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Vectors

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Title: Vectors


1
Vectors
  • Chapter 3 Pages 38-57

2
Overview
  • A vector is a quantity that can be measured in
    both a magnitude and a direction
  • Common Scalar Quantities
  • Mass
  • Work
  • Energy
  • Power
  • Temperature
  • Electric charge
  • Common Vector Quantities
  • Displacement
  • Velocity
  • Acceleration
  • Force

3
Geometric Addition and Subtraction of Vectors
  • Commutative Law
  • a b b a
  • Associative Law
  • (a b) c a (b c)
  • Vector Subtraction
  • d a b a (-b)

4
Components of a Vector Resolving the Vectors
  • ax a cos(f)
  • ay a sin(f)
  • a v(ax2 ay2)
  • tan(f) ay/ax

5
Unit Vector Notation
  • a ax i ay j az k
  • b bx i by j bz k

Addition by Components
r a b rx ax bx ry ay by rz az bz
6
MULTIPLICATION!!!
  • Vector by scalar
  • becomes a new vector of the magnitude of
  • s(scalar) a
  • the direction is the original direction of vector
    a if s is and the opposite direction if s is .
  • Vector by vector
  • Dot product
  • Cross Product

7
Dot (scalar) product
  • a b abcos(f) where f is the angle between
    the directions of a and b
  • a b (axbx) (ayby) (azbz)

Example Work F d (3.0N)(2.0m)ij
(10.5N)(2.0m)ii (6J)(0) (21J)(1) 21 J
If an object experiences a constant force, F
(3.0N)i (10.5N)j in the direction of (2.0m)j,
what is the work done by the force?
8
Cross (Vector) Product
  • a b absin(f) where f is the angle between
    the directions of a and b
  • b a -(a b) does not follow a commutative
    rule

b a
i j k
(aybz - azby)i (azbx - axbz)j (axby -
aybx)k
bx by bz
ax ay az
9
Knowledge Questions
  • 1-20

10
  • What are the formulas for determining components
    of a vector?

ax acos(?) ay asin(?)
11
  • a b b a is the _______ law of vector
    geometric addition.

Commutative Law
12
  • When a vector is multiplied by a ______, the
    direction changes based on that ________ quantity.

Scalar, scalar
13
  • In the formula ab abcos(f), f is
    __________________.

Angle between the directions of a and b.
14
  • True or False
  • (a) a b b a
  • (b) a b b a
  1. False
  2. True

15
  • An example of a scalar quantity is _____ and an
    example of a vector quantity is _____.
  • A) mass, power C) energy, work
  • B) acceleration, work D) mass, acceleration

D) mass, acceleration
16
  • Give the three letters used in expressing
    direction in unit vector notation.

I hat, j hat, k hat
17
  • Give the formula for vector subtraction.

d a b a (-b)
18
  • A ______ quantity is expressed in both magnitude
    and direction.

Vector
19
  • The process of finding the components of a vector
    is called _______ ___ ______.

Resolving the vector
20
  • Values of ax and ay are given. Find the
    magnitude of a.

a (ax2 ay2)½
21
  • dx -25.0 m
  • dy 40.0 m
  • What is the magnitude of d?

d v(dx2 dy2) v(2225 m2) 47.2 m
22
  • Torque is given by the formula t r F.
  • If a radius is given by (3.0 m)i (4.0 m)j and
    the F (10N)i (21N)j, find the torque.

T r F (3.0m)(21N) (4.0m)(10N)k (23Nm)k
23
  • Angular momentum is expressed as l m(r v).
    If an object of mass 200g, and radius (2.0m)i
    (2.0m)j is traveling at v (2.0m/s)i (3.0m/s)j
    (4.0m/s)k, what is its momentum?

l .200kg(30 42)i (-42 20)j (-22
32)k -1.6 i 1.6 j 2.0 k
24
Free Response
  • 1-10

25
  • Name the two laws of vector addition and give
    their formulas.

Associative Law (a b) c a (b
c) Commutative Law a b b a
26
  • Describe two differences between cross and dot
    products.
  1. Dot products follow a commutative rule and cross
    products dont
  2. Cross products containing vectors with no k
    direction might result in a vector in the k
    direction where dot products will not.

27
  • Fg 208 N
  • ? 30
  • Break the force into components.
  • Fg

?
Fx Fgcos(?) 180.1 N Fy Fgsin(?) 104 N
28
  • A person walks 3.1 km north, 2.4 km west, and 5.2
    km south consecutively. A) what is the magnitude
    of their displacement? and b) express the
    displacement vector in unit-vector notation using
    an appropriate coordinate system.
  1. v(2.4)2 (2.1)2 3.18 km
  2. (3.1km)i (2.4km)j (5.2km)i (-2.1km)i
    (2.4km)j
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