10.8 Vectors (Page 5/22)

Page 5 / 22

Writing a vector in terms of i And j

Given a vector $v$ with initial point $P = (2, −6)$ and terminal point $Q = (−6, 6),$ write the vector in terms of $i$ and $j .$

Begin by writing the general form of the vector. Then replace the coordinates with the given values.

\begin{array}{l} v = (x_{2} - x_{1}) i + (y_{2} - y_{1}) j \\ = (- 6 - 2) i + (6 - (- 6)) j \\ = - 8 i + 12 j \end{array}

Got questions? Get instant answers now!

Writing a vector in terms of i And j Using initial and terminal points

Given initial point $P_{1} = (- 1, 3)$ and terminal point $P_{2} = (2, 7),$ write the vector $v$ in terms of $i$ and $j .$

Begin by writing the general form of the vector. Then replace the coordinates with the given values.

\begin{array}{l} v = (x_{2} - x_{1}) i + (y_{2} - y_{1}) j \\ v = (2 - (- 1)) i + (7 - 3) j \\ = 3 i + 4 j \end{array}

Got questions? Get instant answers now!

try it feature

Write the vector $u$ with initial point $P = (- 1, 6)$ and terminal point $Q = (7, - 5)$ in terms of $i$ and $j .$

$u = 8 i - 11 j$

Got questions? Get instant answers now!

Performing operations on vectors in terms of i And j

When vectors are written in terms of $i$ and $j,$ we can carry out addition, subtraction, and scalar multiplication by performing operations on corresponding components.

a general note label

Adding and subtracting vectors in rectangular coordinates

Given v = a i + b j and u = c i + d j , then

\begin{matrix} v + u = (a + c) i + (b + d) j \\ v - u = (a - c) i + (b - d) j \end{matrix}

Finding the sum of the vectors

Find the sum of $v_{1} = 2 i - 3 j$ and $v_{2} = 4 i + 5 j .$

According to the formula, we have

\begin{array}{l} v_{1} + v_{2} = (2 + 4) i + (- 3 + 5) j \\ = 6 i + 2 j \end{array}

Got questions? Get instant answers now!

Calculating the component form of a vector: direction

We have seen how to draw vectors according to their initial and terminal points and how to find the position vector. We have also examined notation for vectors drawn specifically in the Cartesian coordinate plane using $i and j .$ For any of these vectors, we can calculate the magnitude. Now, we want to combine the key points, and look further at the ideas of magnitude and direction.

Calculating direction follows the same straightforward process we used for polar coordinates. We find the direction of the vector by finding the angle to the horizontal. We do this by using the basic trigonometric identities, but with $| v |$ replacing $r .$

a general note label

Vector components in terms of magnitude and direction

Given a position vector $v = ⟨ x, y ⟩$ and a direction angle $θ,$

\begin{array}{l} \cos θ = \frac{x}{| v |} & and \begin{matrix}  \end{matrix} & \sin θ = \frac{y}{| v |} \\ x = | v | \cos θ \begin{matrix}  \end{matrix} & y = | v | \sin θ \end{array}

Thus, $v = x i + y j = | v | \cos θ i + | v | \sin θ j,$ and magnitude is expressed as $| v | = \sqrt{x^{2} + y^{2}} .$

Writing a vector in terms of magnitude and direction

Write a vector with length 7 at an angle of 135° to the positive x -axis in terms of magnitude and direction.

Using the conversion formulas $x = | v | \cos θ i$ and $y = | v | \sin θ j,$ we find that

\begin{array}{l} x = 7 \cos (135°) i \\ = - \frac{7 \sqrt{2}}{2} \\ y = 7 \sin (135°) j \\ = \frac{7 \sqrt{2}}{2} \end{array}

This vector can be written as $v = 7 \cos (135°) i + 7 \sin (135°) j$ or simplified as

v = - \frac{7 \sqrt{2}}{2} i + \frac{7 \sqrt{2}}{2} j

Got questions? Get instant answers now!

trey it feature

A vector travels from the origin to the point $(3, 5) .$ Write the vector in terms of magnitude and direction.

$v = \sqrt{34} \cos (59°) i + \sqrt{34} \sin (59°) j$

Magnitude = $\sqrt{34}$

$θ = \tan^{- 1} (\frac{5}{3}) = 59.04°$

Got questions? Get instant answers now!

Finding the dot product of two vectors

As we discussed earlier in the section, scalar multiplication involves multiplying a vector by a scalar, and the result is a vector. As we have seen, multiplying a vector by a number is called scalar multiplication. If we multiply a vector by a vector, there are two possibilities: the dot product and the cross product . We will only examine the dot product here; you may encounter the cross product in more advanced mathematics courses.

Questions & Answers

calculate molarity of NaOH solution when 25.0ml of NaOH titrated with 27.2ml of 0.2m H2SO4

Gasin Reply

what's Thermochemistry

rhoda Reply

the study of the heat energy which is associated with chemical reactions

Kaddija

How was CH4 and o2 was able to produce (Co2)and (H2o

Edafe Reply

explain please

Victory

First twenty elements with their valences

Martine Reply

what is chemistry

asue Reply

what is atom

asue

what is the best way to define periodic table for jamb

Damilola Reply

what is the change of matter from one state to another

Elijah Reply

what is isolation of organic compounds

IKyernum Reply

what is atomic radius

ThankGod Reply

Read Chapter 6, section 5

Kareem

Atomic radius is the radius of the atom and is also called the orbital radius

Kareem

atomic radius is the distance between the nucleus of an atom and its valence shell

Amos

Read Chapter 6, section 5

paulino

Bohr's model of the theory atom

Ayom Reply

is there a question?

when a gas is compressed why it becomes hot?

ATOMIC

It has no oxygen then

Goldyei

read the chapter on thermochemistry...the sections on "PV" work and the First Law of Thermodynamics should help..

Which element react with water

Mukthar Reply

Mgo

Ibeh

an increase in the pressure of a gas results in the decrease of its

Valentina Reply

definition of the periodic table

Cosmos Reply

What is the lkenes

Da Reply

what were atoms composed of?

Moses Reply

Got questions? Join the online conversation and get instant answers!

Jobilize.com Reply

<< Chapter < Page Page > Chapter >>

Practice Key Terms 11

Read also:

Get Jobilize Job Search Mobile App in your pocket Now!

100% Free Mobile Applications
Receive real-time job alerts and never miss the right job again

Source: OpenStax, Algebra and trigonometry. OpenStax CNX. Nov 14, 2016 Download for free at https://legacy.cnx.org/content/col11758/1.6

Google Play and the Google Play logo are trademarks of Google Inc.

Notification Switch

Would you like to follow the 'Algebra and trigonometry' conversation and receive update notifications?

Ask

	9 Calculating the component form of a vector: direction By OpenStax Read Online Course
	7 Performing operations with vectors in terms of i And j By OpenStax Read Online Course
	Principles of microeconomics for ap® courses By OpenStax Read Online Course
	24 AP 24 Metabolism Nutrition Essay By OpenStax Start Flashcards
	14 Biology 14 DNA Structure and Function MCQ By OpenStax Start Quiz
	Music 113 By Eric Crawford Start Quiz
	6 Neuroanatomy 06 Head Somatic Visceral Sensory By Stephen Voron Start Quiz
	How well do you know 5SOS? By Wey Hey Start Quiz
	4 Biology 04 Cell Structure MCQ By OpenStax Start Quiz
	10 Sociology 10 Global Inequality MCQ By OpenStax Start Quiz
	U.s. history By OpenStax Read Online Course
	Back Safety Quiz - "Back in Action" By David Martin Start Quiz