Direction of a vector relative to east. R S Find the Speed of the ship represented by the given vector by finding the length of the given vector. Use distance formula. Use a trig ratio to find the direction of the ship relative to east. Use tan -1 to find the direction. 6 4 The direction of a vector is determined by the angle it makes with a horizontal line. The given vector represents a ship at sea. The magnitude represents the speed of the ship. The speed is approximately 7.2 mph. The direction relative to east is 33.7° N of East.

14. Example The vector represents the velocity of a ship at sea. Find the ships speed, then find the direction of the ship is traveling relative to west. Speed is the magnitude of vector (distance) The direction of the ship is the angle relative to a horizontal line. 6 5 Speed is approx. 7.8 mph. Direction is approx. 39.8° North of West.